2 1735: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
4 multiply ?5 ?6 =<->= multiply ?6 ?5
5 [6, 5] by commutativity_of_multiply ?5 ?6
7 add (multiply ?8 ?9) ?10 =<= multiply (add ?8 ?10) (add ?9 ?10)
8 [10, 9, 8] by distributivity1 ?8 ?9 ?10
10 add ?12 (multiply ?13 ?14) =<= multiply (add ?12 ?13) (add ?12 ?14)
11 [14, 13, 12] by distributivity2 ?12 ?13 ?14
13 multiply (add ?16 ?17) ?18
15 add (multiply ?16 ?18) (multiply ?17 ?18)
16 [18, 17, 16] by distributivity3 ?16 ?17 ?18
18 multiply ?20 (add ?21 ?22)
20 add (multiply ?20 ?21) (multiply ?20 ?22)
21 [22, 21, 20] by distributivity4 ?20 ?21 ?22
23 add ?24 (inverse ?24) =>= multiplicative_identity
24 [24] by additive_inverse1 ?24
26 add (inverse ?26) ?26 =>= multiplicative_identity
27 [26] by additive_inverse2 ?26
29 multiply ?28 (inverse ?28) =>= additive_identity
30 [28] by multiplicative_inverse1 ?28
32 multiply (inverse ?30) ?30 =>= additive_identity
33 [30] by multiplicative_inverse2 ?30
35 multiply ?32 multiplicative_identity =>= ?32
36 [32] by multiplicative_id1 ?32
38 multiply multiplicative_identity ?34 =>= ?34
39 [34] by multiplicative_id2 ?34
40 1735: Id : 14, {_}: add ?36 additive_identity =>= ?36 [36] by additive_id1 ?36
41 1735: Id : 15, {_}: add additive_identity ?38 =>= ?38 [38] by additive_id2 ?38
44 multiply a (multiply b c) =<= multiply (multiply a b) c
45 [] by prove_associativity
48 Found proof, 48.697236s
49 % SZS status Unsatisfiable for BOO007-2.p
50 % SZS output start CNFRefutation for BOO007-2.p
51 Id : 12, {_}: multiply ?32 multiplicative_identity =>= ?32 [32] by multiplicative_id1 ?32
52 Id : 15, {_}: add additive_identity ?38 =>= ?38 [38] by additive_id2 ?38
53 Id : 7, {_}: multiply ?20 (add ?21 ?22) =<= add (multiply ?20 ?21) (multiply ?20 ?22) [22, 21, 20] by distributivity4 ?20 ?21 ?22
54 Id : 14, {_}: add ?36 additive_identity =>= ?36 [36] by additive_id1 ?36
55 Id : 10, {_}: multiply ?28 (inverse ?28) =>= additive_identity [28] by multiplicative_inverse1 ?28
56 Id : 13, {_}: multiply multiplicative_identity ?34 =>= ?34 [34] by multiplicative_id2 ?34
57 Id : 8, {_}: add ?24 (inverse ?24) =>= multiplicative_identity [24] by additive_inverse1 ?24
58 Id : 2, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
59 Id : 29, {_}: add (multiply ?78 ?79) ?80 =<= multiply (add ?78 ?80) (add ?79 ?80) [80, 79, 78] by distributivity1 ?78 ?79 ?80
60 Id : 5, {_}: add ?12 (multiply ?13 ?14) =<= multiply (add ?12 ?13) (add ?12 ?14) [14, 13, 12] by distributivity2 ?12 ?13 ?14
61 Id : 6, {_}: multiply (add ?16 ?17) ?18 =<= add (multiply ?16 ?18) (multiply ?17 ?18) [18, 17, 16] by distributivity3 ?16 ?17 ?18
62 Id : 4, {_}: add (multiply ?8 ?9) ?10 =<= multiply (add ?8 ?10) (add ?9 ?10) [10, 9, 8] by distributivity1 ?8 ?9 ?10
63 Id : 3, {_}: multiply ?5 ?6 =?= multiply ?6 ?5 [6, 5] by commutativity_of_multiply ?5 ?6
64 Id : 59, {_}: add (multiply ?156 (multiply ?157 ?158)) (multiply ?159 ?158) =<= multiply (add ?156 (multiply ?159 ?158)) (multiply (add ?157 ?159) ?158) [159, 158, 157, 156] by Super 4 with 6 at 2,3
65 Id : 42, {_}: multiply (add ?110 ?111) (add ?110 ?112) =>= add ?110 (multiply ?112 ?111) [112, 111, 110] by Super 3 with 5 at 3
66 Id : 54, {_}: add ?110 (multiply ?111 ?112) =?= add ?110 (multiply ?112 ?111) [112, 111, 110] by Demod 42 with 5 at 2
67 Id : 32, {_}: add (multiply ?90 ?91) ?92 =<= multiply (add ?92 ?90) (add ?91 ?92) [92, 91, 90] by Super 29 with 2 at 1,3
68 Id : 110, {_}: add ?331 (multiply (inverse ?331) ?332) =>= multiply multiplicative_identity (add ?331 ?332) [332, 331] by Super 5 with 8 at 1,3
69 Id : 1943, {_}: add ?2590 (multiply (inverse ?2590) ?2591) =>= add ?2590 ?2591 [2591, 2590] by Demod 110 with 13 at 3
70 Id : 1947, {_}: add ?2600 additive_identity =<= add ?2600 (inverse (inverse ?2600)) [2600] by Super 1943 with 10 at 2,2
71 Id : 1993, {_}: ?2600 =<= add ?2600 (inverse (inverse ?2600)) [2600] by Demod 1947 with 14 at 2
72 Id : 2411, {_}: add (multiply ?3101 ?3102) (inverse (inverse ?3102)) =<= multiply (add (inverse (inverse ?3102)) ?3101) ?3102 [3102, 3101] by Super 32 with 1993 at 2,3
73 Id : 2423, {_}: add (inverse (inverse ?3102)) (multiply ?3101 ?3102) =<= multiply (add (inverse (inverse ?3102)) ?3101) ?3102 [3101, 3102] by Demod 2411 with 2 at 2
74 Id : 2424, {_}: add (inverse (inverse ?3102)) (multiply ?3101 ?3102) =<= multiply ?3102 (add (inverse (inverse ?3102)) ?3101) [3101, 3102] by Demod 2423 with 3 at 3
75 Id : 109, {_}: add ?328 (multiply ?329 (inverse ?328)) =>= multiply (add ?328 ?329) multiplicative_identity [329, 328] by Super 5 with 8 at 2,3
76 Id : 113, {_}: add ?328 (multiply ?329 (inverse ?328)) =>= multiply multiplicative_identity (add ?328 ?329) [329, 328] by Demod 109 with 3 at 3
77 Id : 2866, {_}: add ?328 (multiply ?329 (inverse ?328)) =>= add ?328 ?329 [329, 328] by Demod 113 with 13 at 3
78 Id : 127, {_}: multiply ?345 (add (inverse ?345) ?346) =>= add additive_identity (multiply ?345 ?346) [346, 345] by Super 7 with 10 at 1,3
79 Id : 3211, {_}: multiply ?4050 (add (inverse ?4050) ?4051) =>= multiply ?4050 ?4051 [4051, 4050] by Demod 127 with 15 at 3
80 Id : 3224, {_}: multiply ?4085 (inverse ?4085) =<= multiply ?4085 (inverse (inverse (inverse ?4085))) [4085] by Super 3211 with 1993 at 2,2
81 Id : 3300, {_}: additive_identity =<= multiply ?4085 (inverse (inverse (inverse ?4085))) [4085] by Demod 3224 with 10 at 2
82 Id : 3454, {_}: add (inverse (inverse ?4196)) additive_identity =?= add (inverse (inverse ?4196)) ?4196 [4196] by Super 2866 with 3300 at 2,2
83 Id : 3477, {_}: add additive_identity (inverse (inverse ?4196)) =<= add (inverse (inverse ?4196)) ?4196 [4196] by Demod 3454 with 2 at 2
84 Id : 3478, {_}: add additive_identity (inverse (inverse ?4196)) =?= add ?4196 (inverse (inverse ?4196)) [4196] by Demod 3477 with 2 at 3
85 Id : 3479, {_}: inverse (inverse ?4196) =<= add ?4196 (inverse (inverse ?4196)) [4196] by Demod 3478 with 15 at 2
86 Id : 3480, {_}: inverse (inverse ?4196) =>= ?4196 [4196] by Demod 3479 with 1993 at 3
87 Id : 5662, {_}: add ?3102 (multiply ?3101 ?3102) =<= multiply ?3102 (add (inverse (inverse ?3102)) ?3101) [3101, 3102] by Demod 2424 with 3480 at 1,2
88 Id : 5663, {_}: add ?3102 (multiply ?3101 ?3102) =<= multiply ?3102 (add ?3102 ?3101) [3101, 3102] by Demod 5662 with 3480 at 1,2,3
89 Id : 198, {_}: add ?435 (multiply additive_identity ?436) =<= multiply ?435 (add ?435 ?436) [436, 435] by Super 5 with 14 at 1,3
90 Id : 824, {_}: add (multiply additive_identity ?1231) ?1232 =<= multiply ?1232 (add ?1231 ?1232) [1232, 1231] by Super 4 with 15 at 1,3
91 Id : 826, {_}: add (multiply additive_identity ?1237) (inverse ?1237) =>= multiply (inverse ?1237) multiplicative_identity [1237] by Super 824 with 8 at 2,3
92 Id : 858, {_}: add (inverse ?1237) (multiply additive_identity ?1237) =>= multiply (inverse ?1237) multiplicative_identity [1237] by Demod 826 with 2 at 2
93 Id : 859, {_}: add (inverse ?1237) (multiply additive_identity ?1237) =>= multiply multiplicative_identity (inverse ?1237) [1237] by Demod 858 with 3 at 3
94 Id : 860, {_}: add (inverse ?1237) (multiply additive_identity ?1237) =>= inverse ?1237 [1237] by Demod 859 with 13 at 3
95 Id : 3193, {_}: multiply ?345 (add (inverse ?345) ?346) =>= multiply ?345 ?346 [346, 345] by Demod 127 with 15 at 3
96 Id : 3207, {_}: add (inverse (add (inverse additive_identity) ?4041)) (multiply additive_identity ?4041) =>= inverse (add (inverse additive_identity) ?4041) [4041] by Super 860 with 3193 at 2,2
97 Id : 3250, {_}: add (multiply additive_identity ?4041) (inverse (add (inverse additive_identity) ?4041)) =>= inverse (add (inverse additive_identity) ?4041) [4041] by Demod 3207 with 2 at 2
98 Id : 219, {_}: inverse additive_identity =>= multiplicative_identity [] by Super 8 with 15 at 2
99 Id : 3251, {_}: add (multiply additive_identity ?4041) (inverse (add (inverse additive_identity) ?4041)) =>= inverse (add multiplicative_identity ?4041) [4041] by Demod 3250 with 219 at 1,1,3
100 Id : 3252, {_}: add (multiply additive_identity ?4041) (inverse (add multiplicative_identity ?4041)) =>= inverse (add multiplicative_identity ?4041) [4041] by Demod 3251 with 219 at 1,1,2,2
101 Id : 1948, {_}: add ?2602 (inverse ?2602) =>= add ?2602 multiplicative_identity [2602] by Super 1943 with 12 at 2,2
102 Id : 1994, {_}: multiplicative_identity =<= add ?2602 multiplicative_identity [2602] by Demod 1948 with 8 at 2
103 Id : 2021, {_}: add multiplicative_identity ?2668 =>= multiplicative_identity [2668] by Super 2 with 1994 at 3
104 Id : 3253, {_}: add (multiply additive_identity ?4041) (inverse (add multiplicative_identity ?4041)) =>= inverse multiplicative_identity [4041] by Demod 3252 with 2021 at 1,3
105 Id : 3254, {_}: add (multiply additive_identity ?4041) (inverse multiplicative_identity) =>= inverse multiplicative_identity [4041] by Demod 3253 with 2021 at 1,2,2
106 Id : 165, {_}: inverse multiplicative_identity =>= additive_identity [] by Super 10 with 13 at 2
107 Id : 3255, {_}: add (multiply additive_identity ?4041) (inverse multiplicative_identity) =>= additive_identity [4041] by Demod 3254 with 165 at 3
108 Id : 3256, {_}: add (inverse multiplicative_identity) (multiply additive_identity ?4041) =>= additive_identity [4041] by Demod 3255 with 2 at 2
109 Id : 3257, {_}: add additive_identity (multiply additive_identity ?4041) =>= additive_identity [4041] by Demod 3256 with 165 at 1,2
110 Id : 3258, {_}: multiply additive_identity ?4041 =>= additive_identity [4041] by Demod 3257 with 15 at 2
111 Id : 3331, {_}: add ?435 additive_identity =<= multiply ?435 (add ?435 ?436) [436, 435] by Demod 198 with 3258 at 2,2
112 Id : 3348, {_}: ?435 =<= multiply ?435 (add ?435 ?436) [436, 435] by Demod 3331 with 14 at 2
113 Id : 5664, {_}: add ?3102 (multiply ?3101 ?3102) =>= ?3102 [3101, 3102] by Demod 5663 with 3348 at 3
114 Id : 5671, {_}: add ?6841 (multiply ?6841 ?6842) =>= ?6841 [6842, 6841] by Super 54 with 5664 at 3
115 Id : 5795, {_}: add (multiply ?7033 (multiply ?7034 ?7035)) (multiply ?7033 ?7035) =>= multiply ?7033 (multiply (add ?7034 ?7033) ?7035) [7035, 7034, 7033] by Super 59 with 5671 at 1,3
116 Id : 5891, {_}: add (multiply ?7033 ?7035) (multiply ?7033 (multiply ?7034 ?7035)) =>= multiply ?7033 (multiply (add ?7034 ?7033) ?7035) [7034, 7035, 7033] by Demod 5795 with 2 at 2
117 Id : 5892, {_}: multiply ?7033 (add ?7035 (multiply ?7034 ?7035)) =?= multiply ?7033 (multiply (add ?7034 ?7033) ?7035) [7034, 7035, 7033] by Demod 5891 with 7 at 2
118 Id : 17951, {_}: multiply ?25977 ?25978 =<= multiply ?25977 (multiply (add ?25979 ?25977) ?25978) [25979, 25978, 25977] by Demod 5892 with 5664 at 2,2
119 Id : 17970, {_}: multiply (multiply ?26056 ?26057) ?26058 =<= multiply (multiply ?26056 ?26057) (multiply ?26057 ?26058) [26058, 26057, 26056] by Super 17951 with 5664 at 1,2,3
120 Id : 129, {_}: multiply (add ?351 ?352) (inverse ?351) =>= add additive_identity (multiply ?352 (inverse ?351)) [352, 351] by Super 6 with 10 at 1,3
121 Id : 134, {_}: multiply (inverse ?351) (add ?351 ?352) =>= add additive_identity (multiply ?352 (inverse ?351)) [352, 351] by Demod 129 with 3 at 2
122 Id : 3776, {_}: multiply (inverse ?351) (add ?351 ?352) =>= multiply ?352 (inverse ?351) [352, 351] by Demod 134 with 15 at 3
123 Id : 313, {_}: add (multiply ?580 ?581) ?582 =<= multiply (add ?580 ?582) (add ?582 ?581) [582, 581, 580] by Super 29 with 2 at 2,3
124 Id : 322, {_}: add (multiply ?615 ?616) (inverse ?615) =?= multiply multiplicative_identity (add (inverse ?615) ?616) [616, 615] by Super 313 with 8 at 1,3
125 Id : 344, {_}: add (inverse ?615) (multiply ?615 ?616) =?= multiply multiplicative_identity (add (inverse ?615) ?616) [616, 615] by Demod 322 with 2 at 2
126 Id : 345, {_}: add (inverse ?615) (multiply ?615 ?616) =>= add (inverse ?615) ?616 [616, 615] by Demod 344 with 13 at 3
127 Id : 3960, {_}: multiply (inverse (inverse ?4827)) (add (inverse ?4827) ?4828) =>= multiply (multiply ?4827 ?4828) (inverse (inverse ?4827)) [4828, 4827] by Super 3776 with 345 at 2,2
128 Id : 3987, {_}: multiply ?4828 (inverse (inverse ?4827)) =<= multiply (multiply ?4827 ?4828) (inverse (inverse ?4827)) [4827, 4828] by Demod 3960 with 3776 at 2
129 Id : 3988, {_}: multiply ?4828 (inverse (inverse ?4827)) =<= multiply (inverse (inverse ?4827)) (multiply ?4827 ?4828) [4827, 4828] by Demod 3987 with 3 at 3
130 Id : 3989, {_}: multiply ?4828 ?4827 =<= multiply (inverse (inverse ?4827)) (multiply ?4827 ?4828) [4827, 4828] by Demod 3988 with 3480 at 2,2
131 Id : 3990, {_}: multiply ?4828 ?4827 =<= multiply ?4827 (multiply ?4827 ?4828) [4827, 4828] by Demod 3989 with 3480 at 1,3
132 Id : 17971, {_}: multiply (multiply ?26060 ?26061) ?26062 =<= multiply (multiply ?26060 ?26061) (multiply ?26060 ?26062) [26062, 26061, 26060] by Super 17951 with 5671 at 1,2,3
133 Id : 31662, {_}: multiply (multiply ?52217 ?52218) (multiply ?52217 ?52219) =<= multiply (multiply ?52217 ?52219) (multiply (multiply ?52217 ?52219) ?52218) [52219, 52218, 52217] by Super 3990 with 17971 at 2,3
134 Id : 31878, {_}: multiply (multiply ?52217 ?52218) ?52219 =<= multiply (multiply ?52217 ?52219) (multiply (multiply ?52217 ?52219) ?52218) [52219, 52218, 52217] by Demod 31662 with 17971 at 2
135 Id : 31879, {_}: multiply (multiply ?52217 ?52218) ?52219 =>= multiply ?52218 (multiply ?52217 ?52219) [52219, 52218, 52217] by Demod 31878 with 3990 at 3
136 Id : 32123, {_}: multiply ?26057 (multiply ?26056 ?26058) =<= multiply (multiply ?26056 ?26057) (multiply ?26057 ?26058) [26058, 26056, 26057] by Demod 17970 with 31879 at 2
137 Id : 32124, {_}: multiply ?26057 (multiply ?26056 ?26058) =<= multiply ?26057 (multiply ?26056 (multiply ?26057 ?26058)) [26058, 26056, 26057] by Demod 32123 with 31879 at 3
138 Id : 218, {_}: add (multiply additive_identity ?463) ?464 =<= multiply ?464 (add ?463 ?464) [464, 463] by Super 4 with 15 at 1,3
139 Id : 3330, {_}: add additive_identity ?464 =<= multiply ?464 (add ?463 ?464) [463, 464] by Demod 218 with 3258 at 1,2
140 Id : 3349, {_}: ?464 =<= multiply ?464 (add ?463 ?464) [463, 464] by Demod 3330 with 15 at 2
141 Id : 5805, {_}: add ?7066 (multiply ?7067 (multiply ?7066 ?7068)) =>= multiply (add ?7066 ?7067) ?7066 [7068, 7067, 7066] by Super 5 with 5671 at 2,3
142 Id : 5872, {_}: add ?7066 (multiply ?7067 (multiply ?7066 ?7068)) =>= multiply ?7066 (add ?7066 ?7067) [7068, 7067, 7066] by Demod 5805 with 3 at 3
143 Id : 5873, {_}: add ?7066 (multiply ?7067 (multiply ?7066 ?7068)) =>= ?7066 [7068, 7067, 7066] by Demod 5872 with 3348 at 3
144 Id : 16789, {_}: multiply ?23487 (multiply ?23488 ?23489) =<= multiply (multiply ?23487 (multiply ?23488 ?23489)) ?23488 [23489, 23488, 23487] by Super 3349 with 5873 at 2,3
145 Id : 16955, {_}: multiply ?23487 (multiply ?23488 ?23489) =<= multiply ?23488 (multiply ?23487 (multiply ?23488 ?23489)) [23489, 23488, 23487] by Demod 16789 with 3 at 3
146 Id : 32125, {_}: multiply ?26057 (multiply ?26056 ?26058) =?= multiply ?26056 (multiply ?26057 ?26058) [26058, 26056, 26057] by Demod 32124 with 16955 at 3
147 Id : 32577, {_}: multiply a (multiply b c) =?= multiply a (multiply b c) [] by Demod 32576 with 3 at 2,3
148 Id : 32576, {_}: multiply a (multiply b c) =?= multiply a (multiply c b) [] by Demod 32575 with 32125 at 3
149 Id : 32575, {_}: multiply a (multiply b c) =<= multiply c (multiply a b) [] by Demod 1 with 3 at 3
150 Id : 1, {_}: multiply a (multiply b c) =<= multiply (multiply a b) c [] by prove_associativity
151 % SZS output end CNFRefutation for BOO007-2.p
152 1736: solved BOO007-2.p in 9.728607 using kbo
153 !! infer_left 303 0.0003 0.0000 0.0000
154 !! infer_right 153 43.6267 2.4522 0.2851
155 !! simplify_goal 303 0.4737 0.4004 0.0016
156 !! keep_simplified 615 4.1116 0.4999 0.0067
157 !! simplification_step 678 4.1095 0.4088 0.0061
158 !! simplify 25989 42.4206 0.4126 0.0016
159 !! orphan_murder 656 0.0188 0.0005 0.0000
160 !! is_subsumed 21710 3.8041 0.4122 0.0002
161 !! build_new_clause 17650 2.3840 0.4063 0.0001
162 !! demodulate 25789 38.1945 0.4057 0.0015
163 !! demod 153271 36.0228 0.4044 0.0002
164 !! demod.apply_subst 518702 4.5318 0.4001 0.0000
165 !! demod.compare_terms 244926 14.8635 0.4041 0.0001
166 !! demod.retrieve_generalizations 153271 3.4032 0.4001 0.0000
167 !! demod.unify 425467 5.9114 0.4043 0.0000
168 !! build_clause 36279 2.0349 0.4027 0.0001
169 !! compare_terms(kbo) 285288 13.4065 0.4012 0.0000
170 !! compare_terms(nrkbo) 15 0.0001 0.0000 0.0000
172 1770: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
174 multiply ?5 ?6 =<->= multiply ?6 ?5
175 [6, 5] by commutativity_of_multiply ?5 ?6
177 add ?8 (multiply ?9 ?10) =<= multiply (add ?8 ?9) (add ?8 ?10)
178 [10, 9, 8] by distributivity1 ?8 ?9 ?10
180 multiply ?12 (add ?13 ?14)
182 add (multiply ?12 ?13) (multiply ?12 ?14)
183 [14, 13, 12] by distributivity2 ?12 ?13 ?14
184 1770: Id : 6, {_}: add ?16 additive_identity =>= ?16 [16] by additive_id1 ?16
186 multiply ?18 multiplicative_identity =>= ?18
187 [18] by multiplicative_id1 ?18
189 add ?20 (inverse ?20) =>= multiplicative_identity
190 [20] by additive_inverse1 ?20
192 multiply ?22 (inverse ?22) =>= additive_identity
193 [22] by multiplicative_inverse1 ?22
196 multiply a (multiply b c) =<= multiply (multiply a b) c
197 [] by prove_associativity
200 Found proof, 54.096388s
201 % SZS status Unsatisfiable for BOO007-4.p
202 % SZS output start CNFRefutation for BOO007-4.p
203 Id : 5, {_}: multiply ?12 (add ?13 ?14) =<= add (multiply ?12 ?13) (multiply ?12 ?14) [14, 13, 12] by distributivity2 ?12 ?13 ?14
204 Id : 8, {_}: add ?20 (inverse ?20) =>= multiplicative_identity [20] by additive_inverse1 ?20
205 Id : 4, {_}: add ?8 (multiply ?9 ?10) =<= multiply (add ?8 ?9) (add ?8 ?10) [10, 9, 8] by distributivity1 ?8 ?9 ?10
206 Id : 7, {_}: multiply ?18 multiplicative_identity =>= ?18 [18] by multiplicative_id1 ?18
207 Id : 40, {_}: multiply ?112 (add ?113 ?114) =<= add (multiply ?112 ?113) (multiply ?112 ?114) [114, 113, 112] by distributivity2 ?112 ?113 ?114
208 Id : 6, {_}: add ?16 additive_identity =>= ?16 [16] by additive_id1 ?16
209 Id : 2, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
210 Id : 23, {_}: add ?62 (multiply ?63 ?64) =<= multiply (add ?62 ?63) (add ?62 ?64) [64, 63, 62] by distributivity1 ?62 ?63 ?64
211 Id : 3, {_}: multiply ?5 ?6 =?= multiply ?6 ?5 [6, 5] by commutativity_of_multiply ?5 ?6
212 Id : 92, {_}: add ?229 (multiply ?230 ?231) =<= multiply (add ?229 ?230) (add ?231 ?229) [231, 230, 229] by Super 23 with 2 at 2,3
213 Id : 99, {_}: add ?256 (multiply additive_identity ?257) =<= multiply ?256 (add ?257 ?256) [257, 256] by Super 92 with 6 at 1,3
214 Id : 57, {_}: add additive_identity ?160 =>= ?160 [160] by Super 2 with 6 at 3
215 Id : 1995, {_}: multiply ?2660 (add ?2661 ?2662) =<= add (multiply ?2660 ?2661) (multiply ?2662 ?2660) [2662, 2661, 2660] by Super 40 with 3 at 2,3
216 Id : 67, {_}: multiply multiplicative_identity ?178 =>= ?178 [178] by Super 3 with 7 at 3
217 Id : 1999, {_}: multiply ?2674 (add ?2675 multiplicative_identity) =?= add (multiply ?2674 ?2675) ?2674 [2675, 2674] by Super 1995 with 67 at 2,3
218 Id : 76, {_}: add ?193 (multiply (inverse ?193) ?194) =>= multiply multiplicative_identity (add ?193 ?194) [194, 193] by Super 4 with 8 at 1,3
219 Id : 1718, {_}: add ?2343 (multiply (inverse ?2343) ?2344) =>= add ?2343 ?2344 [2344, 2343] by Demod 76 with 67 at 3
220 Id : 1722, {_}: add ?2353 (inverse ?2353) =>= add ?2353 multiplicative_identity [2353] by Super 1718 with 7 at 2,2
221 Id : 1761, {_}: multiplicative_identity =<= add ?2353 multiplicative_identity [2353] by Demod 1722 with 8 at 2
222 Id : 2057, {_}: multiply ?2674 multiplicative_identity =<= add (multiply ?2674 ?2675) ?2674 [2675, 2674] by Demod 1999 with 1761 at 2,2
223 Id : 2058, {_}: multiply ?2674 multiplicative_identity =<= add ?2674 (multiply ?2674 ?2675) [2675, 2674] by Demod 2057 with 2 at 3
224 Id : 2059, {_}: ?2674 =<= add ?2674 (multiply ?2674 ?2675) [2675, 2674] by Demod 2058 with 7 at 2
225 Id : 2704, {_}: additive_identity =<= multiply additive_identity ?3300 [3300] by Super 57 with 2059 at 2
226 Id : 2787, {_}: add ?256 additive_identity =<= multiply ?256 (add ?257 ?256) [257, 256] by Demod 99 with 2704 at 2,2
227 Id : 2795, {_}: ?256 =<= multiply ?256 (add ?257 ?256) [257, 256] by Demod 2787 with 6 at 2
228 Id : 38, {_}: add (multiply ?102 ?103) (multiply ?104 (multiply ?102 ?105)) =<= multiply (add (multiply ?102 ?103) ?104) (multiply ?102 (add ?103 ?105)) [105, 104, 103, 102] by Super 4 with 5 at 2,3
229 Id : 1787, {_}: add multiplicative_identity ?2424 =>= multiplicative_identity [2424] by Super 2 with 1761 at 3
230 Id : 1863, {_}: add (multiply ?2484 multiplicative_identity) (multiply ?2485 (multiply ?2484 ?2486)) =?= multiply (add (multiply ?2484 multiplicative_identity) ?2485) (multiply ?2484 multiplicative_identity) [2486, 2485, 2484] by Super 38 with 1787 at 2,2,3
231 Id : 1888, {_}: add ?2484 (multiply ?2485 (multiply ?2484 ?2486)) =?= multiply (add (multiply ?2484 multiplicative_identity) ?2485) (multiply ?2484 multiplicative_identity) [2486, 2485, 2484] by Demod 1863 with 7 at 1,2
232 Id : 1889, {_}: add ?2484 (multiply ?2485 (multiply ?2484 ?2486)) =?= multiply (multiply ?2484 multiplicative_identity) (add (multiply ?2484 multiplicative_identity) ?2485) [2486, 2485, 2484] by Demod 1888 with 3 at 3
233 Id : 56, {_}: add ?157 (multiply additive_identity ?158) =<= multiply ?157 (add ?157 ?158) [158, 157] by Super 4 with 6 at 1,3
234 Id : 1890, {_}: add ?2484 (multiply ?2485 (multiply ?2484 ?2486)) =?= add (multiply ?2484 multiplicative_identity) (multiply additive_identity ?2485) [2486, 2485, 2484] by Demod 1889 with 56 at 3
235 Id : 1891, {_}: add ?2484 (multiply ?2485 (multiply ?2484 ?2486)) =>= add ?2484 (multiply additive_identity ?2485) [2486, 2485, 2484] by Demod 1890 with 7 at 1,3
236 Id : 11344, {_}: add ?2484 (multiply ?2485 (multiply ?2484 ?2486)) =>= add ?2484 additive_identity [2486, 2485, 2484] by Demod 1891 with 2704 at 2,3
237 Id : 11345, {_}: add ?2484 (multiply ?2485 (multiply ?2484 ?2486)) =>= ?2484 [2486, 2485, 2484] by Demod 11344 with 6 at 3
238 Id : 11361, {_}: multiply ?14884 (multiply ?14885 ?14886) =<= multiply (multiply ?14884 (multiply ?14885 ?14886)) ?14885 [14886, 14885, 14884] by Super 2795 with 11345 at 2,3
239 Id : 20000, {_}: multiply ?31824 (multiply ?31825 ?31826) =<= multiply ?31825 (multiply ?31824 (multiply ?31825 ?31826)) [31826, 31825, 31824] by Demod 11361 with 3 at 3
240 Id : 20001, {_}: multiply ?31828 (multiply ?31829 ?31830) =<= multiply ?31829 (multiply ?31828 (multiply ?31830 ?31829)) [31830, 31829, 31828] by Super 20000 with 3 at 2,2,3
241 Id : 2015, {_}: multiply ?2737 (add multiplicative_identity ?2738) =?= add ?2737 (multiply ?2738 ?2737) [2738, 2737] by Super 1995 with 7 at 1,3
242 Id : 2080, {_}: multiply ?2737 multiplicative_identity =<= add ?2737 (multiply ?2738 ?2737) [2738, 2737] by Demod 2015 with 1787 at 2,2
243 Id : 2081, {_}: ?2737 =<= add ?2737 (multiply ?2738 ?2737) [2738, 2737] by Demod 2080 with 7 at 2
244 Id : 3223, {_}: add ?3993 (multiply ?3994 (multiply ?3995 ?3993)) =>= multiply (add ?3993 ?3994) ?3993 [3995, 3994, 3993] by Super 4 with 2081 at 2,3
245 Id : 3268, {_}: add ?3993 (multiply ?3994 (multiply ?3995 ?3993)) =>= multiply ?3993 (add ?3993 ?3994) [3995, 3994, 3993] by Demod 3223 with 3 at 3
246 Id : 2786, {_}: add ?157 additive_identity =<= multiply ?157 (add ?157 ?158) [158, 157] by Demod 56 with 2704 at 2,2
247 Id : 2796, {_}: ?157 =<= multiply ?157 (add ?157 ?158) [158, 157] by Demod 2786 with 6 at 2
248 Id : 3269, {_}: add ?3993 (multiply ?3994 (multiply ?3995 ?3993)) =>= ?3993 [3995, 3994, 3993] by Demod 3268 with 2796 at 3
249 Id : 12646, {_}: multiply ?17385 (multiply ?17386 ?17387) =<= multiply (multiply ?17385 (multiply ?17386 ?17387)) ?17387 [17387, 17386, 17385] by Super 2795 with 3269 at 2,3
250 Id : 12791, {_}: multiply ?17385 (multiply ?17386 ?17387) =<= multiply ?17387 (multiply ?17385 (multiply ?17386 ?17387)) [17387, 17386, 17385] by Demod 12646 with 3 at 3
251 Id : 29290, {_}: multiply ?31828 (multiply ?31829 ?31830) =?= multiply ?31828 (multiply ?31830 ?31829) [31830, 31829, 31828] by Demod 20001 with 12791 at 3
252 Id : 2707, {_}: add (multiply ?3308 ?3309) (multiply additive_identity ?3308) =>= multiply (multiply ?3308 ?3309) ?3308 [3309, 3308] by Super 99 with 2059 at 2,3
253 Id : 41, {_}: multiply ?116 (add ?117 ?118) =<= add (multiply ?116 ?117) (multiply ?118 ?116) [118, 117, 116] by Super 40 with 3 at 2,3
254 Id : 2744, {_}: multiply ?3308 (add ?3309 additive_identity) =<= multiply (multiply ?3308 ?3309) ?3308 [3309, 3308] by Demod 2707 with 41 at 2
255 Id : 2745, {_}: multiply ?3308 (add ?3309 additive_identity) =<= multiply ?3308 (multiply ?3308 ?3309) [3309, 3308] by Demod 2744 with 3 at 3
256 Id : 2746, {_}: multiply ?3308 ?3309 =<= multiply ?3308 (multiply ?3308 ?3309) [3309, 3308] by Demod 2745 with 6 at 2,2
257 Id : 3308, {_}: multiply ?4113 (add ?4114 (multiply ?4113 ?4115)) =>= add (multiply ?4113 ?4114) (multiply ?4113 ?4115) [4115, 4114, 4113] by Super 5 with 2746 at 2,3
258 Id : 13184, {_}: multiply ?18521 (add ?18522 (multiply ?18521 ?18523)) =>= multiply ?18521 (add ?18522 ?18523) [18523, 18522, 18521] by Demod 3308 with 5 at 3
259 Id : 13242, {_}: multiply ?18755 (multiply ?18756 (add ?18757 ?18755)) =?= multiply ?18755 (add (multiply ?18756 ?18757) ?18756) [18757, 18756, 18755] by Super 13184 with 41 at 2,2
260 Id : 36, {_}: add (multiply ?94 ?95) (multiply ?94 ?96) =>= multiply ?94 (add ?96 ?95) [96, 95, 94] by Super 2 with 5 at 3
261 Id : 50, {_}: multiply ?94 (add ?95 ?96) =?= multiply ?94 (add ?96 ?95) [96, 95, 94] by Demod 36 with 5 at 2
262 Id : 13377, {_}: multiply ?18755 (multiply ?18756 (add ?18757 ?18755)) =?= multiply ?18755 (add ?18756 (multiply ?18756 ?18757)) [18757, 18756, 18755] by Demod 13242 with 50 at 3
263 Id : 21775, {_}: multiply ?35092 (multiply ?35093 (add ?35094 ?35092)) =>= multiply ?35092 ?35093 [35094, 35093, 35092] by Demod 13377 with 2059 at 2,3
264 Id : 21806, {_}: multiply (multiply ?35231 ?35232) (multiply ?35233 ?35231) =>= multiply (multiply ?35231 ?35232) ?35233 [35233, 35232, 35231] by Super 21775 with 2059 at 2,2,2
265 Id : 30826, {_}: multiply (multiply ?54413 ?54414) (multiply ?54413 ?54415) =>= multiply (multiply ?54413 ?54414) ?54415 [54415, 54414, 54413] by Super 29290 with 21806 at 3
266 Id : 21807, {_}: multiply (multiply ?35235 ?35236) (multiply ?35237 ?35236) =>= multiply (multiply ?35235 ?35236) ?35237 [35237, 35236, 35235] by Super 21775 with 2081 at 2,2,2
267 Id : 31457, {_}: multiply (multiply ?55866 ?55867) (multiply ?55867 ?55868) =>= multiply (multiply ?55866 ?55867) ?55868 [55868, 55867, 55866] by Super 29290 with 21807 at 3
268 Id : 30871, {_}: multiply (multiply ?54619 ?54620) (multiply ?54620 ?54621) =>= multiply (multiply ?54620 ?54621) ?54619 [54621, 54620, 54619] by Super 3 with 21806 at 3
269 Id : 35987, {_}: multiply (multiply ?55867 ?55868) ?55866 =?= multiply (multiply ?55866 ?55867) ?55868 [55866, 55868, 55867] by Demod 31457 with 30871 at 2
270 Id : 36082, {_}: multiply ?65656 (multiply ?65657 ?65658) =<= multiply (multiply ?65656 ?65657) ?65658 [65658, 65657, 65656] by Super 3 with 35987 at 3
271 Id : 36556, {_}: multiply ?54413 (multiply ?54414 (multiply ?54413 ?54415)) =>= multiply (multiply ?54413 ?54414) ?54415 [54415, 54414, 54413] by Demod 30826 with 36082 at 2
272 Id : 36557, {_}: multiply ?54413 (multiply ?54414 (multiply ?54413 ?54415)) =>= multiply ?54413 (multiply ?54414 ?54415) [54415, 54414, 54413] by Demod 36556 with 36082 at 3
273 Id : 11495, {_}: multiply ?14884 (multiply ?14885 ?14886) =<= multiply ?14885 (multiply ?14884 (multiply ?14885 ?14886)) [14886, 14885, 14884] by Demod 11361 with 3 at 3
274 Id : 36558, {_}: multiply ?54414 (multiply ?54413 ?54415) =?= multiply ?54413 (multiply ?54414 ?54415) [54415, 54413, 54414] by Demod 36557 with 11495 at 2
275 Id : 37012, {_}: multiply a (multiply b c) =?= multiply a (multiply b c) [] by Demod 37011 with 3 at 2,3
276 Id : 37011, {_}: multiply a (multiply b c) =?= multiply a (multiply c b) [] by Demod 37010 with 36558 at 3
277 Id : 37010, {_}: multiply a (multiply b c) =<= multiply c (multiply a b) [] by Demod 1 with 3 at 3
278 Id : 1, {_}: multiply a (multiply b c) =<= multiply (multiply a b) c [] by prove_associativity
279 % SZS output end CNFRefutation for BOO007-4.p
280 1771: solved BOO007-4.p in 11.70073 using kbo
281 !! infer_left 319 0.0003 0.0000 0.0000
282 !! infer_right 161 46.7423 2.5437 0.2903
283 !! simplify_goal 319 0.7817 0.4007 0.0025
284 !! keep_simplified 827 5.3629 0.4213 0.0065
285 !! simplification_step 893 5.3604 0.4212 0.0060
286 !! simplify 30590 43.9838 0.4162 0.0014
287 !! orphan_murder 850 0.4325 0.4005 0.0005
288 !! is_subsumed 24422 1.7134 0.4001 0.0001
289 !! build_new_clause 20808 4.7365 0.4009 0.0002
290 !! demodulate 29959 42.1389 0.4162 0.0014
291 !! demod 177657 38.8888 0.4162 0.0002
292 !! demod.apply_subst 608092 5.6835 0.4001 0.0000
293 !! demod.compare_terms 286848 14.4398 0.4003 0.0001
294 !! demod.retrieve_generalizations 177657 4.8575 0.4161 0.0000
295 !! demod.unify 518629 6.7446 0.4002 0.0000
296 !! build_clause 40982 5.7804 0.4005 0.0001
297 !! compare_terms(kbo) 333832 15.8655 0.4005 0.0000
298 !! compare_terms(nrkbo) 9 0.0001 0.0000 0.0000
301 multiply (multiply ?2 ?3 ?4) ?5 (multiply ?2 ?3 ?6)
303 multiply ?2 ?3 (multiply ?4 ?5 ?6)
304 [6, 5, 4, 3, 2] by associativity ?2 ?3 ?4 ?5 ?6
305 1805: Id : 3, {_}: multiply ?8 ?8 ?9 =>= ?8 [9, 8] by ternary_multiply_2 ?8 ?9
307 multiply (inverse ?11) ?11 ?12 =>= ?12
308 [12, 11] by left_inverse ?11 ?12
310 multiply ?14 ?15 (inverse ?15) =>= ?14
311 [15, 14] by right_inverse ?14 ?15
313 1805: Id : 1, {_}: multiply y x x =>= x [] by prove_ternary_multiply_1_independant
314 % SZS status Timeout for BOO019-1.p
316 1832: Id : 2, {_}: multiply (add ?2 ?3) ?3 =>= ?3 [3, 2] by multiply_add ?2 ?3
318 multiply ?5 (add ?6 ?7) =<= add (multiply ?6 ?5) (multiply ?7 ?5)
319 [7, 6, 5] by multiply_add_property ?5 ?6 ?7
320 1832: Id : 4, {_}: add ?9 (inverse ?9) =>= n1 [9] by additive_inverse ?9
324 add (multiply ?11 (inverse ?12))
325 (add (multiply ?11 ?13) (multiply (inverse ?12) ?13))
326 [13, 12, 11] by pixley_defn ?11 ?12 ?13
327 1832: Id : 6, {_}: pixley ?15 ?15 ?16 =>= ?16 [16, 15] by pixley1 ?15 ?16
328 1832: Id : 7, {_}: pixley ?18 ?19 ?19 =>= ?18 [19, 18] by pixley2 ?18 ?19
329 1832: Id : 8, {_}: pixley ?21 ?22 ?21 =>= ?21 [22, 21] by pixley3 ?21 ?22
332 add a (multiply b c) =<= multiply (add a b) (add a c)
333 [] by prove_add_multiply_property
336 Found proof, 55.121856s
337 % SZS status Unsatisfiable for BOO023-1.p
338 % SZS output start CNFRefutation for BOO023-1.p
339 Id : 8, {_}: pixley ?21 ?22 ?21 =>= ?21 [22, 21] by pixley3 ?21 ?22
340 Id : 6, {_}: pixley ?15 ?15 ?16 =>= ?16 [16, 15] by pixley1 ?15 ?16
341 Id : 4, {_}: add ?9 (inverse ?9) =>= n1 [9] by additive_inverse ?9
342 Id : 7, {_}: pixley ?18 ?19 ?19 =>= ?18 [19, 18] by pixley2 ?18 ?19
343 Id : 5, {_}: pixley ?11 ?12 ?13 =<= add (multiply ?11 (inverse ?12)) (add (multiply ?11 ?13) (multiply (inverse ?12) ?13)) [13, 12, 11] by pixley_defn ?11 ?12 ?13
344 Id : 2, {_}: multiply (add ?2 ?3) ?3 =>= ?3 [3, 2] by multiply_add ?2 ?3
345 Id : 12, {_}: multiply ?33 (add ?34 ?35) =<= add (multiply ?34 ?33) (multiply ?35 ?33) [35, 34, 33] by multiply_add_property ?33 ?34 ?35
346 Id : 3, {_}: multiply ?5 (add ?6 ?7) =<= add (multiply ?6 ?5) (multiply ?7 ?5) [7, 6, 5] by multiply_add_property ?5 ?6 ?7
347 Id : 13, {_}: multiply ?37 (add ?38 (add ?39 ?37)) =>= add (multiply ?38 ?37) ?37 [39, 38, 37] by Super 12 with 2 at 2,3
348 Id : 83, {_}: multiply (add ?226 (add ?227 ?228)) (add ?228 ?229) =<= add (add (multiply ?226 ?228) ?228) (multiply ?229 (add ?226 (add ?227 ?228))) [229, 228, 227, 226] by Super 3 with 13 at 1,3
349 Id : 19, {_}: pixley ?11 ?12 ?13 =<= add (multiply ?11 (inverse ?12)) (multiply ?13 (add ?11 (inverse ?12))) [13, 12, 11] by Demod 5 with 3 at 2,3
350 Id : 21, {_}: pixley ?58 ?59 ?60 =<= add (multiply ?58 (inverse ?59)) (multiply ?60 (add ?58 (inverse ?59))) [60, 59, 58] by Demod 5 with 3 at 2,3
351 Id : 22, {_}: pixley ?62 ?62 ?63 =<= add (multiply ?62 (inverse ?62)) (multiply ?63 n1) [63, 62] by Super 21 with 4 at 2,2,3
352 Id : 125, {_}: ?331 =<= add (multiply ?332 (inverse ?332)) (multiply ?331 n1) [332, 331] by Demod 22 with 6 at 2
353 Id : 16, {_}: multiply n1 (inverse ?49) =>= inverse ?49 [49] by Super 2 with 4 at 1,2
354 Id : 129, {_}: ?343 =<= add (inverse n1) (multiply ?343 n1) [343] by Super 125 with 16 at 1,3
355 Id : 120, {_}: ?63 =<= add (multiply ?62 (inverse ?62)) (multiply ?63 n1) [62, 63] by Demod 22 with 6 at 2
356 Id : 14, {_}: multiply ?41 (add (add ?42 ?41) ?43) =>= add ?41 (multiply ?43 ?41) [43, 42, 41] by Super 12 with 2 at 1,3
357 Id : 150, {_}: ?377 =<= add (inverse n1) (multiply ?377 n1) [377] by Super 125 with 16 at 1,3
358 Id : 234, {_}: add ?516 n1 =?= add (inverse n1) n1 [516] by Super 150 with 2 at 2,3
359 Id : 153, {_}: add ?383 n1 =?= add (inverse n1) n1 [383] by Super 150 with 2 at 2,3
360 Id : 240, {_}: add ?528 n1 =?= add ?529 n1 [529, 528] by Super 234 with 153 at 3
361 Id : 124, {_}: multiply (multiply ?328 n1) (add ?329 ?328) =<= add (multiply ?329 (multiply ?328 n1)) (multiply ?328 n1) [329, 328] by Super 13 with 120 at 2,2,2
362 Id : 45, {_}: multiply (multiply ?119 (add ?120 ?121)) (multiply ?121 ?119) =>= multiply ?121 ?119 [121, 120, 119] by Super 2 with 3 at 1,2
363 Id : 48, {_}: multiply (multiply ?132 n1) (multiply (inverse ?133) ?132) =>= multiply (inverse ?133) ?132 [133, 132] by Super 45 with 4 at 2,1,2
364 Id : 56, {_}: multiply (inverse ?155) (add ?156 n1) =<= add (multiply ?156 (inverse ?155)) (inverse ?155) [156, 155] by Super 3 with 16 at 2,3
365 Id : 69, {_}: multiply (inverse ?183) (add ?184 n1) =<= add (multiply ?184 (inverse ?183)) (inverse ?183) [184, 183] by Super 3 with 16 at 2,3
366 Id : 70, {_}: multiply (inverse ?186) (add (add ?187 (inverse ?186)) n1) =>= add (inverse ?186) (inverse ?186) [187, 186] by Super 69 with 2 at 1,3
367 Id : 514, {_}: add (inverse ?186) (multiply n1 (inverse ?186)) =>= add (inverse ?186) (inverse ?186) [186] by Demod 70 with 14 at 2
368 Id : 57, {_}: multiply (inverse ?158) (add n1 ?159) =<= add (inverse ?158) (multiply ?159 (inverse ?158)) [159, 158] by Super 3 with 16 at 1,3
369 Id : 515, {_}: multiply (inverse ?186) (add n1 n1) =?= add (inverse ?186) (inverse ?186) [186] by Demod 514 with 57 at 2
370 Id : 165, {_}: multiply (pixley ?406 ?407 ?408) (multiply ?408 (add ?406 (inverse ?407))) =>= multiply ?408 (add ?406 (inverse ?407)) [408, 407, 406] by Super 2 with 19 at 1,2
371 Id : 1508, {_}: multiply ?2277 (multiply ?2278 (add ?2277 (inverse ?2278))) =>= multiply ?2278 (add ?2277 (inverse ?2278)) [2278, 2277] by Super 165 with 7 at 1,2
372 Id : 388, {_}: multiply (multiply ?729 n1) (multiply (inverse ?730) ?729) =>= multiply (inverse ?730) ?729 [730, 729] by Super 45 with 4 at 2,1,2
373 Id : 396, {_}: multiply n1 (multiply (inverse ?752) (add ?753 n1)) =>= multiply (inverse ?752) (add ?753 n1) [753, 752] by Super 388 with 2 at 1,2
374 Id : 517, {_}: multiply n1 (add (inverse ?924) (inverse ?924)) =>= multiply (inverse ?924) (add n1 n1) [924] by Super 396 with 515 at 2,2
375 Id : 1514, {_}: multiply (inverse n1) (multiply (inverse n1) (add n1 n1)) =>= multiply n1 (add (inverse n1) (inverse n1)) [] by Super 1508 with 517 at 2,2
376 Id : 1532, {_}: multiply (inverse n1) (add (inverse n1) (inverse n1)) =>= multiply n1 (add (inverse n1) (inverse n1)) [] by Demod 1514 with 515 at 2,2
377 Id : 1533, {_}: multiply (inverse n1) (add (inverse n1) (inverse n1)) =>= multiply (inverse n1) (add n1 n1) [] by Demod 1532 with 517 at 3
378 Id : 1534, {_}: multiply (inverse n1) (add (inverse n1) (inverse n1)) =>= add (inverse n1) (inverse n1) [] by Demod 1533 with 515 at 3
379 Id : 1547, {_}: pixley (inverse n1) n1 (inverse n1) =<= add (multiply (inverse n1) (inverse n1)) (add (inverse n1) (inverse n1)) [] by Super 19 with 1534 at 2,3
380 Id : 1558, {_}: inverse n1 =<= add (multiply (inverse n1) (inverse n1)) (add (inverse n1) (inverse n1)) [] by Demod 1547 with 8 at 2
381 Id : 2318, {_}: multiply (inverse n1) (inverse n1) =<= add (multiply (multiply (inverse n1) (inverse n1)) (inverse n1)) (inverse n1) [] by Super 13 with 1558 at 2,2
382 Id : 2670, {_}: multiply (inverse n1) (inverse n1) =<= multiply (inverse n1) (add (multiply (inverse n1) (inverse n1)) n1) [] by Demod 2318 with 56 at 3
383 Id : 2685, {_}: multiply (inverse n1) (inverse n1) =<= multiply (inverse n1) (add ?3417 n1) [3417] by Super 2670 with 240 at 2,3
384 Id : 2739, {_}: multiply (inverse n1) (inverse n1) =>= add (inverse n1) (inverse n1) [] by Super 515 with 2685 at 2
385 Id : 2820, {_}: multiply (inverse n1) (add (inverse n1) n1) =<= add (add (inverse n1) (inverse n1)) (inverse n1) [] by Super 56 with 2739 at 1,3
386 Id : 2807, {_}: add (inverse n1) (inverse n1) =<= multiply (inverse n1) (add ?3417 n1) [3417] by Demod 2685 with 2739 at 2
387 Id : 2842, {_}: add (inverse n1) (inverse n1) =<= add (add (inverse n1) (inverse n1)) (inverse n1) [] by Demod 2820 with 2807 at 2
388 Id : 2909, {_}: multiply (inverse n1) (add (inverse n1) (inverse n1)) =>= add (inverse n1) (multiply (inverse n1) (inverse n1)) [] by Super 14 with 2842 at 2,2
389 Id : 2958, {_}: add (inverse n1) (inverse n1) =<= add (inverse n1) (multiply (inverse n1) (inverse n1)) [] by Demod 2909 with 1534 at 2
390 Id : 2959, {_}: add (inverse n1) (inverse n1) =<= multiply (inverse n1) (add n1 (inverse n1)) [] by Demod 2958 with 57 at 3
391 Id : 2960, {_}: add (inverse n1) (inverse n1) =>= multiply (inverse n1) n1 [] by Demod 2959 with 4 at 2,3
392 Id : 2810, {_}: inverse n1 =<= add (add (inverse n1) (inverse n1)) (add (inverse n1) (inverse n1)) [] by Demod 1558 with 2739 at 1,3
393 Id : 2999, {_}: inverse n1 =<= add (multiply (inverse n1) n1) (add (inverse n1) (inverse n1)) [] by Demod 2810 with 2960 at 1,3
394 Id : 3000, {_}: inverse n1 =<= add (multiply (inverse n1) n1) (multiply (inverse n1) n1) [] by Demod 2999 with 2960 at 2,3
395 Id : 3003, {_}: inverse n1 =<= multiply n1 (add (inverse n1) (inverse n1)) [] by Demod 3000 with 3 at 3
396 Id : 3004, {_}: inverse n1 =<= multiply (inverse n1) (add n1 n1) [] by Demod 3003 with 517 at 3
397 Id : 3005, {_}: inverse n1 =<= add (inverse n1) (inverse n1) [] by Demod 3004 with 515 at 3
398 Id : 3006, {_}: inverse n1 =<= multiply (inverse n1) n1 [] by Demod 3005 with 2960 at 3
399 Id : 3009, {_}: add (inverse n1) (inverse n1) =>= inverse n1 [] by Demod 2960 with 3006 at 3
400 Id : 3031, {_}: multiply (inverse n1) (add ?3586 (inverse n1)) =>= add (multiply ?3586 (inverse n1)) (inverse n1) [3586] by Super 13 with 3009 at 2,2,2
401 Id : 3076, {_}: multiply (inverse n1) (add ?3586 (inverse n1)) =>= multiply (inverse n1) (add ?3586 n1) [3586] by Demod 3031 with 56 at 3
402 Id : 3001, {_}: multiply (inverse n1) n1 =<= multiply (inverse n1) (add ?3417 n1) [3417] by Demod 2807 with 2960 at 2
403 Id : 3007, {_}: inverse n1 =<= multiply (inverse n1) (add ?3417 n1) [3417] by Demod 3001 with 3006 at 2
404 Id : 3077, {_}: multiply (inverse n1) (add ?3586 (inverse n1)) =>= inverse n1 [3586] by Demod 3076 with 3007 at 3
405 Id : 3239, {_}: multiply (multiply (add ?3714 (inverse n1)) n1) (inverse n1) =>= multiply (inverse n1) (add ?3714 (inverse n1)) [3714] by Super 48 with 3077 at 2,2
406 Id : 4041, {_}: multiply (multiply (add ?4663 (inverse n1)) n1) (inverse n1) =>= inverse n1 [4663] by Demod 3239 with 3077 at 3
407 Id : 4052, {_}: multiply (multiply n1 n1) (inverse n1) =>= inverse n1 [] by Super 4041 with 4 at 1,1,2
408 Id : 4115, {_}: multiply (inverse n1) (add (multiply n1 n1) ?4714) =>= add (inverse n1) (multiply ?4714 (inverse n1)) [4714] by Super 3 with 4052 at 1,3
409 Id : 4145, {_}: multiply (inverse n1) (add (multiply n1 n1) ?4714) =>= multiply (inverse n1) (add n1 ?4714) [4714] by Demod 4115 with 57 at 3
410 Id : 24, {_}: pixley (add ?69 (inverse ?70)) ?70 ?71 =<= add (inverse ?70) (multiply ?71 (add (add ?69 (inverse ?70)) (inverse ?70))) [71, 70, 69] by Super 21 with 2 at 1,3
411 Id : 3026, {_}: pixley (add (inverse n1) (inverse n1)) n1 ?3577 =<= add (inverse n1) (multiply ?3577 (add (inverse n1) (inverse n1))) [3577] by Super 24 with 3009 at 1,2,2,3
412 Id : 3081, {_}: pixley (inverse n1) n1 ?3577 =<= add (inverse n1) (multiply ?3577 (add (inverse n1) (inverse n1))) [3577] by Demod 3026 with 3009 at 1,2
413 Id : 3082, {_}: pixley (inverse n1) n1 ?3577 =<= add (inverse n1) (multiply ?3577 (inverse n1)) [3577] by Demod 3081 with 3009 at 2,2,3
414 Id : 3083, {_}: pixley (inverse n1) n1 ?3577 =<= multiply (inverse n1) (add n1 ?3577) [3577] by Demod 3082 with 57 at 3
415 Id : 4354, {_}: multiply (inverse n1) (add (multiply n1 n1) ?4904) =>= pixley (inverse n1) n1 ?4904 [4904] by Demod 4145 with 3083 at 3
416 Id : 4365, {_}: multiply (inverse n1) (multiply n1 (add n1 ?4925)) =>= pixley (inverse n1) n1 (multiply ?4925 n1) [4925] by Super 4354 with 3 at 2,2
417 Id : 3028, {_}: pixley (inverse n1) n1 ?3581 =<= add (multiply (inverse n1) (inverse n1)) (multiply ?3581 (inverse n1)) [3581] by Super 19 with 3009 at 2,2,3
418 Id : 3361, {_}: pixley (inverse n1) n1 ?3831 =<= multiply (inverse n1) (add (inverse n1) ?3831) [3831] by Demod 3028 with 3 at 3
419 Id : 3373, {_}: pixley (inverse n1) n1 (multiply ?3854 n1) =>= multiply (inverse n1) ?3854 [3854] by Super 3361 with 129 at 2,3
420 Id : 4549, {_}: multiply (inverse n1) (multiply n1 (add n1 ?5063)) =>= multiply (inverse n1) ?5063 [5063] by Demod 4365 with 3373 at 3
421 Id : 4552, {_}: multiply (inverse n1) (multiply n1 n1) =>= multiply (inverse n1) (inverse n1) [] by Super 4549 with 4 at 2,2,2
422 Id : 3002, {_}: multiply (inverse n1) (inverse n1) =>= multiply (inverse n1) n1 [] by Demod 2739 with 2960 at 3
423 Id : 3008, {_}: multiply (inverse n1) (inverse n1) =>= inverse n1 [] by Demod 3002 with 3006 at 3
424 Id : 4581, {_}: multiply (inverse n1) (multiply n1 n1) =>= inverse n1 [] by Demod 4552 with 3008 at 3
425 Id : 4604, {_}: multiply (multiply n1 n1) (add (inverse n1) n1) =>= add (inverse n1) (multiply n1 n1) [] by Super 124 with 4581 at 1,3
426 Id : 697, {_}: multiply (multiply ?1237 n1) (add ?1237 ?1238) =<= add (multiply ?1237 n1) (multiply ?1238 (multiply ?1237 n1)) [1238, 1237] by Super 14 with 120 at 1,2,2
427 Id : 122, {_}: multiply ?323 (multiply ?323 n1) =>= multiply ?323 n1 [323] by Super 2 with 120 at 1,2
428 Id : 708, {_}: multiply (multiply ?1267 n1) (add ?1267 ?1267) =>= add (multiply ?1267 n1) (multiply ?1267 n1) [1267] by Super 697 with 122 at 2,3
429 Id : 756, {_}: multiply (multiply ?1313 n1) (add ?1313 ?1313) =>= multiply n1 (add ?1313 ?1313) [1313] by Demod 708 with 3 at 3
430 Id : 757, {_}: multiply (multiply n1 n1) (add ?1315 n1) =>= multiply n1 (add n1 n1) [1315] by Super 756 with 240 at 2,2
431 Id : 4636, {_}: multiply n1 (add n1 n1) =<= add (inverse n1) (multiply n1 n1) [] by Demod 4604 with 757 at 2
432 Id : 4637, {_}: multiply n1 (add n1 n1) =>= n1 [] by Demod 4636 with 129 at 3
433 Id : 5191, {_}: multiply (add n1 n1) (add n1 ?5746) =>= add n1 (multiply ?5746 (add n1 n1)) [5746] by Super 3 with 4637 at 1,3
434 Id : 4823, {_}: multiply n1 (add n1 n1) =>= n1 [] by Demod 4636 with 129 at 3
435 Id : 4828, {_}: multiply n1 (add ?5443 n1) =>= n1 [5443] by Super 4823 with 240 at 2,2
436 Id : 4947, {_}: n1 =<= add n1 (multiply n1 n1) [] by Super 14 with 4828 at 2
437 Id : 5198, {_}: multiply (add n1 n1) n1 =<= add n1 (multiply (multiply n1 n1) (add n1 n1)) [] by Super 5191 with 4947 at 2,2
438 Id : 5236, {_}: n1 =<= add n1 (multiply (multiply n1 n1) (add n1 n1)) [] by Demod 5198 with 2 at 2
439 Id : 738, {_}: multiply (multiply ?1267 n1) (add ?1267 ?1267) =>= multiply n1 (add ?1267 ?1267) [1267] by Demod 708 with 3 at 3
440 Id : 5237, {_}: n1 =<= add n1 (multiply n1 (add n1 n1)) [] by Demod 5236 with 738 at 2,3
441 Id : 5238, {_}: n1 =<= add n1 n1 [] by Demod 5237 with 4828 at 2,3
442 Id : 5269, {_}: add ?5790 n1 =>= n1 [5790] by Super 240 with 5238 at 3
443 Id : 5530, {_}: multiply ?5969 n1 =<= add ?5969 (multiply n1 ?5969) [5969] by Super 14 with 5269 at 2,2
444 Id : 5251, {_}: multiply n1 (add (inverse ?924) (inverse ?924)) =>= multiply (inverse ?924) n1 [924] by Demod 517 with 5238 at 2,3
445 Id : 5252, {_}: multiply (inverse ?186) n1 =<= add (inverse ?186) (inverse ?186) [186] by Demod 515 with 5238 at 2,2
446 Id : 5258, {_}: multiply n1 (multiply (inverse ?924) n1) =>= multiply (inverse ?924) n1 [924] by Demod 5251 with 5252 at 2,2
447 Id : 5542, {_}: multiply (multiply (inverse ?5992) n1) n1 =<= add (multiply (inverse ?5992) n1) (multiply (inverse ?5992) n1) [5992] by Super 5530 with 5258 at 2,3
448 Id : 5596, {_}: multiply (multiply (inverse ?5992) n1) n1 =<= multiply n1 (add (inverse ?5992) (inverse ?5992)) [5992] by Demod 5542 with 3 at 3
449 Id : 5597, {_}: multiply (multiply (inverse ?5992) n1) n1 =>= multiply n1 (multiply (inverse ?5992) n1) [5992] by Demod 5596 with 5252 at 2,3
450 Id : 5598, {_}: multiply (multiply (inverse ?5992) n1) n1 =>= multiply (inverse ?5992) n1 [5992] by Demod 5597 with 5258 at 3
451 Id : 5623, {_}: multiply (inverse ?6038) n1 =<= add (multiply ?6039 (inverse ?6039)) (multiply (inverse ?6038) n1) [6039, 6038] by Super 120 with 5598 at 2,3
452 Id : 5666, {_}: multiply (inverse ?6038) n1 =>= inverse ?6038 [6038] by Demod 5623 with 120 at 3
453 Id : 5733, {_}: inverse ?6128 =<= add (inverse n1) (inverse ?6128) [6128] by Super 129 with 5666 at 2,3
454 Id : 5815, {_}: inverse (inverse n1) =>= n1 [] by Super 4 with 5733 at 2
455 Id : 5900, {_}: pixley ?6277 (inverse n1) ?6278 =<= add (multiply ?6277 (inverse (inverse n1))) (multiply ?6278 (add ?6277 n1)) [6278, 6277] by Super 19 with 5815 at 2,2,2,3
456 Id : 5965, {_}: pixley ?6277 (inverse n1) ?6278 =<= add (multiply ?6277 n1) (multiply ?6278 (add ?6277 n1)) [6278, 6277] by Demod 5900 with 5815 at 2,1,3
457 Id : 5966, {_}: pixley ?6277 (inverse n1) ?6278 =<= add (multiply ?6277 n1) (multiply ?6278 n1) [6278, 6277] by Demod 5965 with 5269 at 2,2,3
458 Id : 5967, {_}: pixley ?6277 (inverse n1) ?6278 =>= multiply n1 (add ?6277 ?6278) [6278, 6277] by Demod 5966 with 3 at 3
459 Id : 6744, {_}: multiply n1 (add ?7003 (inverse n1)) =>= ?7003 [7003] by Super 7 with 5967 at 2
460 Id : 6822, {_}: pixley ?7090 n1 n1 =<= add (multiply ?7090 (inverse n1)) ?7090 [7090] by Super 19 with 6744 at 2,3
461 Id : 6862, {_}: ?7090 =<= add (multiply ?7090 (inverse n1)) ?7090 [7090] by Demod 6822 with 7 at 2
462 Id : 171, {_}: multiply ?428 (multiply ?429 (add ?428 (inverse ?429))) =>= multiply ?429 (add ?428 (inverse ?429)) [429, 428] by Super 165 with 7 at 1,2
463 Id : 5910, {_}: multiply ?6301 (multiply (inverse n1) (add ?6301 n1)) =?= multiply (inverse n1) (add ?6301 (inverse (inverse n1))) [6301] by Super 171 with 5815 at 2,2,2,2
464 Id : 5935, {_}: multiply ?6301 (multiply (inverse n1) n1) =<= multiply (inverse n1) (add ?6301 (inverse (inverse n1))) [6301] by Demod 5910 with 5269 at 2,2,2
465 Id : 5936, {_}: multiply ?6301 (multiply (inverse n1) n1) =?= multiply (inverse n1) (add ?6301 n1) [6301] by Demod 5935 with 5815 at 2,2,3
466 Id : 5937, {_}: multiply ?6301 (inverse n1) =<= multiply (inverse n1) (add ?6301 n1) [6301] by Demod 5936 with 5666 at 2,2
467 Id : 5938, {_}: multiply ?6301 (inverse n1) =?= multiply (inverse n1) n1 [6301] by Demod 5937 with 5269 at 2,3
468 Id : 5939, {_}: multiply ?6301 (inverse n1) =>= inverse n1 [6301] by Demod 5938 with 5666 at 3
469 Id : 6863, {_}: ?7090 =<= add (inverse n1) ?7090 [7090] by Demod 6862 with 5939 at 1,3
470 Id : 7107, {_}: multiply ?7307 (add ?7308 ?7307) =?= add (multiply (inverse n1) ?7307) ?7307 [7308, 7307] by Super 13 with 6863 at 2,2
471 Id : 7056, {_}: ?343 =<= multiply ?343 n1 [343] by Demod 129 with 6863 at 3
472 Id : 7072, {_}: multiply ?328 (add ?329 ?328) =<= add (multiply ?329 (multiply ?328 n1)) (multiply ?328 n1) [329, 328] by Demod 124 with 7056 at 1,2
473 Id : 7073, {_}: multiply ?328 (add ?329 ?328) =<= add (multiply ?329 ?328) (multiply ?328 n1) [329, 328] by Demod 7072 with 7056 at 2,1,3
474 Id : 7074, {_}: multiply ?328 (add ?329 ?328) =>= add (multiply ?329 ?328) ?328 [329, 328] by Demod 7073 with 7056 at 2,3
475 Id : 7154, {_}: add (multiply ?7308 ?7307) ?7307 =?= add (multiply (inverse n1) ?7307) ?7307 [7307, 7308] by Demod 7107 with 7074 at 2
476 Id : 6022, {_}: multiply (inverse n1) (add n1 ?6349) =>= add (inverse n1) (inverse n1) [6349] by Super 57 with 5939 at 2,3
477 Id : 6051, {_}: pixley (inverse n1) n1 ?6349 =>= add (inverse n1) (inverse n1) [6349] by Demod 6022 with 3083 at 2
478 Id : 5713, {_}: inverse ?186 =<= add (inverse ?186) (inverse ?186) [186] by Demod 5252 with 5666 at 2
479 Id : 6052, {_}: pixley (inverse n1) n1 ?6349 =>= inverse n1 [6349] by Demod 6051 with 5713 at 3
480 Id : 6566, {_}: inverse n1 =<= multiply (inverse n1) ?3854 [3854] by Demod 3373 with 6052 at 2
481 Id : 7155, {_}: add (multiply ?7308 ?7307) ?7307 =>= add (inverse n1) ?7307 [7307, 7308] by Demod 7154 with 6566 at 1,3
482 Id : 7156, {_}: add (multiply ?7308 ?7307) ?7307 =>= ?7307 [7307, 7308] by Demod 7155 with 6863 at 3
483 Id : 10064, {_}: multiply (add ?10693 (add ?10694 ?10695)) (add ?10695 ?10696) =>= add ?10695 (multiply ?10696 (add ?10693 (add ?10694 ?10695))) [10696, 10695, 10694, 10693] by Demod 83 with 7156 at 1,3
484 Id : 10086, {_}: multiply (add ?10793 ?10794) (add ?10794 ?10795) =<= add ?10794 (multiply ?10795 (add ?10793 (add (multiply ?10796 ?10794) ?10794))) [10796, 10795, 10794, 10793] by Super 10064 with 7156 at 2,1,2
485 Id : 21988, {_}: multiply (add ?25891 ?25892) (add ?25892 ?25893) =>= add ?25892 (multiply ?25893 (add ?25891 ?25892)) [25893, 25892, 25891] by Demod 10086 with 7156 at 2,2,2,3
486 Id : 82, {_}: multiply (add ?221 (add ?222 ?223)) (add ?224 ?223) =<= add (multiply ?224 (add ?221 (add ?222 ?223))) (add (multiply ?221 ?223) ?223) [224, 223, 222, 221] by Super 3 with 13 at 2,3
487 Id : 7886, {_}: multiply (add ?8136 (add ?8137 ?8138)) (add ?8139 ?8138) =>= add (multiply ?8139 (add ?8136 (add ?8137 ?8138))) ?8138 [8139, 8138, 8137, 8136] by Demod 82 with 7156 at 2,3
488 Id : 7907, {_}: multiply (add ?8232 ?8233) (add ?8234 ?8233) =<= add (multiply ?8234 (add ?8232 (add (multiply ?8235 ?8233) ?8233))) ?8233 [8235, 8234, 8233, 8232] by Super 7886 with 7156 at 2,1,2
489 Id : 12702, {_}: multiply (add ?13943 ?13944) (add ?13945 ?13944) =>= add (multiply ?13945 (add ?13943 ?13944)) ?13944 [13945, 13944, 13943] by Demod 7907 with 7156 at 2,2,1,3
490 Id : 12703, {_}: multiply (add ?13947 (inverse ?13948)) n1 =<= add (multiply ?13948 (add ?13947 (inverse ?13948))) (inverse ?13948) [13948, 13947] by Super 12702 with 4 at 2,2
491 Id : 7482, {_}: add (multiply ?7666 ?7667) ?7667 =>= ?7667 [7667, 7666] by Demod 7155 with 6863 at 3
492 Id : 11, {_}: multiply (multiply ?29 (add ?30 ?31)) (multiply ?31 ?29) =>= multiply ?31 ?29 [31, 30, 29] by Super 2 with 3 at 1,2
493 Id : 7484, {_}: add (multiply ?7671 ?7672) (multiply ?7671 ?7672) =>= multiply ?7671 ?7672 [7672, 7671] by Super 7482 with 11 at 1,2
494 Id : 7527, {_}: multiply ?7672 (add ?7671 ?7671) =>= multiply ?7671 ?7672 [7671, 7672] by Demod 7484 with 3 at 2
495 Id : 5460, {_}: multiply ?5892 n1 =<= add ?5892 (multiply n1 ?5892) [5892] by Super 14 with 5269 at 2,2
496 Id : 7058, {_}: ?5892 =<= add ?5892 (multiply n1 ?5892) [5892] by Demod 5460 with 7056 at 2
497 Id : 5905, {_}: ?6288 =<= add (multiply (inverse n1) n1) (multiply ?6288 n1) [6288] by Super 120 with 5815 at 2,1,3
498 Id : 5956, {_}: ?6288 =<= multiply n1 (add (inverse n1) ?6288) [6288] by Demod 5905 with 3 at 3
499 Id : 7054, {_}: ?6288 =<= multiply n1 ?6288 [6288] by Demod 5956 with 6863 at 2,3
500 Id : 7085, {_}: ?5892 =<= add ?5892 ?5892 [5892] by Demod 7058 with 7054 at 2,3
501 Id : 7528, {_}: multiply ?7672 ?7671 =?= multiply ?7671 ?7672 [7671, 7672] by Demod 7527 with 7085 at 2,2
502 Id : 12798, {_}: multiply n1 (add ?13947 (inverse ?13948)) =<= add (multiply ?13948 (add ?13947 (inverse ?13948))) (inverse ?13948) [13948, 13947] by Demod 12703 with 7528 at 2
503 Id : 7111, {_}: pixley (inverse n1) ?7316 ?7317 =<= add (multiply (inverse n1) (inverse ?7316)) (multiply ?7317 (inverse ?7316)) [7317, 7316] by Super 19 with 6863 at 2,2,3
504 Id : 7149, {_}: pixley (inverse n1) ?7316 ?7317 =<= multiply (inverse ?7316) (add (inverse n1) ?7317) [7317, 7316] by Demod 7111 with 3 at 3
505 Id : 7150, {_}: pixley (inverse n1) ?7316 ?7317 =>= multiply (inverse ?7316) ?7317 [7317, 7316] by Demod 7149 with 6863 at 2,3
506 Id : 7307, {_}: multiply (inverse ?7459) ?7459 =>= inverse n1 [7459] by Super 7 with 7150 at 2
507 Id : 7381, {_}: multiply ?7560 (add ?7561 (inverse ?7560)) =>= add (multiply ?7561 ?7560) (inverse n1) [7561, 7560] by Super 3 with 7307 at 2,3
508 Id : 7086, {_}: add ?7003 (inverse n1) =>= ?7003 [7003] by Demod 6744 with 7054 at 2
509 Id : 7408, {_}: multiply ?7560 (add ?7561 (inverse ?7560)) =>= multiply ?7561 ?7560 [7561, 7560] by Demod 7381 with 7086 at 3
510 Id : 12799, {_}: multiply n1 (add ?13947 (inverse ?13948)) =?= add (multiply ?13947 ?13948) (inverse ?13948) [13948, 13947] by Demod 12798 with 7408 at 1,3
511 Id : 12931, {_}: add ?14243 (inverse ?14244) =<= add (multiply ?14243 ?14244) (inverse ?14244) [14244, 14243] by Demod 12799 with 7054 at 2
512 Id : 13237, {_}: add ?14685 (inverse ?14686) =<= add (multiply ?14686 ?14685) (inverse ?14686) [14686, 14685] by Super 12931 with 7528 at 1,3
513 Id : 7116, {_}: multiply (inverse n1) (multiply ?7330 (inverse ?7330)) =?= multiply ?7330 (add (inverse n1) (inverse ?7330)) [7330] by Super 171 with 6863 at 2,2,2
514 Id : 7138, {_}: inverse n1 =<= multiply ?7330 (add (inverse n1) (inverse ?7330)) [7330] by Demod 7116 with 6566 at 2
515 Id : 7139, {_}: inverse n1 =<= multiply ?7330 (inverse ?7330) [7330] by Demod 7138 with 6863 at 2,3
516 Id : 7194, {_}: multiply (inverse ?7378) (add ?7378 ?7379) =?= add (inverse n1) (multiply ?7379 (inverse ?7378)) [7379, 7378] by Super 3 with 7139 at 1,3
517 Id : 7235, {_}: multiply (inverse ?7378) (add ?7378 ?7379) =>= multiply ?7379 (inverse ?7378) [7379, 7378] by Demod 7194 with 6863 at 3
518 Id : 13247, {_}: add (add ?14714 ?14715) (inverse (inverse ?14714)) =<= add (multiply ?14715 (inverse ?14714)) (inverse (inverse ?14714)) [14715, 14714] by Super 13237 with 7235 at 1,3
519 Id : 55, {_}: pixley n1 ?152 ?153 =<= add (inverse ?152) (multiply ?153 (add n1 (inverse ?152))) [153, 152] by Super 19 with 16 at 1,3
520 Id : 8471, {_}: pixley n1 ?8796 ?8796 =<= add (inverse ?8796) (multiply n1 ?8796) [8796] by Super 55 with 7408 at 2,3
521 Id : 8513, {_}: n1 =<= add (inverse ?8796) (multiply n1 ?8796) [8796] by Demod 8471 with 7 at 2
522 Id : 8514, {_}: n1 =<= add (inverse ?8796) ?8796 [8796] by Demod 8513 with 7054 at 2,3
523 Id : 8605, {_}: pixley (inverse (inverse ?8923)) ?8923 ?8924 =<= add (multiply (inverse (inverse ?8923)) (inverse ?8923)) (multiply ?8924 n1) [8924, 8923] by Super 19 with 8514 at 2,2,3
524 Id : 8634, {_}: pixley (inverse (inverse ?8923)) ?8923 ?8924 =>= add (inverse n1) (multiply ?8924 n1) [8924, 8923] by Demod 8605 with 7307 at 1,3
525 Id : 8635, {_}: pixley (inverse (inverse ?8923)) ?8923 ?8924 =>= add (inverse n1) ?8924 [8924, 8923] by Demod 8634 with 7056 at 2,3
526 Id : 8636, {_}: pixley (inverse (inverse ?8923)) ?8923 ?8924 =>= ?8924 [8924, 8923] by Demod 8635 with 6863 at 3
527 Id : 9901, {_}: ?10439 =<= inverse (inverse ?10439) [10439] by Super 7 with 8636 at 2
528 Id : 13343, {_}: add (add ?14714 ?14715) ?14714 =<= add (multiply ?14715 (inverse ?14714)) (inverse (inverse ?14714)) [14715, 14714] by Demod 13247 with 9901 at 2,2
529 Id : 12800, {_}: add ?13947 (inverse ?13948) =<= add (multiply ?13947 ?13948) (inverse ?13948) [13948, 13947] by Demod 12799 with 7054 at 2
530 Id : 13344, {_}: add (add ?14714 ?14715) ?14714 =>= add ?14715 (inverse (inverse ?14714)) [14715, 14714] by Demod 13343 with 12800 at 3
531 Id : 7191, {_}: multiply (inverse ?7370) (add n1 ?7370) =>= add (inverse ?7370) (inverse n1) [7370] by Super 57 with 7139 at 2,3
532 Id : 7240, {_}: multiply (inverse ?7370) (add n1 ?7370) =>= inverse ?7370 [7370] by Demod 7191 with 7086 at 3
533 Id : 7565, {_}: add (inverse ?7779) (add n1 ?7779) =>= add n1 ?7779 [7779] by Super 7156 with 7240 at 1,2
534 Id : 7922, {_}: multiply (add n1 ?8304) (add ?8305 ?8304) =<= add (multiply ?8305 (add (inverse ?8304) (add n1 ?8304))) ?8304 [8305, 8304] by Super 7886 with 7565 at 1,2
535 Id : 11103, {_}: multiply (add n1 ?12014) (add ?12015 ?12014) =>= add (multiply ?12015 (add n1 ?12014)) ?12014 [12015, 12014] by Demod 7922 with 7565 at 2,1,3
536 Id : 11119, {_}: multiply (add n1 ?12057) n1 =<= add (multiply (inverse ?12057) (add n1 ?12057)) ?12057 [12057] by Super 11103 with 8514 at 2,2
537 Id : 11245, {_}: multiply n1 (add n1 ?12057) =<= add (multiply (inverse ?12057) (add n1 ?12057)) ?12057 [12057] by Demod 11119 with 7528 at 2
538 Id : 7193, {_}: multiply (inverse ?7375) (add ?7376 ?7375) =?= add (multiply ?7376 (inverse ?7375)) (inverse n1) [7376, 7375] by Super 3 with 7139 at 2,3
539 Id : 7234, {_}: multiply (inverse ?7375) (add ?7376 ?7375) =>= multiply ?7376 (inverse ?7375) [7376, 7375] by Demod 7193 with 7086 at 3
540 Id : 11246, {_}: multiply n1 (add n1 ?12057) =<= add (multiply n1 (inverse ?12057)) ?12057 [12057] by Demod 11245 with 7234 at 1,3
541 Id : 121, {_}: multiply (multiply ?320 n1) (add ?320 ?321) =<= add (multiply ?320 n1) (multiply ?321 (multiply ?320 n1)) [321, 320] by Super 14 with 120 at 1,2,2
542 Id : 7069, {_}: multiply ?320 (add ?320 ?321) =<= add (multiply ?320 n1) (multiply ?321 (multiply ?320 n1)) [321, 320] by Demod 121 with 7056 at 1,2
543 Id : 7070, {_}: multiply ?320 (add ?320 ?321) =<= add ?320 (multiply ?321 (multiply ?320 n1)) [321, 320] by Demod 7069 with 7056 at 1,3
544 Id : 7071, {_}: multiply ?320 (add ?320 ?321) =>= add ?320 (multiply ?321 ?320) [321, 320] by Demod 7070 with 7056 at 2,2,3
545 Id : 11247, {_}: add n1 (multiply ?12057 n1) =<= add (multiply n1 (inverse ?12057)) ?12057 [12057] by Demod 11246 with 7071 at 2
546 Id : 11248, {_}: add n1 (multiply ?12057 n1) =?= add (inverse ?12057) ?12057 [12057] by Demod 11247 with 7054 at 1,3
547 Id : 11249, {_}: add n1 ?12057 =<= add (inverse ?12057) ?12057 [12057] by Demod 11248 with 7056 at 2,2
548 Id : 11250, {_}: add n1 ?12057 =>= n1 [12057] by Demod 11249 with 8514 at 3
549 Id : 11338, {_}: multiply ?12157 (add n1 ?12158) =?= add ?12157 (multiply ?12158 ?12157) [12158, 12157] by Super 14 with 11250 at 1,2,2
550 Id : 11388, {_}: multiply ?12157 n1 =<= add ?12157 (multiply ?12158 ?12157) [12158, 12157] by Demod 11338 with 11250 at 2,2
551 Id : 11466, {_}: ?12291 =<= add ?12291 (multiply ?12292 ?12291) [12292, 12291] by Demod 11388 with 7056 at 2
552 Id : 11389, {_}: ?12157 =<= add ?12157 (multiply ?12158 ?12157) [12158, 12157] by Demod 11388 with 7056 at 2
553 Id : 11443, {_}: multiply ?320 (add ?320 ?321) =>= ?320 [321, 320] by Demod 7071 with 11389 at 3
554 Id : 11487, {_}: add ?12367 ?12368 =<= add (add ?12367 ?12368) ?12367 [12368, 12367] by Super 11466 with 11443 at 2,3
555 Id : 13345, {_}: add ?14714 ?14715 =<= add ?14715 (inverse (inverse ?14714)) [14715, 14714] by Demod 13344 with 11487 at 2
556 Id : 13346, {_}: add ?14714 ?14715 =?= add ?14715 ?14714 [14715, 14714] by Demod 13345 with 9901 at 2,3
557 Id : 22037, {_}: multiply (add ?26083 ?26084) (add ?26083 ?26085) =>= add ?26083 (multiply ?26085 (add ?26084 ?26083)) [26085, 26084, 26083] by Super 21988 with 13346 at 1,2
558 Id : 7988, {_}: multiply (add ?8232 ?8233) (add ?8234 ?8233) =>= add (multiply ?8234 (add ?8232 ?8233)) ?8233 [8234, 8233, 8232] by Demod 7907 with 7156 at 2,2,1,3
559 Id : 17754, {_}: multiply (add ?8232 ?8233) (add ?8234 ?8233) =>= add ?8233 (multiply ?8234 (add ?8232 ?8233)) [8234, 8233, 8232] by Demod 7988 with 13346 at 3
560 Id : 17781, {_}: multiply (add ?20198 ?20199) (add ?20200 ?20198) =>= add ?20198 (multiply ?20200 (add ?20199 ?20198)) [20200, 20199, 20198] by Super 17754 with 13346 at 1,2
561 Id : 12739, {_}: multiply (add ?14084 ?14085) (add ?14086 ?14084) =<= add (multiply ?14086 (add (add ?14084 ?14085) ?14084)) ?14084 [14086, 14085, 14084] by Super 12702 with 11487 at 1,2
562 Id : 12881, {_}: multiply (add ?14084 ?14085) (add ?14086 ?14084) =>= add (multiply ?14086 (add ?14084 ?14085)) ?14084 [14086, 14085, 14084] by Demod 12739 with 11487 at 2,1,3
563 Id : 27122, {_}: multiply (add ?14084 ?14085) (add ?14086 ?14084) =>= add ?14084 (multiply ?14086 (add ?14084 ?14085)) [14086, 14085, 14084] by Demod 12881 with 13346 at 3
564 Id : 27541, {_}: add ?20198 (multiply ?20200 (add ?20198 ?20199)) =?= add ?20198 (multiply ?20200 (add ?20199 ?20198)) [20199, 20200, 20198] by Demod 17781 with 27122 at 2
565 Id : 10192, {_}: multiply (add ?10793 ?10794) (add ?10794 ?10795) =>= add ?10794 (multiply ?10795 (add ?10793 ?10794)) [10795, 10794, 10793] by Demod 10086 with 7156 at 2,2,2,3
566 Id : 21968, {_}: multiply (add ?25807 ?25808) (add ?25809 ?25807) =>= add ?25807 (multiply ?25808 (add ?25809 ?25807)) [25809, 25808, 25807] by Super 7528 with 10192 at 3
567 Id : 30393, {_}: add ?41129 (multiply ?41130 (add ?41129 ?41131)) =?= add ?41129 (multiply ?41131 (add ?41130 ?41129)) [41131, 41130, 41129] by Demod 21968 with 27122 at 2
568 Id : 11441, {_}: multiply ?41 (add (add ?42 ?41) ?43) =>= ?41 [43, 42, 41] by Demod 14 with 11389 at 3
569 Id : 11444, {_}: multiply (multiply ?12210 ?12211) (add ?12211 ?12212) =>= multiply ?12210 ?12211 [12212, 12211, 12210] by Super 11441 with 11389 at 1,2,2
570 Id : 30454, {_}: add ?41381 (multiply ?41382 (add ?41381 (multiply ?41383 ?41382))) =>= add ?41381 (multiply ?41383 ?41382) [41383, 41382, 41381] by Super 30393 with 11444 at 2,3
571 Id : 12736, {_}: multiply ?14072 (add ?14073 (multiply ?14074 ?14072)) =<= add (multiply ?14073 (add ?14072 (multiply ?14074 ?14072))) (multiply ?14074 ?14072) [14074, 14073, 14072] by Super 12702 with 11389 at 1,2
572 Id : 12876, {_}: multiply ?14072 (add ?14073 (multiply ?14074 ?14072)) =>= add (multiply ?14073 ?14072) (multiply ?14074 ?14072) [14074, 14073, 14072] by Demod 12736 with 11389 at 2,1,3
573 Id : 12877, {_}: multiply ?14072 (add ?14073 (multiply ?14074 ?14072)) =>= multiply ?14072 (add ?14073 ?14074) [14074, 14073, 14072] by Demod 12876 with 3 at 3
574 Id : 30743, {_}: add ?41381 (multiply ?41382 (add ?41381 ?41383)) =>= add ?41381 (multiply ?41383 ?41382) [41383, 41382, 41381] by Demod 30454 with 12877 at 2,2
575 Id : 47985, {_}: add ?20198 (multiply ?20199 ?20200) =<= add ?20198 (multiply ?20200 (add ?20199 ?20198)) [20200, 20199, 20198] by Demod 27541 with 30743 at 2
576 Id : 47993, {_}: multiply (add ?26083 ?26084) (add ?26083 ?26085) =>= add ?26083 (multiply ?26084 ?26085) [26085, 26084, 26083] by Demod 22037 with 47985 at 3
577 Id : 48482, {_}: add a (multiply b c) =?= add a (multiply b c) [] by Demod 1 with 47993 at 3
578 Id : 1, {_}: add a (multiply b c) =<= multiply (add a b) (add a c) [] by prove_add_multiply_property
579 % SZS output end CNFRefutation for BOO023-1.p
580 1833: solved BOO023-1.p in 13.804862 using kbo
581 !! infer_left 301 0.0004 0.0000 0.0000
582 !! infer_right 268 43.7454 1.5701 0.1632
583 !! simplify_goal 301 0.5943 0.3008 0.0020
584 !! keep_simplified 682 10.3284 0.4195 0.0151
585 !! simplification_step 884 10.3246 0.3169 0.0117
586 !! simplify 49748 46.3014 0.3566 0.0009
587 !! orphan_murder 865 0.3503 0.3003 0.0004
588 !! is_subsumed 43199 3.2497 0.3002 0.0001
589 !! build_new_clause 26531 2.4646 0.3010 0.0001
590 !! demodulate 49301 42.5539 0.3565 0.0009
591 !! demod 320428 37.5001 0.3122 0.0001
592 !! demod.apply_subst 632676 4.0731 0.3035 0.0000
593 !! demod.compare_terms 291861 12.1699 0.3082 0.0000
594 !! demod.retrieve_generalizations 320428 7.3973 0.3121 0.0000
595 !! demod.unify 609084 5.7336 0.3003 0.0000
596 !! build_clause 54348 2.9194 0.3010 0.0001
597 !! compare_terms(kbo) 353603 12.3627 0.3082 0.0000
598 !! compare_terms(nrkbo) 8 0.0001 0.0000 0.0000
601 add ?2 (multiply ?3 (multiply ?2 ?4)) =>= ?2
602 [4, 3, 2] by l1 ?2 ?3 ?4
604 add (add (multiply ?6 ?7) (multiply ?7 ?8)) ?7 =>= ?7
605 [8, 7, 6] by l3 ?6 ?7 ?8
607 multiply (add ?10 ?11) (add ?10 (inverse ?11)) =>= ?10
608 [11, 10] by b1 ?10 ?11
610 multiply (add (multiply ?13 ?14) ?13) (add ?13 ?14) =>= ?13
611 [14, 13] by majority1 ?13 ?14
613 multiply (add (multiply ?16 ?16) ?17) (add ?16 ?16) =>= ?16
614 [17, 16] by majority2 ?16 ?17
616 multiply (add (multiply ?19 ?20) ?20) (add ?19 ?20) =>= ?20
617 [20, 19] by majority3 ?19 ?20
619 1860: Id : 1, {_}: inverse (inverse a) =>= a [] by prove_inverse_involution
620 % SZS status Timeout for BOO030-1.p
623 add (multiply ?2 ?3) (add (multiply ?3 ?4) (multiply ?4 ?2))
625 multiply (add ?2 ?3) (multiply (add ?3 ?4) (add ?4 ?2))
626 [4, 3, 2] by distributivity ?2 ?3 ?4
628 add ?6 (multiply ?7 (multiply ?6 ?8)) =>= ?6
629 [8, 7, 6] by l1 ?6 ?7 ?8
631 add (add (multiply ?10 ?11) (multiply ?11 ?12)) ?11 =>= ?11
632 [12, 11, 10] by l3 ?10 ?11 ?12
634 multiply (add ?14 (inverse ?14)) ?15 =>= ?15
635 [15, 14] by property3 ?14 ?15
637 multiply ?17 (add ?18 (add ?17 ?19)) =>= ?17
638 [19, 18, 17] by l2 ?17 ?18 ?19
640 multiply (multiply (add ?21 ?22) (add ?22 ?23)) ?22 =>= ?22
641 [23, 22, 21] by l4 ?21 ?22 ?23
643 add (multiply ?25 (inverse ?25)) ?26 =>= ?26
644 [26, 25] by property3_dual ?25 ?26
645 1917: Id : 9, {_}: add ?28 (inverse ?28) =>= n1 [28] by additive_inverse ?28
647 multiply ?30 (inverse ?30) =>= n0
648 [30] by multiplicative_inverse ?30
650 add (add ?32 ?33) ?34 =?= add ?32 (add ?33 ?34)
651 [34, 33, 32] by associativity_of_add ?32 ?33 ?34
653 multiply (multiply ?36 ?37) ?38 =?= multiply ?36 (multiply ?37 ?38)
654 [38, 37, 36] by associativity_of_multiply ?36 ?37 ?38
657 multiply a (add b c) =<= add (multiply b a) (multiply c a)
658 [] by prove_multiply_add_property
661 Found proof, 26.527372s
662 % SZS status Unsatisfiable for BOO031-1.p
663 % SZS output start CNFRefutation for BOO031-1.p
664 Id : 10, {_}: multiply ?30 (inverse ?30) =>= n0 [30] by multiplicative_inverse ?30
665 Id : 7, {_}: multiply (multiply (add ?21 ?22) (add ?22 ?23)) ?22 =>= ?22 [23, 22, 21] by l4 ?21 ?22 ?23
666 Id : 12, {_}: multiply (multiply ?36 ?37) ?38 =>= multiply ?36 (multiply ?37 ?38) [38, 37, 36] by associativity_of_multiply ?36 ?37 ?38
667 Id : 52, {_}: multiply (multiply (add ?189 ?190) (add ?190 ?191)) ?190 =>= ?190 [191, 190, 189] by l4 ?189 ?190 ?191
668 Id : 9, {_}: add ?28 (inverse ?28) =>= n1 [28] by additive_inverse ?28
669 Id : 5, {_}: multiply (add ?14 (inverse ?14)) ?15 =>= ?15 [15, 14] by property3 ?14 ?15
670 Id : 2, {_}: add (multiply ?2 ?3) (add (multiply ?3 ?4) (multiply ?4 ?2)) =>= multiply (add ?2 ?3) (multiply (add ?3 ?4) (add ?4 ?2)) [4, 3, 2] by distributivity ?2 ?3 ?4
671 Id : 18, {_}: add (add (multiply ?58 ?59) (multiply ?59 ?60)) ?59 =>= ?59 [60, 59, 58] by l3 ?58 ?59 ?60
672 Id : 11, {_}: add (add ?32 ?33) ?34 =>= add ?32 (add ?33 ?34) [34, 33, 32] by associativity_of_add ?32 ?33 ?34
673 Id : 4, {_}: add (add (multiply ?10 ?11) (multiply ?11 ?12)) ?11 =>= ?11 [12, 11, 10] by l3 ?10 ?11 ?12
674 Id : 37, {_}: multiply ?128 (add ?129 (add ?128 ?130)) =>= ?128 [130, 129, 128] by l2 ?128 ?129 ?130
675 Id : 6, {_}: multiply ?17 (add ?18 (add ?17 ?19)) =>= ?17 [19, 18, 17] by l2 ?17 ?18 ?19
676 Id : 3, {_}: add ?6 (multiply ?7 (multiply ?6 ?8)) =>= ?6 [8, 7, 6] by l1 ?6 ?7 ?8
677 Id : 35, {_}: add ?121 (multiply ?122 ?121) =>= ?121 [122, 121] by Super 3 with 6 at 2,2,2
678 Id : 42, {_}: multiply ?149 (add ?149 ?150) =>= ?149 [150, 149] by Super 37 with 4 at 2,2
679 Id : 1142, {_}: add (add ?1694 ?1695) ?1694 =>= add ?1694 ?1695 [1695, 1694] by Super 35 with 42 at 2,2
680 Id : 1169, {_}: add ?1694 (add ?1695 ?1694) =>= add ?1694 ?1695 [1695, 1694] by Demod 1142 with 11 at 2
681 Id : 19, {_}: add (multiply ?62 ?63) ?63 =>= ?63 [63, 62] by Super 18 with 3 at 1,2
682 Id : 39, {_}: multiply ?137 (add ?138 ?137) =>= ?137 [138, 137] by Super 37 with 3 at 2,2,2
683 Id : 758, {_}: add ?1224 (add ?1225 ?1224) =>= add ?1225 ?1224 [1225, 1224] by Super 19 with 39 at 1,2
684 Id : 2086, {_}: add ?1695 ?1694 =?= add ?1694 ?1695 [1694, 1695] by Demod 1169 with 758 at 2
685 Id : 32, {_}: add (multiply (add ?106 (add ?107 ?108)) ?109) (add (multiply ?109 ?107) ?107) =<= multiply (add (add ?106 (add ?107 ?108)) ?109) (multiply (add ?109 ?107) (add ?107 (add ?106 (add ?107 ?108)))) [109, 108, 107, 106] by Super 2 with 6 at 2,2,2
686 Id : 4660, {_}: add (multiply (add ?106 (add ?107 ?108)) ?109) (add ?107 (multiply ?109 ?107)) =<= multiply (add (add ?106 (add ?107 ?108)) ?109) (multiply (add ?109 ?107) (add ?107 (add ?106 (add ?107 ?108)))) [109, 108, 107, 106] by Demod 32 with 2086 at 2,2
687 Id : 4661, {_}: add (multiply (add ?106 (add ?107 ?108)) ?109) (add ?107 (multiply ?109 ?107)) =<= multiply (add ?106 (add (add ?107 ?108) ?109)) (multiply (add ?109 ?107) (add ?107 (add ?106 (add ?107 ?108)))) [109, 108, 107, 106] by Demod 4660 with 11 at 1,3
688 Id : 325, {_}: add (multiply ?689 ?690) ?690 =>= ?690 [690, 689] by Super 18 with 3 at 1,2
689 Id : 326, {_}: add ?692 (add ?693 (add ?692 ?694)) =>= add ?693 (add ?692 ?694) [694, 693, 692] by Super 325 with 6 at 1,2
690 Id : 4662, {_}: add (multiply (add ?106 (add ?107 ?108)) ?109) (add ?107 (multiply ?109 ?107)) =<= multiply (add ?106 (add (add ?107 ?108) ?109)) (multiply (add ?109 ?107) (add ?106 (add ?107 ?108))) [109, 108, 107, 106] by Demod 4661 with 326 at 2,2,3
691 Id : 4663, {_}: add (multiply (add ?106 (add ?107 ?108)) ?109) ?107 =<= multiply (add ?106 (add (add ?107 ?108) ?109)) (multiply (add ?109 ?107) (add ?106 (add ?107 ?108))) [109, 108, 107, 106] by Demod 4662 with 35 at 2,2
692 Id : 4664, {_}: add (multiply (add ?106 (add ?107 ?108)) ?109) ?107 =<= multiply (add ?106 (add ?107 (add ?108 ?109))) (multiply (add ?109 ?107) (add ?106 (add ?107 ?108))) [109, 108, 107, 106] by Demod 4663 with 11 at 2,1,3
693 Id : 4688, {_}: add ?6057 (multiply (add ?6058 (add ?6057 ?6059)) ?6060) =<= multiply (add ?6058 (add ?6057 (add ?6059 ?6060))) (multiply (add ?6060 ?6057) (add ?6058 (add ?6057 ?6059))) [6060, 6059, 6058, 6057] by Demod 4664 with 2086 at 2
694 Id : 79, {_}: multiply n1 ?15 =>= ?15 [15] by Demod 5 with 9 at 1,2
695 Id : 329, {_}: add ?702 ?702 =>= ?702 [702] by Super 325 with 79 at 1,2
696 Id : 4720, {_}: add ?6221 (multiply (add (add ?6221 ?6222) (add ?6221 ?6222)) ?6223) =<= multiply (add (add ?6221 ?6222) (add ?6221 (add ?6222 ?6223))) (multiply (add ?6223 ?6221) (add ?6221 ?6222)) [6223, 6222, 6221] by Super 4688 with 329 at 2,2,3
697 Id : 5030, {_}: add ?6221 (multiply (add ?6221 (add ?6222 (add ?6221 ?6222))) ?6223) =<= multiply (add (add ?6221 ?6222) (add ?6221 (add ?6222 ?6223))) (multiply (add ?6223 ?6221) (add ?6221 ?6222)) [6223, 6222, 6221] by Demod 4720 with 11 at 1,2,2
698 Id : 1217, {_}: multiply (add ?1822 ?1823) ?1823 =>= ?1823 [1823, 1822] by Super 52 with 6 at 1,2
699 Id : 1224, {_}: multiply ?1844 (multiply ?1845 ?1844) =>= multiply ?1845 ?1844 [1845, 1844] by Super 1217 with 35 at 1,2
700 Id : 760, {_}: multiply ?1230 (add ?1231 ?1230) =>= ?1230 [1231, 1230] by Super 37 with 3 at 2,2,2
701 Id : 22, {_}: add ?71 (multiply ?71 ?72) =>= ?71 [72, 71] by Super 3 with 5 at 2,2
702 Id : 766, {_}: multiply (multiply ?1249 ?1250) ?1249 =>= multiply ?1249 ?1250 [1250, 1249] by Super 760 with 22 at 2,2
703 Id : 793, {_}: multiply ?1249 (multiply ?1250 ?1249) =>= multiply ?1249 ?1250 [1250, 1249] by Demod 766 with 12 at 2
704 Id : 2186, {_}: multiply ?1844 ?1845 =?= multiply ?1845 ?1844 [1845, 1844] by Demod 1224 with 793 at 2
705 Id : 5031, {_}: add ?6221 (multiply (add ?6221 (add ?6222 (add ?6221 ?6222))) ?6223) =<= multiply (multiply (add ?6223 ?6221) (add ?6221 ?6222)) (add (add ?6221 ?6222) (add ?6221 (add ?6222 ?6223))) [6223, 6222, 6221] by Demod 5030 with 2186 at 3
706 Id : 5032, {_}: add ?6221 (multiply (add ?6222 (add ?6221 ?6222)) ?6223) =<= multiply (multiply (add ?6223 ?6221) (add ?6221 ?6222)) (add (add ?6221 ?6222) (add ?6221 (add ?6222 ?6223))) [6223, 6222, 6221] by Demod 5031 with 326 at 1,2,2
707 Id : 5033, {_}: add ?6221 (multiply (add ?6222 (add ?6221 ?6222)) ?6223) =<= multiply (add ?6223 ?6221) (multiply (add ?6221 ?6222) (add (add ?6221 ?6222) (add ?6221 (add ?6222 ?6223)))) [6223, 6222, 6221] by Demod 5032 with 12 at 3
708 Id : 5034, {_}: add ?6221 (multiply (add ?6221 ?6222) ?6223) =<= multiply (add ?6223 ?6221) (multiply (add ?6221 ?6222) (add (add ?6221 ?6222) (add ?6221 (add ?6222 ?6223)))) [6223, 6222, 6221] by Demod 5033 with 758 at 1,2,2
709 Id : 11398, {_}: add ?15526 (multiply (add ?15526 ?15527) ?15528) =>= multiply (add ?15528 ?15526) (add ?15526 ?15527) [15528, 15527, 15526] by Demod 5034 with 42 at 2,3
710 Id : 13942, {_}: add ?18812 (multiply (add ?18813 ?18812) ?18814) =>= multiply (add ?18814 ?18812) (add ?18812 ?18813) [18814, 18813, 18812] by Super 11398 with 2086 at 1,2,2
711 Id : 15243, {_}: add ?20523 (multiply ?20524 (add ?20525 ?20523)) =>= multiply (add ?20524 ?20523) (add ?20523 ?20525) [20525, 20524, 20523] by Super 13942 with 2186 at 2,2
712 Id : 15249, {_}: add (multiply ?20549 ?20550) (multiply ?20551 ?20550) =<= multiply (add ?20551 (multiply ?20549 ?20550)) (add (multiply ?20549 ?20550) ?20550) [20551, 20550, 20549] by Super 15243 with 35 at 2,2,2
713 Id : 11411, {_}: add ?15576 (multiply (add ?15577 ?15576) ?15578) =<= multiply (add ?15578 ?15576) (add ?15576 (add ?15577 ?15576)) [15578, 15577, 15576] by Super 11398 with 758 at 1,2,2
714 Id : 11561, {_}: add ?15576 (multiply (add ?15577 ?15576) ?15578) =>= multiply (add ?15578 ?15576) (add ?15577 ?15576) [15578, 15577, 15576] by Demod 11411 with 758 at 2,3
715 Id : 11415, {_}: add ?15594 (multiply (add ?15595 ?15594) ?15596) =>= multiply (add ?15596 ?15594) (add ?15594 ?15595) [15596, 15595, 15594] by Super 11398 with 2086 at 1,2,2
716 Id : 14660, {_}: multiply (add ?15578 ?15576) (add ?15576 ?15577) =?= multiply (add ?15578 ?15576) (add ?15577 ?15576) [15577, 15576, 15578] by Demod 11561 with 11415 at 2
717 Id : 15422, {_}: add (multiply ?20549 ?20550) (multiply ?20551 ?20550) =<= multiply (add ?20551 (multiply ?20549 ?20550)) (add ?20550 (multiply ?20549 ?20550)) [20551, 20550, 20549] by Demod 15249 with 14660 at 3
718 Id : 15423, {_}: add (multiply ?20549 ?20550) (multiply ?20551 ?20550) =>= multiply (add ?20551 (multiply ?20549 ?20550)) ?20550 [20551, 20550, 20549] by Demod 15422 with 35 at 2,3
719 Id : 15424, {_}: add (multiply ?20549 ?20550) (multiply ?20551 ?20550) =>= multiply ?20550 (add ?20551 (multiply ?20549 ?20550)) [20551, 20550, 20549] by Demod 15423 with 2186 at 3
720 Id : 13947, {_}: add (multiply ?18834 ?18835) (multiply ?18834 ?18836) =<= multiply (add ?18836 (multiply ?18834 ?18835)) (add (multiply ?18834 ?18835) ?18834) [18836, 18835, 18834] by Super 13942 with 22 at 1,2,2
721 Id : 14110, {_}: add (multiply ?18834 ?18835) (multiply ?18834 ?18836) =<= multiply (add ?18836 (multiply ?18834 ?18835)) (add ?18834 (multiply ?18834 ?18835)) [18836, 18835, 18834] by Demod 13947 with 2086 at 2,3
722 Id : 14111, {_}: add (multiply ?18834 ?18835) (multiply ?18834 ?18836) =>= multiply (add ?18836 (multiply ?18834 ?18835)) ?18834 [18836, 18835, 18834] by Demod 14110 with 22 at 2,3
723 Id : 15661, {_}: add (multiply ?20991 ?20992) (multiply ?20991 ?20993) =>= multiply ?20991 (add ?20993 (multiply ?20991 ?20992)) [20993, 20992, 20991] by Demod 14111 with 2186 at 3
724 Id : 15712, {_}: add (multiply ?21207 ?21208) (multiply ?21208 ?21209) =>= multiply ?21208 (add ?21209 (multiply ?21208 ?21207)) [21209, 21208, 21207] by Super 15661 with 2186 at 1,2
725 Id : 13948, {_}: add (multiply ?18838 ?18839) (multiply ?18839 ?18840) =<= multiply (add ?18840 (multiply ?18838 ?18839)) (add (multiply ?18838 ?18839) ?18839) [18840, 18839, 18838] by Super 13942 with 35 at 1,2,2
726 Id : 14113, {_}: add (multiply ?18838 ?18839) (multiply ?18839 ?18840) =<= multiply (add ?18840 (multiply ?18838 ?18839)) (add ?18839 (multiply ?18838 ?18839)) [18840, 18839, 18838] by Demod 13948 with 2086 at 2,3
727 Id : 14114, {_}: add (multiply ?18838 ?18839) (multiply ?18839 ?18840) =>= multiply (add ?18840 (multiply ?18838 ?18839)) ?18839 [18840, 18839, 18838] by Demod 14113 with 35 at 2,3
728 Id : 14115, {_}: add (multiply ?18838 ?18839) (multiply ?18839 ?18840) =>= multiply ?18839 (add ?18840 (multiply ?18838 ?18839)) [18840, 18839, 18838] by Demod 14114 with 2186 at 3
729 Id : 17950, {_}: multiply ?21208 (add ?21209 (multiply ?21207 ?21208)) =?= multiply ?21208 (add ?21209 (multiply ?21208 ?21207)) [21207, 21209, 21208] by Demod 15712 with 14115 at 2
730 Id : 16606, {_}: add (multiply ?22260 ?22261) (multiply ?22262 ?22260) =>= multiply ?22260 (add ?22261 (multiply ?22262 ?22260)) [22262, 22261, 22260] by Super 2086 with 14115 at 3
731 Id : 15248, {_}: add (multiply ?20545 ?20546) (multiply ?20547 ?20545) =<= multiply (add ?20547 (multiply ?20545 ?20546)) (add (multiply ?20545 ?20546) ?20545) [20547, 20546, 20545] by Super 15243 with 22 at 2,2,2
732 Id : 15419, {_}: add (multiply ?20545 ?20546) (multiply ?20547 ?20545) =<= multiply (add ?20547 (multiply ?20545 ?20546)) (add ?20545 (multiply ?20545 ?20546)) [20547, 20546, 20545] by Demod 15248 with 14660 at 3
733 Id : 15420, {_}: add (multiply ?20545 ?20546) (multiply ?20547 ?20545) =>= multiply (add ?20547 (multiply ?20545 ?20546)) ?20545 [20547, 20546, 20545] by Demod 15419 with 22 at 2,3
734 Id : 15421, {_}: add (multiply ?20545 ?20546) (multiply ?20547 ?20545) =>= multiply ?20545 (add ?20547 (multiply ?20545 ?20546)) [20547, 20546, 20545] by Demod 15420 with 2186 at 3
735 Id : 18553, {_}: multiply ?25006 (add ?25007 (multiply ?25006 ?25008)) =?= multiply ?25006 (add ?25008 (multiply ?25007 ?25006)) [25008, 25007, 25006] by Demod 16606 with 15421 at 2
736 Id : 19629, {_}: multiply ?26411 (add (multiply ?26411 ?26412) ?26413) =>= multiply ?26411 (add ?26412 (multiply ?26413 ?26411)) [26413, 26412, 26411] by Super 18553 with 2086 at 2,2
737 Id : 16573, {_}: add (multiply ?2 ?3) (multiply ?4 (add ?2 (multiply ?3 ?4))) =>= multiply (add ?2 ?3) (multiply (add ?3 ?4) (add ?4 ?2)) [4, 3, 2] by Demod 2 with 14115 at 2,2
738 Id : 19695, {_}: multiply ?26703 (multiply (add ?26703 ?26704) (multiply (add ?26704 ?26705) (add ?26705 ?26703))) =<= multiply ?26703 (add ?26704 (multiply (multiply ?26705 (add ?26703 (multiply ?26704 ?26705))) ?26703)) [26705, 26704, 26703] by Super 19629 with 16573 at 2,2
739 Id : 1139, {_}: multiply ?1683 ?1684 =<= multiply ?1683 (multiply (add ?1683 ?1685) ?1684) [1685, 1684, 1683] by Super 12 with 42 at 1,2
740 Id : 20009, {_}: multiply ?26703 (multiply (add ?26704 ?26705) (add ?26705 ?26703)) =<= multiply ?26703 (add ?26704 (multiply (multiply ?26705 (add ?26703 (multiply ?26704 ?26705))) ?26703)) [26705, 26704, 26703] by Demod 19695 with 1139 at 2
741 Id : 20010, {_}: multiply ?26703 (multiply (add ?26704 ?26705) (add ?26705 ?26703)) =<= multiply ?26703 (add ?26704 (multiply ?26703 (multiply ?26705 (add ?26703 (multiply ?26704 ?26705))))) [26705, 26704, 26703] by Demod 20009 with 17950 at 3
742 Id : 15, {_}: add (multiply (multiply (multiply ?48 ?49) ?50) ?48) (multiply ?48 ?49) =<= multiply (add (multiply (multiply ?48 ?49) ?50) ?48) (multiply (add ?48 ?49) (add ?49 (multiply (multiply ?48 ?49) ?50))) [50, 49, 48] by Super 2 with 3 at 2,2
743 Id : 163, {_}: add (multiply (multiply ?48 ?49) (multiply ?50 ?48)) (multiply ?48 ?49) =<= multiply (add (multiply (multiply ?48 ?49) ?50) ?48) (multiply (add ?48 ?49) (add ?49 (multiply (multiply ?48 ?49) ?50))) [50, 49, 48] by Demod 15 with 12 at 1,2
744 Id : 164, {_}: add (multiply (multiply ?48 ?49) (multiply ?50 ?48)) (multiply ?48 ?49) =<= multiply (add (multiply ?48 (multiply ?49 ?50)) ?48) (multiply (add ?48 ?49) (add ?49 (multiply (multiply ?48 ?49) ?50))) [50, 49, 48] by Demod 163 with 12 at 1,1,3
745 Id : 165, {_}: add (multiply (multiply ?48 ?49) (multiply ?50 ?48)) (multiply ?48 ?49) =<= multiply (add (multiply ?48 (multiply ?49 ?50)) ?48) (multiply (add ?48 ?49) (add ?49 (multiply ?48 (multiply ?49 ?50)))) [50, 49, 48] by Demod 164 with 12 at 2,2,2,3
746 Id : 166, {_}: add (multiply ?48 (multiply ?49 (multiply ?50 ?48))) (multiply ?48 ?49) =<= multiply (add (multiply ?48 (multiply ?49 ?50)) ?48) (multiply (add ?48 ?49) (add ?49 (multiply ?48 (multiply ?49 ?50)))) [50, 49, 48] by Demod 165 with 12 at 1,2
747 Id : 167, {_}: add (multiply ?48 (multiply ?49 (multiply ?50 ?48))) (multiply ?48 ?49) =<= multiply (add (multiply ?48 (multiply ?49 ?50)) ?48) (multiply (add ?48 ?49) ?49) [50, 49, 48] by Demod 166 with 3 at 2,2,3
748 Id : 130, {_}: multiply (add ?21 ?22) (multiply (add ?22 ?23) ?22) =>= ?22 [23, 22, 21] by Demod 7 with 12 at 2
749 Id : 89, {_}: n0 =<= inverse n1 [] by Super 79 with 10 at 2
750 Id : 243, {_}: add n1 n0 =>= n1 [] by Super 9 with 89 at 2,2
751 Id : 264, {_}: multiply n1 (add ?616 n1) =>= n1 [616] by Super 6 with 243 at 2,2,2
752 Id : 276, {_}: add ?616 n1 =>= n1 [616] by Demod 264 with 79 at 2
753 Id : 287, {_}: multiply ?632 (add ?633 n1) =>= ?632 [633, 632] by Super 6 with 276 at 2,2,2
754 Id : 305, {_}: multiply ?632 n1 =>= ?632 [632] by Demod 287 with 276 at 2,2
755 Id : 387, {_}: multiply (add ?766 n1) (add n1 ?767) =>= n1 [767, 766] by Super 130 with 305 at 2,2
756 Id : 421, {_}: multiply n1 (add n1 ?767) =>= n1 [767] by Demod 387 with 276 at 1,2
757 Id : 422, {_}: add n1 ?767 =>= n1 [767] by Demod 421 with 79 at 2
758 Id : 476, {_}: add (multiply n1 (multiply ?861 (multiply ?862 n1))) (multiply n1 ?861) =>= multiply (add (multiply n1 (multiply ?861 ?862)) n1) (multiply n1 ?861) [862, 861] by Super 167 with 422 at 1,2,3
759 Id : 487, {_}: add (multiply ?861 (multiply ?862 n1)) (multiply n1 ?861) =<= multiply (add (multiply n1 (multiply ?861 ?862)) n1) (multiply n1 ?861) [862, 861] by Demod 476 with 79 at 1,2
760 Id : 488, {_}: add (multiply ?861 (multiply ?862 n1)) ?861 =<= multiply (add (multiply n1 (multiply ?861 ?862)) n1) (multiply n1 ?861) [862, 861] by Demod 487 with 79 at 2,2
761 Id : 489, {_}: add (multiply ?861 (multiply ?862 n1)) ?861 =>= multiply n1 (multiply n1 ?861) [862, 861] by Demod 488 with 276 at 1,3
762 Id : 490, {_}: add (multiply ?861 (multiply ?862 n1)) ?861 =>= multiply n1 ?861 [862, 861] by Demod 489 with 79 at 2,3
763 Id : 491, {_}: add (multiply ?861 ?862) ?861 =>= multiply n1 ?861 [862, 861] by Demod 490 with 305 at 2,1,2
764 Id : 492, {_}: add (multiply ?861 ?862) ?861 =>= ?861 [862, 861] by Demod 491 with 79 at 3
765 Id : 1289, {_}: multiply (multiply ?1889 ?1890) (add ?1891 ?1889) =>= multiply ?1889 ?1890 [1891, 1890, 1889] by Super 6 with 492 at 2,2,2
766 Id : 1322, {_}: multiply ?1889 (multiply ?1890 (add ?1891 ?1889)) =>= multiply ?1889 ?1890 [1891, 1890, 1889] by Demod 1289 with 12 at 2
767 Id : 20011, {_}: multiply ?26703 (add ?26704 ?26705) =<= multiply ?26703 (add ?26704 (multiply ?26703 (multiply ?26705 (add ?26703 (multiply ?26704 ?26705))))) [26705, 26704, 26703] by Demod 20010 with 1322 at 2
768 Id : 670, {_}: add ?1060 ?1061 =<= add ?1060 (add (multiply ?1060 ?1062) ?1061) [1062, 1061, 1060] by Super 11 with 22 at 1,2
769 Id : 4482, {_}: multiply (multiply ?5675 ?5676) (add ?5675 ?5677) =>= multiply ?5675 ?5676 [5677, 5676, 5675] by Super 6 with 670 at 2,2
770 Id : 4588, {_}: multiply ?5675 (multiply ?5676 (add ?5675 ?5677)) =>= multiply ?5675 ?5676 [5677, 5676, 5675] by Demod 4482 with 12 at 2
771 Id : 20012, {_}: multiply ?26703 (add ?26704 ?26705) =<= multiply ?26703 (add ?26704 (multiply ?26703 ?26705)) [26705, 26704, 26703] by Demod 20011 with 4588 at 2,2,3
772 Id : 20081, {_}: multiply ?21208 (add ?21209 (multiply ?21207 ?21208)) =>= multiply ?21208 (add ?21209 ?21207) [21207, 21209, 21208] by Demod 17950 with 20012 at 3
773 Id : 20086, {_}: add (multiply ?20549 ?20550) (multiply ?20551 ?20550) =>= multiply ?20550 (add ?20551 ?20549) [20551, 20550, 20549] by Demod 15424 with 20081 at 3
774 Id : 20397, {_}: multiply a (add c b) =?= multiply a (add c b) [] by Demod 20396 with 2086 at 2,3
775 Id : 20396, {_}: multiply a (add c b) =?= multiply a (add b c) [] by Demod 20395 with 20086 at 3
776 Id : 20395, {_}: multiply a (add c b) =<= add (multiply c a) (multiply b a) [] by Demod 20394 with 2086 at 3
777 Id : 20394, {_}: multiply a (add c b) =<= add (multiply b a) (multiply c a) [] by Demod 1 with 2086 at 2,2
778 Id : 1, {_}: multiply a (add b c) =<= add (multiply b a) (multiply c a) [] by prove_multiply_add_property
779 % SZS output end CNFRefutation for BOO031-1.p
780 1918: solved BOO031-1.p in 5.320332 using kbo
781 !! infer_left 157 0.0002 0.0000 0.0000
782 !! infer_right 100 24.0993 2.0611 0.2410
783 !! simplify_goal 157 0.4373 0.4007 0.0028
784 !! keep_simplified 384 1.9419 0.4103 0.0051
785 !! simplification_step 449 1.9406 0.4051 0.0043
786 !! simplify 13481 24.3524 0.5018 0.0018
787 !! orphan_murder 384 0.0107 0.0001 0.0000
788 !! is_subsumed 11223 1.4112 0.4004 0.0001
789 !! build_new_clause 8759 1.5287 0.4002 0.0002
790 !! demodulate 13353 22.9307 0.5017 0.0017
791 !! demod 95274 20.6602 0.5003 0.0002
792 !! demod.apply_subst 296942 2.5813 0.4003 0.0000
793 !! demod.compare_terms 136754 7.9453 0.4483 0.0001
794 !! demod.retrieve_generalizations 95274 1.9479 0.4003 0.0000
795 !! demod.unify 310624 3.7532 0.5001 0.0000
796 !! build_clause 22174 1.6538 0.4002 0.0001
797 !! compare_terms(kbo) 161227 6.7842 0.4483 0.0000
798 !! compare_terms(nrkbo) 12 0.0001 0.0000 0.0000
801 add ?2 (multiply ?3 (multiply ?2 ?4)) =>= ?2
802 [4, 3, 2] by l1 ?2 ?3 ?4
804 add (add (multiply ?6 ?7) (multiply ?7 ?8)) ?7 =>= ?7
805 [8, 7, 6] by l3 ?6 ?7 ?8
807 multiply (add ?10 (inverse ?10)) ?11 =>= ?11
808 [11, 10] by property3 ?10 ?11
810 multiply ?13 (add ?14 (add ?13 ?15)) =>= ?13
811 [15, 14, 13] by l2 ?13 ?14 ?15
813 multiply (multiply (add ?17 ?18) (add ?18 ?19)) ?18 =>= ?18
814 [19, 18, 17] by l4 ?17 ?18 ?19
816 add (multiply ?21 (inverse ?21)) ?22 =>= ?22
817 [22, 21] by property3_dual ?21 ?22
819 add (multiply (add ?24 ?25) ?24) (multiply ?24 ?25) =>= ?24
820 [25, 24] by majority1 ?24 ?25
822 add (multiply (add ?27 ?27) ?28) (multiply ?27 ?27) =>= ?27
823 [28, 27] by majority2 ?27 ?28
825 add (multiply (add ?30 ?31) ?31) (multiply ?30 ?31) =>= ?31
826 [31, 30] by majority3 ?30 ?31
828 multiply (add (multiply ?33 ?34) ?33) (add ?33 ?34) =>= ?33
829 [34, 33] by majority1_dual ?33 ?34
831 multiply (add (multiply ?36 ?36) ?37) (add ?36 ?36) =>= ?36
832 [37, 36] by majority2_dual ?36 ?37
834 multiply (add (multiply ?39 ?40) ?40) (add ?39 ?40) =>= ?40
835 [40, 39] by majority3_dual ?39 ?40
837 1934: Id : 1, {_}: inverse (inverse a) =>= a [] by prove_inverse_involution
838 % SZS status Timeout for BOO032-1.p
841 add (multiply ?2 ?3) (add (multiply ?3 ?4) (multiply ?4 ?2))
843 multiply (add ?2 ?3) (multiply (add ?3 ?4) (add ?4 ?2))
844 [4, 3, 2] by distributivity ?2 ?3 ?4
846 add ?6 (multiply ?7 (multiply ?6 ?8)) =>= ?6
847 [8, 7, 6] by l1 ?6 ?7 ?8
849 add (add (multiply ?10 ?11) (multiply ?11 ?12)) ?11 =>= ?11
850 [12, 11, 10] by l3 ?10 ?11 ?12
852 multiply (add ?14 (inverse ?14)) ?15 =>= ?15
853 [15, 14] by property3 ?14 ?15
855 multiply (add (multiply ?17 ?18) ?17) (add ?17 ?18) =>= ?17
856 [18, 17] by majority1 ?17 ?18
858 multiply (add (multiply ?20 ?20) ?21) (add ?20 ?20) =>= ?20
859 [21, 20] by majority2 ?20 ?21
861 multiply (add (multiply ?23 ?24) ?24) (add ?23 ?24) =>= ?24
862 [24, 23] by majority3 ?23 ?24
864 1987: Id : 1, {_}: inverse (inverse a) =>= a [] by prove_inverse_involution
865 % SZS status Timeout for BOO033-1.p
868 multiply (multiply ?2 ?3 ?4) ?5 (multiply ?2 ?3 ?6)
870 multiply ?2 ?3 (multiply ?4 ?5 ?6)
871 [6, 5, 4, 3, 2] by associativity ?2 ?3 ?4 ?5 ?6
872 2022: Id : 3, {_}: multiply ?8 ?9 ?9 =>= ?9 [9, 8] by ternary_multiply_1 ?8 ?9
874 multiply ?11 ?11 ?12 =>= ?11
875 [12, 11] by ternary_multiply_2 ?11 ?12
877 multiply (inverse ?14) ?14 ?15 =>= ?15
878 [15, 14] by left_inverse ?14 ?15
880 multiply ?17 ?18 (inverse ?18) =>= ?17
881 [18, 17] by right_inverse ?17 ?18
884 multiply (multiply a (inverse a) b)
885 (inverse (multiply (multiply c d e) f (multiply c d g)))
886 (multiply d (multiply g f e) c)
889 [] by prove_single_axiom
892 Found proof, 9.461485s
893 % SZS status Unsatisfiable for BOO034-1.p
894 % SZS output start CNFRefutation for BOO034-1.p
895 Id : 5, {_}: multiply (inverse ?14) ?14 ?15 =>= ?15 [15, 14] by left_inverse ?14 ?15
896 Id : 4, {_}: multiply ?11 ?11 ?12 =>= ?11 [12, 11] by ternary_multiply_2 ?11 ?12
897 Id : 6, {_}: multiply ?17 ?18 (inverse ?18) =>= ?17 [18, 17] by right_inverse ?17 ?18
898 Id : 3, {_}: multiply ?8 ?9 ?9 =>= ?9 [9, 8] by ternary_multiply_1 ?8 ?9
899 Id : 2, {_}: multiply (multiply ?2 ?3 ?4) ?5 (multiply ?2 ?3 ?6) =>= multiply ?2 ?3 (multiply ?4 ?5 ?6) [6, 5, 4, 3, 2] by associativity ?2 ?3 ?4 ?5 ?6
900 Id : 911, {_}: multiply ?2944 ?2945 (multiply ?2946 ?2944 ?2947) =?= multiply ?2946 ?2944 (multiply ?2944 ?2945 ?2947) [2947, 2946, 2945, 2944] by Super 2 with 3 at 1,2
901 Id : 950, {_}: multiply ?3142 ?3143 ?3144 =<= multiply ?3144 ?3142 (multiply ?3142 ?3143 (inverse ?3142)) [3144, 3143, 3142] by Super 911 with 6 at 3,2
902 Id : 12, {_}: multiply (multiply ?48 ?49 ?50) ?51 ?49 =?= multiply ?48 ?49 (multiply ?50 ?51 ?49) [51, 50, 49, 48] by Super 2 with 3 at 3,2
903 Id : 13, {_}: multiply ?53 ?54 (multiply ?55 ?53 ?56) =?= multiply ?55 ?53 (multiply ?53 ?54 ?56) [56, 55, 54, 53] by Super 2 with 3 at 1,2
904 Id : 903, {_}: multiply (multiply ?2906 ?2907 ?2908) ?2906 ?2907 =?= multiply ?2908 ?2906 (multiply ?2906 ?2907 ?2907) [2908, 2907, 2906] by Super 12 with 13 at 3
905 Id : 1657, {_}: multiply (multiply ?4591 ?4592 ?4593) ?4591 ?4592 =>= multiply ?4593 ?4591 ?4592 [4593, 4592, 4591] by Demod 903 with 3 at 3,3
906 Id : 518, {_}: multiply (multiply ?1782 ?1783 ?1784) ?1785 ?1783 =?= multiply ?1782 ?1783 (multiply ?1784 ?1785 ?1783) [1785, 1784, 1783, 1782] by Super 2 with 3 at 3,2
907 Id : 641, {_}: multiply (multiply ?2137 ?2138 ?2139) ?2139 ?2138 =>= multiply ?2137 ?2138 ?2139 [2139, 2138, 2137] by Super 518 with 4 at 3,3
908 Id : 646, {_}: multiply ?2156 (inverse ?2157) ?2157 =?= multiply ?2156 ?2157 (inverse ?2157) [2157, 2156] by Super 641 with 6 at 1,2
909 Id : 684, {_}: multiply ?2156 (inverse ?2157) ?2157 =>= ?2156 [2157, 2156] by Demod 646 with 6 at 3
910 Id : 1669, {_}: multiply ?4646 ?4646 (inverse ?4647) =?= multiply ?4647 ?4646 (inverse ?4647) [4647, 4646] by Super 1657 with 684 at 1,2
911 Id : 1718, {_}: ?4646 =<= multiply ?4647 ?4646 (inverse ?4647) [4647, 4646] by Demod 1669 with 4 at 2
912 Id : 6901, {_}: multiply ?3142 ?3143 ?3144 =?= multiply ?3144 ?3142 ?3143 [3144, 3143, 3142] by Demod 950 with 1718 at 3,3
913 Id : 547, {_}: multiply ?1934 ?1935 ?1936 =<= multiply ?1934 ?1936 (multiply (inverse ?1936) ?1935 ?1936) [1936, 1935, 1934] by Super 518 with 6 at 1,2
914 Id : 1662, {_}: multiply ?4610 ?4610 ?4611 =?= multiply (inverse ?4611) ?4610 ?4611 [4611, 4610] by Super 1657 with 6 at 1,2
915 Id : 1716, {_}: ?4610 =<= multiply (inverse ?4611) ?4610 ?4611 [4611, 4610] by Demod 1662 with 4 at 2
916 Id : 5327, {_}: multiply ?1934 ?1935 ?1936 =<->= multiply ?1934 ?1936 ?1935 [1936, 1935, 1934] by Demod 547 with 1716 at 3,3
917 Id : 711, {_}: inverse (inverse ?2298) =>= ?2298 [2298] by Super 5 with 684 at 2
918 Id : 745, {_}: multiply ?2389 (inverse ?2389) ?2390 =>= ?2390 [2390, 2389] by Super 5 with 711 at 1,2
919 Id : 7385, {_}: b === b [] by Demod 7384 with 684 at 2
920 Id : 7384, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c d (multiply e f g)) =>= b [] by Demod 7383 with 5327 at 3,3,2
921 Id : 7383, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c d (multiply e g f)) =>= b [] by Demod 7382 with 6901 at 3,3,2
922 Id : 7382, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c d (multiply f e g)) =>= b [] by Demod 7381 with 5327 at 3,3,2
923 Id : 7381, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c d (multiply f g e)) =>= b [] by Demod 7380 with 6901 at 3,3,2
924 Id : 7380, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c d (multiply g e f)) =>= b [] by Demod 7379 with 5327 at 3,3,2
925 Id : 7379, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c d (multiply g f e)) =>= b [] by Demod 7378 with 5327 at 3,2
926 Id : 7378, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply c (multiply g f e) d) =>= b [] by Demod 7377 with 6901 at 3,2
927 Id : 7377, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply d c (multiply g f e)) =>= b [] by Demod 7376 with 5327 at 2
928 Id : 7376, {_}: multiply b (multiply d c (multiply g f e)) (inverse (multiply c d (multiply e f g))) =>= b [] by Demod 7375 with 6901 at 2
929 Id : 7375, {_}: multiply (inverse (multiply c d (multiply e f g))) b (multiply d c (multiply g f e)) =>= b [] by Demod 7374 with 5327 at 3,2
930 Id : 7374, {_}: multiply (inverse (multiply c d (multiply e f g))) b (multiply d (multiply g f e) c) =>= b [] by Demod 7373 with 745 at 2,2
931 Id : 7373, {_}: multiply (inverse (multiply c d (multiply e f g))) (multiply a (inverse a) b) (multiply d (multiply g f e) c) =>= b [] by Demod 7372 with 5327 at 2
932 Id : 7372, {_}: multiply (inverse (multiply c d (multiply e f g))) (multiply d (multiply g f e) c) (multiply a (inverse a) b) =>= b [] by Demod 11 with 6901 at 2
933 Id : 11, {_}: multiply (multiply a (inverse a) b) (inverse (multiply c d (multiply e f g))) (multiply d (multiply g f e) c) =>= b [] by Demod 1 with 2 at 1,2,2
934 Id : 1, {_}: multiply (multiply a (inverse a) b) (inverse (multiply (multiply c d e) f (multiply c d g))) (multiply d (multiply g f e) c) =>= b [] by prove_single_axiom
935 % SZS output end CNFRefutation for BOO034-1.p
936 2022: solved BOO034-1.p in 1.936121 using nrkbo
937 !! infer_left 78 0.0001 0.0000 0.0000
938 !! infer_right 48 9.3027 1.4515 0.1938
939 !! simplify_goal 78 0.0409 0.0045 0.0005
940 !! keep_simplified 69 0.0985 0.0224 0.0014
941 !! simplification_step 72 0.0983 0.0103 0.0014
942 !! simplify 5045 7.4867 0.4027 0.0015
943 !! orphan_murder 69 0.0008 0.0000 0.0000
944 !! is_subsumed 3272 1.0387 0.4004 0.0003
945 !! build_new_clause 3866 1.4054 0.4009 0.0004
946 !! demodulate 4777 6.4718 0.4025 0.0014
947 !! demod 29450 5.1585 0.4005 0.0002
948 !! demod.apply_subst 26158 0.0623 0.0003 0.0000
949 !! demod.compare_terms 9540 0.5661 0.4001 0.0001
950 !! demod.retrieve_generalizations 29450 1.7470 0.4001 0.0001
951 !! demod.unify 161416 2.1523 0.4003 0.0000
952 !! build_clause 7487 1.4082 0.4007 0.0002
953 !! compare_terms(nrkbo) 18688 1.0780 0.4002 0.0001
954 !! compare_terms(nrkbo) 6 0.0001 0.0000 0.0000
958 (add (inverse (add (inverse (add ?2 ?3)) ?4))
960 (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5)))))))
963 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
965 2030: Id : 1, {_}: add b a =<= add a b [] by huntinton_1
968 Found proof, 4.721715s
969 % SZS status Unsatisfiable for BOO072-1.p
970 % SZS output start CNFRefutation for BOO072-1.p
971 Id : 3, {_}: inverse (add (inverse (add (inverse (add ?7 ?8)) ?9)) (inverse (add ?7 (inverse (add (inverse ?9) (inverse (add ?9 ?10))))))) =>= ?9 [10, 9, 8, 7] by dn1 ?7 ?8 ?9 ?10
972 Id : 2, {_}: inverse (add (inverse (add (inverse (add ?2 ?3)) ?4)) (inverse (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5))))))) =>= ?4 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
973 Id : 15, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?74)) ?75)) ?74)) ?76)) (inverse ?74))) ?74) =>= inverse ?74 [76, 75, 74] by Super 3 with 2 at 2,1,2
974 Id : 20, {_}: inverse (add (inverse (add ?104 (inverse ?104))) ?104) =>= inverse ?104 [104] by Super 15 with 2 at 1,1,1,1,2
975 Id : 34, {_}: inverse (add (inverse ?125) (inverse (add ?125 (inverse (add (inverse ?125) (inverse (add ?125 ?126))))))) =>= ?125 [126, 125] by Super 2 with 20 at 1,1,2
976 Id : 55, {_}: inverse (add (inverse (add (inverse (add ?177 ?178)) ?179)) (inverse (add ?177 ?179))) =>= ?179 [179, 178, 177] by Super 2 with 34 at 2,1,2,1,2
977 Id : 129, {_}: inverse (add (inverse (add (inverse (add ?380 ?381)) ?382)) (inverse (add ?380 ?382))) =>= ?382 [382, 381, 380] by Super 2 with 34 at 2,1,2,1,2
978 Id : 139, {_}: inverse (add (inverse (add ?423 ?424)) (inverse (add (inverse ?423) ?424))) =>= ?424 [424, 423] by Super 129 with 34 at 1,1,1,1,2
979 Id : 173, {_}: inverse (add ?519 (inverse (add ?520 (inverse (add (inverse ?520) ?519))))) =>= inverse (add (inverse ?520) ?519) [520, 519] by Super 55 with 139 at 1,1,2
980 Id : 339, {_}: inverse (add (inverse ?868) (inverse (add ?868 (inverse (add (inverse ?868) (inverse ?868)))))) =>= ?868 [868] by Super 34 with 173 at 2,1,2,1,2
981 Id : 388, {_}: inverse (add (inverse ?868) (inverse ?868)) =>= ?868 [868] by Demod 339 with 173 at 2
982 Id : 174, {_}: inverse (add (inverse (add ?522 ?523)) (inverse (add (inverse ?522) ?523))) =>= ?523 [523, 522] by Super 129 with 34 at 1,1,1,1,2
983 Id : 59, {_}: inverse (add (inverse ?193) (inverse (add ?193 (inverse (add (inverse ?193) (inverse (add ?193 ?194))))))) =>= ?193 [194, 193] by Super 2 with 20 at 1,1,2
984 Id : 68, {_}: inverse (add (inverse ?226) (inverse (add ?226 ?226))) =>= ?226 [226] by Super 59 with 34 at 2,1,2,1,2
985 Id : 187, {_}: inverse (add (inverse (add ?573 (inverse (add ?573 ?573)))) ?573) =>= inverse (add ?573 ?573) [573] by Super 174 with 68 at 2,1,2
986 Id : 207, {_}: inverse (add (inverse (add ?609 ?609)) (inverse (add ?609 ?609))) =>= ?609 [609] by Super 55 with 187 at 1,1,2
987 Id : 416, {_}: add ?609 ?609 =>= ?609 [609] by Demod 207 with 388 at 2
988 Id : 425, {_}: inverse (inverse ?868) =>= ?868 [868] by Demod 388 with 416 at 1,2
989 Id : 432, {_}: inverse (add (inverse (add (inverse ?1023) ?1024)) (inverse (add ?1023 ?1024))) =>= ?1024 [1024, 1023] by Super 139 with 425 at 1,1,2,1,2
990 Id : 1000, {_}: inverse (add ?1842 (inverse (add (inverse ?1843) (inverse (add ?1843 ?1842))))) =>= inverse (add ?1843 ?1842) [1843, 1842] by Super 55 with 432 at 1,1,2
991 Id : 2933, {_}: inverse (inverse (add ?4434 ?4435)) =<= add ?4435 (inverse (add (inverse ?4434) (inverse (add ?4434 ?4435)))) [4435, 4434] by Super 425 with 1000 at 1,2
992 Id : 3023, {_}: add ?4434 ?4435 =<= add ?4435 (inverse (add (inverse ?4434) (inverse (add ?4434 ?4435)))) [4435, 4434] by Demod 2933 with 425 at 2
993 Id : 5778, {_}: inverse (add ?7760 (inverse (add (inverse (add ?7761 ?7762)) (inverse (add ?7761 ?7760))))) =>= inverse (add ?7761 ?7760) [7762, 7761, 7760] by Super 129 with 55 at 1,1,2
994 Id : 439, {_}: inverse (inverse ?1046) =>= ?1046 [1046] by Demod 388 with 416 at 1,2
995 Id : 445, {_}: inverse (inverse (add (inverse ?1065) ?1066)) =<= add ?1066 (inverse (add ?1065 (inverse (add (inverse ?1065) ?1066)))) [1066, 1065] by Super 439 with 173 at 1,2
996 Id : 457, {_}: add (inverse ?1065) ?1066 =<= add ?1066 (inverse (add ?1065 (inverse (add (inverse ?1065) ?1066)))) [1066, 1065] by Demod 445 with 425 at 2
997 Id : 5837, {_}: inverse (add (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996)))) (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) =>= inverse (add ?7995 (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) [7996, 7995] by Super 5778 with 457 at 1,2,1,2
998 Id : 5990, {_}: inverse (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996)))) =<= inverse (add ?7995 (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) [7996, 7995] by Demod 5837 with 416 at 1,2
999 Id : 5991, {_}: add (inverse ?7995) (inverse (add ?7995 ?7996)) =<= inverse (add ?7995 (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) [7996, 7995] by Demod 5990 with 425 at 2
1000 Id : 6004, {_}: inverse (add (inverse ?125) (add (inverse ?125) (inverse (add ?125 ?126)))) =>= ?125 [126, 125] by Demod 34 with 5991 at 2,1,2
1001 Id : 6, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?26)) ?27)) ?26)) ?28)) (inverse ?26))) ?26) =>= inverse ?26 [28, 27, 26] by Super 3 with 2 at 2,1,2
1002 Id : 426, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add ?26 ?27)) ?26)) ?28)) (inverse ?26))) ?26) =>= inverse ?26 [28, 27, 26] by Demod 6 with 425 at 1,1,1,1,1,1,1,1,1,1,2
1003 Id : 249, {_}: inverse (add ?713 (inverse (add ?713 (inverse (add ?713 ?713))))) =>= inverse (add ?713 ?713) [713] by Super 55 with 207 at 1,1,2
1004 Id : 417, {_}: inverse (add ?713 (inverse (add ?713 (inverse ?713)))) =>= inverse (add ?713 ?713) [713] by Demod 249 with 416 at 1,2,1,2,1,2
1005 Id : 418, {_}: inverse (add ?713 (inverse (add ?713 (inverse ?713)))) =>= inverse ?713 [713] by Demod 417 with 416 at 1,3
1006 Id : 446, {_}: inverse (inverse ?1068) =<= add ?1068 (inverse (add ?1068 (inverse ?1068))) [1068] by Super 439 with 418 at 1,2
1007 Id : 458, {_}: ?1068 =<= add ?1068 (inverse (add ?1068 (inverse ?1068))) [1068] by Demod 446 with 425 at 2
1008 Id : 507, {_}: inverse (add (inverse (add (inverse ?1172) (inverse (inverse ?1172)))) (inverse (add ?1172 (inverse (inverse ?1172))))) =>= inverse (add (inverse ?1172) (inverse (add (inverse ?1172) (inverse (inverse ?1172))))) [1172] by Super 173 with 458 at 1,2,1,2,1,2
1009 Id : 520, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse (add ?1172 (inverse (inverse ?1172))))) =>= inverse (add (inverse ?1172) (inverse (add (inverse ?1172) (inverse (inverse ?1172))))) [1172] by Demod 507 with 425 at 2,1,1,1,2
1010 Id : 521, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse (add ?1172 ?1172))) =?= inverse (add (inverse ?1172) (inverse (add (inverse ?1172) (inverse (inverse ?1172))))) [1172] by Demod 520 with 425 at 2,1,2,1,2
1011 Id : 522, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse (add ?1172 ?1172))) =>= inverse (inverse ?1172) [1172] by Demod 521 with 458 at 1,3
1012 Id : 523, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse ?1172)) =>= inverse (inverse ?1172) [1172] by Demod 522 with 416 at 1,2,1,2
1013 Id : 524, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse ?1172)) =>= ?1172 [1172] by Demod 523 with 425 at 3
1014 Id : 562, {_}: inverse ?1268 =<= add (inverse (add (inverse ?1268) ?1268)) (inverse ?1268) [1268] by Super 425 with 524 at 1,2
1015 Id : 631, {_}: inverse (add (inverse (add (inverse (add (inverse (inverse ?1362)) ?1363)) (inverse (inverse ?1362)))) (inverse ?1362)) =>= inverse (inverse ?1362) [1363, 1362] by Super 426 with 562 at 1,1,1,1,1,1,1,2
1016 Id : 651, {_}: inverse (add (inverse (add (inverse (add ?1362 ?1363)) (inverse (inverse ?1362)))) (inverse ?1362)) =>= inverse (inverse ?1362) [1363, 1362] by Demod 631 with 425 at 1,1,1,1,1,1,2
1017 Id : 652, {_}: inverse (add (inverse (add (inverse (add ?1362 ?1363)) ?1362)) (inverse ?1362)) =>= inverse (inverse ?1362) [1363, 1362] by Demod 651 with 425 at 2,1,1,1,2
1018 Id : 1548, {_}: inverse (add (inverse (add (inverse (add ?2603 ?2604)) ?2603)) (inverse ?2603)) =>= ?2603 [2604, 2603] by Demod 652 with 425 at 3
1019 Id : 1577, {_}: inverse (add ?2689 (inverse (inverse (add ?2690 ?2689)))) =>= inverse (add ?2690 ?2689) [2690, 2689] by Super 1548 with 55 at 1,1,2
1020 Id : 1652, {_}: inverse (add ?2689 (add ?2690 ?2689)) =>= inverse (add ?2690 ?2689) [2690, 2689] by Demod 1577 with 425 at 2,1,2
1021 Id : 1666, {_}: inverse (inverse (add ?2734 ?2735)) =<= add ?2735 (add ?2734 ?2735) [2735, 2734] by Super 425 with 1652 at 1,2
1022 Id : 1717, {_}: add ?2734 ?2735 =<= add ?2735 (add ?2734 ?2735) [2735, 2734] by Demod 1666 with 425 at 2
1023 Id : 1692, {_}: inverse (add ?2833 (add ?2834 ?2833)) =>= inverse (add ?2834 ?2833) [2834, 2833] by Demod 1577 with 425 at 2,1,2
1024 Id : 1009, {_}: inverse ?1880 =<= add (inverse (add (inverse ?1881) ?1880)) (inverse (add ?1881 ?1880)) [1881, 1880] by Super 425 with 432 at 1,2
1025 Id : 1701, {_}: inverse (add (inverse (add ?2854 ?2855)) (inverse ?2855)) =<= inverse (add (inverse (add (inverse ?2854) ?2855)) (inverse (add ?2854 ?2855))) [2855, 2854] by Super 1692 with 1009 at 2,1,2
1026 Id : 1750, {_}: inverse (add (inverse (add ?2854 ?2855)) (inverse ?2855)) =>= inverse (inverse ?2855) [2855, 2854] by Demod 1701 with 1009 at 1,3
1027 Id : 1751, {_}: inverse (add (inverse (add ?2854 ?2855)) (inverse ?2855)) =>= ?2855 [2855, 2854] by Demod 1750 with 425 at 3
1028 Id : 1834, {_}: inverse ?3002 =<= add (inverse (add ?3003 ?3002)) (inverse ?3002) [3003, 3002] by Super 425 with 1751 at 1,2
1029 Id : 1988, {_}: inverse (add (inverse (inverse ?3213)) (inverse (add ?3214 (inverse ?3213)))) =>= inverse ?3213 [3214, 3213] by Super 55 with 1834 at 1,1,1,2
1030 Id : 2037, {_}: inverse (add ?3213 (inverse (add ?3214 (inverse ?3213)))) =>= inverse ?3213 [3214, 3213] by Demod 1988 with 425 at 1,1,2
1031 Id : 2117, {_}: inverse (inverse ?3342) =<= add ?3342 (inverse (add ?3343 (inverse ?3342))) [3343, 3342] by Super 425 with 2037 at 1,2
1032 Id : 2219, {_}: ?3342 =<= add ?3342 (inverse (add ?3343 (inverse ?3342))) [3343, 3342] by Demod 2117 with 425 at 2
1033 Id : 2573, {_}: add ?3976 (inverse (add ?3977 (inverse ?3976))) =?= add (inverse (add ?3977 (inverse ?3976))) ?3976 [3977, 3976] by Super 1717 with 2219 at 2,3
1034 Id : 2685, {_}: ?4113 =<= add (inverse (add ?4114 (inverse ?4113))) ?4113 [4114, 4113] by Demod 2573 with 2219 at 2
1035 Id : 5194, {_}: add ?7112 (inverse (add (inverse ?7113) (inverse (add ?7113 ?7114)))) =<= add ?7113 (add ?7112 (inverse (add (inverse ?7113) (inverse (add ?7113 ?7114))))) [7114, 7113, 7112] by Super 2685 with 2 at 1,3
1036 Id : 2139, {_}: add (inverse ?3423) (inverse (add ?3424 (inverse (inverse ?3423)))) =<= add (inverse (add ?3424 (inverse (inverse ?3423)))) (inverse (add ?3423 (inverse (inverse ?3423)))) [3424, 3423] by Super 457 with 2037 at 2,1,2,3
1037 Id : 2185, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =<= add (inverse (add ?3424 (inverse (inverse ?3423)))) (inverse (add ?3423 (inverse (inverse ?3423)))) [3424, 3423] by Demod 2139 with 425 at 2,1,2,2
1038 Id : 2186, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =<= add (inverse (add ?3424 ?3423)) (inverse (add ?3423 (inverse (inverse ?3423)))) [3424, 3423] by Demod 2185 with 425 at 2,1,1,3
1039 Id : 2187, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =<= add (inverse (add ?3424 ?3423)) (inverse (add ?3423 ?3423)) [3424, 3423] by Demod 2186 with 425 at 2,1,2,3
1040 Id : 2188, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =?= add (inverse (add ?3424 ?3423)) (inverse ?3423) [3424, 3423] by Demod 2187 with 416 at 1,2,3
1041 Id : 2189, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =>= inverse ?3423 [3424, 3423] by Demod 2188 with 1834 at 3
1042 Id : 5230, {_}: add (inverse (inverse (add ?7260 ?7261))) (inverse (add (inverse ?7260) (inverse (add ?7260 ?7261)))) =>= add ?7260 (inverse (inverse (add ?7260 ?7261))) [7261, 7260] by Super 5194 with 2189 at 2,3
1043 Id : 5493, {_}: inverse (inverse (add ?7260 ?7261)) =<= add ?7260 (inverse (inverse (add ?7260 ?7261))) [7261, 7260] by Demod 5230 with 2189 at 2
1044 Id : 5494, {_}: inverse (inverse (add ?7260 ?7261)) =<= add ?7260 (add ?7260 ?7261) [7261, 7260] by Demod 5493 with 425 at 2,3
1045 Id : 5495, {_}: add ?7260 ?7261 =<= add ?7260 (add ?7260 ?7261) [7261, 7260] by Demod 5494 with 425 at 2
1046 Id : 6005, {_}: inverse (add (inverse ?125) (inverse (add ?125 ?126))) =>= ?125 [126, 125] by Demod 6004 with 5495 at 1,2
1047 Id : 6007, {_}: add ?4434 ?4435 =<->= add ?4435 ?4434 [4435, 4434] by Demod 3023 with 6005 at 2,3
1048 Id : 6250, {_}: add b a === add b a [] by Demod 1 with 6007 at 3
1049 Id : 1, {_}: add b a =<= add a b [] by huntinton_1
1050 % SZS output end CNFRefutation for BOO072-1.p
1051 2033: solved BOO072-1.p in 1.13607 using nrkbo
1052 !! infer_left 55 0.0001 0.0000 0.0000
1053 !! infer_right 56 3.9854 0.3427 0.0712
1054 !! simplify_goal 56 0.0022 0.0001 0.0000
1055 !! keep_simplified 115 0.7108 0.3057 0.0062
1056 !! simplification_step 143 0.7102 0.3029 0.0050
1057 !! simplify 3791 4.1942 0.3019 0.0011
1058 !! orphan_murder 232 0.0038 0.0004 0.0000
1059 !! is_subsumed 2721 0.3518 0.3001 0.0001
1060 !! build_new_clause 2427 0.1094 0.0014 0.0000
1061 !! demodulate 3737 3.8304 0.3018 0.0010
1062 !! demod 54262 2.7585 0.3004 0.0001
1063 !! demod.apply_subst 8502 0.0166 0.0003 0.0000
1064 !! demod.compare_terms 505 0.0073 0.0008 0.0000
1065 !! demod.retrieve_generalizations 54262 1.8455 0.3004 0.0000
1066 !! demod.unify 42918 0.4474 0.3001 0.0000
1067 !! build_clause 6193 0.4355 0.3002 0.0001
1068 !! compare_terms(nrkbo) 6702 0.0681 0.0009 0.0000
1069 !! compare_terms(nrkbo) 2 0.0001 0.0000 0.0000
1073 (add (inverse (add (inverse (add ?2 ?3)) ?4))
1075 (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5)))))))
1078 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
1080 2038: Id : 1, {_}: add (add a b) c =>= add a (add b c) [] by huntinton_2
1081 % SZS status Timeout for BOO073-1.p
1085 (add (inverse (add (inverse (add ?2 ?3)) ?4))
1087 (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5)))))))
1090 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
1093 add (inverse (add (inverse a) b))
1094 (inverse (add (inverse a) (inverse b)))
1100 Found proof, 9.045057s
1101 % SZS status Unsatisfiable for BOO074-1.p
1102 % SZS output start CNFRefutation for BOO074-1.p
1103 Id : 3, {_}: inverse (add (inverse (add (inverse (add ?7 ?8)) ?9)) (inverse (add ?7 (inverse (add (inverse ?9) (inverse (add ?9 ?10))))))) =>= ?9 [10, 9, 8, 7] by dn1 ?7 ?8 ?9 ?10
1104 Id : 2, {_}: inverse (add (inverse (add (inverse (add ?2 ?3)) ?4)) (inverse (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5))))))) =>= ?4 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
1105 Id : 15, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?74)) ?75)) ?74)) ?76)) (inverse ?74))) ?74) =>= inverse ?74 [76, 75, 74] by Super 3 with 2 at 2,1,2
1106 Id : 20, {_}: inverse (add (inverse (add ?104 (inverse ?104))) ?104) =>= inverse ?104 [104] by Super 15 with 2 at 1,1,1,1,2
1107 Id : 34, {_}: inverse (add (inverse ?125) (inverse (add ?125 (inverse (add (inverse ?125) (inverse (add ?125 ?126))))))) =>= ?125 [126, 125] by Super 2 with 20 at 1,1,2
1108 Id : 129, {_}: inverse (add (inverse (add (inverse (add ?380 ?381)) ?382)) (inverse (add ?380 ?382))) =>= ?382 [382, 381, 380] by Super 2 with 34 at 2,1,2,1,2
1109 Id : 55, {_}: inverse (add (inverse (add (inverse (add ?177 ?178)) ?179)) (inverse (add ?177 ?179))) =>= ?179 [179, 178, 177] by Super 2 with 34 at 2,1,2,1,2
1110 Id : 146, {_}: inverse (add ?449 (inverse (add (inverse (add ?450 ?451)) (inverse (add ?450 ?449))))) =>= inverse (add ?450 ?449) [451, 450, 449] by Super 129 with 55 at 1,1,2
1111 Id : 139, {_}: inverse (add (inverse (add ?423 ?424)) (inverse (add (inverse ?423) ?424))) =>= ?424 [424, 423] by Super 129 with 34 at 1,1,1,1,2
1112 Id : 173, {_}: inverse (add ?519 (inverse (add ?520 (inverse (add (inverse ?520) ?519))))) =>= inverse (add (inverse ?520) ?519) [520, 519] by Super 55 with 139 at 1,1,2
1113 Id : 339, {_}: inverse (add (inverse ?868) (inverse (add ?868 (inverse (add (inverse ?868) (inverse ?868)))))) =>= ?868 [868] by Super 34 with 173 at 2,1,2,1,2
1114 Id : 388, {_}: inverse (add (inverse ?868) (inverse ?868)) =>= ?868 [868] by Demod 339 with 173 at 2
1115 Id : 174, {_}: inverse (add (inverse (add ?522 ?523)) (inverse (add (inverse ?522) ?523))) =>= ?523 [523, 522] by Super 129 with 34 at 1,1,1,1,2
1116 Id : 59, {_}: inverse (add (inverse ?193) (inverse (add ?193 (inverse (add (inverse ?193) (inverse (add ?193 ?194))))))) =>= ?193 [194, 193] by Super 2 with 20 at 1,1,2
1117 Id : 68, {_}: inverse (add (inverse ?226) (inverse (add ?226 ?226))) =>= ?226 [226] by Super 59 with 34 at 2,1,2,1,2
1118 Id : 187, {_}: inverse (add (inverse (add ?573 (inverse (add ?573 ?573)))) ?573) =>= inverse (add ?573 ?573) [573] by Super 174 with 68 at 2,1,2
1119 Id : 207, {_}: inverse (add (inverse (add ?609 ?609)) (inverse (add ?609 ?609))) =>= ?609 [609] by Super 55 with 187 at 1,1,2
1120 Id : 416, {_}: add ?609 ?609 =>= ?609 [609] by Demod 207 with 388 at 2
1121 Id : 425, {_}: inverse (inverse ?868) =>= ?868 [868] by Demod 388 with 416 at 1,2
1122 Id : 6, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?26)) ?27)) ?26)) ?28)) (inverse ?26))) ?26) =>= inverse ?26 [28, 27, 26] by Super 3 with 2 at 2,1,2
1123 Id : 426, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add ?26 ?27)) ?26)) ?28)) (inverse ?26))) ?26) =>= inverse ?26 [28, 27, 26] by Demod 6 with 425 at 1,1,1,1,1,1,1,1,1,1,2
1124 Id : 439, {_}: inverse (inverse ?1046) =>= ?1046 [1046] by Demod 388 with 416 at 1,2
1125 Id : 249, {_}: inverse (add ?713 (inverse (add ?713 (inverse (add ?713 ?713))))) =>= inverse (add ?713 ?713) [713] by Super 55 with 207 at 1,1,2
1126 Id : 417, {_}: inverse (add ?713 (inverse (add ?713 (inverse ?713)))) =>= inverse (add ?713 ?713) [713] by Demod 249 with 416 at 1,2,1,2,1,2
1127 Id : 418, {_}: inverse (add ?713 (inverse (add ?713 (inverse ?713)))) =>= inverse ?713 [713] by Demod 417 with 416 at 1,3
1128 Id : 446, {_}: inverse (inverse ?1068) =<= add ?1068 (inverse (add ?1068 (inverse ?1068))) [1068] by Super 439 with 418 at 1,2
1129 Id : 458, {_}: ?1068 =<= add ?1068 (inverse (add ?1068 (inverse ?1068))) [1068] by Demod 446 with 425 at 2
1130 Id : 507, {_}: inverse (add (inverse (add (inverse ?1172) (inverse (inverse ?1172)))) (inverse (add ?1172 (inverse (inverse ?1172))))) =>= inverse (add (inverse ?1172) (inverse (add (inverse ?1172) (inverse (inverse ?1172))))) [1172] by Super 173 with 458 at 1,2,1,2,1,2
1131 Id : 520, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse (add ?1172 (inverse (inverse ?1172))))) =>= inverse (add (inverse ?1172) (inverse (add (inverse ?1172) (inverse (inverse ?1172))))) [1172] by Demod 507 with 425 at 2,1,1,1,2
1132 Id : 521, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse (add ?1172 ?1172))) =?= inverse (add (inverse ?1172) (inverse (add (inverse ?1172) (inverse (inverse ?1172))))) [1172] by Demod 520 with 425 at 2,1,2,1,2
1133 Id : 522, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse (add ?1172 ?1172))) =>= inverse (inverse ?1172) [1172] by Demod 521 with 458 at 1,3
1134 Id : 523, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse ?1172)) =>= inverse (inverse ?1172) [1172] by Demod 522 with 416 at 1,2,1,2
1135 Id : 524, {_}: inverse (add (inverse (add (inverse ?1172) ?1172)) (inverse ?1172)) =>= ?1172 [1172] by Demod 523 with 425 at 3
1136 Id : 562, {_}: inverse ?1268 =<= add (inverse (add (inverse ?1268) ?1268)) (inverse ?1268) [1268] by Super 425 with 524 at 1,2
1137 Id : 631, {_}: inverse (add (inverse (add (inverse (add (inverse (inverse ?1362)) ?1363)) (inverse (inverse ?1362)))) (inverse ?1362)) =>= inverse (inverse ?1362) [1363, 1362] by Super 426 with 562 at 1,1,1,1,1,1,1,2
1138 Id : 651, {_}: inverse (add (inverse (add (inverse (add ?1362 ?1363)) (inverse (inverse ?1362)))) (inverse ?1362)) =>= inverse (inverse ?1362) [1363, 1362] by Demod 631 with 425 at 1,1,1,1,1,1,2
1139 Id : 652, {_}: inverse (add (inverse (add (inverse (add ?1362 ?1363)) ?1362)) (inverse ?1362)) =>= inverse (inverse ?1362) [1363, 1362] by Demod 651 with 425 at 2,1,1,1,2
1140 Id : 1548, {_}: inverse (add (inverse (add (inverse (add ?2603 ?2604)) ?2603)) (inverse ?2603)) =>= ?2603 [2604, 2603] by Demod 652 with 425 at 3
1141 Id : 1577, {_}: inverse (add ?2689 (inverse (inverse (add ?2690 ?2689)))) =>= inverse (add ?2690 ?2689) [2690, 2689] by Super 1548 with 55 at 1,1,2
1142 Id : 1692, {_}: inverse (add ?2833 (add ?2834 ?2833)) =>= inverse (add ?2834 ?2833) [2834, 2833] by Demod 1577 with 425 at 2,1,2
1143 Id : 432, {_}: inverse (add (inverse (add (inverse ?1023) ?1024)) (inverse (add ?1023 ?1024))) =>= ?1024 [1024, 1023] by Super 139 with 425 at 1,1,2,1,2
1144 Id : 1009, {_}: inverse ?1880 =<= add (inverse (add (inverse ?1881) ?1880)) (inverse (add ?1881 ?1880)) [1881, 1880] by Super 425 with 432 at 1,2
1145 Id : 1701, {_}: inverse (add (inverse (add ?2854 ?2855)) (inverse ?2855)) =<= inverse (add (inverse (add (inverse ?2854) ?2855)) (inverse (add ?2854 ?2855))) [2855, 2854] by Super 1692 with 1009 at 2,1,2
1146 Id : 1750, {_}: inverse (add (inverse (add ?2854 ?2855)) (inverse ?2855)) =>= inverse (inverse ?2855) [2855, 2854] by Demod 1701 with 1009 at 1,3
1147 Id : 1751, {_}: inverse (add (inverse (add ?2854 ?2855)) (inverse ?2855)) =>= ?2855 [2855, 2854] by Demod 1750 with 425 at 3
1148 Id : 1834, {_}: inverse ?3002 =<= add (inverse (add ?3003 ?3002)) (inverse ?3002) [3003, 3002] by Super 425 with 1751 at 1,2
1149 Id : 1988, {_}: inverse (add (inverse (inverse ?3213)) (inverse (add ?3214 (inverse ?3213)))) =>= inverse ?3213 [3214, 3213] by Super 55 with 1834 at 1,1,1,2
1150 Id : 2037, {_}: inverse (add ?3213 (inverse (add ?3214 (inverse ?3213)))) =>= inverse ?3213 [3214, 3213] by Demod 1988 with 425 at 1,1,2
1151 Id : 2117, {_}: inverse (inverse ?3342) =<= add ?3342 (inverse (add ?3343 (inverse ?3342))) [3343, 3342] by Super 425 with 2037 at 1,2
1152 Id : 2219, {_}: ?3342 =<= add ?3342 (inverse (add ?3343 (inverse ?3342))) [3343, 3342] by Demod 2117 with 425 at 2
1153 Id : 445, {_}: inverse (inverse (add (inverse ?1065) ?1066)) =<= add ?1066 (inverse (add ?1065 (inverse (add (inverse ?1065) ?1066)))) [1066, 1065] by Super 439 with 173 at 1,2
1154 Id : 457, {_}: add (inverse ?1065) ?1066 =<= add ?1066 (inverse (add ?1065 (inverse (add (inverse ?1065) ?1066)))) [1066, 1065] by Demod 445 with 425 at 2
1155 Id : 2139, {_}: add (inverse ?3423) (inverse (add ?3424 (inverse (inverse ?3423)))) =<= add (inverse (add ?3424 (inverse (inverse ?3423)))) (inverse (add ?3423 (inverse (inverse ?3423)))) [3424, 3423] by Super 457 with 2037 at 2,1,2,3
1156 Id : 2185, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =<= add (inverse (add ?3424 (inverse (inverse ?3423)))) (inverse (add ?3423 (inverse (inverse ?3423)))) [3424, 3423] by Demod 2139 with 425 at 2,1,2,2
1157 Id : 2186, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =<= add (inverse (add ?3424 ?3423)) (inverse (add ?3423 (inverse (inverse ?3423)))) [3424, 3423] by Demod 2185 with 425 at 2,1,1,3
1158 Id : 2187, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =<= add (inverse (add ?3424 ?3423)) (inverse (add ?3423 ?3423)) [3424, 3423] by Demod 2186 with 425 at 2,1,2,3
1159 Id : 2188, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =?= add (inverse (add ?3424 ?3423)) (inverse ?3423) [3424, 3423] by Demod 2187 with 416 at 1,2,3
1160 Id : 2189, {_}: add (inverse ?3423) (inverse (add ?3424 ?3423)) =>= inverse ?3423 [3424, 3423] by Demod 2188 with 1834 at 3
1161 Id : 5778, {_}: inverse (add ?7760 (inverse (add (inverse (add ?7761 ?7762)) (inverse (add ?7761 ?7760))))) =>= inverse (add ?7761 ?7760) [7762, 7761, 7760] by Super 129 with 55 at 1,1,2
1162 Id : 5837, {_}: inverse (add (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996)))) (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) =>= inverse (add ?7995 (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) [7996, 7995] by Super 5778 with 457 at 1,2,1,2
1163 Id : 5990, {_}: inverse (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996)))) =<= inverse (add ?7995 (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) [7996, 7995] by Demod 5837 with 416 at 1,2
1164 Id : 5991, {_}: add (inverse ?7995) (inverse (add ?7995 ?7996)) =<= inverse (add ?7995 (inverse (add (inverse ?7995) (inverse (add ?7995 ?7996))))) [7996, 7995] by Demod 5990 with 425 at 2
1165 Id : 6004, {_}: inverse (add (inverse ?125) (add (inverse ?125) (inverse (add ?125 ?126)))) =>= ?125 [126, 125] by Demod 34 with 5991 at 2,1,2
1166 Id : 1652, {_}: inverse (add ?2689 (add ?2690 ?2689)) =>= inverse (add ?2690 ?2689) [2690, 2689] by Demod 1577 with 425 at 2,1,2
1167 Id : 1666, {_}: inverse (inverse (add ?2734 ?2735)) =<= add ?2735 (add ?2734 ?2735) [2735, 2734] by Super 425 with 1652 at 1,2
1168 Id : 1717, {_}: add ?2734 ?2735 =<= add ?2735 (add ?2734 ?2735) [2735, 2734] by Demod 1666 with 425 at 2
1169 Id : 2573, {_}: add ?3976 (inverse (add ?3977 (inverse ?3976))) =?= add (inverse (add ?3977 (inverse ?3976))) ?3976 [3977, 3976] by Super 1717 with 2219 at 2,3
1170 Id : 2685, {_}: ?4113 =<= add (inverse (add ?4114 (inverse ?4113))) ?4113 [4114, 4113] by Demod 2573 with 2219 at 2
1171 Id : 5194, {_}: add ?7112 (inverse (add (inverse ?7113) (inverse (add ?7113 ?7114)))) =<= add ?7113 (add ?7112 (inverse (add (inverse ?7113) (inverse (add ?7113 ?7114))))) [7114, 7113, 7112] by Super 2685 with 2 at 1,3
1172 Id : 5230, {_}: add (inverse (inverse (add ?7260 ?7261))) (inverse (add (inverse ?7260) (inverse (add ?7260 ?7261)))) =>= add ?7260 (inverse (inverse (add ?7260 ?7261))) [7261, 7260] by Super 5194 with 2189 at 2,3
1173 Id : 5493, {_}: inverse (inverse (add ?7260 ?7261)) =<= add ?7260 (inverse (inverse (add ?7260 ?7261))) [7261, 7260] by Demod 5230 with 2189 at 2
1174 Id : 5494, {_}: inverse (inverse (add ?7260 ?7261)) =<= add ?7260 (add ?7260 ?7261) [7261, 7260] by Demod 5493 with 425 at 2,3
1175 Id : 5495, {_}: add ?7260 ?7261 =<= add ?7260 (add ?7260 ?7261) [7261, 7260] by Demod 5494 with 425 at 2
1176 Id : 6005, {_}: inverse (add (inverse ?125) (inverse (add ?125 ?126))) =>= ?125 [126, 125] by Demod 6004 with 5495 at 1,2
1177 Id : 6011, {_}: add (inverse ?7995) (inverse (add ?7995 ?7996)) =>= inverse (add ?7995 ?7995) [7996, 7995] by Demod 5991 with 6005 at 2,1,3
1178 Id : 6012, {_}: add (inverse ?7995) (inverse (add ?7995 ?7996)) =>= inverse ?7995 [7996, 7995] by Demod 6011 with 416 at 1,3
1179 Id : 6033, {_}: add (inverse (inverse (add ?8055 ?8056))) (inverse (inverse ?8055)) =>= inverse (inverse (add ?8055 ?8056)) [8056, 8055] by Super 2189 with 6012 at 1,2,2
1180 Id : 6156, {_}: add (add ?8055 ?8056) (inverse (inverse ?8055)) =>= inverse (inverse (add ?8055 ?8056)) [8056, 8055] by Demod 6033 with 425 at 1,2
1181 Id : 6157, {_}: add (add ?8055 ?8056) ?8055 =>= inverse (inverse (add ?8055 ?8056)) [8056, 8055] by Demod 6156 with 425 at 2,2
1182 Id : 6158, {_}: add (add ?8055 ?8056) ?8055 =>= add ?8055 ?8056 [8056, 8055] by Demod 6157 with 425 at 3
1183 Id : 6258, {_}: ?8254 =<= add ?8254 (inverse (add (inverse ?8254) ?8255)) [8255, 8254] by Super 2219 with 6158 at 1,2,3
1184 Id : 6643, {_}: inverse (add ?8626 (inverse (add (inverse ?8627) (inverse (add ?8627 ?8626))))) =>= inverse (add ?8627 ?8626) [8627, 8626] by Super 146 with 6258 at 1,1,1,2,1,2
1185 Id : 6768, {_}: inverse (add ?8626 (inverse (inverse ?8627))) =>= inverse (add ?8627 ?8626) [8627, 8626] by Demod 6643 with 6012 at 1,2,1,2
1186 Id : 6769, {_}: inverse (add ?8626 ?8627) =<->= inverse (add ?8627 ?8626) [8627, 8626] by Demod 6768 with 425 at 2,1,2
1187 Id : 444, {_}: inverse ?1062 =<= add (inverse (add ?1063 ?1062)) (inverse (add (inverse ?1063) ?1062)) [1063, 1062] by Super 439 with 139 at 1,2
1188 Id : 7030, {_}: inverse ?9108 =<= add (inverse (add ?9109 ?9108)) (inverse (add ?9108 (inverse ?9109))) [9109, 9108] by Super 444 with 6769 at 2,3
1189 Id : 9860, {_}: a === a [] by Demod 9859 with 425 at 2
1190 Id : 9859, {_}: inverse (inverse a) =>= a [] by Demod 9858 with 7030 at 2
1191 Id : 9858, {_}: add (inverse (add b (inverse a))) (inverse (add (inverse a) (inverse b))) =>= a [] by Demod 1 with 6769 at 1,2
1192 Id : 1, {_}: add (inverse (add (inverse a) b)) (inverse (add (inverse a) (inverse b))) =>= a [] by huntinton_3
1193 % SZS output end CNFRefutation for BOO074-1.p
1194 2084: solved BOO074-1.p in 1.836114 using nrkbo
1195 !! infer_left 83 0.0001 0.0000 0.0000
1196 !! infer_right 70 8.2183 0.4839 0.1174
1197 !! simplify_goal 83 0.0155 0.0005 0.0002
1198 !! keep_simplified 172 0.7836 0.4049 0.0046
1199 !! simplification_step 201 0.7829 0.4028 0.0039
1200 !! simplify 5467 7.9230 0.4065 0.0014
1201 !! orphan_murder 291 0.0045 0.0002 0.0000
1202 !! is_subsumed 3666 0.4776 0.4002 0.0001
1203 !! build_new_clause 3700 0.1493 0.0014 0.0000
1204 !! demodulate 5371 7.4416 0.4064 0.0014
1205 !! demod 70912 6.4046 0.4042 0.0001
1206 !! demod.apply_subst 34252 0.0692 0.0008 0.0000
1207 !! demod.compare_terms 11316 0.5597 0.4002 0.0000
1208 !! demod.retrieve_generalizations 70912 2.6990 0.4002 0.0000
1209 !! demod.unify 76807 1.4507 0.4001 0.0000
1210 !! build_clause 9863 0.1951 0.0013 0.0000
1211 !! compare_terms(nrkbo) 21294 0.6274 0.4002 0.0000
1212 !! compare_terms(nrkbo) 2 0.0001 0.0000 0.0000
1215 nand (nand ?2 (nand (nand ?3 ?2) ?2)) (nand ?3 (nand ?4 ?2)) =>= ?3
1216 [4, 3, 2] by sh_1 ?2 ?3 ?4
1219 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1220 [] by prove_meredith_2_basis_2
1221 % SZS status Timeout for BOO076-1.p
1224 nand (nand ?2 (nand (nand ?3 ?2) ?2)) (nand ?3 (nand ?2 ?4)) =>= ?3
1225 [4, 3, 2] by c1 ?2 ?3 ?4
1227 2116: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1228 % SZS status Timeout for BOO077-1.p
1231 nand (nand ?2 (nand (nand ?3 ?2) ?2)) (nand ?3 (nand ?2 ?4)) =>= ?3
1232 [4, 3, 2] by c1 ?2 ?3 ?4
1235 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1236 [] by prove_meredith_2_basis_2
1237 % SZS status Timeout for BOO078-1.p
1240 nand (nand ?2 (nand ?2 (nand ?3 ?2))) (nand ?3 (nand ?4 ?2)) =>= ?3
1241 [4, 3, 2] by c2 ?2 ?3 ?4
1243 2207: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1244 % SZS status Timeout for BOO079-1.p
1247 nand (nand ?2 (nand ?2 (nand ?3 ?2))) (nand ?3 (nand ?4 ?2)) =>= ?3
1248 [4, 3, 2] by c2 ?2 ?3 ?4
1251 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1252 [] by prove_meredith_2_basis_2
1253 % SZS status Timeout for BOO080-1.p
1256 nand (nand ?2 (nand ?2 (nand ?2 ?3))) (nand ?3 (nand ?4 ?2)) =>= ?3
1257 [4, 3, 2] by c3 ?2 ?3 ?4
1259 2288: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1260 % SZS status Timeout for BOO081-1.p
1263 nand (nand ?2 (nand ?2 (nand ?2 ?3))) (nand ?3 (nand ?4 ?2)) =>= ?3
1264 [4, 3, 2] by c3 ?2 ?3 ?4
1267 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1268 [] by prove_meredith_2_basis_2
1269 % SZS status Timeout for BOO082-1.p
1272 nand (nand ?2 (nand ?2 (nand ?2 ?3))) (nand ?3 (nand ?2 ?4)) =>= ?3
1273 [4, 3, 2] by c4 ?2 ?3 ?4
1275 2374: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1276 % SZS status Timeout for BOO083-1.p
1279 nand (nand ?2 (nand ?2 (nand ?2 ?3))) (nand ?3 (nand ?2 ?4)) =>= ?3
1280 [4, 3, 2] by c4 ?2 ?3 ?4
1283 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1284 [] by prove_meredith_2_basis_2
1285 % SZS status Timeout for BOO084-1.p
1288 nand (nand ?2 (nand ?2 (nand ?3 ?4))) (nand ?3 (nand ?4 ?2)) =>= ?3
1289 [4, 3, 2] by c5 ?2 ?3 ?4
1291 2482: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1292 % SZS status Timeout for BOO085-1.p
1295 nand (nand ?2 (nand ?2 (nand ?3 ?4))) (nand ?3 (nand ?4 ?2)) =>= ?3
1296 [4, 3, 2] by c5 ?2 ?3 ?4
1299 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1300 [] by prove_meredith_2_basis_2
1301 % SZS status Timeout for BOO086-1.p
1304 nand (nand ?2 (nand ?2 (nand ?3 ?4))) (nand ?4 (nand ?2 ?3)) =>= ?4
1305 [4, 3, 2] by c6 ?2 ?3 ?4
1307 2582: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1308 % SZS status Timeout for BOO087-1.p
1311 nand (nand ?2 (nand ?2 (nand ?3 ?4))) (nand ?4 (nand ?2 ?3)) =>= ?4
1312 [4, 3, 2] by c6 ?2 ?3 ?4
1315 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1316 [] by prove_meredith_2_basis_2
1317 % SZS status Timeout for BOO088-1.p
1320 nand (nand ?2 (nand ?2 (nand ?3 ?3))) (nand ?3 (nand ?4 ?2)) =>= ?3
1321 [4, 3, 2] by c7 ?2 ?3 ?4
1323 2740: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1324 % SZS status Timeout for BOO089-1.p
1327 nand (nand ?2 (nand ?2 (nand ?3 ?3))) (nand ?3 (nand ?4 ?2)) =>= ?3
1328 [4, 3, 2] by c7 ?2 ?3 ?4
1331 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1332 [] by prove_meredith_2_basis_2
1333 % SZS status Timeout for BOO090-1.p
1336 nand (nand (nand ?2 (nand ?2 ?3)) ?2) (nand ?3 (nand ?4 ?2)) =>= ?3
1337 [4, 3, 2] by c8 ?2 ?3 ?4
1339 2817: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1340 % SZS status Timeout for BOO091-1.p
1343 nand (nand (nand ?2 (nand ?2 ?3)) ?2) (nand ?3 (nand ?4 ?2)) =>= ?3
1344 [4, 3, 2] by c8 ?2 ?3 ?4
1347 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1348 [] by prove_meredith_2_basis_2
1349 % SZS status Timeout for BOO092-1.p
1352 nand (nand (nand ?2 (nand ?3 ?3)) ?2) (nand ?3 (nand ?4 ?2)) =>= ?3
1353 [4, 3, 2] by c9 ?2 ?3 ?4
1355 2954: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1356 % SZS status Timeout for BOO093-1.p
1359 nand (nand (nand ?2 (nand ?3 ?3)) ?2) (nand ?3 (nand ?4 ?2)) =>= ?3
1360 [4, 3, 2] by c9 ?2 ?3 ?4
1363 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1364 [] by prove_meredith_2_basis_2
1365 % SZS status Timeout for BOO094-1.p
1368 nand (nand (nand ?2 (nand ?3 ?4)) ?2) (nand ?3 (nand ?2 ?4)) =>= ?3
1369 [4, 3, 2] by c10 ?2 ?3 ?4
1371 3064: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1372 % SZS status Timeout for BOO095-1.p
1375 nand (nand (nand ?2 (nand ?3 ?4)) ?2) (nand ?3 (nand ?2 ?4)) =>= ?3
1376 [4, 3, 2] by c10 ?2 ?3 ?4
1379 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1380 [] by prove_meredith_2_basis_2
1381 % SZS status Timeout for BOO096-1.p
1384 nand (nand (nand ?2 (nand ?3 ?4)) ?2) (nand ?4 (nand ?2 ?3)) =>= ?4
1385 [4, 3, 2] by c11 ?2 ?3 ?4
1387 3163: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1388 % SZS status Timeout for BOO097-1.p
1391 nand (nand (nand ?2 (nand ?3 ?4)) ?2) (nand ?4 (nand ?2 ?3)) =>= ?4
1392 [4, 3, 2] by c11 ?2 ?3 ?4
1395 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1396 [] by prove_meredith_2_basis_2
1397 % SZS status Timeout for BOO098-1.p
1400 nand (nand (nand ?2 (nand ?2 ?3)) ?2) (nand ?3 (nand ?2 ?4)) =>= ?3
1401 [4, 3, 2] by c12 ?2 ?3 ?4
1403 3244: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1404 % SZS status Timeout for BOO099-1.p
1407 nand (nand (nand ?2 (nand ?2 ?3)) ?2) (nand ?3 (nand ?2 ?4)) =>= ?3
1408 [4, 3, 2] by c12 ?2 ?3 ?4
1411 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1412 [] by prove_meredith_2_basis_2
1413 % SZS status Timeout for BOO100-1.p
1416 nand (nand (nand (nand ?2 ?3) ?2) ?2) (nand ?3 (nand ?4 ?2)) =>= ?3
1417 [4, 3, 2] by c13 ?2 ?3 ?4
1419 3310: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1420 % SZS status Timeout for BOO101-1.p
1423 nand (nand (nand (nand ?2 ?3) ?2) ?2) (nand ?3 (nand ?4 ?2)) =>= ?3
1424 [4, 3, 2] by c13 ?2 ?3 ?4
1427 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1428 [] by prove_meredith_2_basis_2
1429 % SZS status Timeout for BOO102-1.p
1432 nand (nand (nand (nand ?2 ?3) ?2) ?2) (nand ?3 (nand ?2 ?4)) =>= ?3
1433 [4, 3, 2] by c14 ?2 ?3 ?4
1435 3377: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1436 % SZS status Timeout for BOO103-1.p
1439 nand (nand (nand (nand ?2 ?3) ?2) ?2) (nand ?3 (nand ?2 ?4)) =>= ?3
1440 [4, 3, 2] by c14 ?2 ?3 ?4
1443 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1444 [] by prove_meredith_2_basis_2
1445 % SZS status Timeout for BOO104-1.p
1448 nand (nand (nand (nand ?2 ?3) ?4) ?4) (nand ?3 (nand ?2 ?4)) =>= ?3
1449 [4, 3, 2] by c15 ?2 ?3 ?4
1451 3452: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1452 % SZS status Timeout for BOO105-1.p
1455 nand (nand (nand (nand ?2 ?3) ?4) ?4) (nand ?3 (nand ?2 ?4)) =>= ?3
1456 [4, 3, 2] by c15 ?2 ?3 ?4
1459 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1460 [] by prove_meredith_2_basis_2
1461 % SZS status Timeout for BOO106-1.p
1464 nand (nand (nand (nand ?2 ?3) ?4) ?4) (nand ?3 (nand ?4 ?2)) =>= ?3
1465 [4, 3, 2] by c16 ?2 ?3 ?4
1467 4642: Id : 1, {_}: nand (nand a a) (nand b a) =>= a [] by prove_meredith_2_basis_1
1468 % SZS status Timeout for BOO107-1.p
1471 nand (nand (nand (nand ?2 ?3) ?4) ?4) (nand ?3 (nand ?4 ?2)) =>= ?3
1472 [4, 3, 2] by c16 ?2 ?3 ?4
1475 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1476 [] by prove_meredith_2_basis_2
1477 % SZS status Timeout for BOO108-1.p
1480 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1481 [4, 3, 2] by b_definition ?2 ?3 ?4
1483 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1484 [7, 6] by w_definition ?6 ?7
1488 apply (apply b (apply w w)) (apply (apply b w) (apply (apply b b) b))
1489 [] by strong_fixed_point
1492 apply strong_fixed_point fixed_pt
1494 apply fixed_pt (apply strong_fixed_point fixed_pt)
1495 [] by prove_strong_fixed_point
1496 % SZS status Timeout for COL003-12.p
1499 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1500 [4, 3, 2] by b_definition ?2 ?3 ?4
1502 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1503 [7, 6] by w_definition ?6 ?7
1509 (apply (apply b (apply (apply b (apply w w)) (apply b w))) b)) b
1510 [] by strong_fixed_point
1513 apply strong_fixed_point fixed_pt
1515 apply fixed_pt (apply strong_fixed_point fixed_pt)
1516 [] by prove_strong_fixed_point
1517 % SZS status Timeout for COL003-17.p
1520 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1521 [4, 3, 2] by b_definition ?2 ?3 ?4
1523 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1524 [7, 6] by w_definition ?6 ?7
1528 apply (apply b (apply (apply b (apply w w)) (apply b w)))
1529 (apply (apply b b) b)
1530 [] by strong_fixed_point
1533 apply strong_fixed_point fixed_pt
1535 apply fixed_pt (apply strong_fixed_point fixed_pt)
1536 [] by prove_strong_fixed_point
1537 % SZS status Timeout for COL003-18.p
1540 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1541 [4, 3, 2] by b_definition ?2 ?3 ?4
1543 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1544 [7, 6] by w_definition ?6 ?7
1550 (apply (apply b (apply w w)) (apply (apply b (apply b w)) b))) b
1551 [] by strong_fixed_point
1554 apply strong_fixed_point fixed_pt
1556 apply fixed_pt (apply strong_fixed_point fixed_pt)
1557 [] by prove_strong_fixed_point
1558 % SZS status Timeout for COL003-19.p
1561 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1562 [5, 4, 3] by b_definition ?3 ?4 ?5
1564 apply (apply w ?7) ?8 =?= apply (apply ?7 ?8) ?8
1565 [8, 7] by w_definition ?7 ?8
1568 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1569 [1] by prove_strong_fixed_point ?1
1570 % SZS status Timeout for COL003-1.p
1573 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1574 [4, 3, 2] by b_definition ?2 ?3 ?4
1576 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1577 [7, 6] by w_definition ?6 ?7
1581 apply (apply b (apply w w))
1582 (apply (apply b (apply b w)) (apply (apply b b) b))
1583 [] by strong_fixed_point
1586 apply strong_fixed_point fixed_pt
1588 apply fixed_pt (apply strong_fixed_point fixed_pt)
1589 [] by prove_strong_fixed_point
1590 % SZS status Timeout for COL003-20.p
1593 apply (apply (apply s ?3) ?4) ?5
1595 apply (apply ?3 ?5) (apply ?4 ?5)
1596 [5, 4, 3] by s_definition ?3 ?4 ?5
1597 5011: Id : 3, {_}: apply (apply k ?7) ?8 =>= ?7 [8, 7] by k_definition ?7 ?8
1600 apply (apply ?1 (f ?1)) (g ?1)
1602 apply (g ?1) (apply (apply (f ?1) (f ?1)) (g ?1))
1603 [1] by prove_u_combinator ?1
1604 % SZS status Timeout for COL004-1.p
1607 apply (apply (apply s ?2) ?3) ?4
1609 apply (apply ?2 ?4) (apply ?3 ?4)
1610 [4, 3, 2] by s_definition ?2 ?3 ?4
1611 5061: Id : 3, {_}: apply (apply k ?6) ?7 =>= ?6 [7, 6] by k_definition ?6 ?7
1616 (apply (apply s (apply k (apply s (apply (apply s k) k))))
1617 (apply (apply s (apply (apply s k) k)) (apply (apply s k) k)))
1620 apply y (apply (apply x x) y)
1621 [] by prove_u_combinator
1624 Found proof, 0.198880s
1625 % SZS status Unsatisfiable for COL004-3.p
1626 % SZS output start CNFRefutation for COL004-3.p
1627 Id : 3, {_}: apply (apply k ?6) ?7 =>= ?6 [7, 6] by k_definition ?6 ?7
1628 Id : 2, {_}: apply (apply (apply s ?2) ?3) ?4 =?= apply (apply ?2 ?4) (apply ?3 ?4) [4, 3, 2] by s_definition ?2 ?3 ?4
1629 Id : 29, {_}: apply y (apply (apply x x) y) === apply y (apply (apply x x) y) [] by Demod 28 with 3 at 1,2
1630 Id : 28, {_}: apply (apply (apply k y) (apply k y)) (apply (apply x x) y) =>= apply y (apply (apply x x) y) [] by Demod 27 with 2 at 1,2
1631 Id : 27, {_}: apply (apply (apply (apply s k) k) y) (apply (apply x x) y) =>= apply y (apply (apply x x) y) [] by Demod 26 with 2 at 2
1632 Id : 26, {_}: apply (apply (apply s (apply (apply s k) k)) (apply x x)) y =>= apply y (apply (apply x x) y) [] by Demod 25 with 3 at 2,2,1,2
1633 Id : 25, {_}: apply (apply (apply s (apply (apply s k) k)) (apply x (apply (apply k x) (apply k x)))) y =>= apply y (apply (apply x x) y) [] by Demod 24 with 3 at 1,2,1,2
1634 Id : 24, {_}: apply (apply (apply s (apply (apply s k) k)) (apply (apply (apply k x) (apply k x)) (apply (apply k x) (apply k x)))) y =>= apply y (apply (apply x x) y) [] by Demod 17 with 3 at 1,1,2
1635 Id : 17, {_}: apply (apply (apply (apply k (apply s (apply (apply s k) k))) x) (apply (apply (apply k x) (apply k x)) (apply (apply k x) (apply k x)))) y =>= apply y (apply (apply x x) y) [] by Demod 16 with 2 at 2,2,1,2
1636 Id : 16, {_}: apply (apply (apply (apply k (apply s (apply (apply s k) k))) x) (apply (apply (apply k x) (apply k x)) (apply (apply (apply s k) k) x))) y =>= apply y (apply (apply x x) y) [] by Demod 15 with 2 at 1,2,1,2
1637 Id : 15, {_}: apply (apply (apply (apply k (apply s (apply (apply s k) k))) x) (apply (apply (apply (apply s k) k) x) (apply (apply (apply s k) k) x))) y =>= apply y (apply (apply x x) y) [] by Demod 14 with 2 at 2,1,2
1638 Id : 14, {_}: apply (apply (apply (apply k (apply s (apply (apply s k) k))) x) (apply (apply (apply s (apply (apply s k) k)) (apply (apply s k) k)) x)) y =>= apply y (apply (apply x x) y) [] by Demod 1 with 2 at 1,2
1639 Id : 1, {_}: apply (apply (apply (apply s (apply k (apply s (apply (apply s k) k)))) (apply (apply s (apply (apply s k) k)) (apply (apply s k) k))) x) y =>= apply y (apply (apply x x) y) [] by prove_u_combinator
1640 % SZS output end CNFRefutation for COL004-3.p
1641 5063: solved COL004-3.p in 0.020001 using lpo
1642 !! infer_left 1 0.0000 0.0000 0.0000
1643 !! infer_right 2 0.1920 0.1910 0.0960
1644 !! simplify_goal 2 0.0062 0.0044 0.0031
1645 !! keep_simplified 2 0.0002 0.0001 0.0001
1646 !! simplification_step 2 0.0002 0.0001 0.0001
1647 !! simplify 17 0.1876 0.1846 0.0110
1648 !! orphan_murder 2 0.0000 0.0000 0.0000
1649 !! is_subsumed 14 0.0002 0.0000 0.0000
1650 !! build_new_clause 14 0.0037 0.0008 0.0003
1651 !! demodulate 16 0.1935 0.1845 0.0121
1652 !! demod 281 0.1911 0.1843 0.0007
1653 !! demod.apply_subst 70 0.0001 0.0000 0.0000
1654 !! demod.compare_terms 31 0.1893 0.1843 0.0061
1655 !! demod.retrieve_generalizations 281 0.0010 0.0000 0.0000
1656 !! demod.unify 48 0.0002 0.0000 0.0000
1657 !! build_clause 24 0.0055 0.0008 0.0002
1658 !! compare_terms(lpo) 80 0.1972 0.1843 0.0025
1659 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
1662 apply (apply (apply s ?3) ?4) ?5
1664 apply (apply ?3 ?5) (apply ?4 ?5)
1665 [5, 4, 3] by s_definition ?3 ?4 ?5
1667 apply (apply w ?7) ?8 =?= apply (apply ?7 ?8) ?8
1668 [8, 7] by w_definition ?7 ?8
1670 5069: Id : 1, {_}: ?1 =<= apply combinator ?1 [1] by prove_model ?1
1671 % SZS status Timeout for COL005-1.p
1674 apply (apply (apply s ?3) ?4) ?5
1676 apply (apply ?3 ?5) (apply ?4 ?5)
1677 [5, 4, 3] by s_definition ?3 ?4 ?5
1678 5115: Id : 3, {_}: apply (apply k ?7) ?8 =>= ?7 [8, 7] by k_definition ?7 ?8
1681 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1682 [1] by prove_fixed_point ?1
1683 % SZS status Timeout for COL006-1.p
1686 apply (apply (apply s ?2) ?3) ?4
1688 apply (apply ?2 ?4) (apply ?3 ?4)
1689 [4, 3, 2] by s_definition ?2 ?3 ?4
1690 5158: Id : 3, {_}: apply (apply k ?6) ?7 =>= ?6 [7, 6] by k_definition ?6 ?7
1697 (apply (apply s (apply (apply s k) k)) (apply (apply s k) k))))
1698 (apply (apply s (apply k (apply (apply s s) (apply s k))))
1699 (apply (apply s (apply k s)) k))
1700 [] by strong_fixed_point
1703 apply strong_fixed_point fixed_pt
1705 apply fixed_pt (apply strong_fixed_point fixed_pt)
1706 [] by prove_strong_fixed_point
1707 % SZS status Timeout for COL006-5.p
1710 apply (apply (apply s ?2) ?3) ?4
1712 apply (apply ?2 ?4) (apply ?3 ?4)
1713 [4, 3, 2] by s_definition ?2 ?3 ?4
1714 5185: Id : 3, {_}: apply (apply k ?6) ?7 =>= ?6 [7, 6] by k_definition ?6 ?7
1721 (apply (apply s (apply (apply s k) k)) (apply (apply s k) k))))
1722 (apply (apply s (apply (apply s (apply k s)) k))
1724 (apply (apply s (apply (apply s k) k)) (apply (apply s k) k))))
1725 [] by strong_fixed_point
1728 apply strong_fixed_point fixed_pt
1730 apply fixed_pt (apply strong_fixed_point fixed_pt)
1731 [] by prove_strong_fixed_point
1732 % SZS status Timeout for COL006-6.p
1735 apply (apply (apply s ?2) ?3) ?4
1737 apply (apply ?2 ?4) (apply ?3 ?4)
1738 [4, 3, 2] by s_definition ?2 ?3 ?4
1739 5226: Id : 3, {_}: apply (apply k ?6) ?7 =>= ?6 [7, 6] by k_definition ?6 ?7
1746 (apply (apply (apply s s) (apply (apply s k) k))
1747 (apply (apply s s) (apply s k)))))
1748 (apply (apply s (apply k s)) k)
1749 [] by strong_fixed_point
1752 apply strong_fixed_point fixed_pt
1754 apply fixed_pt (apply strong_fixed_point fixed_pt)
1755 [] by prove_strong_fixed_point
1756 % SZS status Timeout for COL006-7.p
1759 apply (apply o ?3) ?4 =?= apply ?4 (apply ?3 ?4)
1760 [4, 3] by o_definition ?3 ?4
1762 apply (apply (apply q1 ?6) ?7) ?8 =>= apply ?6 (apply ?8 ?7)
1763 [8, 7, 6] by q1_definition ?6 ?7 ?8
1765 5253: Id : 1, {_}: ?1 =<= apply combinator ?1 [1] by prove_fixed_point ?1
1766 % SZS status Timeout for COL011-1.p
1769 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1770 [5, 4, 3] by b_definition ?3 ?4 ?5
1771 5307: Id : 3, {_}: apply m ?7 =?= apply ?7 ?7 [7] by m_definition ?7
1773 apply (apply t ?9) ?10 =>= apply ?10 ?9
1774 [10, 9] by t_definition ?9 ?10
1777 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1778 [1] by prove_fixed_point ?1
1782 Found proof, 4.025913s
1783 % SZS status Unsatisfiable for COL034-1.p
1784 % SZS output start CNFRefutation for COL034-1.p
1785 Id : 3, {_}: apply m ?7 =?= apply ?7 ?7 [7] by m_definition ?7
1786 Id : 4, {_}: apply (apply t ?9) ?10 =>= apply ?10 ?9 [10, 9] by t_definition ?9 ?10
1787 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1788 Id : 11, {_}: apply m (apply (apply b ?29) ?30) =<= apply ?29 (apply ?30 (apply (apply b ?29) ?30)) [30, 29] by Super 2 with 3 at 2
1789 Id : 2520, {_}: apply (f (apply (apply b m) (apply (apply b (apply t m)) b))) (apply m (apply (apply b (f (apply (apply b m) (apply (apply b (apply t m)) b)))) m)) === apply (f (apply (apply b m) (apply (apply b (apply t m)) b))) (apply m (apply (apply b (f (apply (apply b m) (apply (apply b (apply t m)) b)))) m)) [] by Super 2519 with 11 at 2
1790 Id : 2519, {_}: apply ?1967 (apply (apply ?1969 (f (apply (apply b ?1967) (apply (apply b (apply t ?1968)) ?1969)))) ?1968) =<= apply (f (apply (apply b ?1967) (apply (apply b (apply t ?1968)) ?1969))) (apply ?1967 (apply (apply ?1969 (f (apply (apply b ?1967) (apply (apply b (apply t ?1968)) ?1969)))) ?1968)) [1968, 1969, 1967] by Demod 2269 with 4 at 2,2
1791 Id : 2269, {_}: apply ?1967 (apply (apply t ?1968) (apply ?1969 (f (apply (apply b ?1967) (apply (apply b (apply t ?1968)) ?1969))))) =<= apply (f (apply (apply b ?1967) (apply (apply b (apply t ?1968)) ?1969))) (apply ?1967 (apply (apply ?1969 (f (apply (apply b ?1967) (apply (apply b (apply t ?1968)) ?1969)))) ?1968)) [1969, 1968, 1967] by Super 53 with 4 at 2,2,3
1792 Id : 53, {_}: apply ?78 (apply ?79 (apply ?80 (f (apply (apply b ?78) (apply (apply b ?79) ?80))))) =<= apply (f (apply (apply b ?78) (apply (apply b ?79) ?80))) (apply ?78 (apply ?79 (apply ?80 (f (apply (apply b ?78) (apply (apply b ?79) ?80)))))) [80, 79, 78] by Demod 39 with 2 at 2,2
1793 Id : 39, {_}: apply ?78 (apply (apply (apply b ?79) ?80) (f (apply (apply b ?78) (apply (apply b ?79) ?80)))) =<= apply (f (apply (apply b ?78) (apply (apply b ?79) ?80))) (apply ?78 (apply ?79 (apply ?80 (f (apply (apply b ?78) (apply (apply b ?79) ?80)))))) [80, 79, 78] by Super 8 with 2 at 2,2,3
1794 Id : 8, {_}: apply ?20 (apply ?21 (f (apply (apply b ?20) ?21))) =<= apply (f (apply (apply b ?20) ?21)) (apply ?20 (apply ?21 (f (apply (apply b ?20) ?21)))) [21, 20] by Demod 7 with 2 at 2
1795 Id : 7, {_}: apply (apply (apply b ?20) ?21) (f (apply (apply b ?20) ?21)) =<= apply (f (apply (apply b ?20) ?21)) (apply ?20 (apply ?21 (f (apply (apply b ?20) ?21)))) [21, 20] by Super 1 with 2 at 2,3
1796 Id : 1, {_}: apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1)) [1] by prove_fixed_point ?1
1797 % SZS output end CNFRefutation for COL034-1.p
1798 5307: solved COL034-1.p in 0.81205 using nrkbo
1799 !! infer_left 160 1.4963 0.9109 0.0094
1800 !! infer_right 42 1.9932 0.4467 0.0475
1801 !! simplify_goal 375 1.5051 0.4070 0.0040
1802 !! keep_simplified 69 0.0873 0.0043 0.0013
1803 !! simplification_step 71 0.0870 0.0043 0.0012
1804 !! simplify 1547 1.6193 0.4128 0.0010
1805 !! orphan_murder 69 0.0007 0.0000 0.0000
1806 !! deep_eq 304 0.4434 0.4007 0.0015
1807 !! is_subsumed 1429 0.4280 0.4123 0.0003
1808 !! build_new_clause 951 0.8569 0.4084 0.0009
1809 !! demodulate 1875 2.2463 0.4070 0.0012
1810 !! demod 61273 2.1175 0.4044 0.0000
1811 !! demod.apply_subst 20392 0.8439 0.4044 0.0000
1812 !! demod.compare_terms 9141 0.0493 0.0005 0.0000
1813 !! demod.retrieve_generalizations 61273 0.5884 0.4001 0.0000
1814 !! demod.unify 35566 0.4709 0.4003 0.0000
1815 !! build_clause 2506 0.0578 0.0013 0.0000
1816 !! compare_terms(nrkbo) 12011 0.0605 0.0012 0.0000
1817 !! compare_terms(nrkbo) 4 0.0001 0.0000 0.0000
1820 apply (apply (apply s ?3) ?4) ?5
1822 apply (apply ?3 ?5) (apply ?4 ?5)
1823 [5, 4, 3] by s_definition ?3 ?4 ?5
1825 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
1826 [9, 8, 7] by b_definition ?7 ?8 ?9
1828 apply (apply t ?11) ?12 =>= apply ?12 ?11
1829 [12, 11] by t_definition ?11 ?12
1832 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1833 [1] by prove_fixed_point ?1
1834 % SZS status Timeout for COL036-1.p
1837 apply (apply (apply s ?3) ?4) ?5
1839 apply (apply ?3 ?5) (apply ?4 ?5)
1840 [5, 4, 3] by s_definition ?3 ?4 ?5
1842 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
1843 [9, 8, 7] by b_definition ?7 ?8 ?9
1845 apply (apply (apply c ?11) ?12) ?13 =>= apply (apply ?11 ?13) ?12
1846 [13, 12, 11] by c_definition ?11 ?12 ?13
1849 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1850 [1] by prove_fixed_point ?1
1851 % SZS status Timeout for COL037-1.p
1854 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1855 [5, 4, 3] by b_definition ?3 ?4 ?5
1856 5384: Id : 3, {_}: apply m ?7 =?= apply ?7 ?7 [7] by m_definition ?7
1858 apply (apply (apply v ?9) ?10) ?11 =>= apply (apply ?11 ?9) ?10
1859 [11, 10, 9] by v_definition ?9 ?10 ?11
1862 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1863 [1] by prove_fixed_point ?1
1864 % SZS status Timeout for COL038-1.p
1867 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1868 [5, 4, 3] by b_definition ?3 ?4 ?5
1869 5417: Id : 3, {_}: apply m ?7 =?= apply ?7 ?7 [7] by m_definition ?7
1871 apply (apply (apply c ?9) ?10) ?11 =>= apply (apply ?9 ?11) ?10
1872 [11, 10, 9] by c_definition ?9 ?10 ?11
1875 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1876 [1] by prove_fixed_point ?1
1880 Found proof, 2.343424s
1881 % SZS status Unsatisfiable for COL041-1.p
1882 % SZS output start CNFRefutation for COL041-1.p
1883 Id : 4, {_}: apply (apply (apply c ?9) ?10) ?11 =>= apply (apply ?9 ?11) ?10 [11, 10, 9] by c_definition ?9 ?10 ?11
1884 Id : 3, {_}: apply m ?7 =?= apply ?7 ?7 [7] by m_definition ?7
1885 Id : 12, {_}: apply m ?33 =?= apply ?33 ?33 [33] by m_definition ?33
1886 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1887 Id : 15, {_}: apply m ?39 =?= apply m ?39 [39] by Super 12 with 3 at 3
1888 Id : 11, {_}: apply m (apply (apply b ?30) ?31) =<= apply ?30 (apply ?31 (apply (apply b ?30) ?31)) [31, 30] by Super 2 with 3 at 2
1889 Id : 1701, {_}: apply (f (apply (apply b m) (apply (apply c b) m))) (apply m (apply (apply b (f (apply (apply b m) (apply (apply c b) m)))) m)) =?= apply (f (apply (apply b m) (apply (apply c b) m))) (apply m (apply (apply b (f (apply (apply b m) (apply (apply c b) m)))) m)) [] by Super 1700 with 11 at 2
1890 Id : 1700, {_}: apply m (apply (apply ?1856 (f (apply (apply b m) (apply (apply c ?1856) ?1857)))) ?1857) =<= apply (f (apply (apply b m) (apply (apply c ?1856) ?1857))) (apply m (apply (apply ?1856 (f (apply (apply b m) (apply (apply c ?1856) ?1857)))) ?1857)) [1857, 1856] by Demod 1667 with 4 at 2,2
1891 Id : 1667, {_}: apply m (apply (apply (apply c ?1856) ?1857) (f (apply (apply b m) (apply (apply c ?1856) ?1857)))) =<= apply (f (apply (apply b m) (apply (apply c ?1856) ?1857))) (apply m (apply (apply ?1856 (f (apply (apply b m) (apply (apply c ?1856) ?1857)))) ?1857)) [1857, 1856] by Super 48 with 4 at 2,2,3
1892 Id : 48, {_}: apply m (apply ?112 (f (apply (apply b m) ?112))) =<= apply (f (apply (apply b m) ?112)) (apply m (apply ?112 (f (apply (apply b m) ?112)))) [112] by Super 8 with 15 at 2,3
1893 Id : 8, {_}: apply ?21 (apply ?22 (f (apply (apply b ?21) ?22))) =<= apply (f (apply (apply b ?21) ?22)) (apply ?21 (apply ?22 (f (apply (apply b ?21) ?22)))) [22, 21] by Demod 7 with 2 at 2
1894 Id : 7, {_}: apply (apply (apply b ?21) ?22) (f (apply (apply b ?21) ?22)) =<= apply (f (apply (apply b ?21) ?22)) (apply ?21 (apply ?22 (f (apply (apply b ?21) ?22)))) [22, 21] by Super 1 with 2 at 2,3
1895 Id : 1, {_}: apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1)) [1] by prove_fixed_point ?1
1896 % SZS output end CNFRefutation for COL041-1.p
1897 5418: solved COL041-1.p in 0.588036 using kbo
1898 !! infer_left 119 0.6824 0.3811 0.0057
1899 !! infer_right 34 1.5736 0.3542 0.0463
1900 !! simplify_goal 297 0.6951 0.3339 0.0023
1901 !! keep_simplified 42 0.0536 0.0035 0.0013
1902 !! simplification_step 44 0.0534 0.0029 0.0012
1903 !! simplify 1311 1.5782 0.3287 0.0012
1904 !! orphan_murder 42 0.0004 0.0000 0.0000
1905 !! deep_eq 232 0.0220 0.0004 0.0001
1906 !! is_subsumed 1308 0.0172 0.0002 0.0000
1907 !! build_new_clause 1024 0.0360 0.0053 0.0000
1908 !! demodulate 1605 2.2286 0.3336 0.0014
1909 !! demod 39040 2.1588 0.3321 0.0001
1910 !! demod.apply_subst 28136 0.5731 0.3321 0.0000
1911 !! demod.compare_terms 13478 0.0789 0.0005 0.0000
1912 !! demod.retrieve_generalizations 39040 0.4000 0.3001 0.0000
1913 !! demod.unify 28835 0.0508 0.0011 0.0000
1914 !! build_clause 1821 0.0339 0.0009 0.0000
1915 !! compare_terms(kbo) 16000 0.0760 0.0006 0.0000
1916 !! compare_terms(nrkbo) 4 0.0001 0.0000 0.0000
1919 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1920 [5, 4, 3] by b_definition ?3 ?4 ?5
1922 apply (apply w1 ?7) ?8 =?= apply (apply ?8 ?7) ?7
1923 [8, 7] by w1_definition ?7 ?8
1926 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1927 [1] by prove_fixed_point ?1
1928 % SZS status Timeout for COL042-1.p
1931 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1932 [5, 4, 3] by b_definition ?3 ?4 ?5
1934 apply (apply (apply h ?7) ?8) ?9
1936 apply (apply (apply ?7 ?8) ?9) ?8
1937 [9, 8, 7] by h_definition ?7 ?8 ?9
1940 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1941 [1] by prove_fixed_point ?1
1942 % SZS status Timeout for COL043-1.p
1945 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1946 [4, 3, 2] by b_definition ?2 ?3 ?4
1948 apply (apply (apply h ?6) ?7) ?8
1950 apply (apply (apply ?6 ?7) ?8) ?7
1951 [8, 7, 6] by h_definition ?6 ?7 ?8
1961 (apply (apply b (apply (apply b h) (apply b b)))
1962 (apply h (apply (apply b h) (apply b b))))) h)) b)) b
1963 [] by strong_fixed_point
1966 apply strong_fixed_point fixed_pt
1968 apply fixed_pt (apply strong_fixed_point fixed_pt)
1969 [] by prove_strong_fixed_point
1970 % SZS status Timeout for COL043-3.p
1973 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1974 [5, 4, 3] by b_definition ?3 ?4 ?5
1976 apply (apply (apply n ?7) ?8) ?9
1978 apply (apply (apply ?7 ?9) ?8) ?9
1979 [9, 8, 7] by n_definition ?7 ?8 ?9
1982 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1983 [1] by prove_fixed_point ?1
1984 % SZS status Timeout for COL044-1.p
1987 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1988 [4, 3, 2] by b_definition ?2 ?3 ?4
1990 apply (apply (apply n ?6) ?7) ?8
1992 apply (apply (apply ?6 ?8) ?7) ?8
1993 [8, 7, 6] by n_definition ?6 ?7 ?8
2004 (apply (apply n (apply (apply b b) n)) n))) n)) b)) b
2005 [] by strong_fixed_point
2008 apply strong_fixed_point fixed_pt
2010 apply fixed_pt (apply strong_fixed_point fixed_pt)
2011 [] by prove_strong_fixed_point
2012 % SZS status Timeout for COL044-6.p
2015 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
2016 [4, 3, 2] by b_definition ?2 ?3 ?4
2018 apply (apply (apply n ?6) ?7) ?8
2020 apply (apply (apply ?6 ?8) ?7) ?8
2021 [8, 7, 6] by n_definition ?6 ?7 ?8
2032 (apply (apply n (apply n (apply b b))) n))) n)) b)) b
2033 [] by strong_fixed_point
2036 apply strong_fixed_point fixed_pt
2038 apply fixed_pt (apply strong_fixed_point fixed_pt)
2039 [] by prove_strong_fixed_point
2040 % SZS status Timeout for COL044-7.p
2043 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
2044 [4, 3, 2] by b_definition ?2 ?3 ?4
2046 apply (apply (apply n ?6) ?7) ?8
2048 apply (apply (apply ?6 ?8) ?7) ?8
2049 [8, 7, 6] by n_definition ?6 ?7 ?8
2060 (apply (apply b (apply b b))
2061 (apply n (apply (apply b b) n))))) n)) b)) b
2062 [] by strong_fixed_point
2065 apply strong_fixed_point fixed_pt
2067 apply fixed_pt (apply strong_fixed_point fixed_pt)
2068 [] by prove_strong_fixed_point
2069 % SZS status Timeout for COL044-8.p
2072 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
2073 [4, 3, 2] by b_definition ?2 ?3 ?4
2075 apply (apply (apply n ?6) ?7) ?8
2077 apply (apply (apply ?6 ?8) ?7) ?8
2078 [8, 7, 6] by n_definition ?6 ?7 ?8
2089 (apply (apply b (apply b b))
2090 (apply n (apply n (apply b b)))))) n)) b)) b
2091 [] by strong_fixed_point
2094 apply strong_fixed_point fixed_pt
2096 apply fixed_pt (apply strong_fixed_point fixed_pt)
2097 [] by prove_strong_fixed_point
2098 % SZS status Timeout for COL044-9.p
2101 apply (apply (apply s ?3) ?4) ?5
2103 apply (apply ?3 ?5) (apply ?4 ?5)
2104 [5, 4, 3] by s_definition ?3 ?4 ?5
2106 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
2107 [9, 8, 7] by b_definition ?7 ?8 ?9
2108 5784: Id : 4, {_}: apply m ?11 =?= apply ?11 ?11 [11] by m_definition ?11
2111 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2112 [1] by prove_fixed_point ?1
2113 % SZS status Timeout for COL046-1.p
2116 apply (apply l ?3) ?4 =?= apply ?3 (apply ?4 ?4)
2117 [4, 3] by l_definition ?3 ?4
2119 apply (apply (apply q ?6) ?7) ?8 =>= apply ?7 (apply ?6 ?8)
2120 [8, 7, 6] by q_definition ?6 ?7 ?8
2123 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2124 [1] by prove_model ?1
2125 % SZS status Timeout for COL047-1.p
2128 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2129 [5, 4, 3] by b_definition ?3 ?4 ?5
2131 apply (apply w ?7) ?8 =?= apply (apply ?7 ?8) ?8
2132 [8, 7] by w_definition ?7 ?8
2133 5858: Id : 4, {_}: apply m ?10 =?= apply ?10 ?10 [10] by m_definition ?10
2136 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2137 [1] by prove_strong_fixed_point ?1
2141 Found proof, 22.743860s
2142 % SZS status Unsatisfiable for COL049-1.p
2143 % SZS output start CNFRefutation for COL049-1.p
2144 Id : 3, {_}: apply (apply w ?7) ?8 =?= apply (apply ?7 ?8) ?8 [8, 7] by w_definition ?7 ?8
2145 Id : 4, {_}: apply m ?10 =?= apply ?10 ?10 [10] by m_definition ?10
2146 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
2147 Id : 221, {_}: apply (apply w (apply b ?340)) ?341 =?= apply ?340 (apply ?341 ?341) [341, 340] by Super 2 with 3 at 2
2148 Id : 227, {_}: apply (apply w (apply b ?356)) ?357 =>= apply ?356 (apply m ?357) [357, 356] by Super 221 with 4 at 2,3
2149 Id : 496, {_}: apply m (apply w (apply b ?830)) =<= apply ?830 (apply m (apply w (apply b ?830))) [830] by Super 4 with 227 at 3
2150 Id : 10345, {_}: apply (f (apply (apply b m) (apply (apply b w) b))) (apply m (apply w (apply b (f (apply (apply b m) (apply (apply b w) b)))))) === apply (f (apply (apply b m) (apply (apply b w) b))) (apply m (apply w (apply b (f (apply (apply b m) (apply (apply b w) b)))))) [] by Super 68 with 496 at 2
2151 Id : 68, {_}: apply ?116 (apply ?117 (apply ?118 (f (apply (apply b ?116) (apply (apply b ?117) ?118))))) =<= apply (f (apply (apply b ?116) (apply (apply b ?117) ?118))) (apply ?116 (apply ?117 (apply ?118 (f (apply (apply b ?116) (apply (apply b ?117) ?118)))))) [118, 117, 116] by Demod 57 with 2 at 2,2
2152 Id : 57, {_}: apply ?116 (apply (apply (apply b ?117) ?118) (f (apply (apply b ?116) (apply (apply b ?117) ?118)))) =<= apply (f (apply (apply b ?116) (apply (apply b ?117) ?118))) (apply ?116 (apply ?117 (apply ?118 (f (apply (apply b ?116) (apply (apply b ?117) ?118)))))) [118, 117, 116] by Super 8 with 2 at 2,2,3
2153 Id : 8, {_}: apply ?20 (apply ?21 (f (apply (apply b ?20) ?21))) =<= apply (f (apply (apply b ?20) ?21)) (apply ?20 (apply ?21 (f (apply (apply b ?20) ?21)))) [21, 20] by Demod 7 with 2 at 2
2154 Id : 7, {_}: apply (apply (apply b ?20) ?21) (f (apply (apply b ?20) ?21)) =<= apply (f (apply (apply b ?20) ?21)) (apply ?20 (apply ?21 (f (apply (apply b ?20) ?21)))) [21, 20] by Super 1 with 2 at 2,3
2155 Id : 1, {_}: apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1)) [1] by prove_strong_fixed_point ?1
2156 % SZS output end CNFRefutation for COL049-1.p
2157 5858: solved COL049-1.p in 5.748358 using nrkbo
2158 !! infer_left 468 2.4636 0.8087 0.0053
2159 !! infer_right 160 13.3810 0.4290 0.0836
2160 !! simplify_goal 964 4.3166 0.3088 0.0045
2161 !! keep_simplified 326 4.9430 0.3832 0.0152
2162 !! simplification_step 375 4.9413 0.3140 0.0132
2163 !! simplify 21319 14.5026 0.3021 0.0007
2164 !! orphan_murder 330 0.0105 0.0005 0.0000
2165 !! deep_eq 713 1.8450 0.3026 0.0026
2166 !! is_subsumed 20621 0.8744 0.3003 0.0000
2167 !! build_new_clause 5112 1.0828 0.3005 0.0002
2168 !! demodulate 22076 16.0276 0.3088 0.0007
2169 !! demod 432543 12.8870 0.3008 0.0000
2170 !! demod.apply_subst 159310 1.4948 0.3007 0.0000
2171 !! demod.compare_terms 76392 2.2143 0.3003 0.0000
2172 !! demod.retrieve_generalizations 432543 2.8717 0.3001 0.0000
2173 !! demod.unify 356965 1.8689 0.3001 0.0000
2174 !! build_clause 10809 0.8060 0.3005 0.0001
2175 !! compare_terms(nrkbo) 91407 2.1963 0.3002 0.0000
2176 !! compare_terms(nrkbo) 4 0.0001 0.0000 0.0000
2179 apply (apply (apply s ?3) ?4) ?5
2181 apply (apply ?3 ?5) (apply ?4 ?5)
2182 [5, 4, 3] by s_definition ?3 ?4 ?5
2184 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
2185 [9, 8, 7] by b_definition ?7 ?8 ?9
2187 apply (apply (apply c ?11) ?12) ?13 =>= apply (apply ?11 ?13) ?12
2188 [13, 12, 11] by c_definition ?11 ?12 ?13
2189 5866: Id : 5, {_}: apply i ?15 =>= ?15 [15] by i_definition ?15
2192 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2193 [1] by prove_strong_fixed_point ?1
2197 Found proof, 22.725988s
2198 % SZS status Unsatisfiable for COL057-1.p
2199 % SZS output start CNFRefutation for COL057-1.p
2200 Id : 3, {_}: apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9) [9, 8, 7] by b_definition ?7 ?8 ?9
2201 Id : 5, {_}: apply i ?15 =>= ?15 [15] by i_definition ?15
2202 Id : 2, {_}: apply (apply (apply s ?3) ?4) ?5 =?= apply (apply ?3 ?5) (apply ?4 ?5) [5, 4, 3] by s_definition ?3 ?4 ?5
2203 Id : 33, {_}: apply (apply (apply s i) ?122) ?123 =?= apply ?123 (apply ?122 ?123) [123, 122] by Super 2 with 5 at 1,3
2204 Id : 16, {_}: apply (apply (apply s (apply b ?63)) ?64) ?65 =?= apply ?63 (apply ?65 (apply ?64 ?65)) [65, 64, 63] by Super 2 with 3 at 3
2205 Id : 14156, {_}: apply (apply (apply (apply s (apply b (apply s i))) i) (apply (apply s (apply b (apply s i))) i)) (f (apply (apply (apply s (apply b (apply s i))) i) (apply i (apply (apply s (apply b (apply s i))) i)))) === apply (apply (apply (apply s (apply b (apply s i))) i) (apply (apply s (apply b (apply s i))) i)) (f (apply (apply (apply s (apply b (apply s i))) i) (apply i (apply (apply s (apply b (apply s i))) i)))) [] by Super 14147 with 5 at 2,1,2
2206 Id : 14147, {_}: apply (apply ?19463 (apply ?19464 ?19463)) (f (apply ?19463 (apply ?19464 ?19463))) =?= apply (apply (apply (apply s (apply b (apply s i))) ?19464) ?19463) (f (apply ?19463 (apply ?19464 ?19463))) [19464, 19463] by Super 14146 with 16 at 1,3
2207 Id : 14146, {_}: apply ?19461 (f ?19461) =<= apply (apply (apply s i) ?19461) (f ?19461) [19461] by Super 1 with 33 at 3
2208 Id : 1, {_}: apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1)) [1] by prove_strong_fixed_point ?1
2209 % SZS output end CNFRefutation for COL057-1.p
2210 5866: solved COL057-1.p in 4.884304 using nrkbo
2211 !! infer_left 181 0.4187 0.4098 0.0023
2212 !! infer_right 85 18.7049 0.9933 0.2201
2213 !! simplify_goal 253 0.4658 0.3022 0.0018
2214 !! keep_simplified 113 3.1852 0.4087 0.0282
2215 !! simplification_step 121 3.1847 0.4054 0.0263
2216 !! simplify 9086 20.1824 0.4026 0.0022
2217 !! orphan_murder 113 0.0034 0.0002 0.0000
2218 !! deep_eq 168 0.0842 0.0012 0.0005
2219 !! is_subsumed 8438 1.4708 0.4003 0.0002
2220 !! build_new_clause 6182 0.7566 0.4002 0.0001
2221 !! demodulate 9234 19.0597 0.4026 0.0021
2222 !! demod 236421 15.4350 0.4004 0.0001
2223 !! demod.apply_subst 133800 1.3587 0.4001 0.0000
2224 !! demod.compare_terms 61929 1.6840 0.4001 0.0000
2225 !! demod.retrieve_generalizations 236421 4.1093 0.4002 0.0000
2226 !! demod.unify 284639 5.0468 0.4001 0.0000
2227 !! build_clause 14823 1.1964 0.4005 0.0001
2228 !! compare_terms(nrkbo) 82737 1.7995 0.4001 0.0000
2229 !! compare_terms(nrkbo) 5 0.0001 0.0000 0.0000
2232 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2233 [5, 4, 3] by b_definition ?3 ?4 ?5
2235 apply (apply t ?7) ?8 =>= apply ?8 ?7
2236 [8, 7] by t_definition ?7 ?8
2239 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
2241 apply (g ?1) (apply (f ?1) (h ?1))
2242 [1] by prove_q_combinator ?1
2246 Found proof, 1.310543s
2247 % SZS status Unsatisfiable for COL060-1.p
2248 % SZS output start CNFRefutation for COL060-1.p
2249 Id : 3, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
2250 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
2251 Id : 447, {_}: apply (g (apply (apply b (apply t b)) (apply (apply b b) t))) (apply (f (apply (apply b (apply t b)) (apply (apply b b) t))) (h (apply (apply b (apply t b)) (apply (apply b b) t)))) === apply (g (apply (apply b (apply t b)) (apply (apply b b) t))) (apply (f (apply (apply b (apply t b)) (apply (apply b b) t))) (h (apply (apply b (apply t b)) (apply (apply b b) t)))) [] by Super 445 with 2 at 2
2252 Id : 445, {_}: apply (apply (apply ?1404 (g (apply (apply b (apply t ?1404)) (apply (apply b b) t)))) (f (apply (apply b (apply t ?1404)) (apply (apply b b) t)))) (h (apply (apply b (apply t ?1404)) (apply (apply b b) t))) =>= apply (g (apply (apply b (apply t ?1404)) (apply (apply b b) t))) (apply (f (apply (apply b (apply t ?1404)) (apply (apply b b) t))) (h (apply (apply b (apply t ?1404)) (apply (apply b b) t)))) [1404] by Super 277 with 3 at 1,2
2253 Id : 277, {_}: apply (apply (apply ?900 (f (apply (apply b (apply t ?901)) (apply (apply b b) ?900)))) (apply ?901 (g (apply (apply b (apply t ?901)) (apply (apply b b) ?900))))) (h (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) =>= apply (g (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) (apply (f (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) (h (apply (apply b (apply t ?901)) (apply (apply b b) ?900)))) [901, 900] by Super 29 with 2 at 1,2
2254 Id : 29, {_}: apply (apply (apply (apply ?85 (apply ?86 (f (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))))) ?87) (g (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86)))) (h (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) =>= apply (g (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) (apply (f (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) (h (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86)))) [87, 86, 85] by Super 13 with 3 at 1,1,2
2255 Id : 13, {_}: apply (apply (apply ?33 (apply ?34 (apply ?35 (f (apply (apply b ?33) (apply (apply b ?34) ?35)))))) (g (apply (apply b ?33) (apply (apply b ?34) ?35)))) (h (apply (apply b ?33) (apply (apply b ?34) ?35))) =>= apply (g (apply (apply b ?33) (apply (apply b ?34) ?35))) (apply (f (apply (apply b ?33) (apply (apply b ?34) ?35))) (h (apply (apply b ?33) (apply (apply b ?34) ?35)))) [35, 34, 33] by Super 6 with 2 at 2,1,1,2
2256 Id : 6, {_}: apply (apply (apply ?18 (apply ?19 (f (apply (apply b ?18) ?19)))) (g (apply (apply b ?18) ?19))) (h (apply (apply b ?18) ?19)) =>= apply (g (apply (apply b ?18) ?19)) (apply (f (apply (apply b ?18) ?19)) (h (apply (apply b ?18) ?19))) [19, 18] by Super 1 with 2 at 1,1,2
2257 Id : 1, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (g ?1) (apply (f ?1) (h ?1)) [1] by prove_q_combinator ?1
2258 % SZS output end CNFRefutation for COL060-1.p
2259 5882: solved COL060-1.p in 0.34002 using nrkbo
2260 !! infer_left 151 1.2245 0.4046 0.0081
2261 !! infer_right 2 0.0001 0.0001 0.0001
2262 !! simplify_goal 619 1.2647 0.4007 0.0020
2263 !! keep_simplified 2 0.0001 0.0001 0.0001
2264 !! simplification_step 2 0.0001 0.0001 0.0001
2265 !! simplify 5 0.0001 0.0001 0.0000
2266 !! orphan_murder 2 0.0000 0.0000 0.0000
2267 !! deep_eq 560 0.2149 0.1803 0.0004
2268 !! is_subsumed 3 0.0000 0.0000 0.0000
2269 !! build_new_clause 442 0.0282 0.0007 0.0001
2270 !! demodulate 622 1.0287 0.4006 0.0017
2271 !! demod 42572 0.9692 0.4001 0.0000
2272 !! demod.retrieve_generalizations 42572 0.5018 0.4001 0.0000
2273 !! build_clause 442 0.0193 0.0007 0.0000
2274 !! compare_terms(nrkbo) 445 0.0068 0.0005 0.0000
2275 !! compare_terms(nrkbo) 3 0.0001 0.0001 0.0000
2278 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2279 [5, 4, 3] by b_definition ?3 ?4 ?5
2281 apply (apply t ?7) ?8 =>= apply ?8 ?7
2282 [8, 7] by t_definition ?7 ?8
2285 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
2287 apply (f ?1) (apply (h ?1) (g ?1))
2288 [1] by prove_q1_combinator ?1
2292 Found proof, 1.469236s
2293 % SZS status Unsatisfiable for COL061-1.p
2294 % SZS output start CNFRefutation for COL061-1.p
2295 Id : 3, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
2296 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
2297 Id : 447, {_}: apply (f (apply (apply b (apply t t)) (apply (apply b b) b))) (apply (h (apply (apply b (apply t t)) (apply (apply b b) b))) (g (apply (apply b (apply t t)) (apply (apply b b) b)))) === apply (f (apply (apply b (apply t t)) (apply (apply b b) b))) (apply (h (apply (apply b (apply t t)) (apply (apply b b) b))) (g (apply (apply b (apply t t)) (apply (apply b b) b)))) [] by Super 446 with 3 at 2,2
2298 Id : 446, {_}: apply (f (apply (apply b (apply t ?1406)) (apply (apply b b) b))) (apply (apply ?1406 (g (apply (apply b (apply t ?1406)) (apply (apply b b) b)))) (h (apply (apply b (apply t ?1406)) (apply (apply b b) b)))) =>= apply (f (apply (apply b (apply t ?1406)) (apply (apply b b) b))) (apply (h (apply (apply b (apply t ?1406)) (apply (apply b b) b))) (g (apply (apply b (apply t ?1406)) (apply (apply b b) b)))) [1406] by Super 277 with 2 at 2
2299 Id : 277, {_}: apply (apply (apply ?900 (f (apply (apply b (apply t ?901)) (apply (apply b b) ?900)))) (apply ?901 (g (apply (apply b (apply t ?901)) (apply (apply b b) ?900))))) (h (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) =>= apply (f (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) (apply (h (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) (g (apply (apply b (apply t ?901)) (apply (apply b b) ?900)))) [901, 900] by Super 29 with 2 at 1,2
2300 Id : 29, {_}: apply (apply (apply (apply ?85 (apply ?86 (f (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))))) ?87) (g (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86)))) (h (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) =>= apply (f (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) (apply (h (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) (g (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86)))) [87, 86, 85] by Super 13 with 3 at 1,1,2
2301 Id : 13, {_}: apply (apply (apply ?33 (apply ?34 (apply ?35 (f (apply (apply b ?33) (apply (apply b ?34) ?35)))))) (g (apply (apply b ?33) (apply (apply b ?34) ?35)))) (h (apply (apply b ?33) (apply (apply b ?34) ?35))) =>= apply (f (apply (apply b ?33) (apply (apply b ?34) ?35))) (apply (h (apply (apply b ?33) (apply (apply b ?34) ?35))) (g (apply (apply b ?33) (apply (apply b ?34) ?35)))) [35, 34, 33] by Super 6 with 2 at 2,1,1,2
2302 Id : 6, {_}: apply (apply (apply ?18 (apply ?19 (f (apply (apply b ?18) ?19)))) (g (apply (apply b ?18) ?19))) (h (apply (apply b ?18) ?19)) =>= apply (f (apply (apply b ?18) ?19)) (apply (h (apply (apply b ?18) ?19)) (g (apply (apply b ?18) ?19))) [19, 18] by Super 1 with 2 at 1,1,2
2303 Id : 1, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (f ?1) (apply (h ?1) (g ?1)) [1] by prove_q1_combinator ?1
2304 % SZS output end CNFRefutation for COL061-1.p
2305 5890: solved COL061-1.p in 0.344021 using nrkbo
2306 !! infer_left 151 1.3813 0.4021 0.0091
2307 !! infer_right 2 0.0001 0.0001 0.0001
2308 !! simplify_goal 620 0.6231 0.3371 0.0010
2309 !! keep_simplified 2 0.0001 0.0001 0.0001
2310 !! simplification_step 2 0.0001 0.0001 0.0001
2311 !! simplify 5 0.0001 0.0001 0.0000
2312 !! orphan_murder 2 0.0000 0.0000 0.0000
2313 !! deep_eq 561 0.0353 0.0005 0.0001
2314 !! is_subsumed 3 0.0000 0.0000 0.0000
2315 !! build_new_clause 442 0.0276 0.0008 0.0001
2316 !! demodulate 623 0.5666 0.3369 0.0009
2317 !! demod 42643 0.5082 0.3361 0.0000
2318 !! demod.retrieve_generalizations 42643 0.4406 0.3361 0.0000
2319 !! build_clause 442 0.0186 0.0007 0.0000
2320 !! compare_terms(nrkbo) 445 0.0062 0.0004 0.0000
2321 !! compare_terms(nrkbo) 3 0.0001 0.0001 0.0000
2324 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2325 [5, 4, 3] by b_definition ?3 ?4 ?5
2327 apply (apply t ?7) ?8 =>= apply ?8 ?7
2328 [8, 7] by t_definition ?7 ?8
2331 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
2333 apply (apply (f ?1) (h ?1)) (g ?1)
2334 [1] by prove_c_combinator ?1
2338 Found proof, 6.761132s
2339 % SZS status Unsatisfiable for COL062-1.p
2340 % SZS output start CNFRefutation for COL062-1.p
2341 Id : 3, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
2342 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
2343 Id : 1482, {_}: apply (apply (f (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))) (h (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t)))) (g (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))) === apply (apply (f (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))) (h (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t)))) (g (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))) [] by Super 1481 with 3 at 2
2344 Id : 1481, {_}: apply (apply ?4652 (g (apply (apply b (apply t (apply (apply b b) ?4652))) (apply (apply b b) t)))) (apply (f (apply (apply b (apply t (apply (apply b b) ?4652))) (apply (apply b b) t))) (h (apply (apply b (apply t (apply (apply b b) ?4652))) (apply (apply b b) t)))) =>= apply (apply (f (apply (apply b (apply t (apply (apply b b) ?4652))) (apply (apply b b) t))) (h (apply (apply b (apply t (apply (apply b b) ?4652))) (apply (apply b b) t)))) (g (apply (apply b (apply t (apply (apply b b) ?4652))) (apply (apply b b) t))) [4652] by Super 407 with 2 at 2
2345 Id : 407, {_}: apply (apply (apply ?1209 (apply ?1210 (g (apply (apply b (apply t (apply (apply b ?1209) ?1210))) (apply (apply b b) t))))) (f (apply (apply b (apply t (apply (apply b ?1209) ?1210))) (apply (apply b b) t)))) (h (apply (apply b (apply t (apply (apply b ?1209) ?1210))) (apply (apply b b) t))) =>= apply (apply (f (apply (apply b (apply t (apply (apply b ?1209) ?1210))) (apply (apply b b) t))) (h (apply (apply b (apply t (apply (apply b ?1209) ?1210))) (apply (apply b b) t)))) (g (apply (apply b (apply t (apply (apply b ?1209) ?1210))) (apply (apply b b) t))) [1210, 1209] by Super 405 with 2 at 1,1,2
2346 Id : 405, {_}: apply (apply (apply ?1205 (g (apply (apply b (apply t ?1205)) (apply (apply b b) t)))) (f (apply (apply b (apply t ?1205)) (apply (apply b b) t)))) (h (apply (apply b (apply t ?1205)) (apply (apply b b) t))) =>= apply (apply (f (apply (apply b (apply t ?1205)) (apply (apply b b) t))) (h (apply (apply b (apply t ?1205)) (apply (apply b b) t)))) (g (apply (apply b (apply t ?1205)) (apply (apply b b) t))) [1205] by Super 386 with 3 at 1,2
2347 Id : 386, {_}: apply (apply (apply ?1151 (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (apply ?1152 (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) =>= apply (apply (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) [1152, 1151] by Super 47 with 2 at 1,2
2348 Id : 47, {_}: apply (apply (apply (apply ?123 (apply ?124 (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))))) ?125) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) =>= apply (apply (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) [125, 124, 123] by Super 22 with 2 at 1,1,1,2
2349 Id : 22, {_}: apply (apply (apply (apply ?57 (f (apply (apply b (apply t ?58)) ?57))) ?58) (g (apply (apply b (apply t ?58)) ?57))) (h (apply (apply b (apply t ?58)) ?57)) =>= apply (apply (f (apply (apply b (apply t ?58)) ?57)) (h (apply (apply b (apply t ?58)) ?57))) (g (apply (apply b (apply t ?58)) ?57)) [58, 57] by Super 8 with 3 at 1,1,2
2350 Id : 8, {_}: apply (apply (apply ?24 (apply ?25 (f (apply (apply b ?24) ?25)))) (g (apply (apply b ?24) ?25))) (h (apply (apply b ?24) ?25)) =>= apply (apply (f (apply (apply b ?24) ?25)) (h (apply (apply b ?24) ?25))) (g (apply (apply b ?24) ?25)) [25, 24] by Super 1 with 2 at 1,1,2
2351 Id : 1, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (apply (f ?1) (h ?1)) (g ?1) [1] by prove_c_combinator ?1
2352 % SZS output end CNFRefutation for COL062-1.p
2353 5901: solved COL062-1.p in 1.668103 using nrkbo
2354 !! infer_left 521 4.0384 0.3064 0.0078
2355 !! infer_right 2 0.0014 0.0013 0.0007
2356 !! simplify_goal 2113 5.9728 0.3024 0.0028
2357 !! keep_simplified 2 0.0002 0.0001 0.0001
2358 !! simplification_step 2 0.0002 0.0001 0.0001
2359 !! simplify 5 0.0002 0.0001 0.0000
2360 !! orphan_murder 2 0.0000 0.0000 0.0000
2361 !! deep_eq 1895 0.1746 0.0004 0.0001
2362 !! is_subsumed 3 0.0000 0.0000 0.0000
2363 !! build_new_clause 1477 0.1038 0.0009 0.0001
2364 !! demodulate 2116 4.8971 0.3013 0.0023
2365 !! demod 175286 3.7487 0.3006 0.0000
2366 !! demod.retrieve_generalizations 175286 2.5695 0.3006 0.0000
2367 !! build_clause 1477 0.0695 0.0008 0.0000
2368 !! compare_terms(nrkbo) 1480 0.0316 0.0008 0.0000
2369 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
2372 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2373 [5, 4, 3] by b_definition ?3 ?4 ?5
2375 apply (apply t ?7) ?8 =>= apply ?8 ?7
2376 [8, 7] by t_definition ?7 ?8
2379 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
2381 apply (apply (h ?1) (g ?1)) (f ?1)
2382 [1] by prove_f_combinator ?1
2386 Found proof, 19.957358s
2387 % SZS status Unsatisfiable for COL063-1.p
2388 % SZS output start CNFRefutation for COL063-1.p
2389 Id : 3, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
2390 Id : 2, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
2391 Id : 3189, {_}: apply (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t))))) (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) =?= apply (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t))))) (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) [] by Super 3184 with 3 at 2
2392 Id : 3184, {_}: apply (apply ?10590 (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?10590))))) (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?10590)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?10590))))) =>= apply (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?10590)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?10590))))) (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?10590)))) [10590] by Super 3164 with 3 at 2,2
2393 Id : 3164, {_}: apply (apply ?10539 (f (apply (apply b (apply t ?10540)) (apply (apply b b) (apply (apply b b) ?10539))))) (apply (apply ?10540 (g (apply (apply b (apply t ?10540)) (apply (apply b b) (apply (apply b b) ?10539))))) (h (apply (apply b (apply t ?10540)) (apply (apply b b) (apply (apply b b) ?10539))))) =>= apply (apply (h (apply (apply b (apply t ?10540)) (apply (apply b b) (apply (apply b b) ?10539)))) (g (apply (apply b (apply t ?10540)) (apply (apply b b) (apply (apply b b) ?10539))))) (f (apply (apply b (apply t ?10540)) (apply (apply b b) (apply (apply b b) ?10539)))) [10540, 10539] by Super 442 with 2 at 2
2394 Id : 442, {_}: apply (apply (apply ?1394 (apply ?1395 (f (apply (apply b (apply t ?1396)) (apply (apply b b) (apply (apply b ?1394) ?1395)))))) (apply ?1396 (g (apply (apply b (apply t ?1396)) (apply (apply b b) (apply (apply b ?1394) ?1395)))))) (h (apply (apply b (apply t ?1396)) (apply (apply b b) (apply (apply b ?1394) ?1395)))) =>= apply (apply (h (apply (apply b (apply t ?1396)) (apply (apply b b) (apply (apply b ?1394) ?1395)))) (g (apply (apply b (apply t ?1396)) (apply (apply b b) (apply (apply b ?1394) ?1395))))) (f (apply (apply b (apply t ?1396)) (apply (apply b b) (apply (apply b ?1394) ?1395)))) [1396, 1395, 1394] by Super 277 with 2 at 1,1,2
2395 Id : 277, {_}: apply (apply (apply ?900 (f (apply (apply b (apply t ?901)) (apply (apply b b) ?900)))) (apply ?901 (g (apply (apply b (apply t ?901)) (apply (apply b b) ?900))))) (h (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) =>= apply (apply (h (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) (g (apply (apply b (apply t ?901)) (apply (apply b b) ?900)))) (f (apply (apply b (apply t ?901)) (apply (apply b b) ?900))) [901, 900] by Super 29 with 2 at 1,2
2396 Id : 29, {_}: apply (apply (apply (apply ?85 (apply ?86 (f (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))))) ?87) (g (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86)))) (h (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) =>= apply (apply (h (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) (g (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86)))) (f (apply (apply b (apply t ?87)) (apply (apply b ?85) ?86))) [87, 86, 85] by Super 13 with 3 at 1,1,2
2397 Id : 13, {_}: apply (apply (apply ?33 (apply ?34 (apply ?35 (f (apply (apply b ?33) (apply (apply b ?34) ?35)))))) (g (apply (apply b ?33) (apply (apply b ?34) ?35)))) (h (apply (apply b ?33) (apply (apply b ?34) ?35))) =>= apply (apply (h (apply (apply b ?33) (apply (apply b ?34) ?35))) (g (apply (apply b ?33) (apply (apply b ?34) ?35)))) (f (apply (apply b ?33) (apply (apply b ?34) ?35))) [35, 34, 33] by Super 6 with 2 at 2,1,1,2
2398 Id : 6, {_}: apply (apply (apply ?18 (apply ?19 (f (apply (apply b ?18) ?19)))) (g (apply (apply b ?18) ?19))) (h (apply (apply b ?18) ?19)) =>= apply (apply (h (apply (apply b ?18) ?19)) (g (apply (apply b ?18) ?19))) (f (apply (apply b ?18) ?19)) [19, 18] by Super 1 with 2 at 1,1,2
2399 Id : 1, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (apply (h ?1) (g ?1)) (f ?1) [1] by prove_f_combinator ?1
2400 % SZS output end CNFRefutation for COL063-1.p
2401 5907: solved COL063-1.p in 4.920307 using kbo
2402 !! infer_left 1099 11.0013 0.3367 0.0100
2403 !! infer_right 2 0.0002 0.0001 0.0001
2404 !! simplify_goal 4558 16.7776 0.3344 0.0037
2405 !! keep_simplified 2 0.0002 0.0001 0.0001
2406 !! simplification_step 2 0.0002 0.0001 0.0001
2407 !! simplify 5 0.0002 0.0001 0.0000
2408 !! orphan_murder 2 0.0000 0.0000 0.0000
2409 !! deep_eq 4121 1.0438 0.3004 0.0003
2410 !! is_subsumed 3 0.0000 0.0000 0.0000
2411 !! build_new_clause 3184 2.0617 0.3010 0.0006
2412 !! demodulate 4561 9.6865 0.3341 0.0021
2413 !! demod 414262 7.5831 0.3295 0.0000
2414 !! demod.retrieve_generalizations 414262 5.3827 0.3009 0.0000
2415 !! build_clause 3184 1.6785 0.3010 0.0005
2416 !! compare_terms(kbo) 3187 0.9758 0.3010 0.0003
2417 !! compare_terms(nrkbo) 3 0.0001 0.0001 0.0000
2420 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2421 [5, 4, 3] by b_definition ?3 ?4 ?5
2423 apply (apply t ?7) ?8 =>= apply ?8 ?7
2424 [8, 7] by t_definition ?7 ?8
2427 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
2429 apply (apply (h ?1) (f ?1)) (g ?1)
2430 [1] by prove_v_combinator ?1
2431 % SZS status Timeout for COL064-1.p
2434 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2435 [5, 4, 3] by b_definition ?3 ?4 ?5
2437 apply (apply t ?7) ?8 =>= apply ?8 ?7
2438 [8, 7] by t_definition ?7 ?8
2441 apply (apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)) (i ?1)
2443 apply (apply (f ?1) (i ?1)) (apply (g ?1) (h ?1))
2444 [1] by prove_g_combinator ?1
2445 % SZS status Timeout for COL065-1.p
2448 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2449 [5, 4, 3] by b_definition ?3 ?4 ?5
2451 apply (apply (apply q ?7) ?8) ?9 =>= apply ?8 (apply ?7 ?9)
2452 [9, 8, 7] by q_definition ?7 ?8 ?9
2454 apply (apply w ?11) ?12 =?= apply (apply ?11 ?12) ?12
2455 [12, 11] by w_definition ?11 ?12
2458 apply (apply (apply (apply ?1 (f ?1)) (g ?1)) (g ?1)) (h ?1)
2460 apply (apply (f ?1) (g ?1)) (apply (apply (f ?1) (g ?1)) (h ?1))
2461 [1] by prove_p_combinator ?1
2462 % SZS status Timeout for COL066-1.p
2465 apply (apply (apply s ?3) ?4) ?5
2467 apply (apply ?3 ?5) (apply ?4 ?5)
2468 [5, 4, 3] by s_definition ?3 ?4 ?5
2470 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
2471 [9, 8, 7] by b_definition ?7 ?8 ?9
2474 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2475 [1] by prove_fixed_point ?1
2476 % SZS status Timeout for COL067-1.p
2479 apply (apply (apply s ?3) ?4) ?5
2481 apply (apply ?3 ?5) (apply ?4 ?5)
2482 [5, 4, 3] by s_definition ?3 ?4 ?5
2484 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
2485 [9, 8, 7] by b_definition ?7 ?8 ?9
2487 6112: Id : 1, {_}: ?1 =<= apply combinator ?1 [1] by prove_fixed_point ?1
2488 % SZS status Timeout for COL068-1.p
2491 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2492 [5, 4, 3] by b_definition ?3 ?4 ?5
2494 apply (apply l ?7) ?8 =?= apply ?7 (apply ?8 ?8)
2495 [8, 7] by l_definition ?7 ?8
2498 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2499 [1] by prove_fixed_point ?1
2500 % SZS status Timeout for COL069-1.p
2503 apply (apply (apply n ?3) ?4) ?5
2505 apply (apply (apply ?3 ?5) ?4) ?5
2506 [5, 4, 3] by n_definition ?3 ?4 ?5
2508 apply (apply (apply q ?7) ?8) ?9 =>= apply ?8 (apply ?7 ?9)
2509 [9, 8, 7] by q_definition ?7 ?8 ?9
2512 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2513 [1] by prove_fixed_point ?1
2514 % SZS status Timeout for COL071-1.p
2517 apply (apply (apply n1 ?3) ?4) ?5
2519 apply (apply (apply ?3 ?4) ?4) ?5
2520 [5, 4, 3] by n1_definition ?3 ?4 ?5
2522 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
2523 [9, 8, 7] by b_definition ?7 ?8 ?9
2526 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2527 [1] by prove_strong_fixed_point ?1
2528 % SZS status Timeout for COL073-1.p
2531 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
2532 [5, 4, 3] by definition_B ?3 ?4 ?5
2533 6249: Id : 3, {_}: apply m ?7 =?= apply ?7 ?7 [7] by definition_M ?7
2536 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
2537 [1] by strong_fixpoint ?1
2538 % SZS status Timeout for COL087-1.p
2545 (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4)))
2546 ?5) (inverse (multiply ?3 ?5))))
2549 [5, 4, 3, 2] by group_axiom ?2 ?3 ?4 ?5
2552 multiply a (multiply b c) =<= multiply (multiply a b) c
2553 [] by prove_associativity
2556 Found proof, 30.568717s
2557 % SZS status Unsatisfiable for GRP014-1.p
2558 % SZS output start CNFRefutation for GRP014-1.p
2559 Id : 2, {_}: multiply ?2 (inverse (multiply (multiply (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4))) ?5) (inverse (multiply ?3 ?5)))) =>= ?4 [5, 4, 3, 2] by group_axiom ?2 ?3 ?4 ?5
2560 Id : 3, {_}: multiply ?7 (inverse (multiply (multiply (inverse (multiply (inverse ?8) (multiply (inverse ?7) ?9))) ?10) (inverse (multiply ?8 ?10)))) =>= ?9 [10, 9, 8, 7] by group_axiom ?7 ?8 ?9 ?10
2561 Id : 6, {_}: multiply ?26 (inverse (multiply ?27 (inverse (multiply ?28 (inverse (multiply (multiply (inverse (multiply (inverse ?29) (multiply (inverse (inverse (multiply (inverse ?28) (multiply (inverse ?26) ?30)))) ?27))) ?31) (inverse (multiply ?29 ?31)))))))) =>= ?30 [31, 30, 29, 28, 27, 26] by Super 3 with 2 at 1,1,2,2
2562 Id : 5, {_}: multiply ?19 (inverse (multiply (multiply (inverse (multiply (inverse ?20) ?21)) ?22) (inverse (multiply ?20 ?22)))) =?= inverse (multiply (multiply (inverse (multiply (inverse ?23) (multiply (inverse (inverse ?19)) ?21))) ?24) (inverse (multiply ?23 ?24))) [24, 23, 22, 21, 20, 19] by Super 3 with 2 at 2,1,1,1,1,2,2
2563 Id : 63, {_}: multiply (inverse ?569) (multiply ?569 (inverse (multiply (multiply (inverse (multiply (inverse ?570) ?571)) ?572) (inverse (multiply ?570 ?572))))) =>= ?571 [572, 571, 570, 569] by Super 2 with 5 at 2,2
2564 Id : 64, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?574) (multiply (inverse (inverse ?575)) (multiply (inverse ?575) ?576)))) ?577) (inverse (multiply ?574 ?577))) =>= ?576 [577, 576, 575, 574] by Super 2 with 5 at 2
2565 Id : 282, {_}: multiply (inverse ?2263) (multiply ?2263 ?2264) =?= multiply (inverse (inverse ?2265)) (multiply (inverse ?2265) ?2264) [2265, 2264, 2263] by Super 63 with 64 at 2,2,2
2566 Id : 186, {_}: multiply (inverse ?1640) (multiply ?1640 ?1641) =?= multiply (inverse (inverse ?1642)) (multiply (inverse ?1642) ?1641) [1642, 1641, 1640] by Super 63 with 64 at 2,2,2
2567 Id : 296, {_}: multiply (inverse ?2354) (multiply ?2354 ?2355) =?= multiply (inverse ?2356) (multiply ?2356 ?2355) [2356, 2355, 2354] by Super 282 with 186 at 3
2568 Id : 388, {_}: multiply (inverse ?2841) (multiply ?2841 (inverse (multiply (multiply (inverse (multiply (inverse ?2842) (multiply ?2842 ?2843))) ?2844) (inverse (multiply ?2845 ?2844))))) =>= multiply ?2845 ?2843 [2845, 2844, 2843, 2842, 2841] by Super 63 with 296 at 1,1,1,1,2,2,2
2569 Id : 534, {_}: multiply ?3731 (inverse (multiply (multiply (inverse (multiply (inverse ?3732) (multiply ?3732 ?3733))) ?3734) (inverse (multiply (inverse ?3731) ?3734)))) =>= ?3733 [3734, 3733, 3732, 3731] by Super 2 with 296 at 1,1,1,1,2,2
2570 Id : 2439, {_}: multiply ?16014 (inverse (multiply (multiply (inverse (multiply (inverse ?16015) (multiply ?16015 ?16016))) (multiply ?16014 ?16017)) (inverse (multiply (inverse ?16018) (multiply ?16018 ?16017))))) =>= ?16016 [16018, 16017, 16016, 16015, 16014] by Super 534 with 296 at 1,2,1,2,2
2571 Id : 2524, {_}: multiply (multiply (inverse ?16722) (multiply ?16722 ?16723)) (inverse (multiply ?16724 (inverse (multiply (inverse ?16725) (multiply ?16725 (inverse (multiply (multiply (inverse (multiply (inverse ?16726) ?16724)) ?16727) (inverse (multiply ?16726 ?16727))))))))) =>= ?16723 [16727, 16726, 16725, 16724, 16723, 16722] by Super 2439 with 63 at 1,1,2,2
2572 Id : 2563, {_}: multiply (multiply (inverse ?16722) (multiply ?16722 ?16723)) (inverse (multiply ?16724 (inverse ?16724))) =>= ?16723 [16724, 16723, 16722] by Demod 2524 with 63 at 1,2,1,2,2
2573 Id : 2592, {_}: multiply (inverse (multiply (inverse ?16966) (multiply ?16966 ?16967))) ?16967 =?= multiply (inverse (multiply (inverse ?16968) (multiply ?16968 ?16969))) ?16969 [16969, 16968, 16967, 16966] by Super 388 with 2563 at 2,2
2574 Id : 2821, {_}: multiply (inverse (inverse (multiply (inverse ?18345) (multiply ?18345 (inverse (multiply (multiply (inverse (multiply (inverse ?18346) ?18347)) ?18348) (inverse (multiply ?18346 ?18348)))))))) (multiply (inverse (multiply (inverse ?18349) (multiply ?18349 ?18350))) ?18350) =>= ?18347 [18350, 18349, 18348, 18347, 18346, 18345] by Super 63 with 2592 at 2,2
2575 Id : 3012, {_}: multiply (inverse (inverse ?18347)) (multiply (inverse (multiply (inverse ?18349) (multiply ?18349 ?18350))) ?18350) =>= ?18347 [18350, 18349, 18347] by Demod 2821 with 63 at 1,1,1,2
2576 Id : 135, {_}: multiply (inverse ?1251) (multiply ?1251 (inverse (multiply (multiply (inverse (multiply (inverse ?1252) ?1253)) ?1254) (inverse (multiply ?1252 ?1254))))) =>= ?1253 [1254, 1253, 1252, 1251] by Super 2 with 5 at 2,2
2577 Id : 154, {_}: multiply (inverse ?1406) (multiply ?1406 (multiply ?1407 (inverse (multiply (multiply (inverse (multiply (inverse ?1408) ?1409)) ?1410) (inverse (multiply ?1408 ?1410)))))) =>= multiply (inverse (inverse ?1407)) ?1409 [1410, 1409, 1408, 1407, 1406] by Super 135 with 5 at 2,2,2
2578 Id : 3082, {_}: multiply (inverse (inverse (inverse ?20094))) ?20094 =?= multiply (inverse (inverse (inverse (multiply (inverse ?20095) (multiply ?20095 (inverse (multiply (multiply (inverse (multiply (inverse ?20096) ?20097)) ?20098) (inverse (multiply ?20096 ?20098))))))))) ?20097 [20098, 20097, 20096, 20095, 20094] by Super 154 with 3012 at 2,2
2579 Id : 3171, {_}: multiply (inverse (inverse (inverse ?20094))) ?20094 =?= multiply (inverse (inverse (inverse ?20097))) ?20097 [20097, 20094] by Demod 3082 with 63 at 1,1,1,1,3
2580 Id : 3346, {_}: multiply (inverse (inverse ?21386)) (multiply (inverse (multiply (inverse (inverse (inverse (inverse ?21387)))) (multiply (inverse (inverse (inverse ?21388))) ?21388))) ?21387) =>= ?21386 [21388, 21387, 21386] by Super 3012 with 3171 at 2,1,1,2,2
2581 Id : 372, {_}: multiply ?2725 (inverse (multiply (multiply (inverse ?2726) (multiply ?2726 ?2727)) (inverse (multiply ?2728 (multiply (multiply (inverse ?2728) (multiply (inverse ?2725) ?2729)) ?2727))))) =>= ?2729 [2729, 2728, 2727, 2726, 2725] by Super 2 with 296 at 1,1,2,2
2582 Id : 188, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1652) (multiply (inverse (inverse ?1653)) (multiply (inverse ?1653) ?1654)))) ?1655) (inverse (multiply ?1652 ?1655))) =>= ?1654 [1655, 1654, 1653, 1652] by Super 2 with 5 at 2
2583 Id : 196, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1714) (multiply (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?1715) (multiply (inverse (inverse ?1716)) (multiply (inverse ?1716) ?1717)))) ?1718) (inverse (multiply ?1715 ?1718))))) (multiply ?1717 ?1719)))) ?1720) (inverse (multiply ?1714 ?1720))) =>= ?1719 [1720, 1719, 1718, 1717, 1716, 1715, 1714] by Super 188 with 64 at 1,2,2,1,1,1,1,2
2584 Id : 221, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1714) (multiply (inverse ?1717) (multiply ?1717 ?1719)))) ?1720) (inverse (multiply ?1714 ?1720))) =>= ?1719 [1720, 1719, 1717, 1714] by Demod 196 with 64 at 1,1,2,1,1,1,1,2
2585 Id : 620, {_}: multiply (inverse ?4319) (multiply ?4319 (multiply ?4320 (inverse (multiply (multiply (inverse (multiply (inverse ?4321) ?4322)) ?4323) (inverse (multiply ?4321 ?4323)))))) =>= multiply (inverse (inverse ?4320)) ?4322 [4323, 4322, 4321, 4320, 4319] by Super 135 with 5 at 2,2,2
2586 Id : 653, {_}: multiply (inverse ?4603) (multiply ?4603 (multiply ?4604 ?4605)) =?= multiply (inverse (inverse ?4604)) (multiply (inverse ?4606) (multiply ?4606 ?4605)) [4606, 4605, 4604, 4603] by Super 620 with 221 at 2,2,2,2
2587 Id : 742, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?5193) (multiply ?5193 (multiply ?5194 ?5195)))) ?5196) (inverse (multiply (inverse ?5194) ?5196))) =>= ?5195 [5196, 5195, 5194, 5193] by Super 221 with 653 at 1,1,1,1,2
2588 Id : 2795, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?18165) (multiply ?18165 ?18166))) ?18166) (inverse (multiply (inverse ?18167) (multiply ?18167 ?18168)))) =>= ?18168 [18168, 18167, 18166, 18165] by Super 742 with 2592 at 1,1,2
2589 Id : 3210, {_}: multiply (multiply (inverse (inverse (inverse (inverse ?20600)))) (multiply (inverse (inverse (inverse ?20601))) ?20601)) (inverse (multiply ?20602 (inverse ?20602))) =>= ?20600 [20602, 20601, 20600] by Super 2563 with 3171 at 2,1,2
2590 Id : 3081, {_}: multiply (inverse ?20087) (multiply ?20087 (multiply ?20088 (inverse (multiply (multiply (inverse ?20089) ?20090) (inverse (multiply (inverse ?20089) ?20090)))))) =?= multiply (inverse (inverse ?20088)) (multiply (inverse (multiply (inverse ?20091) (multiply ?20091 ?20092))) ?20092) [20092, 20091, 20090, 20089, 20088, 20087] by Super 154 with 3012 at 1,1,1,1,2,2,2,2
2591 Id : 4777, {_}: multiply (inverse ?29667) (multiply ?29667 (multiply ?29668 (inverse (multiply (multiply (inverse ?29669) ?29670) (inverse (multiply (inverse ?29669) ?29670)))))) =>= ?29668 [29670, 29669, 29668, 29667] by Demod 3081 with 3012 at 3
2592 Id : 4785, {_}: multiply (inverse ?29731) (multiply ?29731 (multiply ?29732 (inverse (multiply (multiply (inverse ?29733) (inverse (multiply (multiply (inverse (multiply (inverse ?29734) (multiply (inverse (inverse ?29733)) ?29735))) ?29736) (inverse (multiply ?29734 ?29736))))) (inverse ?29735))))) =>= ?29732 [29736, 29735, 29734, 29733, 29732, 29731] by Super 4777 with 2 at 1,2,1,2,2,2,2
2593 Id : 4909, {_}: multiply (inverse ?29731) (multiply ?29731 (multiply ?29732 (inverse (multiply ?29735 (inverse ?29735))))) =>= ?29732 [29735, 29732, 29731] by Demod 4785 with 2 at 1,1,2,2,2,2
2594 Id : 4962, {_}: multiply ?30464 (inverse (multiply ?30465 (inverse ?30465))) =?= multiply ?30464 (inverse (multiply ?30466 (inverse ?30466))) [30466, 30465, 30464] by Super 3210 with 4909 at 1,2
2595 Id : 5592, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?33658) (multiply ?33658 ?33659))) ?33659) (inverse (multiply (inverse ?33660) (multiply ?33660 (inverse (multiply ?33661 (inverse ?33661))))))) =?= inverse (multiply ?33662 (inverse ?33662)) [33662, 33661, 33660, 33659, 33658] by Super 2795 with 4962 at 2,1,2,1,2
2596 Id : 5653, {_}: inverse (multiply ?33661 (inverse ?33661)) =?= inverse (multiply ?33662 (inverse ?33662)) [33662, 33661] by Demod 5592 with 2795 at 2
2597 Id : 5929, {_}: multiply (inverse (inverse (multiply ?35194 (inverse ?35194)))) (multiply (inverse (multiply (inverse (inverse (inverse (inverse ?35195)))) (multiply (inverse (inverse (inverse ?35196))) ?35196))) ?35195) =?= multiply ?35197 (inverse ?35197) [35197, 35196, 35195, 35194] by Super 3346 with 5653 at 1,1,2
2598 Id : 5986, {_}: multiply ?35194 (inverse ?35194) =?= multiply ?35197 (inverse ?35197) [35197, 35194] by Demod 5929 with 3346 at 2
2599 Id : 6042, {_}: multiply (multiply (inverse ?35573) (multiply ?35574 (inverse ?35574))) (inverse (multiply ?35575 (inverse ?35575))) =>= inverse ?35573 [35575, 35574, 35573] by Super 2563 with 5986 at 2,1,2
2600 Id : 6543, {_}: multiply ?38358 (inverse (multiply (multiply (inverse ?38359) (multiply ?38359 (inverse (multiply ?38360 (inverse ?38360))))) (inverse (multiply ?38361 (inverse ?38361))))) =>= inverse (inverse ?38358) [38361, 38360, 38359, 38358] by Super 372 with 6042 at 2,1,2,1,2,2
2601 Id : 6618, {_}: multiply ?38358 (inverse (inverse (multiply ?38360 (inverse ?38360)))) =>= inverse (inverse ?38358) [38360, 38358] by Demod 6543 with 2563 at 1,2,2
2602 Id : 6657, {_}: multiply (inverse (inverse ?38833)) (multiply (inverse (multiply (inverse ?38834) (inverse (inverse ?38834)))) (inverse (inverse (multiply ?38835 (inverse ?38835))))) =>= ?38833 [38835, 38834, 38833] by Super 3012 with 6618 at 2,1,1,2,2
2603 Id : 7408, {_}: multiply (inverse (inverse ?41918)) (inverse (inverse (inverse (multiply (inverse ?41919) (inverse (inverse ?41919)))))) =>= ?41918 [41919, 41918] by Demod 6657 with 6618 at 2,2
2604 Id : 6739, {_}: multiply ?39280 (inverse ?39280) =?= inverse (inverse (inverse (multiply ?39281 (inverse ?39281)))) [39281, 39280] by Super 5986 with 6618 at 3
2605 Id : 7438, {_}: multiply (inverse (inverse ?42063)) (multiply ?42064 (inverse ?42064)) =>= ?42063 [42064, 42063] by Super 7408 with 6739 at 2,2
2606 Id : 7572, {_}: multiply ?42586 (inverse (multiply ?42587 (inverse ?42587))) =>= inverse (inverse ?42586) [42587, 42586] by Super 2563 with 7438 at 1,2
2607 Id : 7757, {_}: multiply (inverse (inverse ?43376)) (inverse (inverse (inverse (multiply (inverse (inverse (inverse (inverse (inverse (multiply ?43377 (inverse ?43377))))))) (multiply (inverse (inverse (inverse ?43378))) ?43378))))) =>= ?43376 [43378, 43377, 43376] by Super 3346 with 7572 at 2,2
2608 Id : 7643, {_}: inverse (inverse (multiply (inverse (inverse (inverse (inverse ?20600)))) (multiply (inverse (inverse (inverse ?20601))) ?20601))) =>= ?20600 [20601, 20600] by Demod 3210 with 7572 at 2
2609 Id : 7812, {_}: multiply (inverse (inverse ?43376)) (inverse (inverse (multiply ?43377 (inverse ?43377)))) =>= ?43376 [43377, 43376] by Demod 7757 with 7643 at 1,2,2
2610 Id : 7813, {_}: inverse (inverse (inverse (inverse ?43376))) =>= ?43376 [43376] by Demod 7812 with 6618 at 2
2611 Id : 869, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?5935) (multiply ?5935 (multiply ?5936 ?5937)))) ?5938) (inverse (multiply (inverse ?5936) ?5938))) =>= ?5937 [5938, 5937, 5936, 5935] by Super 221 with 653 at 1,1,1,1,2
2612 Id : 890, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?6097) (multiply ?6097 (multiply (inverse ?6098) (multiply ?6098 ?6099))))) ?6100) (inverse (multiply (inverse (inverse ?6101)) ?6100))) =>= multiply ?6101 ?6099 [6101, 6100, 6099, 6098, 6097] by Super 869 with 296 at 2,2,1,1,1,1,2
2613 Id : 7644, {_}: multiply (inverse ?29731) (multiply ?29731 (inverse (inverse ?29732))) =>= ?29732 [29732, 29731] by Demod 4909 with 7572 at 2,2,2
2614 Id : 8034, {_}: multiply (inverse ?44083) (multiply ?44083 ?44084) =>= inverse (inverse ?44084) [44084, 44083] by Super 7644 with 7813 at 2,2,2
2615 Id : 8446, {_}: inverse (multiply (multiply (inverse (inverse (inverse (multiply (inverse ?6098) (multiply ?6098 ?6099))))) ?6100) (inverse (multiply (inverse (inverse ?6101)) ?6100))) =>= multiply ?6101 ?6099 [6101, 6100, 6099, 6098] by Demod 890 with 8034 at 1,1,1,1,2
2616 Id : 8447, {_}: inverse (multiply (multiply (inverse (inverse (inverse (inverse (inverse ?6099))))) ?6100) (inverse (multiply (inverse (inverse ?6101)) ?6100))) =>= multiply ?6101 ?6099 [6101, 6100, 6099] by Demod 8446 with 8034 at 1,1,1,1,1,1,2
2617 Id : 8480, {_}: inverse (multiply (multiply (inverse ?6099) ?6100) (inverse (multiply (inverse (inverse ?6101)) ?6100))) =>= multiply ?6101 ?6099 [6101, 6100, 6099] by Demod 8447 with 7813 at 1,1,1,2
2618 Id : 7937, {_}: multiply ?43614 (inverse (multiply (inverse (inverse (inverse ?43615))) ?43615)) =>= inverse (inverse ?43614) [43615, 43614] by Super 7572 with 7813 at 2,1,2,2
2619 Id : 8626, {_}: inverse (inverse (inverse (multiply (inverse ?45427) ?45428))) =>= multiply (inverse ?45428) ?45427 [45428, 45427] by Super 8480 with 7937 at 1,2
2620 Id : 8920, {_}: inverse (multiply (inverse ?46068) ?46069) =>= multiply (inverse ?46069) ?46068 [46069, 46068] by Super 7813 with 8626 at 1,2
2621 Id : 9086, {_}: multiply ?26 (inverse (multiply ?27 (inverse (multiply ?28 (inverse (multiply (multiply (multiply (inverse (multiply (inverse (inverse (multiply (inverse ?28) (multiply (inverse ?26) ?30)))) ?27)) ?29) ?31) (inverse (multiply ?29 ?31)))))))) =>= ?30 [31, 29, 30, 28, 27, 26] by Demod 6 with 8920 at 1,1,1,2,1,2,1,2,2
2622 Id : 9087, {_}: multiply ?26 (inverse (multiply ?27 (inverse (multiply ?28 (inverse (multiply (multiply (multiply (multiply (inverse ?27) (inverse (multiply (inverse ?28) (multiply (inverse ?26) ?30)))) ?29) ?31) (inverse (multiply ?29 ?31)))))))) =>= ?30 [31, 29, 30, 28, 27, 26] by Demod 9086 with 8920 at 1,1,1,1,2,1,2,1,2,2
2623 Id : 9088, {_}: multiply ?26 (inverse (multiply ?27 (inverse (multiply ?28 (inverse (multiply (multiply (multiply (multiply (inverse ?27) (multiply (inverse (multiply (inverse ?26) ?30)) ?28)) ?29) ?31) (inverse (multiply ?29 ?31)))))))) =>= ?30 [31, 29, 30, 28, 27, 26] by Demod 9087 with 8920 at 2,1,1,1,1,2,1,2,1,2,2
2624 Id : 9089, {_}: multiply ?26 (inverse (multiply ?27 (inverse (multiply ?28 (inverse (multiply (multiply (multiply (multiply (inverse ?27) (multiply (multiply (inverse ?30) ?26) ?28)) ?29) ?31) (inverse (multiply ?29 ?31)))))))) =>= ?30 [31, 29, 30, 28, 27, 26] by Demod 9088 with 8920 at 1,2,1,1,1,1,2,1,2,1,2,2
2625 Id : 8458, {_}: inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?2842) (multiply ?2842 ?2843))) ?2844) (inverse (multiply ?2845 ?2844))))) =>= multiply ?2845 ?2843 [2845, 2844, 2843, 2842] by Demod 388 with 8034 at 2
2626 Id : 8459, {_}: inverse (inverse (inverse (multiply (multiply (inverse (inverse (inverse ?2843))) ?2844) (inverse (multiply ?2845 ?2844))))) =>= multiply ?2845 ?2843 [2845, 2844, 2843] by Demod 8458 with 8034 at 1,1,1,1,1,1,2
2627 Id : 8637, {_}: inverse (inverse (inverse (inverse (inverse (multiply (inverse (inverse (inverse ?45472))) ?45473))))) =>= multiply (inverse (inverse (inverse ?45473))) ?45472 [45473, 45472] by Super 8459 with 7937 at 1,1,1,2
2628 Id : 8821, {_}: inverse (multiply (inverse (inverse (inverse ?45472))) ?45473) =>= multiply (inverse (inverse (inverse ?45473))) ?45472 [45473, 45472] by Demod 8637 with 7813 at 2
2629 Id : 9269, {_}: multiply (inverse ?45473) (inverse (inverse ?45472)) =?= multiply (inverse (inverse (inverse ?45473))) ?45472 [45472, 45473] by Demod 8821 with 8920 at 2
2630 Id : 9361, {_}: multiply (inverse ?47429) (inverse (inverse (multiply (inverse (inverse ?47429)) ?47430))) =>= inverse (inverse ?47430) [47430, 47429] by Super 8034 with 9269 at 2
2631 Id : 9488, {_}: multiply (inverse ?47429) (inverse (multiply (inverse ?47430) (inverse ?47429))) =>= inverse (inverse ?47430) [47430, 47429] by Demod 9361 with 8920 at 1,2,2
2632 Id : 9489, {_}: multiply (inverse ?47429) (multiply (inverse (inverse ?47429)) ?47430) =>= inverse (inverse ?47430) [47430, 47429] by Demod 9488 with 8920 at 2,2
2633 Id : 8463, {_}: multiply ?2725 (inverse (multiply (inverse (inverse ?2727)) (inverse (multiply ?2728 (multiply (multiply (inverse ?2728) (multiply (inverse ?2725) ?2729)) ?2727))))) =>= ?2729 [2729, 2728, 2727, 2725] by Demod 372 with 8034 at 1,1,2,2
2634 Id : 9076, {_}: multiply ?2725 (multiply (inverse (inverse (multiply ?2728 (multiply (multiply (inverse ?2728) (multiply (inverse ?2725) ?2729)) ?2727)))) (inverse ?2727)) =>= ?2729 [2727, 2729, 2728, 2725] by Demod 8463 with 8920 at 2,2
2635 Id : 390, {_}: multiply (inverse ?2853) (multiply ?2853 (inverse (multiply (multiply (inverse ?2854) (multiply ?2854 ?2855)) (inverse (multiply ?2856 (multiply (multiply (inverse ?2856) ?2857) ?2855)))))) =>= ?2857 [2857, 2856, 2855, 2854, 2853] by Super 63 with 296 at 1,1,2,2,2
2636 Id : 8444, {_}: inverse (inverse (inverse (multiply (multiply (inverse ?2854) (multiply ?2854 ?2855)) (inverse (multiply ?2856 (multiply (multiply (inverse ?2856) ?2857) ?2855)))))) =>= ?2857 [2857, 2856, 2855, 2854] by Demod 390 with 8034 at 2
2637 Id : 8445, {_}: inverse (inverse (inverse (multiply (inverse (inverse ?2855)) (inverse (multiply ?2856 (multiply (multiply (inverse ?2856) ?2857) ?2855)))))) =>= ?2857 [2857, 2856, 2855] by Demod 8444 with 8034 at 1,1,1,1,2
2638 Id : 8890, {_}: multiply (inverse (inverse (multiply ?2856 (multiply (multiply (inverse ?2856) ?2857) ?2855)))) (inverse ?2855) =>= ?2857 [2855, 2857, 2856] by Demod 8445 with 8626 at 2
2639 Id : 9094, {_}: multiply ?2725 (multiply (inverse ?2725) ?2729) =>= ?2729 [2729, 2725] by Demod 9076 with 8890 at 2,2
2640 Id : 9490, {_}: ?47430 =<= inverse (inverse ?47430) [47430] by Demod 9489 with 9094 at 2
2641 Id : 9856, {_}: inverse (multiply ?48264 ?48265) =<= multiply (inverse ?48265) (inverse ?48264) [48265, 48264] by Super 8920 with 9490 at 1,1,2
2642 Id : 9873, {_}: inverse (multiply ?48336 (inverse ?48337)) =>= multiply ?48337 (inverse ?48336) [48337, 48336] by Super 9856 with 9490 at 1,3
2643 Id : 9977, {_}: multiply ?26 (multiply (multiply ?28 (inverse (multiply (multiply (multiply (multiply (inverse ?27) (multiply (multiply (inverse ?30) ?26) ?28)) ?29) ?31) (inverse (multiply ?29 ?31))))) (inverse ?27)) =>= ?30 [31, 29, 30, 27, 28, 26] by Demod 9089 with 9873 at 2,2
2644 Id : 9978, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (inverse (multiply (multiply (multiply (inverse ?27) (multiply (multiply (inverse ?30) ?26) ?28)) ?29) ?31)))) (inverse ?27)) =>= ?30 [30, 27, 31, 29, 28, 26] by Demod 9977 with 9873 at 2,1,2,2
2645 Id : 9747, {_}: inverse (multiply ?47897 ?47898) =<= multiply (inverse ?47898) (inverse ?47897) [47898, 47897] by Super 8920 with 9490 at 1,1,2
2646 Id : 10105, {_}: multiply ?48780 (inverse (multiply ?48781 ?48780)) =>= inverse ?48781 [48781, 48780] by Super 9094 with 9747 at 2,2
2647 Id : 9838, {_}: multiply ?48200 (inverse (multiply ?48201 ?48200)) =>= inverse ?48201 [48201, 48200] by Super 9094 with 9747 at 2,2
2648 Id : 10114, {_}: multiply (inverse (multiply ?48810 ?48811)) (inverse (inverse ?48810)) =>= inverse ?48811 [48811, 48810] by Super 10105 with 9838 at 1,2,2
2649 Id : 10186, {_}: inverse (multiply (inverse ?48810) (multiply ?48810 ?48811)) =>= inverse ?48811 [48811, 48810] by Demod 10114 with 9747 at 2
2650 Id : 10420, {_}: multiply (inverse (multiply ?49364 ?49365)) ?49364 =>= inverse ?49365 [49365, 49364] by Demod 10186 with 8920 at 2
2651 Id : 8452, {_}: inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?570) ?571)) ?572) (inverse (multiply ?570 ?572))))) =>= ?571 [572, 571, 570] by Demod 63 with 8034 at 2
2652 Id : 9075, {_}: inverse (inverse (inverse (multiply (multiply (multiply (inverse ?571) ?570) ?572) (inverse (multiply ?570 ?572))))) =>= ?571 [572, 570, 571] by Demod 8452 with 8920 at 1,1,1,1,1,2
2653 Id : 9732, {_}: inverse (multiply (multiply (multiply (inverse ?571) ?570) ?572) (inverse (multiply ?570 ?572))) =>= ?571 [572, 570, 571] by Demod 9075 with 9490 at 2
2654 Id : 9981, {_}: multiply (multiply ?570 ?572) (inverse (multiply (multiply (inverse ?571) ?570) ?572)) =>= ?571 [571, 572, 570] by Demod 9732 with 9873 at 2
2655 Id : 10433, {_}: multiply (inverse ?49416) (multiply ?49417 ?49418) =<= inverse (inverse (multiply (multiply (inverse ?49416) ?49417) ?49418)) [49418, 49417, 49416] by Super 10420 with 9981 at 1,1,2
2656 Id : 10496, {_}: multiply (inverse ?49416) (multiply ?49417 ?49418) =<= multiply (multiply (inverse ?49416) ?49417) ?49418 [49418, 49417, 49416] by Demod 10433 with 9490 at 3
2657 Id : 10879, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (inverse (multiply (multiply (inverse ?27) (multiply (multiply (multiply (inverse ?30) ?26) ?28) ?29)) ?31)))) (inverse ?27)) =>= ?30 [30, 27, 31, 29, 28, 26] by Demod 9978 with 10496 at 1,1,2,2,1,2,2
2658 Id : 10880, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (inverse (multiply (inverse ?27) (multiply (multiply (multiply (multiply (inverse ?30) ?26) ?28) ?29) ?31))))) (inverse ?27)) =>= ?30 [30, 27, 31, 29, 28, 26] by Demod 10879 with 10496 at 1,2,2,1,2,2
2659 Id : 10881, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (inverse (multiply (inverse ?27) (multiply (multiply (multiply (inverse ?30) (multiply ?26 ?28)) ?29) ?31))))) (inverse ?27)) =>= ?30 [30, 27, 31, 29, 28, 26] by Demod 10880 with 10496 at 1,1,2,1,2,2,1,2,2
2660 Id : 10882, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (inverse (multiply (inverse ?27) (multiply (multiply (inverse ?30) (multiply (multiply ?26 ?28) ?29)) ?31))))) (inverse ?27)) =>= ?30 [30, 27, 31, 29, 28, 26] by Demod 10881 with 10496 at 1,2,1,2,2,1,2,2
2661 Id : 10883, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (inverse (multiply (inverse ?27) (multiply (inverse ?30) (multiply (multiply (multiply ?26 ?28) ?29) ?31)))))) (inverse ?27)) =>= ?30 [30, 27, 31, 29, 28, 26] by Demod 10882 with 10496 at 2,1,2,2,1,2,2
2662 Id : 10900, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (multiply (inverse (multiply (inverse ?30) (multiply (multiply (multiply ?26 ?28) ?29) ?31))) ?27))) (inverse ?27)) =>= ?30 [27, 30, 31, 29, 28, 26] by Demod 10883 with 8920 at 2,2,1,2,2
2663 Id : 10901, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (multiply (multiply (inverse (multiply (multiply (multiply ?26 ?28) ?29) ?31)) ?30) ?27))) (inverse ?27)) =>= ?30 [27, 30, 31, 29, 28, 26] by Demod 10900 with 8920 at 1,2,2,1,2,2
2664 Id : 10902, {_}: multiply ?26 (multiply (multiply ?28 (multiply (multiply ?29 ?31) (multiply (inverse (multiply (multiply (multiply ?26 ?28) ?29) ?31)) (multiply ?30 ?27)))) (inverse ?27)) =>= ?30 [27, 30, 31, 29, 28, 26] by Demod 10901 with 10496 at 2,2,1,2,2
2665 Id : 3348, {_}: multiply (inverse (inverse (inverse ?21394))) ?21394 =?= inverse (multiply (inverse (multiply (inverse ?21395) (multiply ?21395 ?21396))) ?21396) [21396, 21395, 21394] by Super 3012 with 3171 at 2
2666 Id : 8467, {_}: multiply (inverse (inverse (inverse ?21394))) ?21394 =?= inverse (multiply (inverse (inverse (inverse ?21396))) ?21396) [21396, 21394] by Demod 3348 with 8034 at 1,1,1,3
2667 Id : 9090, {_}: multiply (inverse (inverse (inverse ?21394))) ?21394 =?= multiply (inverse ?21396) (inverse (inverse ?21396)) [21396, 21394] by Demod 8467 with 8920 at 3
2668 Id : 9730, {_}: multiply (inverse ?21394) ?21394 =?= multiply (inverse ?21396) (inverse (inverse ?21396)) [21396, 21394] by Demod 9090 with 9490 at 1,2
2669 Id : 9731, {_}: multiply (inverse ?21394) ?21394 =?= multiply (inverse ?21396) ?21396 [21396, 21394] by Demod 9730 with 9490 at 2,3
2670 Id : 9744, {_}: multiply (inverse ?47887) ?47887 =?= multiply ?47888 (inverse ?47888) [47888, 47887] by Super 9731 with 9490 at 1,3
2671 Id : 12085, {_}: multiply ?51983 (multiply (multiply ?51984 (multiply (multiply ?51985 ?51986) (multiply ?51987 (inverse ?51987)))) (inverse ?51986)) =>= multiply (multiply ?51983 ?51984) ?51985 [51987, 51986, 51985, 51984, 51983] by Super 10902 with 9744 at 2,2,1,2,2
2672 Id : 7945, {_}: multiply ?43641 (multiply ?43642 (inverse ?43642)) =>= inverse (inverse ?43641) [43642, 43641] by Super 7438 with 7813 at 1,2
2673 Id : 9720, {_}: multiply ?43641 (multiply ?43642 (inverse ?43642)) =>= ?43641 [43642, 43641] by Demod 7945 with 9490 at 3
2674 Id : 12316, {_}: multiply ?51983 (multiply (multiply ?51984 (multiply ?51985 ?51986)) (inverse ?51986)) =>= multiply (multiply ?51983 ?51984) ?51985 [51986, 51985, 51984, 51983] by Demod 12085 with 9720 at 2,1,2,2
2675 Id : 9708, {_}: inverse (multiply (multiply (inverse (inverse (inverse ?2843))) ?2844) (inverse (multiply ?2845 ?2844))) =>= multiply ?2845 ?2843 [2845, 2844, 2843] by Demod 8459 with 9490 at 2
2676 Id : 9709, {_}: inverse (multiply (multiply (inverse ?2843) ?2844) (inverse (multiply ?2845 ?2844))) =>= multiply ?2845 ?2843 [2845, 2844, 2843] by Demod 9708 with 9490 at 1,1,1,2
2677 Id : 9983, {_}: multiply (multiply ?2845 ?2844) (inverse (multiply (inverse ?2843) ?2844)) =>= multiply ?2845 ?2843 [2843, 2844, 2845] by Demod 9709 with 9873 at 2
2678 Id : 9984, {_}: multiply (multiply ?2845 ?2844) (multiply (inverse ?2844) ?2843) =>= multiply ?2845 ?2843 [2843, 2844, 2845] by Demod 9983 with 8920 at 2,2
2679 Id : 10187, {_}: multiply (inverse (multiply ?48810 ?48811)) ?48810 =>= inverse ?48811 [48811, 48810] by Demod 10186 with 8920 at 2
2680 Id : 10411, {_}: multiply (multiply ?49319 (multiply ?49320 ?49321)) (inverse ?49321) =>= multiply ?49319 ?49320 [49321, 49320, 49319] by Super 9984 with 10187 at 2,2
2681 Id : 21362, {_}: multiply ?51983 (multiply ?51984 ?51985) =?= multiply (multiply ?51983 ?51984) ?51985 [51985, 51984, 51983] by Demod 12316 with 10411 at 2,2
2682 Id : 21800, {_}: multiply a (multiply b c) === multiply a (multiply b c) [] by Demod 1 with 21362 at 3
2683 Id : 1, {_}: multiply a (multiply b c) =<= multiply (multiply a b) c [] by prove_associativity
2684 % SZS output end CNFRefutation for GRP014-1.p
2685 6281: solved GRP014-1.p in 6.232389 using nrkbo
2686 !! infer_left 90 0.0001 0.0000 0.0000
2687 !! infer_right 91 28.3701 1.0092 0.3118
2688 !! simplify_goal 91 0.0067 0.0003 0.0001
2689 !! keep_simplified 356 1.6497 0.4579 0.0046
2690 !! simplification_step 466 1.6468 0.4030 0.0035
2691 !! simplify 16619 24.7555 0.4087 0.0015
2692 !! orphan_murder 700 0.0151 0.0013 0.0000
2693 !! is_subsumed 13882 3.1903 0.4002 0.0002
2694 !! build_new_clause 12799 3.1443 0.4042 0.0002
2695 !! demodulate 16457 21.5145 0.4087 0.0013
2696 !! demod 224678 18.7917 0.4042 0.0001
2697 !! demod.apply_subst 127856 1.0956 0.4001 0.0000
2698 !! demod.compare_terms 54245 2.7719 0.4042 0.0001
2699 !! demod.retrieve_generalizations 224678 6.6579 0.4004 0.0000
2700 !! demod.unify 203862 5.1394 0.4005 0.0000
2701 !! build_clause 22540 2.7104 0.4042 0.0001
2702 !! compare_terms(nrkbo) 85257 3.9018 0.4005 0.0000
2703 !! compare_terms(nrkbo) 2 0.0001 0.0000 0.0000
2705 6297: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2706 6297: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2708 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2709 [8, 7, 6] by associativity ?6 ?7 ?8
2713 multiply (inverse ?10) (multiply (inverse ?11) (multiply ?10 ?11))
2714 [11, 10] by name ?10 ?11
2716 commutator (commutator ?13 ?14) ?15
2718 commutator ?13 (commutator ?14 ?15)
2719 [15, 14, 13] by associativity_of_commutator ?13 ?14 ?15
2722 multiply a (commutator b c) =<= multiply (commutator b c) a
2724 % SZS status Timeout for GRP024-5.p
2726 6324: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2727 6324: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2729 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2730 [8, 7, 6] by associativity ?6 ?7 ?8
2731 6324: Id : 5, {_}: inverse identity =>= identity [] by inverse_of_identity
2732 6324: Id : 6, {_}: inverse (inverse ?11) =>= ?11 [11] by inverse_involution ?11
2734 inverse (multiply ?13 ?14) =<= multiply (inverse ?14) (inverse ?13)
2735 [14, 13] by inverse_product_lemma ?13 ?14
2736 6324: Id : 8, {_}: intersection ?16 ?16 =>= ?16 [16] by intersection_idempotent ?16
2737 6324: Id : 9, {_}: union ?18 ?18 =>= ?18 [18] by union_idempotent ?18
2739 intersection ?20 ?21 =<->= intersection ?21 ?20
2740 [21, 20] by intersection_commutative ?20 ?21
2742 union ?23 ?24 =<->= union ?24 ?23
2743 [24, 23] by union_commutative ?23 ?24
2745 intersection ?26 (intersection ?27 ?28)
2747 intersection (intersection ?26 ?27) ?28
2748 [28, 27, 26] by intersection_associative ?26 ?27 ?28
2750 union ?30 (union ?31 ?32) =?= union (union ?30 ?31) ?32
2751 [32, 31, 30] by union_associative ?30 ?31 ?32
2753 union (intersection ?34 ?35) ?35 =>= ?35
2754 [35, 34] by union_intersection_absorbtion ?34 ?35
2756 intersection (union ?37 ?38) ?38 =>= ?38
2757 [38, 37] by intersection_union_absorbtion ?37 ?38
2759 multiply ?40 (union ?41 ?42)
2761 union (multiply ?40 ?41) (multiply ?40 ?42)
2762 [42, 41, 40] by multiply_union1 ?40 ?41 ?42
2764 multiply ?44 (intersection ?45 ?46)
2766 intersection (multiply ?44 ?45) (multiply ?44 ?46)
2767 [46, 45, 44] by multiply_intersection1 ?44 ?45 ?46
2769 multiply (union ?48 ?49) ?50
2771 union (multiply ?48 ?50) (multiply ?49 ?50)
2772 [50, 49, 48] by multiply_union2 ?48 ?49 ?50
2774 multiply (intersection ?52 ?53) ?54
2776 intersection (multiply ?52 ?54) (multiply ?53 ?54)
2777 [54, 53, 52] by multiply_intersection2 ?52 ?53 ?54
2779 positive_part ?56 =<= union ?56 identity
2780 [56] by positive_part ?56
2782 negative_part ?58 =<= intersection ?58 identity
2783 [58] by negative_part ?58
2786 multiply (positive_part a) (negative_part a) =>= a
2790 Found proof, 27.216107s
2791 % SZS status Unsatisfiable for GRP114-1.p
2792 % SZS output start CNFRefutation for GRP114-1.p
2793 Id : 207, {_}: multiply (union ?586 ?587) ?588 =<= union (multiply ?586 ?588) (multiply ?587 ?588) [588, 587, 586] by multiply_union2 ?586 ?587 ?588
2794 Id : 8, {_}: intersection ?16 ?16 =>= ?16 [16] by intersection_idempotent ?16
2795 Id : 12, {_}: intersection ?26 (intersection ?27 ?28) =?= intersection (intersection ?26 ?27) ?28 [28, 27, 26] by intersection_associative ?26 ?27 ?28
2796 Id : 17, {_}: multiply ?44 (intersection ?45 ?46) =<= intersection (multiply ?44 ?45) (multiply ?44 ?46) [46, 45, 44] by multiply_intersection1 ?44 ?45 ?46
2797 Id : 14, {_}: union (intersection ?34 ?35) ?35 =>= ?35 [35, 34] by union_intersection_absorbtion ?34 ?35
2798 Id : 13, {_}: union ?30 (union ?31 ?32) =?= union (union ?30 ?31) ?32 [32, 31, 30] by union_associative ?30 ?31 ?32
2799 Id : 15, {_}: intersection (union ?37 ?38) ?38 =>= ?38 [38, 37] by intersection_union_absorbtion ?37 ?38
2800 Id : 237, {_}: multiply (intersection ?663 ?664) ?665 =<= intersection (multiply ?663 ?665) (multiply ?664 ?665) [665, 664, 663] by multiply_intersection2 ?663 ?664 ?665
2801 Id : 21, {_}: negative_part ?58 =<= intersection ?58 identity [58] by negative_part ?58
2802 Id : 10, {_}: intersection ?20 ?21 =<->= intersection ?21 ?20 [21, 20] by intersection_commutative ?20 ?21
2803 Id : 176, {_}: multiply ?512 (intersection ?513 ?514) =<= intersection (multiply ?512 ?513) (multiply ?512 ?514) [514, 513, 512] by multiply_intersection1 ?512 ?513 ?514
2804 Id : 7, {_}: inverse (multiply ?13 ?14) =<= multiply (inverse ?14) (inverse ?13) [14, 13] by inverse_product_lemma ?13 ?14
2805 Id : 11, {_}: union ?23 ?24 =<->= union ?24 ?23 [24, 23] by union_commutative ?23 ?24
2806 Id : 20, {_}: positive_part ?56 =<= union ?56 identity [56] by positive_part ?56
2807 Id : 5, {_}: inverse identity =>= identity [] by inverse_of_identity
2808 Id : 16, {_}: multiply ?40 (union ?41 ?42) =<= union (multiply ?40 ?41) (multiply ?40 ?42) [42, 41, 40] by multiply_union1 ?40 ?41 ?42
2809 Id : 6, {_}: inverse (inverse ?11) =>= ?11 [11] by inverse_involution ?11
2810 Id : 54, {_}: inverse (multiply ?143 ?144) =<= multiply (inverse ?144) (inverse ?143) [144, 143] by inverse_product_lemma ?143 ?144
2811 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2812 Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2813 Id : 26, {_}: multiply (multiply ?67 ?68) ?69 =?= multiply ?67 (multiply ?68 ?69) [69, 68, 67] by associativity ?67 ?68 ?69
2814 Id : 34, {_}: multiply identity ?99 =<= multiply (inverse ?100) (multiply ?100 ?99) [100, 99] by Super 26 with 3 at 1,2
2815 Id : 5826, {_}: ?7344 =<= multiply (inverse ?7345) (multiply ?7345 ?7344) [7345, 7344] by Demod 34 with 2 at 2
2816 Id : 56, {_}: inverse (multiply (inverse ?148) ?149) =>= multiply (inverse ?149) ?148 [149, 148] by Super 54 with 6 at 2,3
2817 Id : 55, {_}: inverse (multiply identity ?146) =<= multiply (inverse ?146) identity [146] by Super 54 with 5 at 2,3
2818 Id : 358, {_}: inverse ?856 =<= multiply (inverse ?856) identity [856] by Demod 55 with 2 at 1,2
2819 Id : 360, {_}: inverse (inverse ?859) =<= multiply ?859 identity [859] by Super 358 with 6 at 1,3
2820 Id : 375, {_}: ?859 =<= multiply ?859 identity [859] by Demod 360 with 6 at 2
2821 Id : 380, {_}: multiply ?870 (union ?871 identity) =?= union (multiply ?870 ?871) ?870 [871, 870] by Super 16 with 375 at 2,3
2822 Id : 2246, {_}: multiply ?3132 (positive_part ?3133) =<= union (multiply ?3132 ?3133) ?3132 [3133, 3132] by Demod 380 with 20 at 2,2
2823 Id : 2248, {_}: multiply (inverse ?3137) (positive_part ?3137) =>= union identity (inverse ?3137) [3137] by Super 2246 with 3 at 1,3
2824 Id : 266, {_}: positive_part ?724 =<= union identity ?724 [724] by Super 11 with 20 at 2
2825 Id : 2283, {_}: multiply (inverse ?3137) (positive_part ?3137) =>= positive_part (inverse ?3137) [3137] by Demod 2248 with 266 at 3
2826 Id : 2301, {_}: inverse (positive_part (inverse ?3182)) =<= multiply (inverse (positive_part ?3182)) ?3182 [3182] by Super 56 with 2283 at 1,2
2827 Id : 5841, {_}: ?7382 =<= multiply (inverse (inverse (positive_part ?7382))) (inverse (positive_part (inverse ?7382))) [7382] by Super 5826 with 2301 at 2,3
2828 Id : 5866, {_}: ?7382 =<= inverse (multiply (positive_part (inverse ?7382)) (inverse (positive_part ?7382))) [7382] by Demod 5841 with 7 at 3
2829 Id : 58, {_}: inverse (multiply ?153 (inverse ?154)) =>= multiply ?154 (inverse ?153) [154, 153] by Super 54 with 6 at 1,3
2830 Id : 5867, {_}: ?7382 =<= multiply (positive_part ?7382) (inverse (positive_part (inverse ?7382))) [7382] by Demod 5866 with 58 at 3
2831 Id : 183, {_}: multiply (inverse ?539) (intersection ?539 ?540) =>= intersection identity (multiply (inverse ?539) ?540) [540, 539] by Super 176 with 3 at 1,3
2832 Id : 283, {_}: negative_part ?752 =<= intersection identity ?752 [752] by Super 10 with 21 at 2
2833 Id : 6079, {_}: multiply (inverse ?539) (intersection ?539 ?540) =>= negative_part (multiply (inverse ?539) ?540) [540, 539] by Demod 183 with 283 at 3
2834 Id : 239, {_}: multiply (intersection ?670 (inverse ?671)) ?671 =>= intersection (multiply ?670 ?671) identity [671, 670] by Super 237 with 3 at 2,3
2835 Id : 258, {_}: multiply (intersection ?670 (inverse ?671)) ?671 =>= intersection identity (multiply ?670 ?671) [671, 670] by Demod 239 with 10 at 3
2836 Id : 11314, {_}: multiply (intersection ?670 (inverse ?671)) ?671 =>= negative_part (multiply ?670 ?671) [671, 670] by Demod 258 with 283 at 3
2837 Id : 268, {_}: union ?729 (union ?730 identity) =>= positive_part (union ?729 ?730) [730, 729] by Super 13 with 20 at 3
2838 Id : 278, {_}: union ?729 (positive_part ?730) =>= positive_part (union ?729 ?730) [730, 729] by Demod 268 with 20 at 2,2
2839 Id : 33891, {_}: intersection (positive_part (union ?35597 ?35598)) (positive_part ?35598) =>= positive_part ?35598 [35598, 35597] by Super 15 with 278 at 1,2
2840 Id : 406, {_}: multiply ?870 (positive_part ?871) =<= union (multiply ?870 ?871) ?870 [871, 870] by Demod 380 with 20 at 2,2
2841 Id : 244, {_}: multiply (intersection (inverse ?690) ?691) ?690 =>= intersection identity (multiply ?691 ?690) [691, 690] by Super 237 with 3 at 1,3
2842 Id : 9354, {_}: multiply (intersection (inverse ?10413) ?10414) ?10413 =>= negative_part (multiply ?10414 ?10413) [10414, 10413] by Demod 244 with 283 at 3
2843 Id : 9364, {_}: multiply (negative_part (inverse ?10443)) ?10443 =>= negative_part (multiply identity ?10443) [10443] by Super 9354 with 21 at 1,2
2844 Id : 9412, {_}: multiply (negative_part (inverse ?10443)) ?10443 =>= negative_part ?10443 [10443] by Demod 9364 with 2 at 1,3
2845 Id : 9460, {_}: inverse (negative_part (inverse ?10506)) =<= multiply ?10506 (inverse (negative_part (inverse (inverse ?10506)))) [10506] by Super 58 with 9412 at 1,2
2846 Id : 9487, {_}: inverse (negative_part (inverse ?10506)) =<= multiply ?10506 (inverse (negative_part ?10506)) [10506] by Demod 9460 with 6 at 1,1,2,3
2847 Id : 9638, {_}: multiply ?10688 (positive_part (inverse (negative_part ?10688))) =>= union (inverse (negative_part (inverse ?10688))) ?10688 [10688] by Super 406 with 9487 at 1,3
2848 Id : 329, {_}: union (negative_part ?811) ?811 =>= ?811 [811] by Super 14 with 283 at 1,2
2849 Id : 387, {_}: multiply ?887 (intersection ?888 identity) =?= intersection (multiply ?887 ?888) ?887 [888, 887] by Super 17 with 375 at 2,3
2850 Id : 1761, {_}: multiply ?2622 (negative_part ?2623) =<= intersection (multiply ?2622 ?2623) ?2622 [2623, 2622] by Demod 387 with 21 at 2,2
2851 Id : 1763, {_}: multiply (inverse ?2627) (negative_part ?2627) =>= intersection identity (inverse ?2627) [2627] by Super 1761 with 3 at 1,3
2852 Id : 1811, {_}: multiply (inverse ?2696) (negative_part ?2696) =>= negative_part (inverse ?2696) [2696] by Demod 1763 with 283 at 3
2853 Id : 285, {_}: intersection ?757 (intersection ?758 identity) =>= negative_part (intersection ?757 ?758) [758, 757] by Super 12 with 21 at 3
2854 Id : 522, {_}: intersection ?1051 (negative_part ?1052) =>= negative_part (intersection ?1051 ?1052) [1052, 1051] by Demod 285 with 21 at 2,2
2855 Id : 282, {_}: negative_part identity =>= identity [] by Super 8 with 21 at 2
2856 Id : 523, {_}: intersection ?1054 identity =<= negative_part (intersection ?1054 identity) [1054] by Super 522 with 282 at 2,2
2857 Id : 536, {_}: negative_part ?1054 =<= negative_part (intersection ?1054 identity) [1054] by Demod 523 with 21 at 2
2858 Id : 537, {_}: negative_part ?1054 =<= negative_part (negative_part ?1054) [1054] by Demod 536 with 21 at 1,3
2859 Id : 1816, {_}: multiply (inverse (negative_part ?2707)) (negative_part ?2707) =>= negative_part (inverse (negative_part ?2707)) [2707] by Super 1811 with 537 at 2,2
2860 Id : 1841, {_}: identity =<= negative_part (inverse (negative_part ?2707)) [2707] by Demod 1816 with 3 at 2
2861 Id : 1893, {_}: union identity (inverse (negative_part ?2776)) =>= inverse (negative_part ?2776) [2776] by Super 329 with 1841 at 1,2
2862 Id : 1910, {_}: positive_part (inverse (negative_part ?2776)) =>= inverse (negative_part ?2776) [2776] by Demod 1893 with 266 at 2
2863 Id : 9665, {_}: multiply ?10688 (inverse (negative_part ?10688)) =<= union (inverse (negative_part (inverse ?10688))) ?10688 [10688] by Demod 9638 with 1910 at 2,2
2864 Id : 9666, {_}: inverse (negative_part (inverse ?10688)) =<= union (inverse (negative_part (inverse ?10688))) ?10688 [10688] by Demod 9665 with 9487 at 2
2865 Id : 33962, {_}: intersection (positive_part (inverse (negative_part (inverse ?35825)))) (positive_part ?35825) =>= positive_part ?35825 [35825] by Super 33891 with 9666 at 1,1,2
2866 Id : 34170, {_}: intersection (inverse (negative_part (inverse ?35825))) (positive_part ?35825) =>= positive_part ?35825 [35825] by Demod 33962 with 1910 at 1,2
2867 Id : 34171, {_}: intersection (positive_part ?35825) (inverse (negative_part (inverse ?35825))) =>= positive_part ?35825 [35825] by Demod 34170 with 10 at 2
2868 Id : 34220, {_}: multiply (positive_part ?35918) (negative_part (inverse ?35918)) =<= negative_part (multiply (positive_part ?35918) (negative_part (inverse ?35918))) [35918] by Super 11314 with 34171 at 1,2
2869 Id : 388, {_}: multiply ?890 (intersection identity ?891) =?= intersection ?890 (multiply ?890 ?891) [891, 890] by Super 17 with 375 at 1,3
2870 Id : 401, {_}: multiply ?890 (negative_part ?891) =<= intersection ?890 (multiply ?890 ?891) [891, 890] by Demod 388 with 283 at 2,2
2871 Id : 214, {_}: multiply (union (inverse ?613) ?614) ?613 =>= union identity (multiply ?614 ?613) [614, 613] by Super 207 with 3 at 1,3
2872 Id : 6313, {_}: multiply (union (inverse ?8050) ?8051) ?8050 =>= positive_part (multiply ?8051 ?8050) [8051, 8050] by Demod 214 with 266 at 3
2873 Id : 6323, {_}: multiply (positive_part (inverse ?8080)) ?8080 =>= positive_part (multiply identity ?8080) [8080] by Super 6313 with 20 at 1,2
2874 Id : 6397, {_}: multiply (positive_part (inverse ?8149)) ?8149 =>= positive_part ?8149 [8149] by Demod 6323 with 2 at 1,3
2875 Id : 6399, {_}: multiply (positive_part ?8152) (inverse ?8152) =>= positive_part (inverse ?8152) [8152] by Super 6397 with 6 at 1,1,2
2876 Id : 6448, {_}: multiply (positive_part ?8169) (negative_part (inverse ?8169)) =>= intersection (positive_part ?8169) (positive_part (inverse ?8169)) [8169] by Super 401 with 6399 at 2,3
2877 Id : 34313, {_}: intersection (positive_part ?35918) (positive_part (inverse ?35918)) =<= negative_part (multiply (positive_part ?35918) (negative_part (inverse ?35918))) [35918] by Demod 34220 with 6448 at 2
2878 Id : 281, {_}: negative_part (union ?749 identity) =>= identity [749] by Super 15 with 21 at 2
2879 Id : 297, {_}: negative_part (positive_part ?749) =>= identity [749] by Demod 281 with 20 at 1,2
2880 Id : 524, {_}: intersection ?1056 identity =<= negative_part (intersection ?1056 (positive_part ?1057)) [1057, 1056] by Super 522 with 297 at 2,2
2881 Id : 538, {_}: negative_part ?1056 =<= negative_part (intersection ?1056 (positive_part ?1057)) [1057, 1056] by Demod 524 with 21 at 2
2882 Id : 400, {_}: multiply ?887 (negative_part ?888) =<= intersection (multiply ?887 ?888) ?887 [888, 887] by Demod 387 with 21 at 2,2
2883 Id : 1758, {_}: negative_part (multiply (positive_part ?2613) ?2614) =<= negative_part (multiply (positive_part ?2613) (negative_part ?2614)) [2614, 2613] by Super 538 with 400 at 1,3
2884 Id : 34314, {_}: intersection (positive_part ?35918) (positive_part (inverse ?35918)) =>= negative_part (multiply (positive_part ?35918) (inverse ?35918)) [35918] by Demod 34313 with 1758 at 3
2885 Id : 34315, {_}: intersection (positive_part ?35918) (positive_part (inverse ?35918)) =>= negative_part (positive_part (inverse ?35918)) [35918] by Demod 34314 with 6399 at 1,3
2886 Id : 34316, {_}: intersection (positive_part ?35918) (positive_part (inverse ?35918)) =>= identity [35918] by Demod 34315 with 297 at 3
2887 Id : 34511, {_}: multiply (inverse (positive_part ?36106)) identity =<= negative_part (multiply (inverse (positive_part ?36106)) (positive_part (inverse ?36106))) [36106] by Super 6079 with 34316 at 2,2
2888 Id : 34643, {_}: inverse (positive_part ?36106) =<= negative_part (multiply (inverse (positive_part ?36106)) (positive_part (inverse ?36106))) [36106] by Demod 34511 with 375 at 2
2889 Id : 40, {_}: ?99 =<= multiply (inverse ?100) (multiply ?100 ?99) [100, 99] by Demod 34 with 2 at 2
2890 Id : 6447, {_}: inverse ?8167 =<= multiply (inverse (positive_part ?8167)) (positive_part (inverse ?8167)) [8167] by Super 40 with 6399 at 2,3
2891 Id : 34644, {_}: inverse (positive_part ?36106) =>= negative_part (inverse ?36106) [36106] by Demod 34643 with 6447 at 1,3
2892 Id : 34809, {_}: ?7382 =<= multiply (positive_part ?7382) (negative_part (inverse (inverse ?7382))) [7382] by Demod 5867 with 34644 at 2,3
2893 Id : 34923, {_}: ?7382 =<= multiply (positive_part ?7382) (negative_part ?7382) [7382] by Demod 34809 with 6 at 1,2,3
2894 Id : 35233, {_}: a === a [] by Demod 1 with 34923 at 2
2895 Id : 1, {_}: multiply (positive_part a) (negative_part a) =>= a [] by prove_product
2896 % SZS output end CNFRefutation for GRP114-1.p
2897 6327: solved GRP114-1.p in 5.960371 using nrkbo
2898 !! infer_left 206 0.0003 0.0000 0.0000
2899 !! infer_right 226 19.6626 0.7475 0.0870
2900 !! simplify_goal 207 0.0106 0.0002 0.0001
2901 !! keep_simplified 734 7.0482 0.4168 0.0096
2902 !! simplification_step 798 7.0450 0.4090 0.0088
2903 !! simplify 41265 18.8550 0.4125 0.0005
2904 !! orphan_murder 743 0.4338 0.4002 0.0006
2905 !! is_subsumed 34257 2.2202 0.4004 0.0001
2906 !! build_new_clause 12395 2.5714 0.4087 0.0002
2907 !! demodulate 40852 15.8027 0.4125 0.0004
2908 !! demod 246005 13.2771 0.4122 0.0001
2909 !! demod.apply_subst 115376 0.6332 0.4002 0.0000
2910 !! demod.compare_terms 36766 3.0205 0.4033 0.0001
2911 !! demod.retrieve_generalizations 246005 4.2731 0.4003 0.0000
2912 !! demod.unify 116081 1.5426 0.4121 0.0000
2913 !! build_clause 35392 3.2760 0.4087 0.0001
2914 !! compare_terms(nrkbo) 74415 4.4450 0.4033 0.0001
2915 !! compare_terms(nrkbo) 21 0.0002 0.0000 0.0000
2917 6351: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2918 6351: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2920 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2921 [8, 7, 6] by associativity ?6 ?7 ?8
2923 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
2924 [11, 10] by symmetry_of_glb ?10 ?11
2926 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
2927 [14, 13] by symmetry_of_lub ?13 ?14
2929 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2931 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2932 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2934 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2936 least_upper_bound (least_upper_bound ?20 ?21) ?22
2937 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2938 6351: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2940 greatest_lower_bound ?26 ?26 =>= ?26
2941 [26] by idempotence_of_gld ?26
2943 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
2944 [29, 28] by lub_absorbtion ?28 ?29
2946 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
2947 [32, 31] by glb_absorbtion ?31 ?32
2949 multiply ?34 (least_upper_bound ?35 ?36)
2951 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
2952 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
2954 multiply ?38 (greatest_lower_bound ?39 ?40)
2956 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
2957 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2959 multiply (least_upper_bound ?42 ?43) ?44
2961 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
2962 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2964 multiply (greatest_lower_bound ?46 ?47) ?48
2966 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
2967 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2970 least_upper_bound a (greatest_lower_bound b c)
2972 greatest_lower_bound (least_upper_bound a b) (least_upper_bound a c)
2974 % SZS status Timeout for GRP164-1.p
2976 6385: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2977 6385: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2979 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2980 [8, 7, 6] by associativity ?6 ?7 ?8
2982 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
2983 [11, 10] by symmetry_of_glb ?10 ?11
2985 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
2986 [14, 13] by symmetry_of_lub ?13 ?14
2988 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2990 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2991 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2993 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2995 least_upper_bound (least_upper_bound ?20 ?21) ?22
2996 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2997 6385: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2999 greatest_lower_bound ?26 ?26 =>= ?26
3000 [26] by idempotence_of_gld ?26
3002 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3003 [29, 28] by lub_absorbtion ?28 ?29
3005 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3006 [32, 31] by glb_absorbtion ?31 ?32
3008 multiply ?34 (least_upper_bound ?35 ?36)
3010 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3011 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3013 multiply ?38 (greatest_lower_bound ?39 ?40)
3015 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3016 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3018 multiply (least_upper_bound ?42 ?43) ?44
3020 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3021 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3023 multiply (greatest_lower_bound ?46 ?47) ?48
3025 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3026 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3029 greatest_lower_bound a (least_upper_bound b c)
3031 least_upper_bound (greatest_lower_bound a b)
3032 (greatest_lower_bound a c)
3034 % SZS status Timeout for GRP164-2.p
3036 6443: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3037 6443: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3039 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3040 [8, 7, 6] by associativity ?6 ?7 ?8
3042 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3043 [11, 10] by symmetry_of_glb ?10 ?11
3045 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3046 [14, 13] by symmetry_of_lub ?13 ?14
3048 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3050 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3051 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3053 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3055 least_upper_bound (least_upper_bound ?20 ?21) ?22
3056 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3057 6443: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3059 greatest_lower_bound ?26 ?26 =>= ?26
3060 [26] by idempotence_of_gld ?26
3062 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3063 [29, 28] by lub_absorbtion ?28 ?29
3065 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3066 [32, 31] by glb_absorbtion ?31 ?32
3068 multiply ?34 (least_upper_bound ?35 ?36)
3070 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3071 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3073 multiply ?38 (greatest_lower_bound ?39 ?40)
3075 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3076 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3078 multiply (least_upper_bound ?42 ?43) ?44
3080 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3081 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3083 multiply (greatest_lower_bound ?46 ?47) ?48
3085 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3086 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3088 positive_part ?50 =<= least_upper_bound ?50 identity
3091 negative_part ?52 =<= greatest_lower_bound ?52 identity
3094 least_upper_bound ?54 (greatest_lower_bound ?55 ?56)
3096 greatest_lower_bound (least_upper_bound ?54 ?55)
3097 (least_upper_bound ?54 ?56)
3098 [56, 55, 54] by lat4_3 ?54 ?55 ?56
3100 greatest_lower_bound ?58 (least_upper_bound ?59 ?60)
3102 least_upper_bound (greatest_lower_bound ?58 ?59)
3103 (greatest_lower_bound ?58 ?60)
3104 [60, 59, 58] by lat4_4 ?58 ?59 ?60
3107 a =<= multiply (positive_part a) (negative_part a)
3111 Found proof, 42.804636s
3112 % SZS status Unsatisfiable for GRP167-1.p
3113 % SZS output start CNFRefutation for GRP167-1.p
3114 Id : 8, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =<= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3115 Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3116 Id : 185, {_}: multiply (least_upper_bound ?425 ?426) ?427 =<= least_upper_bound (multiply ?425 ?427) (multiply ?426 ?427) [427, 426, 425] by monotony_lub2 ?425 ?426 ?427
3117 Id : 20, {_}: greatest_lower_bound ?58 (least_upper_bound ?59 ?60) =<= least_upper_bound (greatest_lower_bound ?58 ?59) (greatest_lower_bound ?58 ?60) [60, 59, 58] by lat4_4 ?58 ?59 ?60
3118 Id : 19, {_}: least_upper_bound ?54 (greatest_lower_bound ?55 ?56) =<= greatest_lower_bound (least_upper_bound ?54 ?55) (least_upper_bound ?54 ?56) [56, 55, 54] by lat4_3 ?54 ?55 ?56
3119 Id : 11, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
3120 Id : 12, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
3121 Id : 10, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
3122 Id : 7, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =<= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3123 Id : 328, {_}: greatest_lower_bound ?721 (least_upper_bound ?722 ?723) =<= least_upper_bound (greatest_lower_bound ?721 ?722) (greatest_lower_bound ?721 ?723) [723, 722, 721] by lat4_4 ?721 ?722 ?723
3124 Id : 14, {_}: multiply ?38 (greatest_lower_bound ?39 ?40) =<= greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40) [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3125 Id : 6, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
3126 Id : 17, {_}: positive_part ?50 =<= least_upper_bound ?50 identity [50] by lat4_1 ?50
3127 Id : 13, {_}: multiply ?34 (least_upper_bound ?35 ?36) =<= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3128 Id : 18, {_}: negative_part ?52 =<= greatest_lower_bound ?52 identity [52] by lat4_2 ?52
3129 Id : 5, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
3130 Id : 215, {_}: multiply (greatest_lower_bound ?492 ?493) ?494 =<= greatest_lower_bound (multiply ?492 ?494) (multiply ?493 ?494) [494, 493, 492] by monotony_glb2 ?492 ?493 ?494
3131 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3132 Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3133 Id : 25, {_}: multiply (multiply ?69 ?70) ?71 =>= multiply ?69 (multiply ?70 ?71) [71, 70, 69] by associativity ?69 ?70 ?71
3134 Id : 27, {_}: multiply identity ?76 =<= multiply (inverse ?77) (multiply ?77 ?76) [77, 76] by Super 25 with 3 at 1,2
3135 Id : 31, {_}: ?76 =<= multiply (inverse ?77) (multiply ?77 ?76) [77, 76] by Demod 27 with 2 at 2
3136 Id : 219, {_}: multiply (greatest_lower_bound identity ?507) ?508 =<= greatest_lower_bound ?508 (multiply ?507 ?508) [508, 507] by Super 215 with 2 at 1,3
3137 Id : 256, {_}: greatest_lower_bound identity ?562 =>= negative_part ?562 [562] by Super 5 with 18 at 3
3138 Id : 3653, {_}: multiply (negative_part ?5552) ?5553 =<= greatest_lower_bound ?5553 (multiply ?5552 ?5553) [5553, 5552] by Demod 219 with 256 at 1,2
3139 Id : 3655, {_}: multiply (negative_part (inverse ?5557)) ?5557 =>= greatest_lower_bound ?5557 identity [5557] by Super 3653 with 3 at 2,3
3140 Id : 3682, {_}: multiply (negative_part (inverse ?5557)) ?5557 =>= negative_part ?5557 [5557] by Demod 3655 with 18 at 3
3141 Id : 3699, {_}: ?5590 =<= multiply (inverse (negative_part (inverse ?5590))) (negative_part ?5590) [5590] by Super 31 with 3682 at 2,3
3142 Id : 458, {_}: ?912 =<= multiply (inverse ?913) (multiply ?913 ?912) [913, 912] by Demod 27 with 2 at 2
3143 Id : 460, {_}: ?917 =<= multiply (inverse (inverse ?917)) identity [917] by Super 458 with 3 at 2,3
3144 Id : 890, {_}: multiply (inverse (inverse ?1538)) (least_upper_bound ?1539 identity) =<= least_upper_bound (multiply (inverse (inverse ?1538)) ?1539) ?1538 [1539, 1538] by Super 13 with 460 at 2,3
3145 Id : 899, {_}: multiply (inverse (inverse ?1538)) (positive_part ?1539) =<= least_upper_bound (multiply (inverse (inverse ?1538)) ?1539) ?1538 [1539, 1538] by Demod 890 with 17 at 2,2
3146 Id : 900, {_}: multiply (inverse (inverse ?1538)) (positive_part ?1539) =<= least_upper_bound ?1538 (multiply (inverse (inverse ?1538)) ?1539) [1539, 1538] by Demod 899 with 6 at 3
3147 Id : 462, {_}: multiply ?923 ?924 =<= multiply (inverse (inverse ?923)) ?924 [924, 923] by Super 458 with 31 at 2,3
3148 Id : 1464, {_}: ?917 =<= multiply ?917 identity [917] by Demod 460 with 462 at 3
3149 Id : 1465, {_}: inverse (inverse ?2401) =<= multiply ?2401 identity [2401] by Super 1464 with 462 at 3
3150 Id : 1504, {_}: inverse (inverse ?2401) =>= ?2401 [2401] by Demod 1465 with 1464 at 3
3151 Id : 38316, {_}: multiply ?1538 (positive_part ?1539) =<= least_upper_bound ?1538 (multiply (inverse (inverse ?1538)) ?1539) [1539, 1538] by Demod 900 with 1504 at 1,2
3152 Id : 38317, {_}: multiply ?1538 (positive_part ?1539) =<= least_upper_bound ?1538 (multiply ?1538 ?1539) [1539, 1538] by Demod 38316 with 1504 at 1,2,3
3153 Id : 1478, {_}: multiply ?2447 ?2448 =<= multiply (inverse (inverse ?2447)) ?2448 [2448, 2447] by Super 458 with 31 at 2,3
3154 Id : 1480, {_}: multiply ?2452 (inverse ?2452) =>= identity [2452] by Super 1478 with 3 at 3
3155 Id : 1526, {_}: multiply ?2495 (greatest_lower_bound ?2496 (inverse ?2495)) =>= greatest_lower_bound (multiply ?2495 ?2496) identity [2496, 2495] by Super 14 with 1480 at 2,3
3156 Id : 1539, {_}: multiply ?2495 (greatest_lower_bound ?2496 (inverse ?2495)) =>= greatest_lower_bound identity (multiply ?2495 ?2496) [2496, 2495] by Demod 1526 with 5 at 3
3157 Id : 12010, {_}: multiply ?16307 (greatest_lower_bound ?16308 (inverse ?16307)) =>= negative_part (multiply ?16307 ?16308) [16308, 16307] by Demod 1539 with 256 at 3
3158 Id : 12012, {_}: multiply (inverse ?16312) (greatest_lower_bound ?16313 ?16312) =>= negative_part (multiply (inverse ?16312) ?16313) [16313, 16312] by Super 12010 with 1504 at 2,2,2
3159 Id : 345, {_}: greatest_lower_bound ?793 (least_upper_bound identity ?794) =<= least_upper_bound (negative_part ?793) (greatest_lower_bound ?793 ?794) [794, 793] by Super 328 with 18 at 1,3
3160 Id : 242, {_}: least_upper_bound identity ?537 =>= positive_part ?537 [537] by Super 6 with 17 at 3
3161 Id : 9229, {_}: greatest_lower_bound ?12504 (positive_part ?12505) =<= least_upper_bound (negative_part ?12504) (greatest_lower_bound ?12504 ?12505) [12505, 12504] by Demod 345 with 242 at 2,2
3162 Id : 614, {_}: greatest_lower_bound ?1129 (greatest_lower_bound ?1130 ?1131) =?= greatest_lower_bound ?1130 (greatest_lower_bound ?1131 ?1129) [1131, 1130, 1129] by Super 5 with 7 at 3
3163 Id : 616, {_}: greatest_lower_bound ?1137 (greatest_lower_bound ?1138 ?1137) =>= greatest_lower_bound ?1138 ?1137 [1138, 1137] by Super 614 with 10 at 2,3
3164 Id : 9240, {_}: greatest_lower_bound ?12536 (positive_part (greatest_lower_bound ?12537 ?12536)) =<= least_upper_bound (negative_part ?12536) (greatest_lower_bound ?12537 ?12536) [12537, 12536] by Super 9229 with 616 at 2,3
3165 Id : 9230, {_}: greatest_lower_bound ?12507 (positive_part ?12508) =<= least_upper_bound (negative_part ?12507) (greatest_lower_bound ?12508 ?12507) [12508, 12507] by Super 9229 with 5 at 2,3
3166 Id : 27589, {_}: greatest_lower_bound ?12536 (positive_part (greatest_lower_bound ?12537 ?12536)) =>= greatest_lower_bound ?12536 (positive_part ?12537) [12537, 12536] by Demod 9240 with 9230 at 3
3167 Id : 570, {_}: greatest_lower_bound ?1031 (positive_part ?1031) =>= ?1031 [1031] by Super 12 with 17 at 2,2
3168 Id : 479, {_}: least_upper_bound identity (negative_part ?945) =>= identity [945] by Super 11 with 256 at 2,2
3169 Id : 489, {_}: positive_part (negative_part ?945) =>= identity [945] by Demod 479 with 242 at 2
3170 Id : 572, {_}: greatest_lower_bound (negative_part ?1034) identity =>= negative_part ?1034 [1034] by Super 570 with 489 at 2,2
3171 Id : 582, {_}: greatest_lower_bound identity (negative_part ?1034) =>= negative_part ?1034 [1034] by Demod 572 with 5 at 2
3172 Id : 583, {_}: negative_part (negative_part ?1034) =>= negative_part ?1034 [1034] by Demod 582 with 256 at 2
3173 Id : 38365, {_}: multiply ?43271 (positive_part ?43272) =<= least_upper_bound ?43271 (multiply ?43271 ?43272) [43272, 43271] by Demod 38316 with 1504 at 1,2,3
3174 Id : 38381, {_}: multiply (negative_part (inverse ?43315)) (positive_part ?43315) =<= least_upper_bound (negative_part (inverse ?43315)) (negative_part ?43315) [43315] by Super 38365 with 3682 at 2,3
3175 Id : 3636, {_}: multiply (negative_part ?507) ?508 =<= greatest_lower_bound ?508 (multiply ?507 ?508) [508, 507] by Demod 219 with 256 at 1,2
3176 Id : 1521, {_}: multiply ?2482 (least_upper_bound ?2483 (inverse ?2482)) =>= least_upper_bound (multiply ?2482 ?2483) identity [2483, 2482] by Super 13 with 1480 at 2,3
3177 Id : 1544, {_}: multiply ?2482 (least_upper_bound ?2483 (inverse ?2482)) =>= least_upper_bound identity (multiply ?2482 ?2483) [2483, 2482] by Demod 1521 with 6 at 3
3178 Id : 14157, {_}: multiply ?18540 (least_upper_bound ?18541 (inverse ?18540)) =>= positive_part (multiply ?18540 ?18541) [18541, 18540] by Demod 1544 with 242 at 3
3179 Id : 14162, {_}: multiply ?18553 (positive_part (inverse ?18553)) =>= positive_part (multiply ?18553 identity) [18553] by Super 14157 with 242 at 2,2
3180 Id : 14196, {_}: multiply ?18553 (positive_part (inverse ?18553)) =>= positive_part ?18553 [18553] by Demod 14162 with 1464 at 1,3
3181 Id : 14225, {_}: positive_part (inverse ?18621) =<= multiply (inverse ?18621) (positive_part ?18621) [18621] by Super 31 with 14196 at 2,3
3182 Id : 14293, {_}: multiply (negative_part (inverse ?18673)) (positive_part ?18673) =<= greatest_lower_bound (positive_part ?18673) (positive_part (inverse ?18673)) [18673] by Super 3636 with 14225 at 2,3
3183 Id : 421, {_}: least_upper_bound identity (greatest_lower_bound ?854 ?855) =<= greatest_lower_bound (least_upper_bound identity ?854) (positive_part ?855) [855, 854] by Super 19 with 242 at 2,3
3184 Id : 432, {_}: positive_part (greatest_lower_bound ?854 ?855) =<= greatest_lower_bound (least_upper_bound identity ?854) (positive_part ?855) [855, 854] by Demod 421 with 242 at 2
3185 Id : 433, {_}: positive_part (greatest_lower_bound ?854 ?855) =<= greatest_lower_bound (positive_part ?854) (positive_part ?855) [855, 854] by Demod 432 with 242 at 1,3
3186 Id : 14322, {_}: multiply (negative_part (inverse ?18673)) (positive_part ?18673) =>= positive_part (greatest_lower_bound ?18673 (inverse ?18673)) [18673] by Demod 14293 with 433 at 3
3187 Id : 38491, {_}: positive_part (greatest_lower_bound ?43315 (inverse ?43315)) =<= least_upper_bound (negative_part (inverse ?43315)) (negative_part ?43315) [43315] by Demod 38381 with 14322 at 2
3188 Id : 38492, {_}: positive_part (greatest_lower_bound ?43315 (inverse ?43315)) =<= least_upper_bound (negative_part ?43315) (negative_part (inverse ?43315)) [43315] by Demod 38491 with 6 at 3
3189 Id : 471, {_}: greatest_lower_bound identity (least_upper_bound ?928 ?929) =<= least_upper_bound (greatest_lower_bound identity ?928) (negative_part ?929) [929, 928] by Super 20 with 256 at 2,3
3190 Id : 497, {_}: negative_part (least_upper_bound ?928 ?929) =<= least_upper_bound (greatest_lower_bound identity ?928) (negative_part ?929) [929, 928] by Demod 471 with 256 at 2
3191 Id : 498, {_}: negative_part (least_upper_bound ?928 ?929) =<= least_upper_bound (negative_part ?928) (negative_part ?929) [929, 928] by Demod 497 with 256 at 1,3
3192 Id : 38493, {_}: positive_part (greatest_lower_bound ?43315 (inverse ?43315)) =<= negative_part (least_upper_bound ?43315 (inverse ?43315)) [43315] by Demod 38492 with 498 at 3
3193 Id : 38639, {_}: negative_part (positive_part (greatest_lower_bound ?43522 (inverse ?43522))) =>= negative_part (least_upper_bound ?43522 (inverse ?43522)) [43522] by Super 583 with 38493 at 1,2
3194 Id : 474, {_}: negative_part (least_upper_bound identity ?935) =>= identity [935] by Super 12 with 256 at 2
3195 Id : 494, {_}: negative_part (positive_part ?935) =>= identity [935] by Demod 474 with 242 at 1,2
3196 Id : 38757, {_}: identity =<= negative_part (least_upper_bound ?43522 (inverse ?43522)) [43522] by Demod 38639 with 494 at 2
3197 Id : 38758, {_}: identity =<= positive_part (greatest_lower_bound ?43522 (inverse ?43522)) [43522] by Demod 38757 with 38493 at 3
3198 Id : 40458, {_}: greatest_lower_bound (inverse ?44923) identity =<= greatest_lower_bound (inverse ?44923) (positive_part ?44923) [44923] by Super 27589 with 38758 at 2,2
3199 Id : 40517, {_}: greatest_lower_bound identity (inverse ?44923) =<= greatest_lower_bound (inverse ?44923) (positive_part ?44923) [44923] by Demod 40458 with 5 at 2
3200 Id : 40518, {_}: negative_part (inverse ?44923) =<= greatest_lower_bound (inverse ?44923) (positive_part ?44923) [44923] by Demod 40517 with 256 at 2
3201 Id : 41375, {_}: multiply (inverse (positive_part ?45517)) (negative_part (inverse ?45517)) =>= negative_part (multiply (inverse (positive_part ?45517)) (inverse ?45517)) [45517] by Super 12012 with 40518 at 2,2
3202 Id : 50498, {_}: multiply (inverse (positive_part ?53015)) (positive_part (negative_part (inverse ?53015))) =<= least_upper_bound (inverse (positive_part ?53015)) (negative_part (multiply (inverse (positive_part ?53015)) (inverse ?53015))) [53015] by Super 38317 with 41375 at 2,3
3203 Id : 50621, {_}: multiply (inverse (positive_part ?53015)) identity =<= least_upper_bound (inverse (positive_part ?53015)) (negative_part (multiply (inverse (positive_part ?53015)) (inverse ?53015))) [53015] by Demod 50498 with 489 at 2,2
3204 Id : 246, {_}: greatest_lower_bound ?547 (positive_part ?547) =>= ?547 [547] by Super 12 with 17 at 2,2
3205 Id : 189, {_}: multiply (least_upper_bound identity ?440) ?441 =<= least_upper_bound ?441 (multiply ?440 ?441) [441, 440] by Super 185 with 2 at 1,3
3206 Id : 3246, {_}: multiply (positive_part ?5097) ?5098 =<= least_upper_bound ?5098 (multiply ?5097 ?5098) [5098, 5097] by Demod 189 with 242 at 1,2
3207 Id : 3250, {_}: multiply (positive_part ?5108) (inverse ?5108) =>= least_upper_bound (inverse ?5108) identity [5108] by Super 3246 with 1480 at 2,3
3208 Id : 3271, {_}: multiply (positive_part ?5108) (inverse ?5108) =>= least_upper_bound identity (inverse ?5108) [5108] by Demod 3250 with 6 at 3
3209 Id : 3333, {_}: multiply (positive_part ?5201) (inverse ?5201) =>= positive_part (inverse ?5201) [5201] by Demod 3271 with 242 at 3
3210 Id : 245, {_}: least_upper_bound ?544 (least_upper_bound ?545 identity) =>= positive_part (least_upper_bound ?544 ?545) [545, 544] by Super 8 with 17 at 3
3211 Id : 253, {_}: least_upper_bound ?544 (positive_part ?545) =>= positive_part (least_upper_bound ?544 ?545) [545, 544] by Demod 245 with 17 at 2,2
3212 Id : 690, {_}: positive_part (least_upper_bound (positive_part ?1303) ?1303) =>= positive_part ?1303 [1303] by Super 9 with 253 at 2
3213 Id : 710, {_}: positive_part (least_upper_bound ?1303 (positive_part ?1303)) =>= positive_part ?1303 [1303] by Demod 690 with 6 at 1,2
3214 Id : 711, {_}: positive_part (positive_part (least_upper_bound ?1303 ?1303)) =>= positive_part ?1303 [1303] by Demod 710 with 253 at 1,2
3215 Id : 712, {_}: positive_part (positive_part ?1303) =>= positive_part ?1303 [1303] by Demod 711 with 9 at 1,1,2
3216 Id : 3338, {_}: multiply (positive_part ?5209) (inverse (positive_part ?5209)) =>= positive_part (inverse (positive_part ?5209)) [5209] by Super 3333 with 712 at 1,2
3217 Id : 3375, {_}: identity =<= positive_part (inverse (positive_part ?5209)) [5209] by Demod 3338 with 1480 at 2
3218 Id : 3433, {_}: greatest_lower_bound (inverse (positive_part ?5311)) identity =>= inverse (positive_part ?5311) [5311] by Super 246 with 3375 at 2,2
3219 Id : 3474, {_}: greatest_lower_bound identity (inverse (positive_part ?5311)) =>= inverse (positive_part ?5311) [5311] by Demod 3433 with 5 at 2
3220 Id : 3475, {_}: negative_part (inverse (positive_part ?5311)) =>= inverse (positive_part ?5311) [5311] by Demod 3474 with 256 at 2
3221 Id : 3571, {_}: negative_part (least_upper_bound (inverse (positive_part ?5438)) ?5439) =<= least_upper_bound (inverse (positive_part ?5438)) (negative_part ?5439) [5439, 5438] by Super 498 with 3475 at 1,3
3222 Id : 50622, {_}: multiply (inverse (positive_part ?53015)) identity =<= negative_part (least_upper_bound (inverse (positive_part ?53015)) (multiply (inverse (positive_part ?53015)) (inverse ?53015))) [53015] by Demod 50621 with 3571 at 3
3223 Id : 50623, {_}: inverse (positive_part ?53015) =<= negative_part (least_upper_bound (inverse (positive_part ?53015)) (multiply (inverse (positive_part ?53015)) (inverse ?53015))) [53015] by Demod 50622 with 1464 at 2
3224 Id : 50624, {_}: inverse (positive_part ?53015) =<= negative_part (multiply (inverse (positive_part ?53015)) (positive_part (inverse ?53015))) [53015] by Demod 50623 with 38317 at 1,3
3225 Id : 3272, {_}: multiply (positive_part ?5108) (inverse ?5108) =>= positive_part (inverse ?5108) [5108] by Demod 3271 with 242 at 3
3226 Id : 3332, {_}: inverse ?5199 =<= multiply (inverse (positive_part ?5199)) (positive_part (inverse ?5199)) [5199] by Super 31 with 3272 at 2,3
3227 Id : 50625, {_}: inverse (positive_part ?53015) =<= negative_part (inverse ?53015) [53015] by Demod 50624 with 3332 at 1,3
3228 Id : 50945, {_}: ?5590 =<= multiply (inverse (inverse (positive_part ?5590))) (negative_part ?5590) [5590] by Demod 3699 with 50625 at 1,1,3
3229 Id : 50972, {_}: ?5590 =<= multiply (positive_part ?5590) (negative_part ?5590) [5590] by Demod 50945 with 1504 at 1,3
3230 Id : 51308, {_}: a =?= a [] by Demod 1 with 50972 at 3
3231 Id : 1, {_}: a =<= multiply (positive_part a) (negative_part a) [] by prove_lat4
3232 % SZS output end CNFRefutation for GRP167-1.p
3233 6444: solved GRP167-1.p in 10.716669 using kbo
3234 !! infer_left 253 0.0004 0.0000 0.0000
3235 !! infer_right 254 33.9093 0.7470 0.1335
3236 !! simplify_goal 254 0.0129 0.0002 0.0001
3237 !! keep_simplified 757 8.7621 0.7731 0.0116
3238 !! simplification_step 839 8.7588 0.3194 0.0104
3239 !! simplify 56377 37.0639 0.3081 0.0007
3240 !! orphan_murder 759 0.0371 0.0005 0.0000
3241 !! is_subsumed 50386 1.4703 0.3006 0.0000
3242 !! build_new_clause 21099 1.5322 0.3051 0.0001
3243 !! demodulate 55910 35.1046 0.3080 0.0006
3244 !! demod 381341 27.7607 0.3077 0.0001
3245 !! demod.apply_subst 367092 1.8562 0.3003 0.0000
3246 !! demod.compare_terms 151254 7.6837 0.3076 0.0001
3247 !! demod.retrieve_generalizations 381341 8.2902 0.3002 0.0000
3248 !! demod.unify 288772 3.4169 0.3003 0.0000
3249 !! build_clause 55004 4.2388 0.3037 0.0001
3250 !! compare_terms(kbo) 209985 9.1470 0.3076 0.0000
3251 !! compare_terms(nrkbo) 20 0.0002 0.0000 0.0000
3253 6451: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3254 6451: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3256 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3257 [8, 7, 6] by associativity ?6 ?7 ?8
3259 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3260 [11, 10] by symmetry_of_glb ?10 ?11
3262 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3263 [14, 13] by symmetry_of_lub ?13 ?14
3265 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3267 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3268 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3270 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3272 least_upper_bound (least_upper_bound ?20 ?21) ?22
3273 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3274 6451: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3276 greatest_lower_bound ?26 ?26 =>= ?26
3277 [26] by idempotence_of_gld ?26
3279 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3280 [29, 28] by lub_absorbtion ?28 ?29
3282 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3283 [32, 31] by glb_absorbtion ?31 ?32
3285 multiply ?34 (least_upper_bound ?35 ?36)
3287 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3288 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3290 multiply ?38 (greatest_lower_bound ?39 ?40)
3292 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3293 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3295 multiply (least_upper_bound ?42 ?43) ?44
3297 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3298 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3300 multiply (greatest_lower_bound ?46 ?47) ?48
3302 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3303 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3304 6451: Id : 17, {_}: inverse identity =>= identity [] by lat4_1
3305 6451: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by lat4_2 ?51
3307 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
3308 [54, 53] by lat4_3 ?53 ?54
3310 positive_part ?56 =<= least_upper_bound ?56 identity
3313 negative_part ?58 =<= greatest_lower_bound ?58 identity
3316 least_upper_bound ?60 (greatest_lower_bound ?61 ?62)
3318 greatest_lower_bound (least_upper_bound ?60 ?61)
3319 (least_upper_bound ?60 ?62)
3320 [62, 61, 60] by lat4_6 ?60 ?61 ?62
3322 greatest_lower_bound ?64 (least_upper_bound ?65 ?66)
3324 least_upper_bound (greatest_lower_bound ?64 ?65)
3325 (greatest_lower_bound ?64 ?66)
3326 [66, 65, 64] by lat4_7 ?64 ?65 ?66
3329 a =<= multiply (positive_part a) (negative_part a)
3331 % SZS status Timeout for GRP167-2.p
3333 6498: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3334 6498: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3336 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3337 [8, 7, 6] by associativity ?6 ?7 ?8
3339 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3340 [11, 10] by symmetry_of_glb ?10 ?11
3342 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3343 [14, 13] by symmetry_of_lub ?13 ?14
3345 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3347 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3348 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3350 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3352 least_upper_bound (least_upper_bound ?20 ?21) ?22
3353 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3354 6498: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3356 greatest_lower_bound ?26 ?26 =>= ?26
3357 [26] by idempotence_of_gld ?26
3359 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3360 [29, 28] by lub_absorbtion ?28 ?29
3362 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3363 [32, 31] by glb_absorbtion ?31 ?32
3365 multiply ?34 (least_upper_bound ?35 ?36)
3367 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3368 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3370 multiply ?38 (greatest_lower_bound ?39 ?40)
3372 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3373 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3375 multiply (least_upper_bound ?42 ?43) ?44
3377 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3378 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3380 multiply (greatest_lower_bound ?46 ?47) ?48
3382 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3383 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3388 multiply (least_upper_bound a identity)
3389 (greatest_lower_bound a identity)
3391 % SZS status Timeout for GRP167-3.p
3393 6587: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3394 6587: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3396 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3397 [8, 7, 6] by associativity ?6 ?7 ?8
3399 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3400 [11, 10] by symmetry_of_glb ?10 ?11
3402 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3403 [14, 13] by symmetry_of_lub ?13 ?14
3405 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3407 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3408 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3410 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3412 least_upper_bound (least_upper_bound ?20 ?21) ?22
3413 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3414 6587: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3416 greatest_lower_bound ?26 ?26 =>= ?26
3417 [26] by idempotence_of_gld ?26
3419 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3420 [29, 28] by lub_absorbtion ?28 ?29
3422 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3423 [32, 31] by glb_absorbtion ?31 ?32
3425 multiply ?34 (least_upper_bound ?35 ?36)
3427 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3428 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3430 multiply ?38 (greatest_lower_bound ?39 ?40)
3432 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3433 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3435 multiply (least_upper_bound ?42 ?43) ?44
3437 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3438 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3440 multiply (greatest_lower_bound ?46 ?47) ?48
3442 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3443 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3444 6587: Id : 17, {_}: inverse identity =>= identity [] by p19_1
3445 6587: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p19_2 ?51
3447 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
3448 [54, 53] by p19_3 ?53 ?54
3453 multiply (least_upper_bound a identity)
3454 (greatest_lower_bound a identity)
3456 % SZS status Timeout for GRP167-4.p
3458 6626: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3459 6626: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3461 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3462 [8, 7, 6] by associativity ?6 ?7 ?8
3464 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3465 [11, 10] by symmetry_of_glb ?10 ?11
3467 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3468 [14, 13] by symmetry_of_lub ?13 ?14
3470 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3472 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3473 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3475 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3477 least_upper_bound (least_upper_bound ?20 ?21) ?22
3478 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3479 6626: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3481 greatest_lower_bound ?26 ?26 =>= ?26
3482 [26] by idempotence_of_gld ?26
3484 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3485 [29, 28] by lub_absorbtion ?28 ?29
3487 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3488 [32, 31] by glb_absorbtion ?31 ?32
3490 multiply ?34 (least_upper_bound ?35 ?36)
3492 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3493 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3495 multiply ?38 (greatest_lower_bound ?39 ?40)
3497 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3498 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3500 multiply (least_upper_bound ?42 ?43) ?44
3502 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3503 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3505 multiply (greatest_lower_bound ?46 ?47) ?48
3507 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3508 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3509 6626: Id : 17, {_}: least_upper_bound identity a =>= a [] by p08a_1
3510 6626: Id : 18, {_}: least_upper_bound identity b =>= b [] by p08a_2
3511 6626: Id : 19, {_}: least_upper_bound identity c =>= c [] by p08a_3
3514 least_upper_bound (greatest_lower_bound a (multiply b c))
3515 (multiply (greatest_lower_bound a b) (greatest_lower_bound a c))
3517 multiply (greatest_lower_bound a b) (greatest_lower_bound a c)
3519 % SZS status Timeout for GRP177-1.p
3521 6655: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3522 6655: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3524 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3525 [8, 7, 6] by associativity ?6 ?7 ?8
3527 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3528 [11, 10] by symmetry_of_glb ?10 ?11
3530 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3531 [14, 13] by symmetry_of_lub ?13 ?14
3533 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3535 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3536 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3538 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3540 least_upper_bound (least_upper_bound ?20 ?21) ?22
3541 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3542 6655: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3544 greatest_lower_bound ?26 ?26 =>= ?26
3545 [26] by idempotence_of_gld ?26
3547 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3548 [29, 28] by lub_absorbtion ?28 ?29
3550 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3551 [32, 31] by glb_absorbtion ?31 ?32
3553 multiply ?34 (least_upper_bound ?35 ?36)
3555 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3556 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3558 multiply ?38 (greatest_lower_bound ?39 ?40)
3560 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3561 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3563 multiply (least_upper_bound ?42 ?43) ?44
3565 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3566 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3568 multiply (greatest_lower_bound ?46 ?47) ?48
3570 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3571 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3572 6655: Id : 17, {_}: greatest_lower_bound identity a =>= identity [] by p08b_1
3573 6655: Id : 18, {_}: greatest_lower_bound identity b =>= identity [] by p08b_2
3574 6655: Id : 19, {_}: greatest_lower_bound identity c =>= identity [] by p08b_3
3577 greatest_lower_bound (greatest_lower_bound a (multiply b c))
3578 (multiply (greatest_lower_bound a b) (greatest_lower_bound a c))
3580 greatest_lower_bound a (multiply b c)
3582 % SZS status Timeout for GRP177-2.p
3584 6697: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3585 6697: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3587 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3588 [8, 7, 6] by associativity ?6 ?7 ?8
3590 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3591 [11, 10] by symmetry_of_glb ?10 ?11
3593 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3594 [14, 13] by symmetry_of_lub ?13 ?14
3596 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3598 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3599 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3601 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3603 least_upper_bound (least_upper_bound ?20 ?21) ?22
3604 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3605 6697: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3607 greatest_lower_bound ?26 ?26 =>= ?26
3608 [26] by idempotence_of_gld ?26
3610 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3611 [29, 28] by lub_absorbtion ?28 ?29
3613 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3614 [32, 31] by glb_absorbtion ?31 ?32
3616 multiply ?34 (least_upper_bound ?35 ?36)
3618 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3619 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3621 multiply ?38 (greatest_lower_bound ?39 ?40)
3623 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3624 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3626 multiply (least_upper_bound ?42 ?43) ?44
3628 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3629 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3631 multiply (greatest_lower_bound ?46 ?47) ?48
3633 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3634 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3635 6697: Id : 17, {_}: least_upper_bound identity a =>= a [] by p09a_1
3636 6697: Id : 18, {_}: least_upper_bound identity b =>= b [] by p09a_2
3637 6697: Id : 19, {_}: least_upper_bound identity c =>= c [] by p09a_3
3638 6697: Id : 20, {_}: greatest_lower_bound a b =>= identity [] by p09a_4
3641 greatest_lower_bound a (multiply b c) =>= greatest_lower_bound a c
3643 % SZS status Timeout for GRP178-1.p
3645 6724: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3646 6724: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3648 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3649 [8, 7, 6] by associativity ?6 ?7 ?8
3651 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3652 [11, 10] by symmetry_of_glb ?10 ?11
3654 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3655 [14, 13] by symmetry_of_lub ?13 ?14
3657 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3659 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3660 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3662 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3664 least_upper_bound (least_upper_bound ?20 ?21) ?22
3665 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3666 6724: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3668 greatest_lower_bound ?26 ?26 =>= ?26
3669 [26] by idempotence_of_gld ?26
3671 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3672 [29, 28] by lub_absorbtion ?28 ?29
3674 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3675 [32, 31] by glb_absorbtion ?31 ?32
3677 multiply ?34 (least_upper_bound ?35 ?36)
3679 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3680 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3682 multiply ?38 (greatest_lower_bound ?39 ?40)
3684 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3685 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3687 multiply (least_upper_bound ?42 ?43) ?44
3689 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3690 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3692 multiply (greatest_lower_bound ?46 ?47) ?48
3694 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3695 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3696 6724: Id : 17, {_}: greatest_lower_bound identity a =>= identity [] by p09b_1
3697 6724: Id : 18, {_}: greatest_lower_bound identity b =>= identity [] by p09b_2
3698 6724: Id : 19, {_}: greatest_lower_bound identity c =>= identity [] by p09b_3
3699 6724: Id : 20, {_}: greatest_lower_bound a b =>= identity [] by p09b_4
3702 greatest_lower_bound a (multiply b c) =>= greatest_lower_bound a c
3704 % SZS status Timeout for GRP178-2.p
3706 6763: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3707 6763: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3709 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3710 [8, 7, 6] by associativity ?6 ?7 ?8
3712 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3713 [11, 10] by symmetry_of_glb ?10 ?11
3715 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3716 [14, 13] by symmetry_of_lub ?13 ?14
3718 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3720 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3721 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3723 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3725 least_upper_bound (least_upper_bound ?20 ?21) ?22
3726 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3727 6763: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3729 greatest_lower_bound ?26 ?26 =>= ?26
3730 [26] by idempotence_of_gld ?26
3732 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3733 [29, 28] by lub_absorbtion ?28 ?29
3735 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3736 [32, 31] by glb_absorbtion ?31 ?32
3738 multiply ?34 (least_upper_bound ?35 ?36)
3740 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3741 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3743 multiply ?38 (greatest_lower_bound ?39 ?40)
3745 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3746 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3748 multiply (least_upper_bound ?42 ?43) ?44
3750 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3751 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3753 multiply (greatest_lower_bound ?46 ?47) ?48
3755 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3756 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3759 inverse (least_upper_bound a b)
3761 greatest_lower_bound (inverse a) (inverse b)
3763 % SZS status Timeout for GRP179-1.p
3765 6790: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3766 6790: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3768 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3769 [8, 7, 6] by associativity ?6 ?7 ?8
3771 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3772 [11, 10] by symmetry_of_glb ?10 ?11
3774 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3775 [14, 13] by symmetry_of_lub ?13 ?14
3777 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3779 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3780 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3782 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3784 least_upper_bound (least_upper_bound ?20 ?21) ?22
3785 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3786 6790: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3788 greatest_lower_bound ?26 ?26 =>= ?26
3789 [26] by idempotence_of_gld ?26
3791 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3792 [29, 28] by lub_absorbtion ?28 ?29
3794 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3795 [32, 31] by glb_absorbtion ?31 ?32
3797 multiply ?34 (least_upper_bound ?35 ?36)
3799 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3800 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3802 multiply ?38 (greatest_lower_bound ?39 ?40)
3804 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3805 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3807 multiply (least_upper_bound ?42 ?43) ?44
3809 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3810 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3812 multiply (greatest_lower_bound ?46 ?47) ?48
3814 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3815 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3818 least_upper_bound (inverse a) identity
3820 inverse (greatest_lower_bound a identity)
3822 % SZS status Timeout for GRP179-2.p
3824 6832: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3825 6832: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3827 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3828 [8, 7, 6] by associativity ?6 ?7 ?8
3830 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3831 [11, 10] by symmetry_of_glb ?10 ?11
3833 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3834 [14, 13] by symmetry_of_lub ?13 ?14
3836 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3838 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3839 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3841 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3843 least_upper_bound (least_upper_bound ?20 ?21) ?22
3844 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3845 6832: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3847 greatest_lower_bound ?26 ?26 =>= ?26
3848 [26] by idempotence_of_gld ?26
3850 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3851 [29, 28] by lub_absorbtion ?28 ?29
3853 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3854 [32, 31] by glb_absorbtion ?31 ?32
3856 multiply ?34 (least_upper_bound ?35 ?36)
3858 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3859 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3861 multiply ?38 (greatest_lower_bound ?39 ?40)
3863 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3864 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3866 multiply (least_upper_bound ?42 ?43) ?44
3868 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3869 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3871 multiply (greatest_lower_bound ?46 ?47) ?48
3873 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3874 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3875 6832: Id : 17, {_}: inverse identity =>= identity [] by p18_1
3876 6832: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p18_2 ?51
3878 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
3879 [54, 53] by p18_3 ?53 ?54
3882 least_upper_bound (inverse a) identity
3884 inverse (greatest_lower_bound a identity)
3886 % SZS status Timeout for GRP179-3.p
3888 6859: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3889 6859: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3891 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3892 [8, 7, 6] by associativity ?6 ?7 ?8
3894 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3895 [11, 10] by symmetry_of_glb ?10 ?11
3897 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3898 [14, 13] by symmetry_of_lub ?13 ?14
3900 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3902 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3903 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3905 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3907 least_upper_bound (least_upper_bound ?20 ?21) ?22
3908 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3909 6859: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3911 greatest_lower_bound ?26 ?26 =>= ?26
3912 [26] by idempotence_of_gld ?26
3914 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3915 [29, 28] by lub_absorbtion ?28 ?29
3917 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3918 [32, 31] by glb_absorbtion ?31 ?32
3920 multiply ?34 (least_upper_bound ?35 ?36)
3922 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3923 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3925 multiply ?38 (greatest_lower_bound ?39 ?40)
3927 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3928 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3930 multiply (least_upper_bound ?42 ?43) ?44
3932 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3933 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3935 multiply (greatest_lower_bound ?46 ?47) ?48
3937 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3938 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3941 multiply a (multiply (inverse (greatest_lower_bound a b)) b)
3943 least_upper_bound a b
3945 % SZS status Timeout for GRP180-1.p
3947 6897: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3948 6897: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3950 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3951 [8, 7, 6] by associativity ?6 ?7 ?8
3953 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
3954 [11, 10] by symmetry_of_glb ?10 ?11
3956 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
3957 [14, 13] by symmetry_of_lub ?13 ?14
3959 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3961 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3962 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3964 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3966 least_upper_bound (least_upper_bound ?20 ?21) ?22
3967 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3968 6897: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3970 greatest_lower_bound ?26 ?26 =>= ?26
3971 [26] by idempotence_of_gld ?26
3973 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3974 [29, 28] by lub_absorbtion ?28 ?29
3976 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3977 [32, 31] by glb_absorbtion ?31 ?32
3979 multiply ?34 (least_upper_bound ?35 ?36)
3981 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3982 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3984 multiply ?38 (greatest_lower_bound ?39 ?40)
3986 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3987 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3989 multiply (least_upper_bound ?42 ?43) ?44
3991 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3992 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3994 multiply (greatest_lower_bound ?46 ?47) ?48
3996 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3997 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3998 6897: Id : 17, {_}: inverse identity =>= identity [] by p11_1
3999 6897: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p11_2 ?51
4001 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4002 [54, 53] by p11_3 ?53 ?54
4005 multiply a (multiply (inverse (greatest_lower_bound a b)) b)
4007 least_upper_bound a b
4009 % SZS status Timeout for GRP180-2.p
4011 6924: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4012 6924: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4014 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4015 [8, 7, 6] by associativity ?6 ?7 ?8
4017 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4018 [11, 10] by symmetry_of_glb ?10 ?11
4020 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4021 [14, 13] by symmetry_of_lub ?13 ?14
4023 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4025 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4026 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4028 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4030 least_upper_bound (least_upper_bound ?20 ?21) ?22
4031 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4032 6924: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4034 greatest_lower_bound ?26 ?26 =>= ?26
4035 [26] by idempotence_of_gld ?26
4037 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4038 [29, 28] by lub_absorbtion ?28 ?29
4040 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4041 [32, 31] by glb_absorbtion ?31 ?32
4043 multiply ?34 (least_upper_bound ?35 ?36)
4045 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4046 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4048 multiply ?38 (greatest_lower_bound ?39 ?40)
4050 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4051 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4053 multiply (least_upper_bound ?42 ?43) ?44
4055 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4056 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4058 multiply (greatest_lower_bound ?46 ?47) ?48
4060 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4061 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4063 greatest_lower_bound a c =<= greatest_lower_bound b c
4065 6924: Id : 18, {_}: least_upper_bound a c =<= least_upper_bound b c [] by p12_2
4067 6924: Id : 1, {_}: a =<= b [] by prove_p12
4068 % SZS status Timeout for GRP181-1.p
4070 8049: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4071 8049: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4073 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4074 [8, 7, 6] by associativity ?6 ?7 ?8
4076 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4077 [11, 10] by symmetry_of_glb ?10 ?11
4079 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4080 [14, 13] by symmetry_of_lub ?13 ?14
4082 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4084 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4085 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4087 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4089 least_upper_bound (least_upper_bound ?20 ?21) ?22
4090 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4091 8049: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4093 greatest_lower_bound ?26 ?26 =>= ?26
4094 [26] by idempotence_of_gld ?26
4096 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4097 [29, 28] by lub_absorbtion ?28 ?29
4099 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4100 [32, 31] by glb_absorbtion ?31 ?32
4102 multiply ?34 (least_upper_bound ?35 ?36)
4104 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4105 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4107 multiply ?38 (greatest_lower_bound ?39 ?40)
4109 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4110 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4112 multiply (least_upper_bound ?42 ?43) ?44
4114 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4115 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4117 multiply (greatest_lower_bound ?46 ?47) ?48
4119 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4120 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4121 8049: Id : 17, {_}: inverse identity =>= identity [] by p12_1
4122 8049: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p12_2 ?51
4124 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4125 [54, 53] by p12_3 ?53 ?54
4127 greatest_lower_bound a c =<= greatest_lower_bound b c
4129 8049: Id : 21, {_}: least_upper_bound a c =<= least_upper_bound b c [] by p12_5
4131 8049: Id : 1, {_}: a =<= b [] by prove_p12
4132 % SZS status Timeout for GRP181-2.p
4134 8077: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4135 8077: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4137 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4138 [8, 7, 6] by associativity ?6 ?7 ?8
4140 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4141 [11, 10] by symmetry_of_glb ?10 ?11
4143 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4144 [14, 13] by symmetry_of_lub ?13 ?14
4146 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4148 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4149 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4151 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4153 least_upper_bound (least_upper_bound ?20 ?21) ?22
4154 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4155 8077: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4157 greatest_lower_bound ?26 ?26 =>= ?26
4158 [26] by idempotence_of_gld ?26
4160 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4161 [29, 28] by lub_absorbtion ?28 ?29
4163 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4164 [32, 31] by glb_absorbtion ?31 ?32
4166 multiply ?34 (least_upper_bound ?35 ?36)
4168 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4169 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4171 multiply ?38 (greatest_lower_bound ?39 ?40)
4173 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4174 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4176 multiply (least_upper_bound ?42 ?43) ?44
4178 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4179 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4181 multiply (greatest_lower_bound ?46 ?47) ?48
4183 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4184 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4186 greatest_lower_bound a c =<= greatest_lower_bound b c
4188 8077: Id : 18, {_}: least_upper_bound a c =<= least_upper_bound b c [] by p12x_2
4190 inverse (greatest_lower_bound ?52 ?53)
4192 least_upper_bound (inverse ?52) (inverse ?53)
4193 [53, 52] by p12x_3 ?52 ?53
4195 inverse (least_upper_bound ?55 ?56)
4197 greatest_lower_bound (inverse ?55) (inverse ?56)
4198 [56, 55] by p12x_4 ?55 ?56
4200 8077: Id : 1, {_}: a =<= b [] by prove_p12x
4203 Found proof, 73.294727s
4204 % SZS status Unsatisfiable for GRP181-3.p
4205 % SZS output start CNFRefutation for GRP181-3.p
4206 Id : 18, {_}: least_upper_bound a c =<= least_upper_bound b c [] by p12x_2
4207 Id : 17, {_}: greatest_lower_bound a c =<= greatest_lower_bound b c [] by p12x_1
4208 Id : 5, {_}: greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
4209 Id : 154, {_}: multiply ?474 (greatest_lower_bound ?475 ?476) =<= greatest_lower_bound (multiply ?474 ?475) (multiply ?474 ?476) [476, 475, 474] by monotony_glb1 ?474 ?475 ?476
4210 Id : 19, {_}: inverse (greatest_lower_bound ?52 ?53) =<= least_upper_bound (inverse ?52) (inverse ?53) [53, 52] by p12x_3 ?52 ?53
4211 Id : 6, {_}: least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
4212 Id : 129, {_}: multiply ?411 (least_upper_bound ?412 ?413) =<= least_upper_bound (multiply ?411 ?412) (multiply ?411 ?413) [413, 412, 411] by monotony_lub1 ?411 ?412 ?413
4213 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4214 Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4215 Id : 25, {_}: multiply (multiply ?65 ?66) ?67 =?= multiply ?65 (multiply ?66 ?67) [67, 66, 65] by associativity ?65 ?66 ?67
4216 Id : 33, {_}: multiply identity ?97 =<= multiply (inverse ?98) (multiply ?98 ?97) [98, 97] by Super 25 with 3 at 1,2
4217 Id : 39, {_}: ?97 =<= multiply (inverse ?98) (multiply ?98 ?97) [98, 97] by Demod 33 with 2 at 2
4218 Id : 27, {_}: multiply (multiply ?72 (inverse ?73)) ?73 =>= multiply ?72 identity [73, 72] by Super 25 with 3 at 2,3
4219 Id : 597, {_}: multiply (multiply ?1157 (inverse ?1158)) ?1158 =>= multiply ?1157 identity [1158, 1157] by Super 25 with 3 at 2,3
4220 Id : 599, {_}: multiply identity ?1162 =<= multiply (inverse (inverse ?1162)) identity [1162] by Super 597 with 3 at 1,2
4221 Id : 612, {_}: ?1162 =<= multiply (inverse (inverse ?1162)) identity [1162] by Demod 599 with 2 at 2
4222 Id : 26, {_}: multiply (multiply ?69 identity) ?70 =>= multiply ?69 ?70 [70, 69] by Super 25 with 2 at 2,3
4223 Id : 641, {_}: multiply ?1224 ?1225 =<= multiply (inverse (inverse ?1224)) ?1225 [1225, 1224] by Super 26 with 612 at 1,2
4224 Id : 645, {_}: ?1162 =<= multiply ?1162 identity [1162] by Demod 612 with 641 at 3
4225 Id : 647, {_}: multiply (multiply ?72 (inverse ?73)) ?73 =>= ?72 [73, 72] by Demod 27 with 645 at 3
4226 Id : 131, {_}: multiply (inverse ?418) (least_upper_bound ?419 ?418) =>= least_upper_bound (multiply (inverse ?418) ?419) identity [419, 418] by Super 129 with 3 at 2,3
4227 Id : 16499, {_}: multiply (inverse ?18258) (least_upper_bound ?18259 ?18258) =>= least_upper_bound identity (multiply (inverse ?18258) ?18259) [18259, 18258] by Demod 131 with 6 at 3
4228 Id : 660, {_}: inverse (inverse ?1276) =<= multiply ?1276 identity [1276] by Super 645 with 641 at 3
4229 Id : 665, {_}: inverse (inverse ?1276) =>= ?1276 [1276] by Demod 660 with 645 at 3
4230 Id : 688, {_}: multiply ?1294 (inverse ?1294) =>= identity [1294] by Super 3 with 665 at 1,2
4231 Id : 700, {_}: identity =<= inverse identity [] by Super 2 with 688 at 2
4232 Id : 732, {_}: inverse (greatest_lower_bound identity ?1366) =<= least_upper_bound identity (inverse ?1366) [1366] by Super 19 with 700 at 1,3
4233 Id : 16549, {_}: multiply (inverse (inverse ?18373)) (inverse (greatest_lower_bound identity ?18373)) =>= least_upper_bound identity (multiply (inverse (inverse ?18373)) identity) [18373] by Super 16499 with 732 at 2,2
4234 Id : 16652, {_}: multiply ?18373 (inverse (greatest_lower_bound identity ?18373)) =?= least_upper_bound identity (multiply (inverse (inverse ?18373)) identity) [18373] by Demod 16549 with 665 at 1,2
4235 Id : 16653, {_}: multiply ?18373 (inverse (greatest_lower_bound identity ?18373)) =>= least_upper_bound identity (inverse (inverse ?18373)) [18373] by Demod 16652 with 645 at 2,3
4236 Id : 16654, {_}: multiply ?18373 (inverse (greatest_lower_bound identity ?18373)) =>= inverse (greatest_lower_bound identity (inverse ?18373)) [18373] by Demod 16653 with 732 at 3
4237 Id : 689, {_}: inverse (greatest_lower_bound ?1296 (inverse ?1297)) =>= least_upper_bound (inverse ?1296) ?1297 [1297, 1296] by Super 19 with 665 at 2,3
4238 Id : 16655, {_}: multiply ?18373 (inverse (greatest_lower_bound identity ?18373)) =>= least_upper_bound (inverse identity) ?18373 [18373] by Demod 16654 with 689 at 3
4239 Id : 16656, {_}: multiply ?18373 (inverse (greatest_lower_bound identity ?18373)) =>= least_upper_bound identity ?18373 [18373] by Demod 16655 with 700 at 1,3
4240 Id : 44808, {_}: multiply (least_upper_bound identity ?46675) (greatest_lower_bound identity ?46675) =>= ?46675 [46675] by Super 647 with 16656 at 1,2
4241 Id : 156, {_}: multiply (inverse ?481) (greatest_lower_bound ?482 ?481) =>= greatest_lower_bound (multiply (inverse ?481) ?482) identity [482, 481] by Super 154 with 3 at 2,3
4242 Id : 17453, {_}: multiply (inverse ?19423) (greatest_lower_bound ?19424 ?19423) =>= greatest_lower_bound identity (multiply (inverse ?19423) ?19424) [19424, 19423] by Demod 156 with 5 at 3
4243 Id : 17495, {_}: multiply (inverse c) (greatest_lower_bound a c) =>= greatest_lower_bound identity (multiply (inverse c) b) [] by Super 17453 with 17 at 2,2
4244 Id : 172, {_}: multiply (inverse ?481) (greatest_lower_bound ?482 ?481) =>= greatest_lower_bound identity (multiply (inverse ?481) ?482) [482, 481] by Demod 156 with 5 at 3
4245 Id : 17585, {_}: greatest_lower_bound identity (multiply (inverse c) a) =<= greatest_lower_bound identity (multiply (inverse c) b) [] by Demod 17495 with 172 at 2
4246 Id : 44834, {_}: multiply (least_upper_bound identity (multiply (inverse c) b)) (greatest_lower_bound identity (multiply (inverse c) a)) =>= multiply (inverse c) b [] by Super 44808 with 17585 at 2,2
4247 Id : 16543, {_}: multiply (inverse c) (least_upper_bound a c) =>= least_upper_bound identity (multiply (inverse c) b) [] by Super 16499 with 18 at 2,2
4248 Id : 145, {_}: multiply (inverse ?418) (least_upper_bound ?419 ?418) =>= least_upper_bound identity (multiply (inverse ?418) ?419) [419, 418] by Demod 131 with 6 at 3
4249 Id : 16641, {_}: least_upper_bound identity (multiply (inverse c) a) =<= least_upper_bound identity (multiply (inverse c) b) [] by Demod 16543 with 145 at 2
4250 Id : 44932, {_}: multiply (least_upper_bound identity (multiply (inverse c) a)) (greatest_lower_bound identity (multiply (inverse c) a)) =>= multiply (inverse c) b [] by Demod 44834 with 16641 at 1,2
4251 Id : 16798, {_}: multiply (least_upper_bound identity ?18607) (greatest_lower_bound identity ?18607) =>= ?18607 [18607] by Super 647 with 16656 at 1,2
4252 Id : 44933, {_}: multiply (inverse c) a =<= multiply (inverse c) b [] by Demod 44932 with 16798 at 2
4253 Id : 44989, {_}: b =<= multiply (inverse (inverse c)) (multiply (inverse c) a) [] by Super 39 with 44933 at 2,3
4254 Id : 45031, {_}: b =>= a [] by Demod 44989 with 39 at 3
4255 Id : 45241, {_}: a === a [] by Demod 1 with 45031 at 3
4256 Id : 1, {_}: a =<= b [] by prove_p12x
4257 % SZS output end CNFRefutation for GRP181-3.p
4258 8077: solved GRP181-3.p in 17.009062 using nrkbo
4259 !! infer_left 355 0.0006 0.0000 0.0000
4260 !! infer_right 356 48.8324 3.1205 0.1372
4261 !! simplify_goal 356 0.0055 0.0002 0.0000
4262 !! keep_simplified 678 23.2088 3.6313 0.0342
4263 !! simplification_step 871 23.2019 0.4797 0.0266
4264 !! simplify 81574 62.3251 0.7084 0.0008
4265 !! orphan_murder 795 0.4493 0.4002 0.0006
4266 !! is_subsumed 74880 4.4267 0.7082 0.0001
4267 !! build_new_clause 18657 1.1618 0.3067 0.0001
4268 !! demodulate 80906 57.3130 0.4673 0.0007
4269 !! demod 689413 49.8881 0.4082 0.0001
4270 !! demod.apply_subst 626198 6.4939 0.4001 0.0000
4271 !! demod.compare_terms 295724 12.3310 0.4081 0.0000
4272 !! demod.retrieve_generalizations 689413 14.1089 0.4041 0.0000
4273 !! demod.unify 556016 4.8310 0.4001 0.0000
4274 !! build_clause 46822 1.7727 0.4001 0.0000
4275 !! compare_terms(nrkbo) 352560 11.2445 0.4081 0.0000
4276 !! compare_terms(nrkbo) 20 0.0002 0.0000 0.0000
4278 8115: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4279 8115: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4281 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4282 [8, 7, 6] by associativity ?6 ?7 ?8
4284 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4285 [11, 10] by symmetry_of_glb ?10 ?11
4287 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4288 [14, 13] by symmetry_of_lub ?13 ?14
4290 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4292 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4293 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4295 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4297 least_upper_bound (least_upper_bound ?20 ?21) ?22
4298 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4299 8115: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4301 greatest_lower_bound ?26 ?26 =>= ?26
4302 [26] by idempotence_of_gld ?26
4304 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4305 [29, 28] by lub_absorbtion ?28 ?29
4307 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4308 [32, 31] by glb_absorbtion ?31 ?32
4310 multiply ?34 (least_upper_bound ?35 ?36)
4312 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4313 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4315 multiply ?38 (greatest_lower_bound ?39 ?40)
4317 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4318 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4320 multiply (least_upper_bound ?42 ?43) ?44
4322 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4323 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4325 multiply (greatest_lower_bound ?46 ?47) ?48
4327 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4328 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4329 8115: Id : 17, {_}: inverse identity =>= identity [] by p12x_1
4330 8115: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p12x_2 ?51
4332 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4333 [54, 53] by p12x_3 ?53 ?54
4335 greatest_lower_bound a c =<= greatest_lower_bound b c
4337 8115: Id : 21, {_}: least_upper_bound a c =<= least_upper_bound b c [] by p12x_5
4339 inverse (greatest_lower_bound ?58 ?59)
4341 least_upper_bound (inverse ?58) (inverse ?59)
4342 [59, 58] by p12x_6 ?58 ?59
4344 inverse (least_upper_bound ?61 ?62)
4346 greatest_lower_bound (inverse ?61) (inverse ?62)
4347 [62, 61] by p12x_7 ?61 ?62
4349 8115: Id : 1, {_}: a =<= b [] by prove_p12x
4352 Found proof, 79.374314s
4353 % SZS status Unsatisfiable for GRP181-4.p
4354 % SZS output start CNFRefutation for GRP181-4.p
4355 Id : 21, {_}: least_upper_bound a c =<= least_upper_bound b c [] by p12x_5
4356 Id : 20, {_}: greatest_lower_bound a c =<= greatest_lower_bound b c [] by p12x_4
4357 Id : 5, {_}: greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
4358 Id : 157, {_}: multiply ?480 (greatest_lower_bound ?481 ?482) =<= greatest_lower_bound (multiply ?480 ?481) (multiply ?480 ?482) [482, 481, 480] by monotony_glb1 ?480 ?481 ?482
4359 Id : 19, {_}: inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53) [54, 53] by p12x_3 ?53 ?54
4360 Id : 295, {_}: inverse (greatest_lower_bound ?769 ?770) =<= least_upper_bound (inverse ?769) (inverse ?770) [770, 769] by p12x_6 ?769 ?770
4361 Id : 6, {_}: least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
4362 Id : 132, {_}: multiply ?417 (least_upper_bound ?418 ?419) =<= least_upper_bound (multiply ?417 ?418) (multiply ?417 ?419) [419, 418, 417] by monotony_lub1 ?417 ?418 ?419
4363 Id : 17, {_}: inverse identity =>= identity [] by p12x_1
4364 Id : 257, {_}: inverse (multiply ?719 ?720) =<= multiply (inverse ?720) (inverse ?719) [720, 719] by p12x_3 ?719 ?720
4365 Id : 28, {_}: multiply (multiply ?71 ?72) ?73 =?= multiply ?71 (multiply ?72 ?73) [73, 72, 71] by associativity ?71 ?72 ?73
4366 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4367 Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p12x_2 ?51
4368 Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4369 Id : 4, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
4370 Id : 240, {_}: multiply ?668 (inverse ?668) =>= identity [668] by Super 3 with 18 at 1,2
4371 Id : 549, {_}: multiply identity ?1105 =<= multiply ?1106 (multiply (inverse ?1106) ?1105) [1106, 1105] by Super 4 with 240 at 1,2
4372 Id : 574, {_}: ?1105 =<= multiply ?1106 (multiply (inverse ?1106) ?1105) [1106, 1105] by Demod 549 with 2 at 2
4373 Id : 30, {_}: multiply (multiply ?78 (inverse ?79)) ?79 =>= multiply ?78 identity [79, 78] by Super 28 with 3 at 2,3
4374 Id : 258, {_}: inverse (multiply identity ?722) =<= multiply (inverse ?722) identity [722] by Super 257 with 17 at 2,3
4375 Id : 341, {_}: inverse ?858 =<= multiply (inverse ?858) identity [858] by Demod 258 with 2 at 1,2
4376 Id : 343, {_}: inverse (inverse ?861) =<= multiply ?861 identity [861] by Super 341 with 18 at 1,3
4377 Id : 354, {_}: ?861 =<= multiply ?861 identity [861] by Demod 343 with 18 at 2
4378 Id : 13771, {_}: multiply (multiply ?78 (inverse ?79)) ?79 =>= ?78 [79, 78] by Demod 30 with 354 at 3
4379 Id : 134, {_}: multiply (inverse ?424) (least_upper_bound ?425 ?424) =>= least_upper_bound (multiply (inverse ?424) ?425) identity [425, 424] by Super 132 with 3 at 2,3
4380 Id : 14350, {_}: multiply (inverse ?12073) (least_upper_bound ?12074 ?12073) =>= least_upper_bound identity (multiply (inverse ?12073) ?12074) [12074, 12073] by Demod 134 with 6 at 3
4381 Id : 298, {_}: inverse (greatest_lower_bound identity ?777) =<= least_upper_bound identity (inverse ?777) [777] by Super 295 with 17 at 1,3
4382 Id : 14395, {_}: multiply (inverse (inverse ?12177)) (inverse (greatest_lower_bound identity ?12177)) =>= least_upper_bound identity (multiply (inverse (inverse ?12177)) identity) [12177] by Super 14350 with 298 at 2,2
4383 Id : 14492, {_}: inverse (multiply (greatest_lower_bound identity ?12177) (inverse ?12177)) =?= least_upper_bound identity (multiply (inverse (inverse ?12177)) identity) [12177] by Demod 14395 with 19 at 2
4384 Id : 14493, {_}: inverse (multiply (greatest_lower_bound identity ?12177) (inverse ?12177)) =>= least_upper_bound identity (inverse (inverse ?12177)) [12177] by Demod 14492 with 354 at 2,3
4385 Id : 261, {_}: inverse (multiply ?729 (inverse ?730)) =>= multiply ?730 (inverse ?729) [730, 729] by Super 257 with 18 at 1,3
4386 Id : 14494, {_}: multiply ?12177 (inverse (greatest_lower_bound identity ?12177)) =>= least_upper_bound identity (inverse (inverse ?12177)) [12177] by Demod 14493 with 261 at 2
4387 Id : 14495, {_}: multiply ?12177 (inverse (greatest_lower_bound identity ?12177)) =>= inverse (greatest_lower_bound identity (inverse ?12177)) [12177] by Demod 14494 with 298 at 3
4388 Id : 297, {_}: inverse (greatest_lower_bound ?774 (inverse ?775)) =>= least_upper_bound (inverse ?774) ?775 [775, 774] by Super 295 with 18 at 2,3
4389 Id : 14496, {_}: multiply ?12177 (inverse (greatest_lower_bound identity ?12177)) =>= least_upper_bound (inverse identity) ?12177 [12177] by Demod 14495 with 297 at 3
4390 Id : 14497, {_}: multiply ?12177 (inverse (greatest_lower_bound identity ?12177)) =>= least_upper_bound identity ?12177 [12177] by Demod 14496 with 17 at 1,3
4391 Id : 52535, {_}: multiply (least_upper_bound identity ?40099) (greatest_lower_bound identity ?40099) =>= ?40099 [40099] by Super 13771 with 14497 at 1,2
4392 Id : 159, {_}: multiply (inverse ?487) (greatest_lower_bound ?488 ?487) =>= greatest_lower_bound (multiply (inverse ?487) ?488) identity [488, 487] by Super 157 with 3 at 2,3
4393 Id : 15858, {_}: multiply (inverse ?13310) (greatest_lower_bound ?13311 ?13310) =>= greatest_lower_bound identity (multiply (inverse ?13310) ?13311) [13311, 13310] by Demod 159 with 5 at 3
4394 Id : 15899, {_}: multiply (inverse c) (greatest_lower_bound a c) =>= greatest_lower_bound identity (multiply (inverse c) b) [] by Super 15858 with 20 at 2,2
4395 Id : 175, {_}: multiply (inverse ?487) (greatest_lower_bound ?488 ?487) =>= greatest_lower_bound identity (multiply (inverse ?487) ?488) [488, 487] by Demod 159 with 5 at 3
4396 Id : 15993, {_}: greatest_lower_bound identity (multiply (inverse c) a) =<= greatest_lower_bound identity (multiply (inverse c) b) [] by Demod 15899 with 175 at 2
4397 Id : 52561, {_}: multiply (least_upper_bound identity (multiply (inverse c) b)) (greatest_lower_bound identity (multiply (inverse c) a)) =>= multiply (inverse c) b [] by Super 52535 with 15993 at 2,2
4398 Id : 14391, {_}: multiply (inverse c) (least_upper_bound a c) =>= least_upper_bound identity (multiply (inverse c) b) [] by Super 14350 with 21 at 2,2
4399 Id : 148, {_}: multiply (inverse ?424) (least_upper_bound ?425 ?424) =>= least_upper_bound identity (multiply (inverse ?424) ?425) [425, 424] by Demod 134 with 6 at 3
4400 Id : 14483, {_}: least_upper_bound identity (multiply (inverse c) a) =<= least_upper_bound identity (multiply (inverse c) b) [] by Demod 14391 with 148 at 2
4401 Id : 52664, {_}: multiply (least_upper_bound identity (multiply (inverse c) a)) (greatest_lower_bound identity (multiply (inverse c) a)) =>= multiply (inverse c) b [] by Demod 52561 with 14483 at 1,2
4402 Id : 14657, {_}: multiply (least_upper_bound identity ?12375) (greatest_lower_bound identity ?12375) =>= ?12375 [12375] by Super 13771 with 14497 at 1,2
4403 Id : 52665, {_}: multiply (inverse c) a =<= multiply (inverse c) b [] by Demod 52664 with 14657 at 2
4404 Id : 52756, {_}: b =<= multiply c (multiply (inverse c) a) [] by Super 574 with 52665 at 2,3
4405 Id : 52761, {_}: b =>= a [] by Demod 52756 with 574 at 3
4406 Id : 53106, {_}: a === a [] by Demod 1 with 52761 at 3
4407 Id : 1, {_}: a =<= b [] by prove_p12x
4408 % SZS output end CNFRefutation for GRP181-4.p
4409 8118: solved GRP181-4.p in 18.585161 using nrkbo
4410 !! infer_left 415 0.0006 0.0000 0.0000
4411 !! infer_right 437 47.5832 0.9614 0.1089
4412 !! simplify_goal 416 0.0064 0.0002 0.0000
4413 !! keep_simplified 801 30.9236 5.0070 0.0386
4414 !! simplification_step 1079 30.9165 0.4439 0.0287
4415 !! simplify 116179 57.3217 0.4094 0.0005
4416 !! orphan_murder 870 0.3639 0.3002 0.0004
4417 !! is_subsumed 107530 4.5100 0.4093 0.0000
4418 !! build_new_clause 19683 3.1234 0.4008 0.0002
4419 !! demodulate 115340 51.3172 0.4086 0.0004
4420 !! demod 1013846 41.4354 0.4014 0.0000
4421 !! demod.apply_subst 490152 2.4465 0.4001 0.0000
4422 !! demod.compare_terms 220304 5.7869 0.4001 0.0000
4423 !! demod.retrieve_generalizations 1013846 16.6302 0.4003 0.0000
4424 !! demod.unify 507848 5.3583 0.4013 0.0000
4425 !! build_clause 54458 4.6844 0.4080 0.0001
4426 !! compare_terms(nrkbo) 280408 6.8254 0.4008 0.0000
4427 !! compare_terms(nrkbo) 23 0.0018 0.0016 0.0001
4429 8146: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4430 8146: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4432 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4433 [8, 7, 6] by associativity ?6 ?7 ?8
4435 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4436 [11, 10] by symmetry_of_glb ?10 ?11
4438 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4439 [14, 13] by symmetry_of_lub ?13 ?14
4441 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4443 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4444 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4446 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4448 least_upper_bound (least_upper_bound ?20 ?21) ?22
4449 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4450 8146: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4452 greatest_lower_bound ?26 ?26 =>= ?26
4453 [26] by idempotence_of_gld ?26
4455 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4456 [29, 28] by lub_absorbtion ?28 ?29
4458 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4459 [32, 31] by glb_absorbtion ?31 ?32
4461 multiply ?34 (least_upper_bound ?35 ?36)
4463 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4464 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4466 multiply ?38 (greatest_lower_bound ?39 ?40)
4468 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4469 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4471 multiply (least_upper_bound ?42 ?43) ?44
4473 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4474 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4476 multiply (greatest_lower_bound ?46 ?47) ?48
4478 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4479 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4482 greatest_lower_bound (least_upper_bound a identity)
4483 (inverse (greatest_lower_bound a identity))
4487 % SZS status Timeout for GRP183-1.p
4489 8184: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4490 8184: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4492 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4493 [8, 7, 6] by associativity ?6 ?7 ?8
4495 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4496 [11, 10] by symmetry_of_glb ?10 ?11
4498 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4499 [14, 13] by symmetry_of_lub ?13 ?14
4501 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4503 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4504 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4506 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4508 least_upper_bound (least_upper_bound ?20 ?21) ?22
4509 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4510 8184: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4512 greatest_lower_bound ?26 ?26 =>= ?26
4513 [26] by idempotence_of_gld ?26
4515 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4516 [29, 28] by lub_absorbtion ?28 ?29
4518 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4519 [32, 31] by glb_absorbtion ?31 ?32
4521 multiply ?34 (least_upper_bound ?35 ?36)
4523 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4524 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4526 multiply ?38 (greatest_lower_bound ?39 ?40)
4528 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4529 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4531 multiply (least_upper_bound ?42 ?43) ?44
4533 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4534 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4536 multiply (greatest_lower_bound ?46 ?47) ?48
4538 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4539 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4540 8184: Id : 17, {_}: inverse identity =>= identity [] by p20_1
4541 8184: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p20_2 ?51
4543 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4544 [54, 53] by p20_3 ?53 ?54
4547 greatest_lower_bound (least_upper_bound a identity)
4548 (inverse (greatest_lower_bound a identity))
4552 % SZS status Timeout for GRP183-2.p
4554 8211: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4555 8211: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4557 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4558 [8, 7, 6] by associativity ?6 ?7 ?8
4560 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4561 [11, 10] by symmetry_of_glb ?10 ?11
4563 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4564 [14, 13] by symmetry_of_lub ?13 ?14
4566 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4568 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4569 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4571 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4573 least_upper_bound (least_upper_bound ?20 ?21) ?22
4574 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4575 8211: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4577 greatest_lower_bound ?26 ?26 =>= ?26
4578 [26] by idempotence_of_gld ?26
4580 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4581 [29, 28] by lub_absorbtion ?28 ?29
4583 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4584 [32, 31] by glb_absorbtion ?31 ?32
4586 multiply ?34 (least_upper_bound ?35 ?36)
4588 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4589 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4591 multiply ?38 (greatest_lower_bound ?39 ?40)
4593 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4594 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4596 multiply (least_upper_bound ?42 ?43) ?44
4598 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4599 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4601 multiply (greatest_lower_bound ?46 ?47) ?48
4603 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4604 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4607 greatest_lower_bound (least_upper_bound a identity)
4608 (least_upper_bound (inverse a) identity)
4612 % SZS status Timeout for GRP183-3.p
4614 8255: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4615 8255: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4617 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4618 [8, 7, 6] by associativity ?6 ?7 ?8
4620 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4621 [11, 10] by symmetry_of_glb ?10 ?11
4623 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4624 [14, 13] by symmetry_of_lub ?13 ?14
4626 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4628 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4629 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4631 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4633 least_upper_bound (least_upper_bound ?20 ?21) ?22
4634 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4635 8255: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4637 greatest_lower_bound ?26 ?26 =>= ?26
4638 [26] by idempotence_of_gld ?26
4640 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4641 [29, 28] by lub_absorbtion ?28 ?29
4643 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4644 [32, 31] by glb_absorbtion ?31 ?32
4646 multiply ?34 (least_upper_bound ?35 ?36)
4648 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4649 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4651 multiply ?38 (greatest_lower_bound ?39 ?40)
4653 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4654 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4656 multiply (least_upper_bound ?42 ?43) ?44
4658 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4659 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4661 multiply (greatest_lower_bound ?46 ?47) ?48
4663 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4664 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4665 8255: Id : 17, {_}: inverse identity =>= identity [] by p20x_1
4666 8255: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p20x_1 ?51
4668 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4669 [54, 53] by p20x_3 ?53 ?54
4672 greatest_lower_bound (least_upper_bound a identity)
4673 (least_upper_bound (inverse a) identity)
4677 % SZS status Timeout for GRP183-4.p
4679 8302: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4680 8302: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4682 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4683 [8, 7, 6] by associativity ?6 ?7 ?8
4685 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4686 [11, 10] by symmetry_of_glb ?10 ?11
4688 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4689 [14, 13] by symmetry_of_lub ?13 ?14
4691 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4693 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4694 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4696 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4698 least_upper_bound (least_upper_bound ?20 ?21) ?22
4699 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4700 8302: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4702 greatest_lower_bound ?26 ?26 =>= ?26
4703 [26] by idempotence_of_gld ?26
4705 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4706 [29, 28] by lub_absorbtion ?28 ?29
4708 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4709 [32, 31] by glb_absorbtion ?31 ?32
4711 multiply ?34 (least_upper_bound ?35 ?36)
4713 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4714 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4716 multiply ?38 (greatest_lower_bound ?39 ?40)
4718 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4719 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4721 multiply (least_upper_bound ?42 ?43) ?44
4723 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4724 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4726 multiply (greatest_lower_bound ?46 ?47) ?48
4728 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4729 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4732 multiply (least_upper_bound a identity)
4733 (inverse (greatest_lower_bound a identity))
4735 multiply (inverse (greatest_lower_bound a identity))
4736 (least_upper_bound a identity)
4738 % SZS status Timeout for GRP184-1.p
4740 8349: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4741 8349: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4743 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4744 [8, 7, 6] by associativity ?6 ?7 ?8
4746 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4747 [11, 10] by symmetry_of_glb ?10 ?11
4749 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4750 [14, 13] by symmetry_of_lub ?13 ?14
4752 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4754 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4755 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4757 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4759 least_upper_bound (least_upper_bound ?20 ?21) ?22
4760 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4761 8349: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4763 greatest_lower_bound ?26 ?26 =>= ?26
4764 [26] by idempotence_of_gld ?26
4766 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4767 [29, 28] by lub_absorbtion ?28 ?29
4769 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4770 [32, 31] by glb_absorbtion ?31 ?32
4772 multiply ?34 (least_upper_bound ?35 ?36)
4774 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4775 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4777 multiply ?38 (greatest_lower_bound ?39 ?40)
4779 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4780 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4782 multiply (least_upper_bound ?42 ?43) ?44
4784 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4785 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4787 multiply (greatest_lower_bound ?46 ?47) ?48
4789 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4790 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4791 8349: Id : 17, {_}: inverse identity =>= identity [] by p21_1
4792 8349: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p21_2 ?51
4794 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4795 [54, 53] by p21_3 ?53 ?54
4798 multiply (least_upper_bound a identity)
4799 (inverse (greatest_lower_bound a identity))
4801 multiply (inverse (greatest_lower_bound a identity))
4802 (least_upper_bound a identity)
4804 % SZS status Timeout for GRP184-2.p
4806 8376: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4807 8376: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4809 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4810 [8, 7, 6] by associativity ?6 ?7 ?8
4812 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4813 [11, 10] by symmetry_of_glb ?10 ?11
4815 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4816 [14, 13] by symmetry_of_lub ?13 ?14
4818 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4820 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4821 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4823 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4825 least_upper_bound (least_upper_bound ?20 ?21) ?22
4826 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4827 8376: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4829 greatest_lower_bound ?26 ?26 =>= ?26
4830 [26] by idempotence_of_gld ?26
4832 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4833 [29, 28] by lub_absorbtion ?28 ?29
4835 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4836 [32, 31] by glb_absorbtion ?31 ?32
4838 multiply ?34 (least_upper_bound ?35 ?36)
4840 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4841 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4843 multiply ?38 (greatest_lower_bound ?39 ?40)
4845 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4846 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4848 multiply (least_upper_bound ?42 ?43) ?44
4850 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4851 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4853 multiply (greatest_lower_bound ?46 ?47) ?48
4855 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4856 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4859 multiply (least_upper_bound a identity)
4860 (inverse (greatest_lower_bound a identity))
4862 multiply (inverse (greatest_lower_bound a identity))
4863 (least_upper_bound a identity)
4865 % SZS status Timeout for GRP184-3.p
4867 8415: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4868 8415: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4870 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4871 [8, 7, 6] by associativity ?6 ?7 ?8
4873 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
4874 [11, 10] by symmetry_of_glb ?10 ?11
4876 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
4877 [14, 13] by symmetry_of_lub ?13 ?14
4879 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4881 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4882 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4884 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4886 least_upper_bound (least_upper_bound ?20 ?21) ?22
4887 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4888 8415: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4890 greatest_lower_bound ?26 ?26 =>= ?26
4891 [26] by idempotence_of_gld ?26
4893 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4894 [29, 28] by lub_absorbtion ?28 ?29
4896 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4897 [32, 31] by glb_absorbtion ?31 ?32
4899 multiply ?34 (least_upper_bound ?35 ?36)
4901 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4902 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4904 multiply ?38 (greatest_lower_bound ?39 ?40)
4906 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4907 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4909 multiply (least_upper_bound ?42 ?43) ?44
4911 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4912 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4914 multiply (greatest_lower_bound ?46 ?47) ?48
4916 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4917 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4920 least_upper_bound (least_upper_bound (multiply a b) identity)
4921 (multiply (least_upper_bound a identity)
4922 (least_upper_bound b identity))
4924 multiply (least_upper_bound a identity)
4925 (least_upper_bound b identity)
4929 Found proof, 5.334971s
4930 % SZS status Unsatisfiable for GRP185-1.p
4931 % SZS output start CNFRefutation for GRP185-1.p
4932 Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4933 Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4934 Id : 21, {_}: multiply (multiply ?57 ?58) ?59 =>= multiply ?57 (multiply ?58 ?59) [59, 58, 57] by associativity ?57 ?58 ?59
4935 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4936 Id : 15, {_}: multiply (least_upper_bound ?42 ?43) ?44 =>= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4937 Id : 13, {_}: multiply ?34 (least_upper_bound ?35 ?36) =>= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4938 Id : 8, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =<= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4939 Id : 6, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
4940 Id : 23, {_}: multiply identity ?64 =<= multiply (inverse ?65) (multiply ?65 ?64) [65, 64] by Super 21 with 3 at 1,2
4941 Id : 470, {_}: ?582 =<= multiply (inverse ?583) (multiply ?583 ?582) [583, 582] by Demod 23 with 2 at 2
4942 Id : 472, {_}: ?587 =<= multiply (inverse (inverse ?587)) identity [587] by Super 470 with 3 at 2,3
4943 Id : 27, {_}: ?64 =<= multiply (inverse ?65) (multiply ?65 ?64) [65, 64] by Demod 23 with 2 at 2
4944 Id : 478, {_}: multiply ?609 ?610 =<= multiply (inverse (inverse ?609)) ?610 [610, 609] by Super 470 with 27 at 2,3
4945 Id : 713, {_}: ?587 =<= multiply ?587 identity [587] by Demod 472 with 478 at 3
4946 Id : 73, {_}: least_upper_bound ?180 (least_upper_bound ?180 ?181) =>= least_upper_bound ?180 ?181 [181, 180] by Super 8 with 9 at 1,3
4947 Id : 57, {_}: least_upper_bound ?143 (least_upper_bound ?144 ?145) =?= least_upper_bound ?144 (least_upper_bound ?145 ?143) [145, 144, 143] by Super 6 with 8 at 3
4948 Id : 2966, {_}: least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) === least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) [] by Demod 2965 with 73 at 2,2,2
4949 Id : 2965, {_}: least_upper_bound b (least_upper_bound a (least_upper_bound identity (least_upper_bound identity (multiply a b)))) =>= least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) [] by Demod 2964 with 8 at 2,2
4950 Id : 2964, {_}: least_upper_bound b (least_upper_bound (least_upper_bound a identity) (least_upper_bound identity (multiply a b))) =>= least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) [] by Demod 2963 with 8 at 2
4951 Id : 2963, {_}: least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (least_upper_bound identity (multiply a b)) =>= least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) [] by Demod 2962 with 8 at 2,3
4952 Id : 2962, {_}: least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (least_upper_bound identity (multiply a b)) =>= least_upper_bound b (least_upper_bound (least_upper_bound a identity) (multiply a b)) [] by Demod 2961 with 57 at 2
4953 Id : 2961, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a identity))) =>= least_upper_bound b (least_upper_bound (least_upper_bound a identity) (multiply a b)) [] by Demod 2960 with 8 at 3
4954 Id : 2960, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a identity))) =>= least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (multiply a b) [] by Demod 2959 with 2 at 2,2,2,2,2
4955 Id : 2959, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a (multiply identity identity)))) =>= least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (multiply a b) [] by Demod 2958 with 713 at 1,2,2,2,2
4956 Id : 2958, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (multiply a b) [] by Demod 2957 with 2 at 1,2,2,2
4957 Id : 2957, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (multiply a b) [] by Demod 2956 with 6 at 3
4958 Id : 2956, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a identity)) [] by Demod 2955 with 73 at 2,2
4959 Id : 2955, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a identity)) [] by Demod 2954 with 2 at 2,2,2,3
4960 Id : 2954, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a (multiply identity identity))) [] by Demod 2953 with 713 at 1,2,2,3
4961 Id : 2953, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) (multiply identity identity))) [] by Demod 2952 with 2 at 1,2,3
4962 Id : 2952, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))) [] by Demod 2951 with 8 at 2,2,2
4963 Id : 2951, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))) [] by Demod 2950 with 8 at 3
4964 Id : 2950, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)) [] by Demod 2949 with 15 at 2,2,2,2
4965 Id : 2949, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)) [] by Demod 2948 with 15 at 1,2,2,2
4966 Id : 2948, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)) [] by Demod 2947 with 15 at 2,3
4967 Id : 2947, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (multiply (least_upper_bound a identity) identity) [] by Demod 2946 with 15 at 1,3
4968 Id : 2946, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity) [] by Demod 2945 with 13 at 2,2,2
4969 Id : 2945, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (multiply (least_upper_bound a identity) (least_upper_bound b identity))) =>= least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity) [] by Demod 2944 with 13 at 3
4970 Id : 2944, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (multiply (least_upper_bound a identity) (least_upper_bound b identity))) =>= multiply (least_upper_bound a identity) (least_upper_bound b identity) [] by Demod 56 with 8 at 2
4971 Id : 56, {_}: least_upper_bound (least_upper_bound identity (multiply a b)) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= multiply (least_upper_bound a identity) (least_upper_bound b identity) [] by Demod 1 with 6 at 1,2
4972 Id : 1, {_}: least_upper_bound (least_upper_bound (multiply a b) identity) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= multiply (least_upper_bound a identity) (least_upper_bound b identity) [] by prove_p22a
4973 % SZS output end CNFRefutation for GRP185-1.p
4974 8417: solved GRP185-1.p in 1.048064 using lpo
4975 !! infer_left 200 0.0002 0.0000 0.0000
4976 !! infer_right 39 2.3782 0.4992 0.0610
4977 !! simplify_goal 198 2.5109 0.4135 0.0127
4978 !! keep_simplified 68 0.4409 0.4019 0.0065
4979 !! simplification_step 71 0.4407 0.4018 0.0062
4980 !! simplify 1544 2.7542 0.4006 0.0018
4981 !! orphan_murder 70 0.0006 0.0000 0.0000
4982 !! is_subsumed 1189 0.4210 0.4001 0.0004
4983 !! build_new_clause 889 0.0403 0.0007 0.0000
4984 !! demodulate 1647 4.8380 0.4135 0.0029
4985 !! demod 17712 3.9747 0.4007 0.0002
4986 !! demod.apply_subst 40004 1.2662 0.4001 0.0000
4987 !! demod.compare_terms 18045 1.6445 0.4003 0.0001
4988 !! demod.retrieve_generalizations 17712 0.0876 0.0003 0.0000
4989 !! demod.unify 33701 0.4697 0.4001 0.0000
4990 !! build_clause 3069 0.4676 0.2963 0.0002
4991 !! compare_terms(lpo) 21591 2.0674 0.4003 0.0001
4992 !! compare_terms(nrkbo) 16 0.0002 0.0000 0.0000
4994 8423: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4995 8423: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4997 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4998 [8, 7, 6] by associativity ?6 ?7 ?8
5000 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
5001 [11, 10] by symmetry_of_glb ?10 ?11
5003 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
5004 [14, 13] by symmetry_of_lub ?13 ?14
5006 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
5008 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
5009 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
5011 least_upper_bound ?20 (least_upper_bound ?21 ?22)
5013 least_upper_bound (least_upper_bound ?20 ?21) ?22
5014 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5015 8423: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5017 greatest_lower_bound ?26 ?26 =>= ?26
5018 [26] by idempotence_of_gld ?26
5020 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
5021 [29, 28] by lub_absorbtion ?28 ?29
5023 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
5024 [32, 31] by glb_absorbtion ?31 ?32
5026 multiply ?34 (least_upper_bound ?35 ?36)
5028 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
5029 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5031 multiply ?38 (greatest_lower_bound ?39 ?40)
5033 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
5034 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
5036 multiply (least_upper_bound ?42 ?43) ?44
5038 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
5039 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5041 multiply (greatest_lower_bound ?46 ?47) ?48
5043 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
5044 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
5045 8423: Id : 17, {_}: inverse identity =>= identity [] by p22a_1
5046 8423: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p22a_2 ?51
5048 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
5049 [54, 53] by p22a_3 ?53 ?54
5052 least_upper_bound (least_upper_bound (multiply a b) identity)
5053 (multiply (least_upper_bound a identity)
5054 (least_upper_bound b identity))
5056 multiply (least_upper_bound a identity)
5057 (least_upper_bound b identity)
5061 Found proof, 14.420248s
5062 % SZS status Unsatisfiable for GRP185-2.p
5063 % SZS output start CNFRefutation for GRP185-2.p
5064 Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p22a_2 ?51
5065 Id : 17, {_}: inverse identity =>= identity [] by p22a_1
5066 Id : 420, {_}: inverse (multiply ?514 ?515) =?= multiply (inverse ?515) (inverse ?514) [515, 514] by p22a_3 ?514 ?515
5067 Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5068 Id : 62, {_}: least_upper_bound ?157 (least_upper_bound ?158 ?159) =<= least_upper_bound (least_upper_bound ?157 ?158) ?159 [159, 158, 157] by associativity_of_lub ?157 ?158 ?159
5069 Id : 6, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
5070 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5071 Id : 15, {_}: multiply (least_upper_bound ?42 ?43) ?44 =>= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5072 Id : 13, {_}: multiply ?34 (least_upper_bound ?35 ?36) =>= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5073 Id : 8, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =<= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5074 Id : 63, {_}: least_upper_bound ?161 (least_upper_bound ?162 ?163) =<= least_upper_bound (least_upper_bound ?162 ?161) ?163 [163, 162, 161] by Super 62 with 6 at 1,3
5075 Id : 69, {_}: least_upper_bound ?161 (least_upper_bound ?162 ?163) =?= least_upper_bound ?162 (least_upper_bound ?161 ?163) [163, 162, 161] by Demod 63 with 8 at 3
5076 Id : 76, {_}: least_upper_bound ?186 (least_upper_bound ?186 ?187) =>= least_upper_bound ?186 ?187 [187, 186] by Super 8 with 9 at 1,3
5077 Id : 421, {_}: inverse (multiply identity ?517) =<= multiply (inverse ?517) identity [517] by Super 420 with 17 at 2,3
5078 Id : 477, {_}: inverse ?572 =<= multiply (inverse ?572) identity [572] by Demod 421 with 2 at 1,2
5079 Id : 479, {_}: inverse (inverse ?575) =<= multiply ?575 identity [575] by Super 477 with 18 at 1,3
5080 Id : 491, {_}: ?575 =<= multiply ?575 identity [575] by Demod 479 with 18 at 2
5081 Id : 60, {_}: least_upper_bound ?149 (least_upper_bound ?150 ?151) =?= least_upper_bound ?150 (least_upper_bound ?151 ?149) [151, 150, 149] by Super 6 with 8 at 3
5082 Id : 707, {_}: least_upper_bound ?669 (least_upper_bound ?669 ?670) =>= least_upper_bound ?669 ?670 [670, 669] by Super 8 with 9 at 1,3
5083 Id : 708, {_}: least_upper_bound ?672 (least_upper_bound ?673 ?672) =>= least_upper_bound ?672 ?673 [673, 672] by Super 707 with 6 at 2,2
5084 Id : 1174, {_}: least_upper_bound ?909 (least_upper_bound (least_upper_bound ?910 ?909) ?911) =?= least_upper_bound (least_upper_bound ?909 ?910) ?911 [911, 910, 909] by Super 8 with 708 at 1,3
5085 Id : 1201, {_}: least_upper_bound ?909 (least_upper_bound ?910 (least_upper_bound ?909 ?911)) =<= least_upper_bound (least_upper_bound ?909 ?910) ?911 [911, 910, 909] by Demod 1174 with 8 at 2,2
5086 Id : 1202, {_}: least_upper_bound ?909 (least_upper_bound ?910 (least_upper_bound ?909 ?911)) =>= least_upper_bound ?909 (least_upper_bound ?910 ?911) [911, 910, 909] by Demod 1201 with 8 at 3
5087 Id : 7764, {_}: least_upper_bound a (least_upper_bound b (least_upper_bound identity (multiply a b))) === least_upper_bound a (least_upper_bound b (least_upper_bound identity (multiply a b))) [] by Demod 7763 with 69 at 2
5088 Id : 7763, {_}: least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) =>= least_upper_bound a (least_upper_bound b (least_upper_bound identity (multiply a b))) [] by Demod 7762 with 60 at 2,2
5089 Id : 7762, {_}: least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) a)) =>= least_upper_bound a (least_upper_bound b (least_upper_bound identity (multiply a b))) [] by Demod 7761 with 491 at 2,2,2,2
5090 Id : 7761, {_}: least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) (multiply a identity))) =>= least_upper_bound a (least_upper_bound b (least_upper_bound identity (multiply a b))) [] by Demod 7760 with 69 at 3
5091 Id : 7760, {_}: least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) (multiply a identity))) =>= least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) [] by Demod 7759 with 1202 at 2,2
5092 Id : 7759, {_}: least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound identity (multiply a identity)))) =>= least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b))) [] by Demod 7758 with 60 at 2,3
5093 Id : 7758, {_}: least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound identity (multiply a identity)))) =>= least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) a)) [] by Demod 7757 with 69 at 2
5094 Id : 7757, {_}: least_upper_bound identity (least_upper_bound b (least_upper_bound (multiply a b) (least_upper_bound identity (multiply a identity)))) =>= least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) a)) [] by Demod 7756 with 491 at 2,2,2,3
5095 Id : 7756, {_}: least_upper_bound identity (least_upper_bound b (least_upper_bound (multiply a b) (least_upper_bound identity (multiply a identity)))) =>= least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) (multiply a identity))) [] by Demod 7755 with 69 at 2,2
5096 Id : 7755, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity)))) =>= least_upper_bound b (least_upper_bound identity (least_upper_bound (multiply a b) (multiply a identity))) [] by Demod 7754 with 69 at 2,3
5097 Id : 7754, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity)))) =>= least_upper_bound b (least_upper_bound (multiply a b) (least_upper_bound identity (multiply a identity))) [] by Demod 7753 with 76 at 2,2
5098 Id : 7753, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity))))) =>= least_upper_bound b (least_upper_bound (multiply a b) (least_upper_bound identity (multiply a identity))) [] by Demod 7752 with 69 at 3
5099 Id : 7752, {_}: least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity))) [] by Demod 509 with 69 at 2
5100 Id : 509, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity))) [] by Demod 508 with 6 at 2,2,2,2,2
5101 Id : 508, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) identity)))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound identity (multiply a identity))) [] by Demod 507 with 6 at 2,2,3
5102 Id : 507, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) identity)))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) identity)) [] by Demod 506 with 2 at 2,2,2,2,2,2
5103 Id : 506, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) identity)) [] by Demod 505 with 2 at 1,2,2,2,2
5104 Id : 505, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) identity)) [] by Demod 504 with 2 at 2,2,2,3
5105 Id : 504, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) (multiply identity identity))) [] by Demod 503 with 2 at 1,2,3
5106 Id : 503, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))))) =>= least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))) [] by Demod 502 with 8 at 2,2,2
5107 Id : 502, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity))) [] by Demod 501 with 8 at 3
5108 Id : 501, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)) [] by Demod 500 with 15 at 2,2,2,2
5109 Id : 500, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)) [] by Demod 499 with 15 at 1,2,2,2
5110 Id : 499, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity)) [] by Demod 498 with 15 at 2,3
5111 Id : 498, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (multiply (least_upper_bound a identity) identity) [] by Demod 497 with 15 at 1,3
5112 Id : 497, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity))) =>= least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity) [] by Demod 496 with 13 at 2,2,2
5113 Id : 496, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (multiply (least_upper_bound a identity) (least_upper_bound b identity))) =>= least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity) [] by Demod 495 with 13 at 3
5114 Id : 495, {_}: least_upper_bound (multiply a b) (least_upper_bound identity (multiply (least_upper_bound a identity) (least_upper_bound b identity))) =>= multiply (least_upper_bound a identity) (least_upper_bound b identity) [] by Demod 1 with 8 at 2
5115 Id : 1, {_}: least_upper_bound (least_upper_bound (multiply a b) identity) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= multiply (least_upper_bound a identity) (least_upper_bound b identity) [] by prove_p22a
5116 % SZS output end CNFRefutation for GRP185-2.p
5117 8425: solved GRP185-2.p in 2.828176 using lpo
5118 !! infer_left 445 0.0004 0.0000 0.0000
5119 !! infer_right 61 9.7164 0.9528 0.1593
5120 !! simplify_goal 438 4.1641 0.4115 0.0095
5121 !! keep_simplified 163 0.5263 0.4031 0.0032
5122 !! simplification_step 165 0.5258 0.4031 0.0032
5123 !! simplify 4247 8.8132 0.4067 0.0021
5124 !! orphan_murder 163 0.0020 0.0001 0.0000
5125 !! is_subsumed 2993 0.0626 0.0003 0.0000
5126 !! build_new_clause 2626 0.5502 0.4005 0.0002
5127 !! demodulate 4461 12.8974 0.4115 0.0029
5128 !! demod 42176 9.7292 0.4014 0.0002
5129 !! demod.apply_subst 110926 0.9934 0.4013 0.0000
5130 !! demod.compare_terms 50572 5.6042 0.4004 0.0001
5131 !! demod.retrieve_generalizations 42176 1.0239 0.4001 0.0000
5132 !! demod.unify 98253 0.6176 0.4001 0.0000
5133 !! build_clause 8077 3.2207 0.4016 0.0004
5134 !! compare_terms(lpo) 59928 7.5018 0.4016 0.0001
5135 !! compare_terms(nrkbo) 19 0.0018 0.0016 0.0001
5137 8431: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5138 8431: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
5140 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
5141 [8, 7, 6] by associativity ?6 ?7 ?8
5143 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
5144 [11, 10] by symmetry_of_glb ?10 ?11
5146 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
5147 [14, 13] by symmetry_of_lub ?13 ?14
5149 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
5151 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
5152 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
5154 least_upper_bound ?20 (least_upper_bound ?21 ?22)
5156 least_upper_bound (least_upper_bound ?20 ?21) ?22
5157 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5158 8431: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5160 greatest_lower_bound ?26 ?26 =>= ?26
5161 [26] by idempotence_of_gld ?26
5163 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
5164 [29, 28] by lub_absorbtion ?28 ?29
5166 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
5167 [32, 31] by glb_absorbtion ?31 ?32
5169 multiply ?34 (least_upper_bound ?35 ?36)
5171 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
5172 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5174 multiply ?38 (greatest_lower_bound ?39 ?40)
5176 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
5177 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
5179 multiply (least_upper_bound ?42 ?43) ?44
5181 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
5182 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5184 multiply (greatest_lower_bound ?46 ?47) ?48
5186 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
5187 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
5190 greatest_lower_bound (least_upper_bound (multiply a b) identity)
5191 (multiply (least_upper_bound a identity)
5192 (least_upper_bound b identity))
5194 least_upper_bound (multiply a b) identity
5198 Found proof, 3.899196s
5199 % SZS status Unsatisfiable for GRP185-3.p
5200 % SZS output start CNFRefutation for GRP185-3.p
5201 Id : 104, {_}: greatest_lower_bound ?245 (least_upper_bound ?245 ?246) =>= ?245 [246, 245] by glb_absorbtion ?245 ?246
5202 Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
5203 Id : 21, {_}: multiply (multiply ?57 ?58) ?59 =>= multiply ?57 (multiply ?58 ?59) [59, 58, 57] by associativity ?57 ?58 ?59
5204 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5205 Id : 8, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =<= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5206 Id : 15, {_}: multiply (least_upper_bound ?42 ?43) ?44 =>= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5207 Id : 13, {_}: multiply ?34 (least_upper_bound ?35 ?36) =>= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5208 Id : 6, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
5209 Id : 23, {_}: multiply identity ?64 =<= multiply (inverse ?65) (multiply ?65 ?64) [65, 64] by Super 21 with 3 at 1,2
5210 Id : 380, {_}: ?582 =<= multiply (inverse ?583) (multiply ?583 ?582) [583, 582] by Demod 23 with 2 at 2
5211 Id : 382, {_}: ?587 =<= multiply (inverse (inverse ?587)) identity [587] by Super 380 with 3 at 2,3
5212 Id : 27, {_}: ?64 =<= multiply (inverse ?65) (multiply ?65 ?64) [65, 64] by Demod 23 with 2 at 2
5213 Id : 388, {_}: multiply ?609 ?610 =<= multiply (inverse (inverse ?609)) ?610 [610, 609] by Super 380 with 27 at 2,3
5214 Id : 513, {_}: ?587 =<= multiply ?587 identity [587] by Demod 382 with 388 at 3
5215 Id : 800, {_}: greatest_lower_bound ?1077 (least_upper_bound ?1078 ?1077) =>= ?1077 [1078, 1077] by Super 104 with 6 at 2,2
5216 Id : 807, {_}: greatest_lower_bound ?1097 (least_upper_bound ?1098 (least_upper_bound ?1099 ?1097)) =>= ?1097 [1099, 1098, 1097] by Super 800 with 8 at 2,2
5217 Id : 2297, {_}: least_upper_bound identity (multiply a b) === least_upper_bound identity (multiply a b) [] by Demod 2296 with 807 at 2
5218 Id : 2296, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b)))) =>= least_upper_bound identity (multiply a b) [] by Demod 2295 with 8 at 2,2,2
5219 Id : 2295, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound b (least_upper_bound (least_upper_bound a identity) (multiply a b))) =>= least_upper_bound identity (multiply a b) [] by Demod 2294 with 8 at 2,2
5220 Id : 2294, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (multiply a b)) =>= least_upper_bound identity (multiply a b) [] by Demod 2293 with 6 at 2,2
5221 Id : 2293, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a identity))) =>= least_upper_bound identity (multiply a b) [] by Demod 2292 with 2 at 2,2,2,2,2
5222 Id : 2292, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a (multiply identity identity)))) =>= least_upper_bound identity (multiply a b) [] by Demod 2291 with 513 at 1,2,2,2,2
5223 Id : 2291, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound identity (multiply a b) [] by Demod 2290 with 2 at 1,2,2,2
5224 Id : 2290, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound identity (multiply a b) [] by Demod 2289 with 8 at 2,2
5225 Id : 2289, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity))) =>= least_upper_bound identity (multiply a b) [] by Demod 2288 with 15 at 2,2,2
5226 Id : 2288, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (multiply (least_upper_bound a identity) identity)) =>= least_upper_bound identity (multiply a b) [] by Demod 2287 with 15 at 1,2,2
5227 Id : 2287, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity)) =>= least_upper_bound identity (multiply a b) [] by Demod 2286 with 6 at 3
5228 Id : 2286, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity)) =>= least_upper_bound (multiply a b) identity [] by Demod 2285 with 13 at 2,2
5229 Id : 2285, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= least_upper_bound (multiply a b) identity [] by Demod 1 with 6 at 1,2
5230 Id : 1, {_}: greatest_lower_bound (least_upper_bound (multiply a b) identity) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= least_upper_bound (multiply a b) identity [] by prove_p22b
5231 % SZS output end CNFRefutation for GRP185-3.p
5232 8433: solved GRP185-3.p in 0.80405 using lpo
5233 !! infer_left 112 0.0001 0.0000 0.0000
5234 !! infer_right 41 2.5648 0.4974 0.0626
5235 !! simplify_goal 110 1.2845 0.4047 0.0117
5236 !! keep_simplified 71 0.0451 0.0021 0.0006
5237 !! simplification_step 74 0.0448 0.0021 0.0006
5238 !! simplify 1726 2.5360 0.4042 0.0015
5239 !! orphan_murder 73 0.0005 0.0000 0.0000
5240 !! is_subsumed 1322 0.0245 0.0002 0.0000
5241 !! build_new_clause 1005 0.0448 0.0007 0.0000
5242 !! demodulate 1731 3.7903 0.4047 0.0022
5243 !! demod 13340 3.3069 0.4007 0.0002
5244 !! demod.apply_subst 33322 0.0575 0.0003 0.0000
5245 !! demod.compare_terms 15459 1.8419 0.4002 0.0001
5246 !! demod.retrieve_generalizations 13340 0.0611 0.0002 0.0000
5247 !! demod.unify 26972 0.0610 0.0002 0.0000
5248 !! build_clause 2386 0.4986 0.4003 0.0002
5249 !! compare_terms(lpo) 18357 2.0043 0.4003 0.0001
5250 !! compare_terms(nrkbo) 16 0.0002 0.0000 0.0000
5252 8440: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5253 8440: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
5255 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
5256 [8, 7, 6] by associativity ?6 ?7 ?8
5258 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
5259 [11, 10] by symmetry_of_glb ?10 ?11
5261 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
5262 [14, 13] by symmetry_of_lub ?13 ?14
5264 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
5266 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
5267 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
5269 least_upper_bound ?20 (least_upper_bound ?21 ?22)
5271 least_upper_bound (least_upper_bound ?20 ?21) ?22
5272 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5273 8440: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5275 greatest_lower_bound ?26 ?26 =>= ?26
5276 [26] by idempotence_of_gld ?26
5278 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
5279 [29, 28] by lub_absorbtion ?28 ?29
5281 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
5282 [32, 31] by glb_absorbtion ?31 ?32
5284 multiply ?34 (least_upper_bound ?35 ?36)
5286 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
5287 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5289 multiply ?38 (greatest_lower_bound ?39 ?40)
5291 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
5292 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
5294 multiply (least_upper_bound ?42 ?43) ?44
5296 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
5297 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5299 multiply (greatest_lower_bound ?46 ?47) ?48
5301 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
5302 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
5303 8440: Id : 17, {_}: inverse identity =>= identity [] by p22b_1
5304 8440: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p22b_2 ?51
5306 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
5307 [54, 53] by p22b_3 ?53 ?54
5310 greatest_lower_bound (least_upper_bound (multiply a b) identity)
5311 (multiply (least_upper_bound a identity)
5312 (least_upper_bound b identity))
5314 least_upper_bound (multiply a b) identity
5318 Found proof, 2.688809s
5319 % SZS status Unsatisfiable for GRP185-4.p
5320 % SZS output start CNFRefutation for GRP185-4.p
5321 Id : 107, {_}: greatest_lower_bound ?251 (least_upper_bound ?251 ?252) =>= ?251 [252, 251] by glb_absorbtion ?251 ?252
5322 Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p22b_2 ?51
5323 Id : 17, {_}: inverse identity =>= identity [] by p22b_1
5324 Id : 332, {_}: inverse (multiply ?514 ?515) =?= multiply (inverse ?515) (inverse ?514) [515, 514] by p22b_3 ?514 ?515
5325 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5326 Id : 8, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =<= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5327 Id : 15, {_}: multiply (least_upper_bound ?42 ?43) ?44 =>= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5328 Id : 13, {_}: multiply ?34 (least_upper_bound ?35 ?36) =>= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5329 Id : 6, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
5330 Id : 333, {_}: inverse (multiply identity ?517) =<= multiply (inverse ?517) identity [517] by Super 332 with 17 at 2,3
5331 Id : 368, {_}: inverse ?572 =<= multiply (inverse ?572) identity [572] by Demod 333 with 2 at 1,2
5332 Id : 370, {_}: inverse (inverse ?575) =<= multiply ?575 identity [575] by Super 368 with 18 at 1,3
5333 Id : 382, {_}: ?575 =<= multiply ?575 identity [575] by Demod 370 with 18 at 2
5334 Id : 696, {_}: greatest_lower_bound ?874 (least_upper_bound ?875 ?874) =>= ?874 [875, 874] by Super 107 with 6 at 2,2
5335 Id : 703, {_}: greatest_lower_bound ?894 (least_upper_bound ?895 (least_upper_bound ?896 ?894)) =>= ?894 [896, 895, 894] by Super 696 with 8 at 2,2
5336 Id : 1870, {_}: least_upper_bound identity (multiply a b) === least_upper_bound identity (multiply a b) [] by Demod 1869 with 703 at 2
5337 Id : 1869, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound b (least_upper_bound a (least_upper_bound identity (multiply a b)))) =>= least_upper_bound identity (multiply a b) [] by Demod 1868 with 8 at 2,2,2
5338 Id : 1868, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound b (least_upper_bound (least_upper_bound a identity) (multiply a b))) =>= least_upper_bound identity (multiply a b) [] by Demod 1867 with 8 at 2,2
5339 Id : 1867, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (least_upper_bound b (least_upper_bound a identity)) (multiply a b)) =>= least_upper_bound identity (multiply a b) [] by Demod 1866 with 6 at 2,2
5340 Id : 1866, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a identity))) =>= least_upper_bound identity (multiply a b) [] by Demod 1865 with 2 at 2,2,2,2,2
5341 Id : 1865, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound a (multiply identity identity)))) =>= least_upper_bound identity (multiply a b) [] by Demod 1864 with 382 at 1,2,2,2,2
5342 Id : 1864, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound b (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound identity (multiply a b) [] by Demod 1863 with 2 at 1,2,2,2
5343 Id : 1863, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply a b) (least_upper_bound (multiply identity b) (least_upper_bound (multiply a identity) (multiply identity identity)))) =>= least_upper_bound identity (multiply a b) [] by Demod 1862 with 8 at 2,2
5344 Id : 1862, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (least_upper_bound (multiply a identity) (multiply identity identity))) =>= least_upper_bound identity (multiply a b) [] by Demod 1861 with 15 at 2,2,2
5345 Id : 1861, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (least_upper_bound (multiply a b) (multiply identity b)) (multiply (least_upper_bound a identity) identity)) =>= least_upper_bound identity (multiply a b) [] by Demod 1860 with 15 at 1,2,2
5346 Id : 1860, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity)) =>= least_upper_bound identity (multiply a b) [] by Demod 1859 with 6 at 3
5347 Id : 1859, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (least_upper_bound (multiply (least_upper_bound a identity) b) (multiply (least_upper_bound a identity) identity)) =>= least_upper_bound (multiply a b) identity [] by Demod 1858 with 13 at 2,2
5348 Id : 1858, {_}: greatest_lower_bound (least_upper_bound identity (multiply a b)) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= least_upper_bound (multiply a b) identity [] by Demod 1 with 6 at 1,2
5349 Id : 1, {_}: greatest_lower_bound (least_upper_bound (multiply a b) identity) (multiply (least_upper_bound a identity) (least_upper_bound b identity)) =>= least_upper_bound (multiply a b) identity [] by prove_p22b
5350 % SZS output end CNFRefutation for GRP185-4.p
5351 8442: solved GRP185-4.p in 0.524032 using lpo
5352 !! infer_left 106 0.0001 0.0000 0.0000
5353 !! infer_right 38 1.5097 0.4446 0.0397
5354 !! simplify_goal 104 0.9291 0.4044 0.0089
5355 !! keep_simplified 53 0.2460 0.2123 0.0046
5356 !! simplification_step 53 0.2459 0.2122 0.0046
5357 !! simplify 1386 1.7000 0.4026 0.0012
5358 !! orphan_murder 53 0.0004 0.0001 0.0000
5359 !! is_subsumed 1031 0.0127 0.0002 0.0000
5360 !! build_new_clause 728 0.0323 0.0013 0.0000
5361 !! demodulate 1403 2.6113 0.4044 0.0019
5362 !! demod 11597 2.1437 0.4006 0.0002
5363 !! demod.apply_subst 19168 0.0320 0.0001 0.0000
5364 !! demod.compare_terms 8552 1.3522 0.4003 0.0002
5365 !! demod.retrieve_generalizations 11597 0.2669 0.2121 0.0000
5366 !! demod.unify 16413 0.0363 0.0004 0.0000
5367 !! build_clause 1900 0.0749 0.0013 0.0000
5368 !! compare_terms(lpo) 10727 1.4029 0.4003 0.0001
5369 !! compare_terms(nrkbo) 19 0.0018 0.0016 0.0001
5371 8448: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5372 8448: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
5374 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
5375 [8, 7, 6] by associativity ?6 ?7 ?8
5377 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
5378 [11, 10] by symmetry_of_glb ?10 ?11
5380 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
5381 [14, 13] by symmetry_of_lub ?13 ?14
5383 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
5385 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
5386 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
5388 least_upper_bound ?20 (least_upper_bound ?21 ?22)
5390 least_upper_bound (least_upper_bound ?20 ?21) ?22
5391 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5392 8448: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5394 greatest_lower_bound ?26 ?26 =>= ?26
5395 [26] by idempotence_of_gld ?26
5397 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
5398 [29, 28] by lub_absorbtion ?28 ?29
5400 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
5401 [32, 31] by glb_absorbtion ?31 ?32
5403 multiply ?34 (least_upper_bound ?35 ?36)
5405 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
5406 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5408 multiply ?38 (greatest_lower_bound ?39 ?40)
5410 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
5411 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
5413 multiply (least_upper_bound ?42 ?43) ?44
5415 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
5416 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5418 multiply (greatest_lower_bound ?46 ?47) ?48
5420 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
5421 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
5424 least_upper_bound (multiply a b) identity
5426 multiply a (inverse (greatest_lower_bound a (inverse b)))
5428 % SZS status Timeout for GRP186-1.p
5430 8512: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5431 8512: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
5433 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
5434 [8, 7, 6] by associativity ?6 ?7 ?8
5436 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
5437 [11, 10] by symmetry_of_glb ?10 ?11
5439 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
5440 [14, 13] by symmetry_of_lub ?13 ?14
5442 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
5444 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
5445 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
5447 least_upper_bound ?20 (least_upper_bound ?21 ?22)
5449 least_upper_bound (least_upper_bound ?20 ?21) ?22
5450 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5451 8512: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5453 greatest_lower_bound ?26 ?26 =>= ?26
5454 [26] by idempotence_of_gld ?26
5456 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
5457 [29, 28] by lub_absorbtion ?28 ?29
5459 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
5460 [32, 31] by glb_absorbtion ?31 ?32
5462 multiply ?34 (least_upper_bound ?35 ?36)
5464 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
5465 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5467 multiply ?38 (greatest_lower_bound ?39 ?40)
5469 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
5470 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
5472 multiply (least_upper_bound ?42 ?43) ?44
5474 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
5475 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5477 multiply (greatest_lower_bound ?46 ?47) ?48
5479 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
5480 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
5481 8512: Id : 17, {_}: inverse identity =>= identity [] by p23_1
5482 8512: Id : 18, {_}: inverse (inverse ?51) =>= ?51 [51] by p23_2 ?51
5484 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
5485 [54, 53] by p23_3 ?53 ?54
5488 least_upper_bound (multiply a b) identity
5490 multiply a (inverse (greatest_lower_bound a (inverse b)))
5492 % SZS status Timeout for GRP186-2.p
5494 8550: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5495 8550: Id : 3, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
5497 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
5498 [8, 7, 6] by associativity ?6 ?7 ?8
5500 greatest_lower_bound ?10 ?11 =<->= greatest_lower_bound ?11 ?10
5501 [11, 10] by symmetry_of_glb ?10 ?11
5503 least_upper_bound ?13 ?14 =<->= least_upper_bound ?14 ?13
5504 [14, 13] by symmetry_of_lub ?13 ?14
5506 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
5508 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
5509 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
5511 least_upper_bound ?20 (least_upper_bound ?21 ?22)
5513 least_upper_bound (least_upper_bound ?20 ?21) ?22
5514 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
5515 8550: Id : 9, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
5517 greatest_lower_bound ?26 ?26 =>= ?26
5518 [26] by idempotence_of_gld ?26
5520 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
5521 [29, 28] by lub_absorbtion ?28 ?29
5523 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
5524 [32, 31] by glb_absorbtion ?31 ?32
5526 multiply ?34 (least_upper_bound ?35 ?36)
5528 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
5529 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
5531 multiply ?38 (greatest_lower_bound ?39 ?40)
5533 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
5534 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
5536 multiply (least_upper_bound ?42 ?43) ?44
5538 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
5539 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
5541 multiply (greatest_lower_bound ?46 ?47) ?48
5543 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
5544 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
5546 greatest_lower_bound (least_upper_bound a (inverse a))
5547 (least_upper_bound b (inverse b))
5552 8550: Id : 1, {_}: multiply a b =<= multiply b a [] by prove_p33
5553 % SZS status Timeout for GRP187-1.p
5556 multiply (multiply ?2 ?3) ?4 =?= multiply ?2 (multiply ?3 ?4)
5557 [4, 3, 2] by associativity_of_multiply ?2 ?3 ?4
5559 multiply ?6 (multiply ?7 (multiply ?7 ?7))
5561 multiply ?7 (multiply ?7 (multiply ?7 ?6))
5562 [7, 6] by condition ?6 ?7
5579 (multiply a (multiply b (multiply a b))))))))))))))))
5595 (multiply b (multiply b (multiply b b))))))))))))))))
5597 % SZS status Timeout for GRP196-1.p
5599 8627: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5600 8627: Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
5602 multiply ?6 (left_division ?6 ?7) =>= ?7
5603 [7, 6] by multiply_left_division ?6 ?7
5605 left_division ?9 (multiply ?9 ?10) =>= ?10
5606 [10, 9] by left_division_multiply ?9 ?10
5608 multiply (right_division ?12 ?13) ?13 =>= ?12
5609 [13, 12] by multiply_right_division ?12 ?13
5611 right_division (multiply ?15 ?16) ?16 =>= ?15
5612 [16, 15] by right_division_multiply ?15 ?16
5614 multiply ?18 (right_inverse ?18) =>= identity
5615 [18] by right_inverse ?18
5617 multiply (left_inverse ?20) ?20 =>= identity
5618 [20] by left_inverse ?20
5620 multiply (multiply ?22 (multiply ?23 ?24)) ?22
5622 multiply (multiply ?22 ?23) (multiply ?24 ?22)
5623 [24, 23, 22] by moufang1 ?22 ?23 ?24
5626 multiply (multiply (multiply a b) c) b
5628 multiply a (multiply b (multiply c b))
5629 [] by prove_moufang2
5630 % SZS status Timeout for GRP200-1.p
5632 8654: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5633 8654: Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
5635 multiply ?6 (left_division ?6 ?7) =>= ?7
5636 [7, 6] by multiply_left_division ?6 ?7
5638 left_division ?9 (multiply ?9 ?10) =>= ?10
5639 [10, 9] by left_division_multiply ?9 ?10
5641 multiply (right_division ?12 ?13) ?13 =>= ?12
5642 [13, 12] by multiply_right_division ?12 ?13
5644 right_division (multiply ?15 ?16) ?16 =>= ?15
5645 [16, 15] by right_division_multiply ?15 ?16
5647 multiply ?18 (right_inverse ?18) =>= identity
5648 [18] by right_inverse ?18
5650 multiply (left_inverse ?20) ?20 =>= identity
5651 [20] by left_inverse ?20
5653 multiply (multiply (multiply ?22 ?23) ?24) ?23
5655 multiply ?22 (multiply ?23 (multiply ?24 ?23))
5656 [24, 23, 22] by moufang2 ?22 ?23 ?24
5659 multiply (multiply (multiply a b) a) c
5661 multiply a (multiply b (multiply a c))
5662 [] by prove_moufang3
5665 Found proof, 28.457404s
5666 % SZS status Unsatisfiable for GRP201-1.p
5667 % SZS output start CNFRefutation for GRP201-1.p
5668 Id : 22, {_}: left_division ?48 (multiply ?48 ?49) =>= ?49 [49, 48] by left_division_multiply ?48 ?49
5669 Id : 8, {_}: multiply ?18 (right_inverse ?18) =>= identity [18] by right_inverse ?18
5670 Id : 6, {_}: multiply (right_division ?12 ?13) ?13 =>= ?12 [13, 12] by multiply_right_division ?12 ?13
5671 Id : 4, {_}: multiply ?6 (left_division ?6 ?7) =>= ?7 [7, 6] by multiply_left_division ?6 ?7
5672 Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
5673 Id : 9, {_}: multiply (left_inverse ?20) ?20 =>= identity [20] by left_inverse ?20
5674 Id : 10, {_}: multiply (multiply (multiply ?22 ?23) ?24) ?23 =>= multiply ?22 (multiply ?23 (multiply ?24 ?23)) [24, 23, 22] by moufang2 ?22 ?23 ?24
5675 Id : 7, {_}: right_division (multiply ?15 ?16) ?16 =>= ?15 [16, 15] by right_division_multiply ?15 ?16
5676 Id : 5, {_}: left_division ?9 (multiply ?9 ?10) =>= ?10 [10, 9] by left_division_multiply ?9 ?10
5677 Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5678 Id : 54, {_}: multiply (multiply (multiply ?119 ?120) ?121) ?120 =>= multiply ?119 (multiply ?120 (multiply ?121 ?120)) [121, 120, 119] by moufang2 ?119 ?120 ?121
5679 Id : 55, {_}: multiply (multiply ?123 ?124) ?123 =<= multiply identity (multiply ?123 (multiply ?124 ?123)) [124, 123] by Super 54 with 2 at 1,1,2
5680 Id : 71, {_}: multiply (multiply ?123 ?124) ?123 =>= multiply ?123 (multiply ?124 ?123) [124, 123] by Demod 55 with 2 at 3
5681 Id : 481, {_}: right_division (multiply ?676 (multiply ?677 (multiply ?678 ?677))) ?677 =>= multiply (multiply ?676 ?677) ?678 [678, 677, 676] by Super 7 with 10 at 1,2
5682 Id : 486, {_}: right_division (multiply ?694 (multiply ?695 identity)) ?695 =>= multiply (multiply ?694 ?695) (left_inverse ?695) [695, 694] by Super 481 with 9 at 2,2,1,2
5683 Id : 510, {_}: right_division (multiply ?694 ?695) ?695 =<= multiply (multiply ?694 ?695) (left_inverse ?695) [695, 694] by Demod 486 with 3 at 2,1,2
5684 Id : 511, {_}: ?694 =<= multiply (multiply ?694 ?695) (left_inverse ?695) [695, 694] by Demod 510 with 7 at 2
5685 Id : 744, {_}: left_division (multiply ?1012 ?1013) ?1012 =>= left_inverse ?1013 [1013, 1012] by Super 5 with 511 at 2,2
5686 Id : 747, {_}: left_division ?1019 ?1020 =<= left_inverse (left_division ?1020 ?1019) [1020, 1019] by Super 744 with 4 at 1,2
5687 Id : 596, {_}: left_division (multiply ?806 ?807) ?806 =>= left_inverse ?807 [807, 806] by Super 5 with 511 at 2,2
5688 Id : 604, {_}: ?834 =<= multiply (multiply ?834 ?835) (left_inverse ?835) [835, 834] by Demod 510 with 7 at 2
5689 Id : 610, {_}: right_division ?849 ?850 =<= multiply ?849 (left_inverse ?850) [850, 849] by Super 604 with 6 at 1,3
5690 Id : 691, {_}: right_division (multiply (left_inverse ?967) ?968) ?967 =<= multiply (left_inverse ?967) (multiply ?968 (left_inverse ?967)) [968, 967] by Super 71 with 610 at 2
5691 Id : 708, {_}: right_division (multiply (left_inverse ?967) ?968) ?967 =<= multiply (left_inverse ?967) (right_division ?968 ?967) [968, 967] by Demod 691 with 610 at 2,3
5692 Id : 241, {_}: right_division (multiply ?328 (multiply ?329 ?328)) ?328 =>= multiply ?328 ?329 [329, 328] by Super 7 with 71 at 1,2
5693 Id : 1672, {_}: right_division (multiply (left_inverse ?2005) (multiply ?2005 (multiply ?2006 ?2005))) ?2005 =>= multiply (left_inverse ?2005) (multiply ?2005 ?2006) [2006, 2005] by Super 708 with 241 at 2,3
5694 Id : 53, {_}: right_division (multiply ?115 (multiply ?116 (multiply ?117 ?116))) ?116 =>= multiply (multiply ?115 ?116) ?117 [117, 116, 115] by Super 7 with 10 at 1,2
5695 Id : 1711, {_}: multiply (multiply (left_inverse ?2005) ?2005) ?2006 =>= multiply (left_inverse ?2005) (multiply ?2005 ?2006) [2006, 2005] by Demod 1672 with 53 at 2
5696 Id : 1712, {_}: multiply identity ?2006 =<= multiply (left_inverse ?2005) (multiply ?2005 ?2006) [2005, 2006] by Demod 1711 with 9 at 1,2
5697 Id : 1713, {_}: ?2006 =<= multiply (left_inverse ?2005) (multiply ?2005 ?2006) [2005, 2006] by Demod 1712 with 2 at 2
5698 Id : 2009, {_}: left_division ?2492 (left_inverse ?2493) =>= left_inverse (multiply ?2493 ?2492) [2493, 2492] by Super 596 with 1713 at 1,2
5699 Id : 2109, {_}: left_division (left_inverse ?2600) ?2601 =>= multiply ?2600 ?2601 [2601, 2600] by Super 5 with 1713 at 2,2
5700 Id : 40, {_}: left_division ?91 identity =>= right_inverse ?91 [91] by Super 5 with 8 at 2,2
5701 Id : 28, {_}: left_division (right_division ?62 ?63) ?62 =>= ?63 [63, 62] by Super 5 with 6 at 2,2
5702 Id : 176, {_}: ?256 =<= right_inverse (right_division identity ?256) [256] by Super 40 with 28 at 2
5703 Id : 45, {_}: right_division identity ?99 =>= left_inverse ?99 [99] by Super 7 with 9 at 1,2
5704 Id : 183, {_}: ?256 =<= right_inverse (left_inverse ?256) [256] by Demod 176 with 45 at 1,3
5705 Id : 246, {_}: multiply (multiply ?343 ?344) ?343 =>= multiply ?343 (multiply ?344 ?343) [344, 343] by Demod 55 with 2 at 3
5706 Id : 251, {_}: multiply identity ?356 =<= multiply ?356 (multiply (right_inverse ?356) ?356) [356] by Super 246 with 8 at 1,2
5707 Id : 264, {_}: ?356 =<= multiply ?356 (multiply (right_inverse ?356) ?356) [356] by Demod 251 with 2 at 2
5708 Id : 370, {_}: left_division ?577 ?577 =<= multiply (right_inverse ?577) ?577 [577] by Super 5 with 264 at 2,2
5709 Id : 24, {_}: left_division ?53 ?53 =>= identity [53] by Super 22 with 3 at 2,2
5710 Id : 382, {_}: identity =<= multiply (right_inverse ?577) ?577 [577] by Demod 370 with 24 at 2
5711 Id : 398, {_}: right_division identity ?598 =>= right_inverse ?598 [598] by Super 7 with 382 at 1,2
5712 Id : 416, {_}: left_inverse ?598 =<= right_inverse ?598 [598] by Demod 398 with 45 at 2
5713 Id : 429, {_}: ?256 =<= left_inverse (left_inverse ?256) [256] by Demod 183 with 416 at 3
5714 Id : 2111, {_}: left_division ?2605 ?2606 =<= multiply (left_inverse ?2605) ?2606 [2606, 2605] by Super 2109 with 429 at 1,2
5715 Id : 2210, {_}: multiply (multiply (left_division ?2711 ?2712) ?2713) ?2712 =<= multiply (left_inverse ?2711) (multiply ?2712 (multiply ?2713 ?2712)) [2713, 2712, 2711] by Super 10 with 2111 at 1,1,2
5716 Id : 2277, {_}: multiply (multiply (left_division ?2711 ?2712) ?2713) ?2712 =>= left_division ?2711 (multiply ?2712 (multiply ?2713 ?2712)) [2713, 2712, 2711] by Demod 2210 with 2111 at 3
5717 Id : 2112, {_}: left_division (left_division ?2608 ?2609) ?2610 =<= multiply (left_division ?2609 ?2608) ?2610 [2610, 2609, 2608] by Super 2109 with 747 at 1,2
5718 Id : 6527, {_}: multiply (left_division (left_division ?2712 ?2711) ?2713) ?2712 =>= left_division ?2711 (multiply ?2712 (multiply ?2713 ?2712)) [2713, 2711, 2712] by Demod 2277 with 2112 at 1,2
5719 Id : 6528, {_}: left_division (left_division ?2713 (left_division ?2712 ?2711)) ?2712 =>= left_division ?2711 (multiply ?2712 (multiply ?2713 ?2712)) [2711, 2712, 2713] by Demod 6527 with 2112 at 2
5720 Id : 6539, {_}: left_division ?7196 (multiply (left_inverse ?7197) (multiply ?7198 (left_inverse ?7197))) =>= left_inverse (multiply ?7197 (left_division ?7198 (left_division (left_inverse ?7197) ?7196))) [7198, 7197, 7196] by Super 2009 with 6528 at 2
5721 Id : 6592, {_}: left_division ?7196 (left_division ?7197 (multiply ?7198 (left_inverse ?7197))) =<= left_inverse (multiply ?7197 (left_division ?7198 (left_division (left_inverse ?7197) ?7196))) [7198, 7197, 7196] by Demod 6539 with 2111 at 2,2
5722 Id : 770, {_}: right_division ?1046 (left_division ?1047 ?1048) =<= multiply ?1046 (left_division ?1048 ?1047) [1048, 1047, 1046] by Super 610 with 747 at 2,3
5723 Id : 6593, {_}: left_division ?7196 (left_division ?7197 (multiply ?7198 (left_inverse ?7197))) =<= left_inverse (right_division ?7197 (left_division (left_division (left_inverse ?7197) ?7196) ?7198)) [7198, 7197, 7196] by Demod 6592 with 770 at 1,3
5724 Id : 6594, {_}: left_division ?7196 (left_division ?7197 (right_division ?7198 ?7197)) =<= left_inverse (right_division ?7197 (left_division (left_division (left_inverse ?7197) ?7196) ?7198)) [7198, 7197, 7196] by Demod 6593 with 610 at 2,2,2
5725 Id : 2005, {_}: left_division (left_inverse ?2480) ?2481 =>= multiply ?2480 ?2481 [2481, 2480] by Super 5 with 1713 at 2,2
5726 Id : 2151, {_}: left_inverse (multiply ?2655 (left_inverse ?2656)) =>= multiply ?2656 (left_inverse ?2655) [2656, 2655] by Super 2005 with 2009 at 2
5727 Id : 2162, {_}: left_inverse (right_division ?2655 ?2656) =<= multiply ?2656 (left_inverse ?2655) [2656, 2655] by Demod 2151 with 610 at 1,2
5728 Id : 2163, {_}: left_inverse (right_division ?2655 ?2656) =>= right_division ?2656 ?2655 [2656, 2655] by Demod 2162 with 610 at 3
5729 Id : 6595, {_}: left_division ?7196 (left_division ?7197 (right_division ?7198 ?7197)) =<= right_division (left_division (left_division (left_inverse ?7197) ?7196) ?7198) ?7197 [7198, 7197, 7196] by Demod 6594 with 2163 at 3
5730 Id : 2192, {_}: right_division (left_division ?967 ?968) ?967 =<= multiply (left_inverse ?967) (right_division ?968 ?967) [968, 967] by Demod 708 with 2111 at 1,2
5731 Id : 2193, {_}: right_division (left_division ?967 ?968) ?967 =<= left_division ?967 (right_division ?968 ?967) [968, 967] by Demod 2192 with 2111 at 3
5732 Id : 6596, {_}: left_division ?7196 (right_division (left_division ?7197 ?7198) ?7197) =<= right_division (left_division (left_division (left_inverse ?7197) ?7196) ?7198) ?7197 [7198, 7197, 7196] by Demod 6595 with 2193 at 2,2
5733 Id : 6597, {_}: left_division ?7196 (right_division (left_division ?7197 ?7198) ?7197) =>= right_division (left_division (multiply ?7197 ?7196) ?7198) ?7197 [7198, 7197, 7196] by Demod 6596 with 2005 at 1,1,3
5734 Id : 20877, {_}: left_division (right_division (left_division ?20893 ?20894) ?20893) ?20895 =<= left_inverse (right_division (left_division (multiply ?20893 ?20895) ?20894) ?20893) [20895, 20894, 20893] by Super 747 with 6597 at 1,3
5735 Id : 33499, {_}: left_division (right_division (left_division ?34597 ?34598) ?34597) ?34599 =>= right_division ?34597 (left_division (multiply ?34597 ?34599) ?34598) [34599, 34598, 34597] by Demod 20877 with 2163 at 3
5736 Id : 33508, {_}: left_division (right_division (left_inverse (multiply ?34632 ?34633)) ?34633) ?34634 =>= right_division ?34633 (left_division (multiply ?34633 ?34634) (left_inverse ?34632)) [34634, 34633, 34632] by Super 33499 with 2009 at 1,1,2
5737 Id : 2219, {_}: right_division (left_inverse ?2745) ?2746 =<= left_division ?2745 (left_inverse ?2746) [2746, 2745] by Super 610 with 2111 at 3
5738 Id : 2260, {_}: right_division (left_inverse ?2745) ?2746 =>= left_inverse (multiply ?2746 ?2745) [2746, 2745] by Demod 2219 with 2009 at 3
5739 Id : 33812, {_}: left_division (left_inverse (multiply ?34633 (multiply ?34632 ?34633))) ?34634 =>= right_division ?34633 (left_division (multiply ?34633 ?34634) (left_inverse ?34632)) [34634, 34632, 34633] by Demod 33508 with 2260 at 1,2
5740 Id : 33813, {_}: left_division (left_inverse (multiply ?34633 (multiply ?34632 ?34633))) ?34634 =>= right_division ?34633 (left_inverse (multiply ?34632 (multiply ?34633 ?34634))) [34634, 34632, 34633] by Demod 33812 with 2009 at 2,3
5741 Id : 33814, {_}: multiply (multiply ?34633 (multiply ?34632 ?34633)) ?34634 =<= right_division ?34633 (left_inverse (multiply ?34632 (multiply ?34633 ?34634))) [34634, 34632, 34633] by Demod 33813 with 2005 at 2
5742 Id : 595, {_}: right_division ?803 (left_inverse ?804) =>= multiply ?803 ?804 [804, 803] by Super 7 with 511 at 1,2
5743 Id : 33815, {_}: multiply (multiply ?34633 (multiply ?34632 ?34633)) ?34634 =>= multiply ?34633 (multiply ?34632 (multiply ?34633 ?34634)) [34634, 34632, 34633] by Demod 33814 with 595 at 3
5744 Id : 45208, {_}: multiply a (multiply b (multiply a c)) =?= multiply a (multiply b (multiply a c)) [] by Demod 45207 with 33815 at 2
5745 Id : 45207, {_}: multiply (multiply a (multiply b a)) c =>= multiply a (multiply b (multiply a c)) [] by Demod 1 with 71 at 1,2
5746 Id : 1, {_}: multiply (multiply (multiply a b) a) c =>= multiply a (multiply b (multiply a c)) [] by prove_moufang3
5747 % SZS output end CNFRefutation for GRP201-1.p
5748 8655: solved GRP201-1.p in 7.072442 using kbo
5749 !! infer_left 350 0.0004 0.0000 0.0000
5750 !! infer_right 187 24.3759 0.7782 0.1304
5751 !! simplify_goal 350 0.4988 0.4442 0.0014
5752 !! keep_simplified 535 3.1571 0.3144 0.0059
5753 !! simplification_step 615 3.1552 0.3097 0.0051
5754 !! simplify 29430 23.5363 0.3066 0.0008
5755 !! orphan_murder 547 0.3326 0.3004 0.0006
5756 !! is_subsumed 25977 2.1995 0.3004 0.0001
5757 !! build_new_clause 12393 2.7399 0.3009 0.0002
5758 !! demodulate 29460 20.8291 0.4442 0.0007
5759 !! demod 292448 14.8706 0.4441 0.0001
5760 !! demod.apply_subst 68770 0.4728 0.3001 0.0000
5761 !! demod.compare_terms 1484 0.3060 0.3001 0.0002
5762 !! demod.retrieve_generalizations 292448 3.9073 0.4441 0.0000
5763 !! demod.unify 463590 5.1533 0.3047 0.0000
5764 !! build_clause 45294 5.4325 0.3009 0.0001
5765 !! compare_terms(kbo) 46812 2.7476 0.3008 0.0001
5766 !! compare_terms(nrkbo) 10 0.0001 0.0000 0.0000
5768 8677: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5769 8677: Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
5771 multiply ?6 (left_division ?6 ?7) =>= ?7
5772 [7, 6] by multiply_left_division ?6 ?7
5774 left_division ?9 (multiply ?9 ?10) =>= ?10
5775 [10, 9] by left_division_multiply ?9 ?10
5777 multiply (right_division ?12 ?13) ?13 =>= ?12
5778 [13, 12] by multiply_right_division ?12 ?13
5780 right_division (multiply ?15 ?16) ?16 =>= ?15
5781 [16, 15] by right_division_multiply ?15 ?16
5783 multiply ?18 (right_inverse ?18) =>= identity
5784 [18] by right_inverse ?18
5786 multiply (left_inverse ?20) ?20 =>= identity
5787 [20] by left_inverse ?20
5789 multiply (multiply (multiply ?22 ?23) ?22) ?24
5791 multiply ?22 (multiply ?23 (multiply ?22 ?24))
5792 [24, 23, 22] by moufang3 ?22 ?23 ?24
5795 multiply (multiply a (multiply b c)) a
5797 multiply (multiply a b) (multiply c a)
5798 [] by prove_moufang1
5801 Found proof, 35.548526s
5802 % SZS status Unsatisfiable for GRP202-1.p
5803 % SZS output start CNFRefutation for GRP202-1.p
5804 Id : 56, {_}: multiply (multiply (multiply ?126 ?127) ?126) ?128 =>= multiply ?126 (multiply ?127 (multiply ?126 ?128)) [128, 127, 126] by moufang3 ?126 ?127 ?128
5805 Id : 4, {_}: multiply ?6 (left_division ?6 ?7) =>= ?7 [7, 6] by multiply_left_division ?6 ?7
5806 Id : 5, {_}: left_division ?9 (multiply ?9 ?10) =>= ?10 [10, 9] by left_division_multiply ?9 ?10
5807 Id : 9, {_}: multiply (left_inverse ?20) ?20 =>= identity [20] by left_inverse ?20
5808 Id : 8, {_}: multiply ?18 (right_inverse ?18) =>= identity [18] by right_inverse ?18
5809 Id : 6, {_}: multiply (right_division ?12 ?13) ?13 =>= ?12 [13, 12] by multiply_right_division ?12 ?13
5810 Id : 7, {_}: right_division (multiply ?15 ?16) ?16 =>= ?15 [16, 15] by right_division_multiply ?15 ?16
5811 Id : 10, {_}: multiply (multiply (multiply ?22 ?23) ?22) ?24 =>= multiply ?22 (multiply ?23 (multiply ?22 ?24)) [24, 23, 22] by moufang3 ?22 ?23 ?24
5812 Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
5813 Id : 53, {_}: multiply ?115 (multiply ?116 (multiply ?115 identity)) =>= multiply (multiply ?115 ?116) ?115 [116, 115] by Super 3 with 10 at 2
5814 Id : 70, {_}: multiply ?115 (multiply ?116 ?115) =<= multiply (multiply ?115 ?116) ?115 [116, 115] by Demod 53 with 3 at 2,2,2
5815 Id : 564, {_}: right_division (multiply ?710 (multiply ?711 ?710)) ?710 =>= multiply ?710 ?711 [711, 710] by Super 7 with 70 at 1,2
5816 Id : 568, {_}: right_division (multiply ?720 ?721) ?720 =<= multiply ?720 (right_division ?721 ?720) [721, 720] by Super 564 with 6 at 2,1,2
5817 Id : 55, {_}: right_division (multiply ?122 (multiply ?123 (multiply ?122 ?124))) ?124 =>= multiply (multiply ?122 ?123) ?122 [124, 123, 122] by Super 7 with 10 at 1,2
5818 Id : 1875, {_}: right_division (multiply ?2527 (multiply ?2528 (multiply ?2527 ?2529))) ?2529 =>= multiply ?2527 (multiply ?2528 ?2527) [2529, 2528, 2527] by Demod 55 with 70 at 3
5819 Id : 51, {_}: multiply ?108 (multiply ?109 (multiply ?108 (right_inverse (multiply (multiply ?108 ?109) ?108)))) =>= identity [109, 108] by Super 8 with 10 at 2
5820 Id : 282, {_}: multiply ?401 (multiply ?402 (multiply ?401 (right_inverse (multiply ?401 (multiply ?402 ?401))))) =>= identity [402, 401] by Demod 51 with 70 at 1,2,2,2,2
5821 Id : 287, {_}: multiply (right_inverse ?414) (multiply ?414 (multiply (right_inverse ?414) (right_inverse (multiply (right_inverse ?414) identity)))) =>= identity [414] by Super 282 with 8 at 2,1,2,2,2,2
5822 Id : 316, {_}: multiply (right_inverse ?414) (multiply ?414 (multiply (right_inverse ?414) (right_inverse (right_inverse ?414)))) =>= identity [414] by Demod 287 with 3 at 1,2,2,2,2
5823 Id : 317, {_}: multiply (right_inverse ?414) (multiply ?414 identity) =>= identity [414] by Demod 316 with 8 at 2,2,2
5824 Id : 318, {_}: multiply (right_inverse ?414) ?414 =>= identity [414] by Demod 317 with 3 at 2,2
5825 Id : 347, {_}: right_division identity ?453 =>= right_inverse ?453 [453] by Super 7 with 318 at 1,2
5826 Id : 45, {_}: right_division identity ?99 =>= left_inverse ?99 [99] by Super 7 with 9 at 1,2
5827 Id : 368, {_}: left_inverse ?453 =<= right_inverse ?453 [453] by Demod 347 with 45 at 2
5828 Id : 374, {_}: multiply ?18 (left_inverse ?18) =>= identity [18] by Demod 8 with 368 at 2,2
5829 Id : 1881, {_}: right_division (multiply ?2550 (multiply ?2551 identity)) (left_inverse ?2550) =>= multiply ?2550 (multiply ?2551 ?2550) [2551, 2550] by Super 1875 with 374 at 2,2,1,2
5830 Id : 1928, {_}: right_division (multiply ?2550 ?2551) (left_inverse ?2550) =>= multiply ?2550 (multiply ?2551 ?2550) [2551, 2550] by Demod 1881 with 3 at 2,1,2
5831 Id : 2110, {_}: right_division (multiply (left_inverse ?2786) (multiply ?2786 ?2787)) (left_inverse ?2786) =>= multiply (left_inverse ?2786) (multiply ?2786 (multiply ?2787 ?2786)) [2787, 2786] by Super 568 with 1928 at 2,3
5832 Id : 52, {_}: multiply ?111 (multiply ?112 (multiply ?111 (left_division (multiply (multiply ?111 ?112) ?111) ?113))) =>= ?113 [113, 112, 111] by Super 4 with 10 at 2
5833 Id : 617, {_}: multiply ?798 (multiply ?799 (multiply ?798 (left_division (multiply ?798 (multiply ?799 ?798)) ?800))) =>= ?800 [800, 799, 798] by Demod 52 with 70 at 1,2,2,2,2
5834 Id : 622, {_}: multiply ?816 (multiply (left_inverse ?816) (multiply ?816 (left_division (multiply ?816 identity) ?817))) =>= ?817 [817, 816] by Super 617 with 9 at 2,1,2,2,2,2
5835 Id : 659, {_}: multiply ?816 (multiply (left_inverse ?816) (multiply ?816 (left_division ?816 ?817))) =>= ?817 [817, 816] by Demod 622 with 3 at 1,2,2,2,2
5836 Id : 660, {_}: multiply ?816 (multiply (left_inverse ?816) ?817) =>= ?817 [817, 816] by Demod 659 with 4 at 2,2,2
5837 Id : 754, {_}: left_division ?1007 ?1008 =<= multiply (left_inverse ?1007) ?1008 [1008, 1007] by Super 5 with 660 at 2,2
5838 Id : 2138, {_}: right_division (left_division ?2786 (multiply ?2786 ?2787)) (left_inverse ?2786) =<= multiply (left_inverse ?2786) (multiply ?2786 (multiply ?2787 ?2786)) [2787, 2786] by Demod 2110 with 754 at 1,2
5839 Id : 2139, {_}: right_division (left_division ?2786 (multiply ?2786 ?2787)) (left_inverse ?2786) =>= left_division ?2786 (multiply ?2786 (multiply ?2787 ?2786)) [2787, 2786] by Demod 2138 with 754 at 3
5840 Id : 2140, {_}: right_division ?2787 (left_inverse ?2786) =<= left_division ?2786 (multiply ?2786 (multiply ?2787 ?2786)) [2786, 2787] by Demod 2139 with 5 at 1,2
5841 Id : 2141, {_}: right_division ?2787 (left_inverse ?2786) =>= multiply ?2787 ?2786 [2786, 2787] by Demod 2140 with 5 at 3
5842 Id : 926, {_}: right_division (left_division ?1218 ?1219) ?1219 =>= left_inverse ?1218 [1219, 1218] by Super 7 with 754 at 1,2
5843 Id : 28, {_}: left_division (right_division ?62 ?63) ?62 =>= ?63 [63, 62] by Super 5 with 6 at 2,2
5844 Id : 929, {_}: right_division ?1226 ?1227 =<= left_inverse (right_division ?1227 ?1226) [1227, 1226] by Super 926 with 28 at 1,2
5845 Id : 2784, {_}: multiply (multiply ?3616 ?3617) ?3618 =<= multiply ?3617 (multiply (left_division ?3617 ?3616) (multiply ?3617 ?3618)) [3618, 3617, 3616] by Super 56 with 4 at 1,1,2
5846 Id : 2787, {_}: multiply (multiply ?3626 ?3627) (left_division ?3627 ?3628) =>= multiply ?3627 (multiply (left_division ?3627 ?3626) ?3628) [3628, 3627, 3626] by Super 2784 with 4 at 2,2,3
5847 Id : 2209, {_}: right_division (left_inverse ?2889) ?2890 =>= left_inverse (multiply ?2890 ?2889) [2890, 2889] by Super 929 with 2141 at 1,3
5848 Id : 2274, {_}: left_inverse (multiply (left_inverse ?2961) ?2962) =>= multiply (left_inverse ?2962) ?2961 [2962, 2961] by Super 2141 with 2209 at 2
5849 Id : 2285, {_}: left_inverse (left_division ?2961 ?2962) =<= multiply (left_inverse ?2962) ?2961 [2962, 2961] by Demod 2274 with 754 at 1,2
5850 Id : 2286, {_}: left_inverse (left_division ?2961 ?2962) =>= left_division ?2962 ?2961 [2962, 2961] by Demod 2285 with 754 at 3
5851 Id : 2448, {_}: right_division ?3131 (left_division ?3132 ?3133) =<= multiply ?3131 (left_division ?3133 ?3132) [3133, 3132, 3131] by Super 2141 with 2286 at 2,2
5852 Id : 7771, {_}: right_division (multiply ?3626 ?3627) (left_division ?3628 ?3627) =<= multiply ?3627 (multiply (left_division ?3627 ?3626) ?3628) [3628, 3627, 3626] by Demod 2787 with 2448 at 2
5853 Id : 762, {_}: multiply ?1028 (multiply (left_inverse ?1028) ?1029) =>= ?1029 [1029, 1028] by Demod 659 with 4 at 2,2,2
5854 Id : 766, {_}: multiply ?1038 ?1039 =<= left_division (left_inverse ?1038) ?1039 [1039, 1038] by Super 762 with 4 at 2,2
5855 Id : 2444, {_}: multiply (left_division ?3117 ?3118) ?3119 =>= left_division (left_division ?3118 ?3117) ?3119 [3119, 3118, 3117] by Super 766 with 2286 at 1,3
5856 Id : 7772, {_}: right_division (multiply ?3626 ?3627) (left_division ?3628 ?3627) =<= multiply ?3627 (left_division (left_division ?3626 ?3627) ?3628) [3628, 3627, 3626] by Demod 7771 with 2444 at 2,3
5857 Id : 7773, {_}: right_division (multiply ?3626 ?3627) (left_division ?3628 ?3627) =>= right_division ?3627 (left_division ?3628 (left_division ?3626 ?3627)) [3628, 3627, 3626] by Demod 7772 with 2448 at 3
5858 Id : 7786, {_}: right_division (left_division ?8594 ?8595) (multiply ?8596 ?8595) =<= left_inverse (right_division ?8595 (left_division ?8594 (left_division ?8596 ?8595))) [8596, 8595, 8594] by Super 929 with 7773 at 1,3
5859 Id : 7840, {_}: right_division (left_division ?8594 ?8595) (multiply ?8596 ?8595) =<= right_division (left_division ?8594 (left_division ?8596 ?8595)) ?8595 [8596, 8595, 8594] by Demod 7786 with 929 at 3
5860 Id : 21080, {_}: right_division (left_division ?21081 (left_inverse ?21082)) (multiply ?21083 (left_inverse ?21082)) =>= multiply (left_division ?21081 (left_division ?21083 (left_inverse ?21082))) ?21082 [21083, 21082, 21081] by Super 2141 with 7840 at 2
5861 Id : 2213, {_}: right_division ?2901 (left_inverse ?2902) =>= multiply ?2901 ?2902 [2902, 2901] by Demod 2140 with 5 at 3
5862 Id : 40, {_}: left_division ?91 identity =>= right_inverse ?91 [91] by Super 5 with 8 at 2,2
5863 Id : 177, {_}: ?263 =<= right_inverse (right_division identity ?263) [263] by Super 40 with 28 at 2
5864 Id : 184, {_}: ?263 =<= right_inverse (left_inverse ?263) [263] by Demod 177 with 45 at 1,3
5865 Id : 377, {_}: ?263 =<= left_inverse (left_inverse ?263) [263] by Demod 184 with 368 at 3
5866 Id : 2215, {_}: right_division ?2906 ?2907 =<= multiply ?2906 (left_inverse ?2907) [2907, 2906] by Super 2213 with 377 at 2,2
5867 Id : 2318, {_}: left_division ?3010 (left_inverse ?3011) =>= right_division (left_inverse ?3010) ?3011 [3011, 3010] by Super 754 with 2215 at 3
5868 Id : 2409, {_}: left_division ?3010 (left_inverse ?3011) =>= left_inverse (multiply ?3011 ?3010) [3011, 3010] by Demod 2318 with 2209 at 3
5869 Id : 21195, {_}: right_division (left_inverse (multiply ?21082 ?21081)) (multiply ?21083 (left_inverse ?21082)) =>= multiply (left_division ?21081 (left_division ?21083 (left_inverse ?21082))) ?21082 [21083, 21081, 21082] by Demod 21080 with 2409 at 1,2
5870 Id : 21196, {_}: right_division (left_inverse (multiply ?21082 ?21081)) (right_division ?21083 ?21082) =<= multiply (left_division ?21081 (left_division ?21083 (left_inverse ?21082))) ?21082 [21083, 21081, 21082] by Demod 21195 with 2215 at 2,2
5871 Id : 21197, {_}: right_division (left_inverse (multiply ?21082 ?21081)) (right_division ?21083 ?21082) =<= left_division (left_division (left_division ?21083 (left_inverse ?21082)) ?21081) ?21082 [21083, 21081, 21082] by Demod 21196 with 2444 at 3
5872 Id : 21198, {_}: left_inverse (multiply (right_division ?21083 ?21082) (multiply ?21082 ?21081)) =<= left_division (left_division (left_division ?21083 (left_inverse ?21082)) ?21081) ?21082 [21081, 21082, 21083] by Demod 21197 with 2209 at 2
5873 Id : 21199, {_}: left_inverse (multiply (right_division ?21083 ?21082) (multiply ?21082 ?21081)) =<= left_division (left_division (left_inverse (multiply ?21082 ?21083)) ?21081) ?21082 [21081, 21082, 21083] by Demod 21198 with 2409 at 1,1,3
5874 Id : 947, {_}: multiply (right_division ?1240 ?1241) ?1242 =>= left_division (right_division ?1241 ?1240) ?1242 [1242, 1241, 1240] by Super 766 with 929 at 1,3
5875 Id : 21200, {_}: left_inverse (left_division (right_division ?21082 ?21083) (multiply ?21082 ?21081)) =<= left_division (left_division (left_inverse (multiply ?21082 ?21083)) ?21081) ?21082 [21081, 21083, 21082] by Demod 21199 with 947 at 1,2
5876 Id : 21201, {_}: left_inverse (left_division (right_division ?21082 ?21083) (multiply ?21082 ?21081)) =>= left_division (multiply (multiply ?21082 ?21083) ?21081) ?21082 [21081, 21083, 21082] by Demod 21200 with 766 at 1,3
5877 Id : 33625, {_}: left_division (multiply ?32560 ?32561) (right_division ?32560 ?32562) =<= left_division (multiply (multiply ?32560 ?32562) ?32561) ?32560 [32562, 32561, 32560] by Demod 21201 with 2286 at 2
5878 Id : 33639, {_}: left_division (multiply ?32621 ?32622) (right_division ?32621 (left_inverse ?32623)) =>= left_division (multiply (right_division ?32621 ?32623) ?32622) ?32621 [32623, 32622, 32621] by Super 33625 with 2215 at 1,1,3
5879 Id : 33841, {_}: left_division (multiply ?32621 ?32622) (multiply ?32621 ?32623) =<= left_division (multiply (right_division ?32621 ?32623) ?32622) ?32621 [32623, 32622, 32621] by Demod 33639 with 2141 at 2,2
5880 Id : 33842, {_}: left_division (multiply ?32621 ?32622) (multiply ?32621 ?32623) =<= left_division (left_division (right_division ?32623 ?32621) ?32622) ?32621 [32623, 32622, 32621] by Demod 33841 with 947 at 1,3
5881 Id : 7794, {_}: right_division (multiply ?8626 ?8627) (left_division ?8628 ?8627) =>= right_division ?8627 (left_division ?8628 (left_division ?8626 ?8627)) [8628, 8627, 8626] by Demod 7772 with 2448 at 3
5882 Id : 7805, {_}: right_division (multiply ?8669 (left_inverse ?8670)) (left_inverse (multiply ?8670 ?8671)) =>= right_division (left_inverse ?8670) (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) [8671, 8670, 8669] by Super 7794 with 2409 at 2,2
5883 Id : 7868, {_}: multiply (multiply ?8669 (left_inverse ?8670)) (multiply ?8670 ?8671) =<= right_division (left_inverse ?8670) (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) [8671, 8670, 8669] by Demod 7805 with 2141 at 2
5884 Id : 7869, {_}: multiply (multiply ?8669 (left_inverse ?8670)) (multiply ?8670 ?8671) =<= left_inverse (multiply (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) ?8670) [8671, 8670, 8669] by Demod 7868 with 2209 at 3
5885 Id : 7870, {_}: multiply (right_division ?8669 ?8670) (multiply ?8670 ?8671) =<= left_inverse (multiply (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) ?8670) [8671, 8670, 8669] by Demod 7869 with 2215 at 1,2
5886 Id : 7871, {_}: multiply (right_division ?8669 ?8670) (multiply ?8670 ?8671) =<= left_inverse (left_division (left_division (left_division ?8669 (left_inverse ?8670)) ?8671) ?8670) [8671, 8670, 8669] by Demod 7870 with 2444 at 1,3
5887 Id : 7872, {_}: left_division (right_division ?8670 ?8669) (multiply ?8670 ?8671) =<= left_inverse (left_division (left_division (left_division ?8669 (left_inverse ?8670)) ?8671) ?8670) [8671, 8669, 8670] by Demod 7871 with 947 at 2
5888 Id : 7873, {_}: left_division (right_division ?8670 ?8669) (multiply ?8670 ?8671) =<= left_division ?8670 (left_division (left_division ?8669 (left_inverse ?8670)) ?8671) [8671, 8669, 8670] by Demod 7872 with 2286 at 3
5889 Id : 7874, {_}: left_division (right_division ?8670 ?8669) (multiply ?8670 ?8671) =<= left_division ?8670 (left_division (left_inverse (multiply ?8670 ?8669)) ?8671) [8671, 8669, 8670] by Demod 7873 with 2409 at 1,2,3
5890 Id : 21410, {_}: left_division (right_division ?21608 ?21609) (multiply ?21608 ?21610) =>= left_division ?21608 (multiply (multiply ?21608 ?21609) ?21610) [21610, 21609, 21608] by Demod 7874 with 766 at 2,3
5891 Id : 21443, {_}: left_division (multiply ?21745 ?21746) (multiply ?21745 ?21747) =<= left_division ?21745 (multiply (multiply ?21745 (left_inverse ?21746)) ?21747) [21747, 21746, 21745] by Super 21410 with 2141 at 1,2
5892 Id : 21647, {_}: left_division (multiply ?21745 ?21746) (multiply ?21745 ?21747) =>= left_division ?21745 (multiply (right_division ?21745 ?21746) ?21747) [21747, 21746, 21745] by Demod 21443 with 2215 at 1,2,3
5893 Id : 21648, {_}: left_division (multiply ?21745 ?21746) (multiply ?21745 ?21747) =>= left_division ?21745 (left_division (right_division ?21746 ?21745) ?21747) [21747, 21746, 21745] by Demod 21647 with 947 at 2,3
5894 Id : 43757, {_}: left_division ?42768 (left_division (right_division ?42769 ?42768) ?42770) =<= left_division (left_division (right_division ?42770 ?42768) ?42769) ?42768 [42770, 42769, 42768] by Demod 33842 with 21648 at 2
5895 Id : 835, {_}: multiply (left_inverse ?1117) (multiply ?1118 (left_inverse ?1117)) =>= multiply (left_division ?1117 ?1118) (left_inverse ?1117) [1118, 1117] by Super 70 with 754 at 1,3
5896 Id : 865, {_}: left_division ?1117 (multiply ?1118 (left_inverse ?1117)) =<= multiply (left_division ?1117 ?1118) (left_inverse ?1117) [1118, 1117] by Demod 835 with 754 at 2
5897 Id : 2305, {_}: left_division ?1117 (right_division ?1118 ?1117) =<= multiply (left_division ?1117 ?1118) (left_inverse ?1117) [1118, 1117] by Demod 865 with 2215 at 2,2
5898 Id : 2306, {_}: left_division ?1117 (right_division ?1118 ?1117) =>= right_division (left_division ?1117 ?1118) ?1117 [1118, 1117] by Demod 2305 with 2215 at 3
5899 Id : 43818, {_}: left_division ?43029 (left_division (right_division (right_division ?43030 (right_division ?43031 ?43029)) ?43029) ?43031) =<= left_division (right_division (left_division (right_division ?43031 ?43029) ?43030) (right_division ?43031 ?43029)) ?43029 [43031, 43030, 43029] by Super 43757 with 2306 at 1,3
5900 Id : 59, {_}: multiply (multiply ?136 ?137) ?138 =<= multiply ?137 (multiply (left_division ?137 ?136) (multiply ?137 ?138)) [138, 137, 136] by Super 56 with 4 at 1,1,2
5901 Id : 2770, {_}: left_division ?3557 (multiply (multiply ?3558 ?3557) ?3559) =<= multiply (left_division ?3557 ?3558) (multiply ?3557 ?3559) [3559, 3558, 3557] by Super 5 with 59 at 2,2
5902 Id : 7583, {_}: left_division ?3557 (multiply (multiply ?3558 ?3557) ?3559) =<= left_division (left_division ?3558 ?3557) (multiply ?3557 ?3559) [3559, 3558, 3557] by Demod 2770 with 2444 at 3
5903 Id : 7593, {_}: left_inverse (left_division ?8344 (multiply (multiply ?8345 ?8344) ?8346)) =>= left_division (multiply ?8344 ?8346) (left_division ?8345 ?8344) [8346, 8345, 8344] by Super 2286 with 7583 at 1,2
5904 Id : 7653, {_}: left_division (multiply (multiply ?8345 ?8344) ?8346) ?8344 =>= left_division (multiply ?8344 ?8346) (left_division ?8345 ?8344) [8346, 8344, 8345] by Demod 7593 with 2286 at 2
5905 Id : 20040, {_}: left_division (multiply (left_inverse ?19613) ?19614) (left_division ?19615 (left_inverse ?19613)) =>= left_inverse (multiply ?19613 (multiply (multiply ?19615 (left_inverse ?19613)) ?19614)) [19615, 19614, 19613] by Super 2409 with 7653 at 2
5906 Id : 20121, {_}: left_division (left_division ?19613 ?19614) (left_division ?19615 (left_inverse ?19613)) =<= left_inverse (multiply ?19613 (multiply (multiply ?19615 (left_inverse ?19613)) ?19614)) [19615, 19614, 19613] by Demod 20040 with 754 at 1,2
5907 Id : 20122, {_}: left_division (left_division ?19613 ?19614) (left_inverse (multiply ?19613 ?19615)) =<= left_inverse (multiply ?19613 (multiply (multiply ?19615 (left_inverse ?19613)) ?19614)) [19615, 19614, 19613] by Demod 20121 with 2409 at 2,2
5908 Id : 20123, {_}: left_division (left_division ?19613 ?19614) (left_inverse (multiply ?19613 ?19615)) =>= left_inverse (multiply ?19613 (multiply (right_division ?19615 ?19613) ?19614)) [19615, 19614, 19613] by Demod 20122 with 2215 at 1,2,1,3
5909 Id : 20124, {_}: left_inverse (multiply (multiply ?19613 ?19615) (left_division ?19613 ?19614)) =>= left_inverse (multiply ?19613 (multiply (right_division ?19615 ?19613) ?19614)) [19614, 19615, 19613] by Demod 20123 with 2409 at 2
5910 Id : 20125, {_}: left_inverse (multiply (multiply ?19613 ?19615) (left_division ?19613 ?19614)) =>= left_inverse (multiply ?19613 (left_division (right_division ?19613 ?19615) ?19614)) [19614, 19615, 19613] by Demod 20124 with 947 at 2,1,3
5911 Id : 20126, {_}: left_inverse (right_division (multiply ?19613 ?19615) (left_division ?19614 ?19613)) =<= left_inverse (multiply ?19613 (left_division (right_division ?19613 ?19615) ?19614)) [19614, 19615, 19613] by Demod 20125 with 2448 at 1,2
5912 Id : 20127, {_}: left_inverse (right_division (multiply ?19613 ?19615) (left_division ?19614 ?19613)) =>= left_inverse (right_division ?19613 (left_division ?19614 (right_division ?19613 ?19615))) [19614, 19615, 19613] by Demod 20126 with 2448 at 1,3
5913 Id : 20128, {_}: right_division (left_division ?19614 ?19613) (multiply ?19613 ?19615) =<= left_inverse (right_division ?19613 (left_division ?19614 (right_division ?19613 ?19615))) [19615, 19613, 19614] by Demod 20127 with 929 at 2
5914 Id : 29866, {_}: right_division (left_division ?28549 ?28550) (multiply ?28550 ?28551) =<= right_division (left_division ?28549 (right_division ?28550 ?28551)) ?28550 [28551, 28550, 28549] by Demod 20128 with 929 at 3
5915 Id : 29938, {_}: right_division (left_division (left_inverse ?28848) ?28849) (multiply ?28849 ?28850) =>= right_division (multiply ?28848 (right_division ?28849 ?28850)) ?28849 [28850, 28849, 28848] by Super 29866 with 766 at 1,3
5916 Id : 30204, {_}: right_division (multiply ?28848 ?28849) (multiply ?28849 ?28850) =<= right_division (multiply ?28848 (right_division ?28849 ?28850)) ?28849 [28850, 28849, 28848] by Demod 29938 with 766 at 1,2
5917 Id : 2216, {_}: right_division ?2909 (right_division ?2910 ?2911) =<= multiply ?2909 (right_division ?2911 ?2910) [2911, 2910, 2909] by Super 2213 with 929 at 2,2
5918 Id : 30205, {_}: right_division (multiply ?28848 ?28849) (multiply ?28849 ?28850) =<= right_division (right_division ?28848 (right_division ?28850 ?28849)) ?28849 [28850, 28849, 28848] by Demod 30204 with 2216 at 1,3
5919 Id : 44174, {_}: left_division ?43029 (left_division (right_division (multiply ?43030 ?43029) (multiply ?43029 ?43031)) ?43031) =<= left_division (right_division (left_division (right_division ?43031 ?43029) ?43030) (right_division ?43031 ?43029)) ?43029 [43031, 43030, 43029] by Demod 43818 with 30205 at 1,2,2
5920 Id : 242, {_}: multiply (multiply ?22 (multiply ?23 ?22)) ?24 =>= multiply ?22 (multiply ?23 (multiply ?22 ?24)) [24, 23, 22] by Demod 10 with 70 at 1,2
5921 Id : 833, {_}: multiply (multiply ?1109 (left_division ?1110 ?1109)) ?1111 =<= multiply ?1109 (multiply (left_inverse ?1110) (multiply ?1109 ?1111)) [1111, 1110, 1109] by Super 242 with 754 at 2,1,2
5922 Id : 866, {_}: multiply (multiply ?1109 (left_division ?1110 ?1109)) ?1111 =>= multiply ?1109 (left_division ?1110 (multiply ?1109 ?1111)) [1111, 1110, 1109] by Demod 833 with 754 at 2,3
5923 Id : 3970, {_}: multiply (right_division ?1109 (left_division ?1109 ?1110)) ?1111 =>= multiply ?1109 (left_division ?1110 (multiply ?1109 ?1111)) [1111, 1110, 1109] by Demod 866 with 2448 at 1,2
5924 Id : 3971, {_}: multiply (right_division ?1109 (left_division ?1109 ?1110)) ?1111 =>= right_division ?1109 (left_division (multiply ?1109 ?1111) ?1110) [1111, 1110, 1109] by Demod 3970 with 2448 at 3
5925 Id : 3972, {_}: left_division (right_division (left_division ?1109 ?1110) ?1109) ?1111 =>= right_division ?1109 (left_division (multiply ?1109 ?1111) ?1110) [1111, 1110, 1109] by Demod 3971 with 947 at 2
5926 Id : 44175, {_}: left_division ?43029 (left_division (right_division (multiply ?43030 ?43029) (multiply ?43029 ?43031)) ?43031) =>= right_division (right_division ?43031 ?43029) (left_division (multiply (right_division ?43031 ?43029) ?43029) ?43030) [43031, 43030, 43029] by Demod 44174 with 3972 at 3
5927 Id : 2326, {_}: multiply (multiply (left_inverse ?3033) (right_division ?3034 ?3033)) ?3035 =<= multiply (left_inverse ?3033) (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Super 242 with 2215 at 2,1,2
5928 Id : 2385, {_}: multiply (left_division ?3033 (right_division ?3034 ?3033)) ?3035 =<= multiply (left_inverse ?3033) (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Demod 2326 with 754 at 1,2
5929 Id : 2386, {_}: multiply (left_division ?3033 (right_division ?3034 ?3033)) ?3035 =<= left_division ?3033 (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Demod 2385 with 754 at 3
5930 Id : 2387, {_}: multiply (right_division (left_division ?3033 ?3034) ?3033) ?3035 =<= left_division ?3033 (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Demod 2386 with 2306 at 1,2
5931 Id : 2388, {_}: multiply (right_division (left_division ?3033 ?3034) ?3033) ?3035 =>= left_division ?3033 (multiply ?3034 (left_division ?3033 ?3035)) [3035, 3034, 3033] by Demod 2387 with 754 at 2,2,3
5932 Id : 2389, {_}: left_division (right_division ?3033 (left_division ?3033 ?3034)) ?3035 =>= left_division ?3033 (multiply ?3034 (left_division ?3033 ?3035)) [3035, 3034, 3033] by Demod 2388 with 947 at 2
5933 Id : 6630, {_}: left_division (right_division ?3033 (left_division ?3033 ?3034)) ?3035 =>= left_division ?3033 (right_division ?3034 (left_division ?3035 ?3033)) [3035, 3034, 3033] by Demod 2389 with 2448 at 2,3
5934 Id : 6649, {_}: left_inverse (left_division ?7225 (right_division ?7226 (left_division ?7227 ?7225))) =>= left_division ?7227 (right_division ?7225 (left_division ?7225 ?7226)) [7227, 7226, 7225] by Super 2286 with 6630 at 1,2
5935 Id : 19005, {_}: left_division (right_division ?18377 (left_division ?18378 ?18379)) ?18379 =>= left_division ?18378 (right_division ?18379 (left_division ?18379 ?18377)) [18379, 18378, 18377] by Demod 6649 with 2286 at 2
5936 Id : 19026, {_}: left_division (right_division ?18462 (multiply ?18463 ?18464)) ?18464 =<= left_division (left_inverse ?18463) (right_division ?18464 (left_division ?18464 ?18462)) [18464, 18463, 18462] by Super 19005 with 766 at 2,1,2
5937 Id : 19232, {_}: left_division (right_division ?18462 (multiply ?18463 ?18464)) ?18464 =<= multiply ?18463 (right_division ?18464 (left_division ?18464 ?18462)) [18464, 18463, 18462] by Demod 19026 with 766 at 3
5938 Id : 19233, {_}: left_division (right_division ?18462 (multiply ?18463 ?18464)) ?18464 =>= right_division ?18463 (right_division (left_division ?18464 ?18462) ?18464) [18464, 18463, 18462] by Demod 19232 with 2216 at 3
5939 Id : 44176, {_}: left_division ?43029 (right_division ?43029 (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031)) =>= right_division (right_division ?43031 ?43029) (left_division (multiply (right_division ?43031 ?43029) ?43029) ?43030) [43030, 43031, 43029] by Demod 44175 with 19233 at 2,2
5940 Id : 44177, {_}: left_division ?43029 (right_division ?43029 (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031)) =>= right_division (right_division ?43031 ?43029) (left_division (left_division (right_division ?43029 ?43031) ?43029) ?43030) [43030, 43031, 43029] by Demod 44176 with 947 at 1,2,3
5941 Id : 2324, {_}: left_division ?3028 (right_division ?3028 ?3029) =>= left_inverse ?3029 [3029, 3028] by Super 5 with 2215 at 2,2
5942 Id : 44178, {_}: left_inverse (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031) =<= right_division (right_division ?43031 ?43029) (left_division (left_division (right_division ?43029 ?43031) ?43029) ?43030) [43029, 43030, 43031] by Demod 44177 with 2324 at 2
5943 Id : 44179, {_}: left_inverse (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031) =>= right_division (right_division ?43031 ?43029) (left_division ?43031 ?43030) [43029, 43030, 43031] by Demod 44178 with 28 at 1,2,3
5944 Id : 44180, {_}: right_division ?43031 (left_division ?43031 (multiply ?43030 ?43029)) =<= right_division (right_division ?43031 ?43029) (left_division ?43031 ?43030) [43029, 43030, 43031] by Demod 44179 with 929 at 2
5945 Id : 48135, {_}: right_division (left_division ?47766 ?47767) (right_division ?47766 ?47768) =<= left_inverse (right_division ?47766 (left_division ?47766 (multiply ?47767 ?47768))) [47768, 47767, 47766] by Super 929 with 44180 at 1,3
5946 Id : 48395, {_}: right_division (left_division ?47766 ?47767) (right_division ?47766 ?47768) =<= right_division (left_division ?47766 (multiply ?47767 ?47768)) ?47766 [47768, 47767, 47766] by Demod 48135 with 929 at 3
5947 Id : 50566, {_}: right_division (left_division (left_inverse ?50556) ?50557) (right_division (left_inverse ?50556) ?50558) =>= multiply (left_division (left_inverse ?50556) (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Super 2141 with 48395 at 2
5948 Id : 50772, {_}: right_division (multiply ?50556 ?50557) (right_division (left_inverse ?50556) ?50558) =<= multiply (left_division (left_inverse ?50556) (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Demod 50566 with 766 at 1,2
5949 Id : 50773, {_}: right_division (multiply ?50556 ?50557) (left_inverse (multiply ?50558 ?50556)) =<= multiply (left_division (left_inverse ?50556) (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Demod 50772 with 2209 at 2,2
5950 Id : 50774, {_}: right_division (multiply ?50556 ?50557) (left_inverse (multiply ?50558 ?50556)) =<= left_division (left_division (multiply ?50557 ?50558) (left_inverse ?50556)) ?50556 [50558, 50557, 50556] by Demod 50773 with 2444 at 3
5951 Id : 50775, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =<= left_division (left_division (multiply ?50557 ?50558) (left_inverse ?50556)) ?50556 [50558, 50557, 50556] by Demod 50774 with 2141 at 2
5952 Id : 50776, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =<= left_division (left_inverse (multiply ?50556 (multiply ?50557 ?50558))) ?50556 [50558, 50557, 50556] by Demod 50775 with 2409 at 1,3
5953 Id : 50777, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =<= multiply (multiply ?50556 (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Demod 50776 with 766 at 3
5954 Id : 50778, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =>= multiply ?50556 (multiply (multiply ?50557 ?50558) ?50556) [50558, 50557, 50556] by Demod 50777 with 70 at 3
5955 Id : 52410, {_}: multiply a (multiply (multiply b c) a) =?= multiply a (multiply (multiply b c) a) [] by Demod 52409 with 50778 at 3
5956 Id : 52409, {_}: multiply a (multiply (multiply b c) a) =<= multiply (multiply a b) (multiply c a) [] by Demod 1 with 70 at 2
5957 Id : 1, {_}: multiply (multiply a (multiply b c)) a =>= multiply (multiply a b) (multiply c a) [] by prove_moufang1
5958 % SZS output end CNFRefutation for GRP202-1.p
5959 8678: solved GRP202-1.p in 8.532532 using kbo
5960 !! infer_left 366 0.0004 0.0000 0.0000
5961 !! infer_right 195 32.1163 0.7782 0.1647
5962 !! simplify_goal 366 0.3571 0.3004 0.0010
5963 !! keep_simplified 561 2.9270 0.4005 0.0052
5964 !! simplification_step 647 2.9248 0.4005 0.0045
5965 !! simplify 32671 31.0860 0.6010 0.0010
5966 !! orphan_murder 578 0.0389 0.0005 0.0001
5967 !! is_subsumed 28740 2.3567 0.4002 0.0001
5968 !! build_new_clause 13947 3.5511 0.4002 0.0003
5969 !! demodulate 32710 28.9728 0.6010 0.0009
5970 !! demod 347675 20.9037 0.6005 0.0001
5971 !! demod.apply_subst 80634 1.3164 0.4007 0.0000
5972 !! demod.compare_terms 1790 0.0061 0.0003 0.0000
5973 !! demod.retrieve_generalizations 347675 5.9660 0.6005 0.0000
5974 !! demod.unify 560999 7.4078 0.4001 0.0000
5975 !! build_clause 52474 7.0742 0.4010 0.0001
5976 !! compare_terms(kbo) 54298 4.8000 0.4009 0.0001
5977 !! compare_terms(nrkbo) 10 0.0001 0.0000 0.0000
5979 8704: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5981 multiply (left_inverse ?4) ?4 =>= identity
5982 [4] by left_inverse ?4
5984 multiply (multiply ?6 (multiply ?7 ?8)) ?6
5986 multiply (multiply ?6 ?7) (multiply ?8 ?6)
5987 [8, 7, 6] by moufang1 ?6 ?7 ?8
5990 multiply (multiply (multiply a b) c) b
5992 multiply a (multiply b (multiply c b))
5993 [] by prove_moufang2
5994 % SZS status Timeout for GRP204-1.p
5996 8733: Id : 2, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
5997 8733: Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
5999 multiply ?6 (left_division ?6 ?7) =>= ?7
6000 [7, 6] by multiply_left_division ?6 ?7
6002 left_division ?9 (multiply ?9 ?10) =>= ?10
6003 [10, 9] by left_division_multiply ?9 ?10
6005 multiply (right_division ?12 ?13) ?13 =>= ?12
6006 [13, 12] by multiply_right_division ?12 ?13
6008 right_division (multiply ?15 ?16) ?16 =>= ?15
6009 [16, 15] by right_division_multiply ?15 ?16
6011 multiply ?18 (right_inverse ?18) =>= identity
6012 [18] by right_inverse ?18
6014 multiply (left_inverse ?20) ?20 =>= identity
6015 [20] by left_inverse ?20
6017 multiply (multiply (multiply ?22 ?23) ?22) ?24
6019 multiply ?22 (multiply ?23 (multiply ?22 ?24))
6020 [24, 23, 22] by moufang3 ?22 ?23 ?24
6023 multiply x (multiply (multiply y z) x)
6025 multiply (multiply x y) (multiply z x)
6026 [] by prove_moufang4
6029 Found proof, 33.711197s
6030 % SZS status Unsatisfiable for GRP205-1.p
6031 % SZS output start CNFRefutation for GRP205-1.p
6032 Id : 56, {_}: multiply (multiply (multiply ?126 ?127) ?126) ?128 =>= multiply ?126 (multiply ?127 (multiply ?126 ?128)) [128, 127, 126] by moufang3 ?126 ?127 ?128
6033 Id : 4, {_}: multiply ?6 (left_division ?6 ?7) =>= ?7 [7, 6] by multiply_left_division ?6 ?7
6034 Id : 5, {_}: left_division ?9 (multiply ?9 ?10) =>= ?10 [10, 9] by left_division_multiply ?9 ?10
6035 Id : 9, {_}: multiply (left_inverse ?20) ?20 =>= identity [20] by left_inverse ?20
6036 Id : 8, {_}: multiply ?18 (right_inverse ?18) =>= identity [18] by right_inverse ?18
6037 Id : 6, {_}: multiply (right_division ?12 ?13) ?13 =>= ?12 [13, 12] by multiply_right_division ?12 ?13
6038 Id : 10, {_}: multiply (multiply (multiply ?22 ?23) ?22) ?24 =>= multiply ?22 (multiply ?23 (multiply ?22 ?24)) [24, 23, 22] by moufang3 ?22 ?23 ?24
6039 Id : 3, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
6040 Id : 7, {_}: right_division (multiply ?15 ?16) ?16 =>= ?15 [16, 15] by right_division_multiply ?15 ?16
6041 Id : 53, {_}: multiply ?115 (multiply ?116 (multiply ?115 identity)) =>= multiply (multiply ?115 ?116) ?115 [116, 115] by Super 3 with 10 at 2
6042 Id : 70, {_}: multiply ?115 (multiply ?116 ?115) =<= multiply (multiply ?115 ?116) ?115 [116, 115] by Demod 53 with 3 at 2,2,2
6043 Id : 557, {_}: right_division (multiply ?710 (multiply ?711 ?710)) ?710 =>= multiply ?710 ?711 [711, 710] by Super 7 with 70 at 1,2
6044 Id : 561, {_}: right_division (multiply ?720 ?721) ?720 =<= multiply ?720 (right_division ?721 ?720) [721, 720] by Super 557 with 6 at 2,1,2
6045 Id : 55, {_}: right_division (multiply ?122 (multiply ?123 (multiply ?122 ?124))) ?124 =>= multiply (multiply ?122 ?123) ?122 [124, 123, 122] by Super 7 with 10 at 1,2
6046 Id : 1849, {_}: right_division (multiply ?2527 (multiply ?2528 (multiply ?2527 ?2529))) ?2529 =>= multiply ?2527 (multiply ?2528 ?2527) [2529, 2528, 2527] by Demod 55 with 70 at 3
6047 Id : 51, {_}: multiply ?108 (multiply ?109 (multiply ?108 (right_inverse (multiply (multiply ?108 ?109) ?108)))) =>= identity [109, 108] by Super 8 with 10 at 2
6048 Id : 281, {_}: multiply ?401 (multiply ?402 (multiply ?401 (right_inverse (multiply ?401 (multiply ?402 ?401))))) =>= identity [402, 401] by Demod 51 with 70 at 1,2,2,2,2
6049 Id : 286, {_}: multiply (right_inverse ?414) (multiply ?414 (multiply (right_inverse ?414) (right_inverse (multiply (right_inverse ?414) identity)))) =>= identity [414] by Super 281 with 8 at 2,1,2,2,2,2
6050 Id : 315, {_}: multiply (right_inverse ?414) (multiply ?414 (multiply (right_inverse ?414) (right_inverse (right_inverse ?414)))) =>= identity [414] by Demod 286 with 3 at 1,2,2,2,2
6051 Id : 316, {_}: multiply (right_inverse ?414) (multiply ?414 identity) =>= identity [414] by Demod 315 with 8 at 2,2,2
6052 Id : 317, {_}: multiply (right_inverse ?414) ?414 =>= identity [414] by Demod 316 with 3 at 2,2
6053 Id : 345, {_}: right_division identity ?453 =>= right_inverse ?453 [453] by Super 7 with 317 at 1,2
6054 Id : 45, {_}: right_division identity ?99 =>= left_inverse ?99 [99] by Super 7 with 9 at 1,2
6055 Id : 366, {_}: left_inverse ?453 =<= right_inverse ?453 [453] by Demod 345 with 45 at 2
6056 Id : 371, {_}: multiply ?18 (left_inverse ?18) =>= identity [18] by Demod 8 with 366 at 2,2
6057 Id : 1855, {_}: right_division (multiply ?2550 (multiply ?2551 identity)) (left_inverse ?2550) =>= multiply ?2550 (multiply ?2551 ?2550) [2551, 2550] by Super 1849 with 371 at 2,2,1,2
6058 Id : 1902, {_}: right_division (multiply ?2550 ?2551) (left_inverse ?2550) =>= multiply ?2550 (multiply ?2551 ?2550) [2551, 2550] by Demod 1855 with 3 at 2,1,2
6059 Id : 2080, {_}: right_division (multiply (left_inverse ?2786) (multiply ?2786 ?2787)) (left_inverse ?2786) =>= multiply (left_inverse ?2786) (multiply ?2786 (multiply ?2787 ?2786)) [2787, 2786] by Super 561 with 1902 at 2,3
6060 Id : 52, {_}: multiply ?111 (multiply ?112 (multiply ?111 (left_division (multiply (multiply ?111 ?112) ?111) ?113))) =>= ?113 [113, 112, 111] by Super 4 with 10 at 2
6061 Id : 609, {_}: multiply ?798 (multiply ?799 (multiply ?798 (left_division (multiply ?798 (multiply ?799 ?798)) ?800))) =>= ?800 [800, 799, 798] by Demod 52 with 70 at 1,2,2,2,2
6062 Id : 614, {_}: multiply ?816 (multiply (left_inverse ?816) (multiply ?816 (left_division (multiply ?816 identity) ?817))) =>= ?817 [817, 816] by Super 609 with 9 at 2,1,2,2,2,2
6063 Id : 651, {_}: multiply ?816 (multiply (left_inverse ?816) (multiply ?816 (left_division ?816 ?817))) =>= ?817 [817, 816] by Demod 614 with 3 at 1,2,2,2,2
6064 Id : 652, {_}: multiply ?816 (multiply (left_inverse ?816) ?817) =>= ?817 [817, 816] by Demod 651 with 4 at 2,2,2
6065 Id : 744, {_}: left_division ?1007 ?1008 =<= multiply (left_inverse ?1007) ?1008 [1008, 1007] by Super 5 with 652 at 2,2
6066 Id : 2108, {_}: right_division (left_division ?2786 (multiply ?2786 ?2787)) (left_inverse ?2786) =<= multiply (left_inverse ?2786) (multiply ?2786 (multiply ?2787 ?2786)) [2787, 2786] by Demod 2080 with 744 at 1,2
6067 Id : 2109, {_}: right_division (left_division ?2786 (multiply ?2786 ?2787)) (left_inverse ?2786) =>= left_division ?2786 (multiply ?2786 (multiply ?2787 ?2786)) [2787, 2786] by Demod 2108 with 744 at 3
6068 Id : 2110, {_}: right_division ?2787 (left_inverse ?2786) =<= left_division ?2786 (multiply ?2786 (multiply ?2787 ?2786)) [2786, 2787] by Demod 2109 with 5 at 1,2
6069 Id : 2111, {_}: right_division ?2787 (left_inverse ?2786) =>= multiply ?2787 ?2786 [2786, 2787] by Demod 2110 with 5 at 3
6070 Id : 913, {_}: right_division (left_division ?1218 ?1219) ?1219 =>= left_inverse ?1218 [1219, 1218] by Super 7 with 744 at 1,2
6071 Id : 28, {_}: left_division (right_division ?62 ?63) ?62 =>= ?63 [63, 62] by Super 5 with 6 at 2,2
6072 Id : 916, {_}: right_division ?1226 ?1227 =<= left_inverse (right_division ?1227 ?1226) [1227, 1226] by Super 913 with 28 at 1,2
6073 Id : 2746, {_}: multiply (multiply ?3616 ?3617) ?3618 =<= multiply ?3617 (multiply (left_division ?3617 ?3616) (multiply ?3617 ?3618)) [3618, 3617, 3616] by Super 56 with 4 at 1,1,2
6074 Id : 2749, {_}: multiply (multiply ?3626 ?3627) (left_division ?3627 ?3628) =>= multiply ?3627 (multiply (left_division ?3627 ?3626) ?3628) [3628, 3627, 3626] by Super 2746 with 4 at 2,2,3
6075 Id : 2178, {_}: right_division (left_inverse ?2889) ?2890 =>= left_inverse (multiply ?2890 ?2889) [2890, 2889] by Super 916 with 2111 at 1,3
6076 Id : 2242, {_}: left_inverse (multiply (left_inverse ?2961) ?2962) =>= multiply (left_inverse ?2962) ?2961 [2962, 2961] by Super 2111 with 2178 at 2
6077 Id : 2253, {_}: left_inverse (left_division ?2961 ?2962) =<= multiply (left_inverse ?2962) ?2961 [2962, 2961] by Demod 2242 with 744 at 1,2
6078 Id : 2254, {_}: left_inverse (left_division ?2961 ?2962) =>= left_division ?2962 ?2961 [2962, 2961] by Demod 2253 with 744 at 3
6079 Id : 2414, {_}: right_division ?3131 (left_division ?3132 ?3133) =<= multiply ?3131 (left_division ?3133 ?3132) [3133, 3132, 3131] by Super 2111 with 2254 at 2,2
6080 Id : 7703, {_}: right_division (multiply ?3626 ?3627) (left_division ?3628 ?3627) =<= multiply ?3627 (multiply (left_division ?3627 ?3626) ?3628) [3628, 3627, 3626] by Demod 2749 with 2414 at 2
6081 Id : 752, {_}: multiply ?1028 (multiply (left_inverse ?1028) ?1029) =>= ?1029 [1029, 1028] by Demod 651 with 4 at 2,2,2
6082 Id : 756, {_}: multiply ?1038 ?1039 =<= left_division (left_inverse ?1038) ?1039 [1039, 1038] by Super 752 with 4 at 2,2
6083 Id : 2410, {_}: multiply (left_division ?3117 ?3118) ?3119 =>= left_division (left_division ?3118 ?3117) ?3119 [3119, 3118, 3117] by Super 756 with 2254 at 1,3
6084 Id : 7704, {_}: right_division (multiply ?3626 ?3627) (left_division ?3628 ?3627) =<= multiply ?3627 (left_division (left_division ?3626 ?3627) ?3628) [3628, 3627, 3626] by Demod 7703 with 2410 at 2,3
6085 Id : 7705, {_}: right_division (multiply ?3626 ?3627) (left_division ?3628 ?3627) =>= right_division ?3627 (left_division ?3628 (left_division ?3626 ?3627)) [3628, 3627, 3626] by Demod 7704 with 2414 at 3
6086 Id : 7718, {_}: right_division (left_division ?8594 ?8595) (multiply ?8596 ?8595) =<= left_inverse (right_division ?8595 (left_division ?8594 (left_division ?8596 ?8595))) [8596, 8595, 8594] by Super 916 with 7705 at 1,3
6087 Id : 7772, {_}: right_division (left_division ?8594 ?8595) (multiply ?8596 ?8595) =<= right_division (left_division ?8594 (left_division ?8596 ?8595)) ?8595 [8596, 8595, 8594] by Demod 7718 with 916 at 3
6088 Id : 20972, {_}: right_division (left_division ?21081 (left_inverse ?21082)) (multiply ?21083 (left_inverse ?21082)) =>= multiply (left_division ?21081 (left_division ?21083 (left_inverse ?21082))) ?21082 [21083, 21082, 21081] by Super 2111 with 7772 at 2
6089 Id : 2182, {_}: right_division ?2901 (left_inverse ?2902) =>= multiply ?2901 ?2902 [2902, 2901] by Demod 2110 with 5 at 3
6090 Id : 40, {_}: left_division ?91 identity =>= right_inverse ?91 [91] by Super 5 with 8 at 2,2
6091 Id : 177, {_}: ?263 =<= right_inverse (right_division identity ?263) [263] by Super 40 with 28 at 2
6092 Id : 184, {_}: ?263 =<= right_inverse (left_inverse ?263) [263] by Demod 177 with 45 at 1,3
6093 Id : 374, {_}: ?263 =<= left_inverse (left_inverse ?263) [263] by Demod 184 with 366 at 3
6094 Id : 2184, {_}: right_division ?2906 ?2907 =<= multiply ?2906 (left_inverse ?2907) [2907, 2906] by Super 2182 with 374 at 2,2
6095 Id : 2285, {_}: left_division ?3010 (left_inverse ?3011) =>= right_division (left_inverse ?3010) ?3011 [3011, 3010] by Super 744 with 2184 at 3
6096 Id : 2376, {_}: left_division ?3010 (left_inverse ?3011) =>= left_inverse (multiply ?3011 ?3010) [3011, 3010] by Demod 2285 with 2178 at 3
6097 Id : 21087, {_}: right_division (left_inverse (multiply ?21082 ?21081)) (multiply ?21083 (left_inverse ?21082)) =>= multiply (left_division ?21081 (left_division ?21083 (left_inverse ?21082))) ?21082 [21083, 21081, 21082] by Demod 20972 with 2376 at 1,2
6098 Id : 21088, {_}: right_division (left_inverse (multiply ?21082 ?21081)) (right_division ?21083 ?21082) =<= multiply (left_division ?21081 (left_division ?21083 (left_inverse ?21082))) ?21082 [21083, 21081, 21082] by Demod 21087 with 2184 at 2,2
6099 Id : 21089, {_}: right_division (left_inverse (multiply ?21082 ?21081)) (right_division ?21083 ?21082) =<= left_division (left_division (left_division ?21083 (left_inverse ?21082)) ?21081) ?21082 [21083, 21081, 21082] by Demod 21088 with 2410 at 3
6100 Id : 21090, {_}: left_inverse (multiply (right_division ?21083 ?21082) (multiply ?21082 ?21081)) =<= left_division (left_division (left_division ?21083 (left_inverse ?21082)) ?21081) ?21082 [21081, 21082, 21083] by Demod 21089 with 2178 at 2
6101 Id : 21091, {_}: left_inverse (multiply (right_division ?21083 ?21082) (multiply ?21082 ?21081)) =<= left_division (left_division (left_inverse (multiply ?21082 ?21083)) ?21081) ?21082 [21081, 21082, 21083] by Demod 21090 with 2376 at 1,1,3
6102 Id : 933, {_}: multiply (right_division ?1240 ?1241) ?1242 =>= left_division (right_division ?1241 ?1240) ?1242 [1242, 1241, 1240] by Super 756 with 916 at 1,3
6103 Id : 21092, {_}: left_inverse (left_division (right_division ?21082 ?21083) (multiply ?21082 ?21081)) =<= left_division (left_division (left_inverse (multiply ?21082 ?21083)) ?21081) ?21082 [21081, 21083, 21082] by Demod 21091 with 933 at 1,2
6104 Id : 21093, {_}: left_inverse (left_division (right_division ?21082 ?21083) (multiply ?21082 ?21081)) =>= left_division (multiply (multiply ?21082 ?21083) ?21081) ?21082 [21081, 21083, 21082] by Demod 21092 with 756 at 1,3
6105 Id : 33490, {_}: left_division (multiply ?32560 ?32561) (right_division ?32560 ?32562) =<= left_division (multiply (multiply ?32560 ?32562) ?32561) ?32560 [32562, 32561, 32560] by Demod 21093 with 2254 at 2
6106 Id : 33504, {_}: left_division (multiply ?32621 ?32622) (right_division ?32621 (left_inverse ?32623)) =>= left_division (multiply (right_division ?32621 ?32623) ?32622) ?32621 [32623, 32622, 32621] by Super 33490 with 2184 at 1,1,3
6107 Id : 33706, {_}: left_division (multiply ?32621 ?32622) (multiply ?32621 ?32623) =<= left_division (multiply (right_division ?32621 ?32623) ?32622) ?32621 [32623, 32622, 32621] by Demod 33504 with 2111 at 2,2
6108 Id : 33707, {_}: left_division (multiply ?32621 ?32622) (multiply ?32621 ?32623) =<= left_division (left_division (right_division ?32623 ?32621) ?32622) ?32621 [32623, 32622, 32621] by Demod 33706 with 933 at 1,3
6109 Id : 7726, {_}: right_division (multiply ?8626 ?8627) (left_division ?8628 ?8627) =>= right_division ?8627 (left_division ?8628 (left_division ?8626 ?8627)) [8628, 8627, 8626] by Demod 7704 with 2414 at 3
6110 Id : 7737, {_}: right_division (multiply ?8669 (left_inverse ?8670)) (left_inverse (multiply ?8670 ?8671)) =>= right_division (left_inverse ?8670) (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) [8671, 8670, 8669] by Super 7726 with 2376 at 2,2
6111 Id : 7800, {_}: multiply (multiply ?8669 (left_inverse ?8670)) (multiply ?8670 ?8671) =<= right_division (left_inverse ?8670) (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) [8671, 8670, 8669] by Demod 7737 with 2111 at 2
6112 Id : 7801, {_}: multiply (multiply ?8669 (left_inverse ?8670)) (multiply ?8670 ?8671) =<= left_inverse (multiply (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) ?8670) [8671, 8670, 8669] by Demod 7800 with 2178 at 3
6113 Id : 7802, {_}: multiply (right_division ?8669 ?8670) (multiply ?8670 ?8671) =<= left_inverse (multiply (left_division ?8671 (left_division ?8669 (left_inverse ?8670))) ?8670) [8671, 8670, 8669] by Demod 7801 with 2184 at 1,2
6114 Id : 7803, {_}: multiply (right_division ?8669 ?8670) (multiply ?8670 ?8671) =<= left_inverse (left_division (left_division (left_division ?8669 (left_inverse ?8670)) ?8671) ?8670) [8671, 8670, 8669] by Demod 7802 with 2410 at 1,3
6115 Id : 7804, {_}: left_division (right_division ?8670 ?8669) (multiply ?8670 ?8671) =<= left_inverse (left_division (left_division (left_division ?8669 (left_inverse ?8670)) ?8671) ?8670) [8671, 8669, 8670] by Demod 7803 with 933 at 2
6116 Id : 7805, {_}: left_division (right_division ?8670 ?8669) (multiply ?8670 ?8671) =<= left_division ?8670 (left_division (left_division ?8669 (left_inverse ?8670)) ?8671) [8671, 8669, 8670] by Demod 7804 with 2254 at 3
6117 Id : 7806, {_}: left_division (right_division ?8670 ?8669) (multiply ?8670 ?8671) =<= left_division ?8670 (left_division (left_inverse (multiply ?8670 ?8669)) ?8671) [8671, 8669, 8670] by Demod 7805 with 2376 at 1,2,3
6118 Id : 21301, {_}: left_division (right_division ?21608 ?21609) (multiply ?21608 ?21610) =>= left_division ?21608 (multiply (multiply ?21608 ?21609) ?21610) [21610, 21609, 21608] by Demod 7806 with 756 at 2,3
6119 Id : 21334, {_}: left_division (multiply ?21745 ?21746) (multiply ?21745 ?21747) =<= left_division ?21745 (multiply (multiply ?21745 (left_inverse ?21746)) ?21747) [21747, 21746, 21745] by Super 21301 with 2111 at 1,2
6120 Id : 21538, {_}: left_division (multiply ?21745 ?21746) (multiply ?21745 ?21747) =>= left_division ?21745 (multiply (right_division ?21745 ?21746) ?21747) [21747, 21746, 21745] by Demod 21334 with 2184 at 1,2,3
6121 Id : 21539, {_}: left_division (multiply ?21745 ?21746) (multiply ?21745 ?21747) =>= left_division ?21745 (left_division (right_division ?21746 ?21745) ?21747) [21747, 21746, 21745] by Demod 21538 with 933 at 2,3
6122 Id : 43601, {_}: left_division ?42768 (left_division (right_division ?42769 ?42768) ?42770) =<= left_division (left_division (right_division ?42770 ?42768) ?42769) ?42768 [42770, 42769, 42768] by Demod 33707 with 21539 at 2
6123 Id : 824, {_}: multiply (left_inverse ?1117) (multiply ?1118 (left_inverse ?1117)) =>= multiply (left_division ?1117 ?1118) (left_inverse ?1117) [1118, 1117] by Super 70 with 744 at 1,3
6124 Id : 854, {_}: left_division ?1117 (multiply ?1118 (left_inverse ?1117)) =<= multiply (left_division ?1117 ?1118) (left_inverse ?1117) [1118, 1117] by Demod 824 with 744 at 2
6125 Id : 2272, {_}: left_division ?1117 (right_division ?1118 ?1117) =<= multiply (left_division ?1117 ?1118) (left_inverse ?1117) [1118, 1117] by Demod 854 with 2184 at 2,2
6126 Id : 2273, {_}: left_division ?1117 (right_division ?1118 ?1117) =>= right_division (left_division ?1117 ?1118) ?1117 [1118, 1117] by Demod 2272 with 2184 at 3
6127 Id : 43662, {_}: left_division ?43029 (left_division (right_division (right_division ?43030 (right_division ?43031 ?43029)) ?43029) ?43031) =<= left_division (right_division (left_division (right_division ?43031 ?43029) ?43030) (right_division ?43031 ?43029)) ?43029 [43031, 43030, 43029] by Super 43601 with 2273 at 1,3
6128 Id : 59, {_}: multiply (multiply ?136 ?137) ?138 =<= multiply ?137 (multiply (left_division ?137 ?136) (multiply ?137 ?138)) [138, 137, 136] by Super 56 with 4 at 1,1,2
6129 Id : 2732, {_}: left_division ?3557 (multiply (multiply ?3558 ?3557) ?3559) =<= multiply (left_division ?3557 ?3558) (multiply ?3557 ?3559) [3559, 3558, 3557] by Super 5 with 59 at 2,2
6130 Id : 7516, {_}: left_division ?3557 (multiply (multiply ?3558 ?3557) ?3559) =<= left_division (left_division ?3558 ?3557) (multiply ?3557 ?3559) [3559, 3558, 3557] by Demod 2732 with 2410 at 3
6131 Id : 7526, {_}: left_inverse (left_division ?8344 (multiply (multiply ?8345 ?8344) ?8346)) =>= left_division (multiply ?8344 ?8346) (left_division ?8345 ?8344) [8346, 8345, 8344] by Super 2254 with 7516 at 1,2
6132 Id : 7586, {_}: left_division (multiply (multiply ?8345 ?8344) ?8346) ?8344 =>= left_division (multiply ?8344 ?8346) (left_division ?8345 ?8344) [8346, 8344, 8345] by Demod 7526 with 2254 at 2
6133 Id : 19936, {_}: left_division (multiply (left_inverse ?19613) ?19614) (left_division ?19615 (left_inverse ?19613)) =>= left_inverse (multiply ?19613 (multiply (multiply ?19615 (left_inverse ?19613)) ?19614)) [19615, 19614, 19613] by Super 2376 with 7586 at 2
6134 Id : 20017, {_}: left_division (left_division ?19613 ?19614) (left_division ?19615 (left_inverse ?19613)) =<= left_inverse (multiply ?19613 (multiply (multiply ?19615 (left_inverse ?19613)) ?19614)) [19615, 19614, 19613] by Demod 19936 with 744 at 1,2
6135 Id : 20018, {_}: left_division (left_division ?19613 ?19614) (left_inverse (multiply ?19613 ?19615)) =<= left_inverse (multiply ?19613 (multiply (multiply ?19615 (left_inverse ?19613)) ?19614)) [19615, 19614, 19613] by Demod 20017 with 2376 at 2,2
6136 Id : 20019, {_}: left_division (left_division ?19613 ?19614) (left_inverse (multiply ?19613 ?19615)) =>= left_inverse (multiply ?19613 (multiply (right_division ?19615 ?19613) ?19614)) [19615, 19614, 19613] by Demod 20018 with 2184 at 1,2,1,3
6137 Id : 20020, {_}: left_inverse (multiply (multiply ?19613 ?19615) (left_division ?19613 ?19614)) =>= left_inverse (multiply ?19613 (multiply (right_division ?19615 ?19613) ?19614)) [19614, 19615, 19613] by Demod 20019 with 2376 at 2
6138 Id : 20021, {_}: left_inverse (multiply (multiply ?19613 ?19615) (left_division ?19613 ?19614)) =>= left_inverse (multiply ?19613 (left_division (right_division ?19613 ?19615) ?19614)) [19614, 19615, 19613] by Demod 20020 with 933 at 2,1,3
6139 Id : 20022, {_}: left_inverse (right_division (multiply ?19613 ?19615) (left_division ?19614 ?19613)) =<= left_inverse (multiply ?19613 (left_division (right_division ?19613 ?19615) ?19614)) [19614, 19615, 19613] by Demod 20021 with 2414 at 1,2
6140 Id : 20023, {_}: left_inverse (right_division (multiply ?19613 ?19615) (left_division ?19614 ?19613)) =>= left_inverse (right_division ?19613 (left_division ?19614 (right_division ?19613 ?19615))) [19614, 19615, 19613] by Demod 20022 with 2414 at 1,3
6141 Id : 20024, {_}: right_division (left_division ?19614 ?19613) (multiply ?19613 ?19615) =<= left_inverse (right_division ?19613 (left_division ?19614 (right_division ?19613 ?19615))) [19615, 19613, 19614] by Demod 20023 with 916 at 2
6142 Id : 29739, {_}: right_division (left_division ?28549 ?28550) (multiply ?28550 ?28551) =<= right_division (left_division ?28549 (right_division ?28550 ?28551)) ?28550 [28551, 28550, 28549] by Demod 20024 with 916 at 3
6143 Id : 29811, {_}: right_division (left_division (left_inverse ?28848) ?28849) (multiply ?28849 ?28850) =>= right_division (multiply ?28848 (right_division ?28849 ?28850)) ?28849 [28850, 28849, 28848] by Super 29739 with 756 at 1,3
6144 Id : 30077, {_}: right_division (multiply ?28848 ?28849) (multiply ?28849 ?28850) =<= right_division (multiply ?28848 (right_division ?28849 ?28850)) ?28849 [28850, 28849, 28848] by Demod 29811 with 756 at 1,2
6145 Id : 2185, {_}: right_division ?2909 (right_division ?2910 ?2911) =<= multiply ?2909 (right_division ?2911 ?2910) [2911, 2910, 2909] by Super 2182 with 916 at 2,2
6146 Id : 30078, {_}: right_division (multiply ?28848 ?28849) (multiply ?28849 ?28850) =<= right_division (right_division ?28848 (right_division ?28850 ?28849)) ?28849 [28850, 28849, 28848] by Demod 30077 with 2185 at 1,3
6147 Id : 44018, {_}: left_division ?43029 (left_division (right_division (multiply ?43030 ?43029) (multiply ?43029 ?43031)) ?43031) =<= left_division (right_division (left_division (right_division ?43031 ?43029) ?43030) (right_division ?43031 ?43029)) ?43029 [43031, 43030, 43029] by Demod 43662 with 30078 at 1,2,2
6148 Id : 242, {_}: multiply (multiply ?22 (multiply ?23 ?22)) ?24 =>= multiply ?22 (multiply ?23 (multiply ?22 ?24)) [24, 23, 22] by Demod 10 with 70 at 1,2
6149 Id : 822, {_}: multiply (multiply ?1109 (left_division ?1110 ?1109)) ?1111 =<= multiply ?1109 (multiply (left_inverse ?1110) (multiply ?1109 ?1111)) [1111, 1110, 1109] by Super 242 with 744 at 2,1,2
6150 Id : 855, {_}: multiply (multiply ?1109 (left_division ?1110 ?1109)) ?1111 =>= multiply ?1109 (left_division ?1110 (multiply ?1109 ?1111)) [1111, 1110, 1109] by Demod 822 with 744 at 2,3
6151 Id : 3922, {_}: multiply (right_division ?1109 (left_division ?1109 ?1110)) ?1111 =>= multiply ?1109 (left_division ?1110 (multiply ?1109 ?1111)) [1111, 1110, 1109] by Demod 855 with 2414 at 1,2
6152 Id : 3923, {_}: multiply (right_division ?1109 (left_division ?1109 ?1110)) ?1111 =>= right_division ?1109 (left_division (multiply ?1109 ?1111) ?1110) [1111, 1110, 1109] by Demod 3922 with 2414 at 3
6153 Id : 3924, {_}: left_division (right_division (left_division ?1109 ?1110) ?1109) ?1111 =>= right_division ?1109 (left_division (multiply ?1109 ?1111) ?1110) [1111, 1110, 1109] by Demod 3923 with 933 at 2
6154 Id : 44019, {_}: left_division ?43029 (left_division (right_division (multiply ?43030 ?43029) (multiply ?43029 ?43031)) ?43031) =>= right_division (right_division ?43031 ?43029) (left_division (multiply (right_division ?43031 ?43029) ?43029) ?43030) [43031, 43030, 43029] by Demod 44018 with 3924 at 3
6155 Id : 2293, {_}: multiply (multiply (left_inverse ?3033) (right_division ?3034 ?3033)) ?3035 =<= multiply (left_inverse ?3033) (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Super 242 with 2184 at 2,1,2
6156 Id : 2352, {_}: multiply (left_division ?3033 (right_division ?3034 ?3033)) ?3035 =<= multiply (left_inverse ?3033) (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Demod 2293 with 744 at 1,2
6157 Id : 2353, {_}: multiply (left_division ?3033 (right_division ?3034 ?3033)) ?3035 =<= left_division ?3033 (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Demod 2352 with 744 at 3
6158 Id : 2354, {_}: multiply (right_division (left_division ?3033 ?3034) ?3033) ?3035 =<= left_division ?3033 (multiply ?3034 (multiply (left_inverse ?3033) ?3035)) [3035, 3034, 3033] by Demod 2353 with 2273 at 1,2
6159 Id : 2355, {_}: multiply (right_division (left_division ?3033 ?3034) ?3033) ?3035 =>= left_division ?3033 (multiply ?3034 (left_division ?3033 ?3035)) [3035, 3034, 3033] by Demod 2354 with 744 at 2,2,3
6160 Id : 2356, {_}: left_division (right_division ?3033 (left_division ?3033 ?3034)) ?3035 =>= left_division ?3033 (multiply ?3034 (left_division ?3033 ?3035)) [3035, 3034, 3033] by Demod 2355 with 933 at 2
6161 Id : 6567, {_}: left_division (right_division ?3033 (left_division ?3033 ?3034)) ?3035 =>= left_division ?3033 (right_division ?3034 (left_division ?3035 ?3033)) [3035, 3034, 3033] by Demod 2356 with 2414 at 2,3
6162 Id : 6586, {_}: left_inverse (left_division ?7225 (right_division ?7226 (left_division ?7227 ?7225))) =>= left_division ?7227 (right_division ?7225 (left_division ?7225 ?7226)) [7227, 7226, 7225] by Super 2254 with 6567 at 1,2
6163 Id : 18904, {_}: left_division (right_division ?18377 (left_division ?18378 ?18379)) ?18379 =>= left_division ?18378 (right_division ?18379 (left_division ?18379 ?18377)) [18379, 18378, 18377] by Demod 6586 with 2254 at 2
6164 Id : 18925, {_}: left_division (right_division ?18462 (multiply ?18463 ?18464)) ?18464 =<= left_division (left_inverse ?18463) (right_division ?18464 (left_division ?18464 ?18462)) [18464, 18463, 18462] by Super 18904 with 756 at 2,1,2
6165 Id : 19131, {_}: left_division (right_division ?18462 (multiply ?18463 ?18464)) ?18464 =<= multiply ?18463 (right_division ?18464 (left_division ?18464 ?18462)) [18464, 18463, 18462] by Demod 18925 with 756 at 3
6166 Id : 19132, {_}: left_division (right_division ?18462 (multiply ?18463 ?18464)) ?18464 =>= right_division ?18463 (right_division (left_division ?18464 ?18462) ?18464) [18464, 18463, 18462] by Demod 19131 with 2185 at 3
6167 Id : 44020, {_}: left_division ?43029 (right_division ?43029 (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031)) =>= right_division (right_division ?43031 ?43029) (left_division (multiply (right_division ?43031 ?43029) ?43029) ?43030) [43030, 43031, 43029] by Demod 44019 with 19132 at 2,2
6168 Id : 44021, {_}: left_division ?43029 (right_division ?43029 (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031)) =>= right_division (right_division ?43031 ?43029) (left_division (left_division (right_division ?43029 ?43031) ?43029) ?43030) [43030, 43031, 43029] by Demod 44020 with 933 at 1,2,3
6169 Id : 2291, {_}: left_division ?3028 (right_division ?3028 ?3029) =>= left_inverse ?3029 [3029, 3028] by Super 5 with 2184 at 2,2
6170 Id : 44022, {_}: left_inverse (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031) =<= right_division (right_division ?43031 ?43029) (left_division (left_division (right_division ?43029 ?43031) ?43029) ?43030) [43029, 43030, 43031] by Demod 44021 with 2291 at 2
6171 Id : 44023, {_}: left_inverse (right_division (left_division ?43031 (multiply ?43030 ?43029)) ?43031) =>= right_division (right_division ?43031 ?43029) (left_division ?43031 ?43030) [43029, 43030, 43031] by Demod 44022 with 28 at 1,2,3
6172 Id : 44024, {_}: right_division ?43031 (left_division ?43031 (multiply ?43030 ?43029)) =<= right_division (right_division ?43031 ?43029) (left_division ?43031 ?43030) [43029, 43030, 43031] by Demod 44023 with 916 at 2
6173 Id : 47970, {_}: right_division (left_division ?47766 ?47767) (right_division ?47766 ?47768) =<= left_inverse (right_division ?47766 (left_division ?47766 (multiply ?47767 ?47768))) [47768, 47767, 47766] by Super 916 with 44024 at 1,3
6174 Id : 48230, {_}: right_division (left_division ?47766 ?47767) (right_division ?47766 ?47768) =<= right_division (left_division ?47766 (multiply ?47767 ?47768)) ?47766 [47768, 47767, 47766] by Demod 47970 with 916 at 3
6175 Id : 50397, {_}: right_division (left_division (left_inverse ?50556) ?50557) (right_division (left_inverse ?50556) ?50558) =>= multiply (left_division (left_inverse ?50556) (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Super 2111 with 48230 at 2
6176 Id : 50603, {_}: right_division (multiply ?50556 ?50557) (right_division (left_inverse ?50556) ?50558) =<= multiply (left_division (left_inverse ?50556) (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Demod 50397 with 756 at 1,2
6177 Id : 50604, {_}: right_division (multiply ?50556 ?50557) (left_inverse (multiply ?50558 ?50556)) =<= multiply (left_division (left_inverse ?50556) (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Demod 50603 with 2178 at 2,2
6178 Id : 50605, {_}: right_division (multiply ?50556 ?50557) (left_inverse (multiply ?50558 ?50556)) =<= left_division (left_division (multiply ?50557 ?50558) (left_inverse ?50556)) ?50556 [50558, 50557, 50556] by Demod 50604 with 2410 at 3
6179 Id : 50606, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =<= left_division (left_division (multiply ?50557 ?50558) (left_inverse ?50556)) ?50556 [50558, 50557, 50556] by Demod 50605 with 2111 at 2
6180 Id : 50607, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =<= left_division (left_inverse (multiply ?50556 (multiply ?50557 ?50558))) ?50556 [50558, 50557, 50556] by Demod 50606 with 2376 at 1,3
6181 Id : 50608, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =<= multiply (multiply ?50556 (multiply ?50557 ?50558)) ?50556 [50558, 50557, 50556] by Demod 50607 with 756 at 3
6182 Id : 50609, {_}: multiply (multiply ?50556 ?50557) (multiply ?50558 ?50556) =>= multiply ?50556 (multiply (multiply ?50557 ?50558) ?50556) [50558, 50557, 50556] by Demod 50608 with 70 at 3
6183 Id : 52237, {_}: multiply x (multiply (multiply y z) x) =?= multiply x (multiply (multiply y z) x) [] by Demod 1 with 50609 at 3
6184 Id : 1, {_}: multiply x (multiply (multiply y z) x) =<= multiply (multiply x y) (multiply z x) [] by prove_moufang4
6185 % SZS output end CNFRefutation for GRP205-1.p
6186 8734: solved GRP205-1.p in 8.472529 using kbo
6187 !! infer_left 194 0.0003 0.0000 0.0000
6188 !! infer_right 195 29.6761 0.7781 0.1522
6189 !! simplify_goal 195 0.0202 0.0005 0.0001
6190 !! keep_simplified 561 3.2611 0.3110 0.0058
6191 !! simplification_step 647 3.2563 0.3110 0.0050
6192 !! simplify 32671 29.4133 0.3326 0.0009
6193 !! orphan_murder 578 0.6395 0.3003 0.0011
6194 !! is_subsumed 28740 1.3715 0.3001 0.0000
6195 !! build_new_clause 13947 2.2329 0.3009 0.0002
6196 !! demodulate 32539 27.9502 0.3325 0.0009
6197 !! demod 343904 18.5951 0.3321 0.0001
6198 !! demod.apply_subst 80288 0.8147 0.3001 0.0000
6199 !! demod.compare_terms 1790 0.0063 0.0003 0.0000
6200 !! demod.retrieve_generalizations 343904 5.5470 0.3054 0.0000
6201 !! demod.unify 558499 7.9286 0.3321 0.0000
6202 !! build_clause 52301 6.8824 0.3009 0.0001
6203 !! compare_terms(kbo) 54125 4.0948 0.3009 0.0001
6204 !! compare_terms(nrkbo) 10 0.0001 0.0000 0.0000
6211 (multiply (multiply ?4 (inverse ?4))
6212 (inverse (multiply ?2 ?3))) ?2)))
6215 [4, 3, 2] by single_non_axiom ?2 ?3 ?4
6222 (multiply (multiply z (inverse z)) (inverse (multiply u y)))
6226 [] by try_prove_this_axiom
6227 % SZS status Timeout for GRP207-1.p
6228 Fatal error: exception Assert_failure("matitaprover.ml", 280, 46)
6233 (multiply (inverse (multiply (inverse (multiply ?2 ?3)) ?4))
6234 (inverse (multiply ?3 (multiply (inverse ?3) ?3)))))
6237 [4, 3, 2] by single_axiom ?2 ?3 ?4
6240 multiply (multiply (inverse b2) b2) a2 =>= a2
6241 [] by prove_these_axioms_2
6242 % SZS status Timeout for GRP404-1.p
6247 (multiply (inverse (multiply (inverse (multiply ?2 ?3)) ?4))
6248 (inverse (multiply ?3 (multiply (inverse ?3) ?3)))))
6251 [4, 3, 2] by single_axiom ?2 ?3 ?4
6254 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6255 [] by prove_these_axioms_3
6256 % SZS status Timeout for GRP405-1.p
6260 (multiply (inverse (multiply ?2 (inverse (multiply ?3 ?4))))
6261 (multiply ?2 (inverse ?4))) (inverse (multiply (inverse ?4) ?4))
6264 [4, 3, 2] by single_axiom ?2 ?3 ?4
6267 multiply (multiply (inverse b2) b2) a2 =>= a2
6268 [] by prove_these_axioms_2
6271 Found proof, 39.494848s
6272 % SZS status Unsatisfiable for GRP410-1.p
6273 % SZS output start CNFRefutation for GRP410-1.p
6274 Id : 3, {_}: multiply (multiply (inverse (multiply ?6 (inverse (multiply ?7 ?8)))) (multiply ?6 (inverse ?8))) (inverse (multiply (inverse ?8) ?8)) =>= ?7 [8, 7, 6] by single_axiom ?6 ?7 ?8
6275 Id : 2, {_}: multiply (multiply (inverse (multiply ?2 (inverse (multiply ?3 ?4)))) (multiply ?2 (inverse ?4))) (inverse (multiply (inverse ?4) ?4)) =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
6276 Id : 5, {_}: multiply (multiply (inverse (multiply ?15 (inverse ?16))) (multiply ?15 (inverse (inverse (multiply (inverse ?17) ?17))))) (inverse (multiply (inverse (inverse (multiply (inverse ?17) ?17))) (inverse (multiply (inverse ?17) ?17)))) =?= multiply (inverse (multiply ?18 (inverse (multiply ?16 ?17)))) (multiply ?18 (inverse ?17)) [18, 17, 16, 15] by Super 3 with 2 at 1,2,1,1,1,2
6277 Id : 106, {_}: multiply (inverse (multiply ?503 (inverse (multiply (multiply ?504 (inverse (multiply (inverse ?505) ?505))) ?505)))) (multiply ?503 (inverse ?505)) =>= ?504 [505, 504, 503] by Super 2 with 5 at 2
6278 Id : 117, {_}: multiply (multiply (inverse (multiply ?561 (inverse ?562))) (multiply ?561 (inverse (inverse (multiply (inverse ?563) ?563))))) (inverse (multiply (inverse (inverse (multiply (inverse ?563) ?563))) (inverse (multiply (inverse ?563) ?563)))) =?= multiply (inverse (multiply ?564 (inverse (multiply ?562 ?563)))) (multiply ?564 (inverse ?563)) [564, 563, 562, 561] by Super 3 with 2 at 1,2,1,1,1,2
6279 Id : 216, {_}: multiply (inverse (multiply ?1036 (inverse (multiply ?1037 ?1038)))) (multiply ?1036 (inverse ?1038)) =?= multiply (inverse (multiply ?1039 (inverse (multiply ?1037 ?1038)))) (multiply ?1039 (inverse ?1038)) [1039, 1038, 1037, 1036] by Super 117 with 5 at 2
6280 Id : 229, {_}: multiply (inverse (multiply ?1117 (inverse (multiply (inverse (multiply ?1118 (inverse (multiply (multiply ?1119 (inverse (multiply (inverse ?1120) ?1120))) ?1120)))) (multiply ?1118 (inverse ?1120)))))) (multiply ?1117 (inverse (multiply ?1118 (inverse ?1120)))) =?= multiply (inverse (multiply ?1121 (inverse ?1119))) (multiply ?1121 (inverse (multiply ?1118 (inverse ?1120)))) [1121, 1120, 1119, 1118, 1117] by Super 216 with 106 at 1,2,1,1,3
6281 Id : 704, {_}: multiply (inverse (multiply ?2676 (inverse ?2677))) (multiply ?2676 (inverse (multiply ?2678 (inverse ?2679)))) =?= multiply (inverse (multiply ?2680 (inverse ?2677))) (multiply ?2680 (inverse (multiply ?2678 (inverse ?2679)))) [2680, 2679, 2678, 2677, 2676] by Demod 229 with 106 at 1,2,1,1,2
6282 Id : 151, {_}: multiply (multiply (inverse (multiply ?754 (inverse ?755))) (multiply ?754 (inverse (multiply ?756 (inverse ?757))))) (inverse (multiply (inverse (multiply ?756 (inverse ?757))) (multiply ?756 (inverse ?757)))) =>= inverse (multiply ?756 (inverse (multiply (multiply ?755 (inverse (multiply (inverse ?757) ?757))) ?757))) [757, 756, 755, 754] by Super 2 with 106 at 1,2,1,1,1,2
6283 Id : 310, {_}: inverse (multiply ?1412 (inverse (multiply (multiply (multiply ?1413 (multiply ?1412 (inverse ?1414))) (inverse (multiply (inverse ?1414) ?1414))) ?1414))) =>= ?1413 [1414, 1413, 1412] by Super 2 with 151 at 2
6284 Id : 713, {_}: multiply (inverse (multiply ?2742 (inverse ?2743))) (multiply ?2742 (inverse (multiply ?2744 (inverse (multiply (multiply (multiply ?2745 (multiply ?2744 (inverse ?2746))) (inverse (multiply (inverse ?2746) ?2746))) ?2746))))) =?= multiply (inverse (multiply ?2747 (inverse ?2743))) (multiply ?2747 ?2745) [2747, 2746, 2745, 2744, 2743, 2742] by Super 704 with 310 at 2,2,3
6285 Id : 869, {_}: multiply (inverse (multiply ?3440 (inverse ?3441))) (multiply ?3440 ?3442) =?= multiply (inverse (multiply ?3443 (inverse ?3441))) (multiply ?3443 ?3442) [3443, 3442, 3441, 3440] by Demod 713 with 310 at 2,2,2
6286 Id : 881, {_}: multiply (inverse (multiply ?3517 (inverse (multiply ?3518 (inverse (multiply (multiply (multiply ?3519 (multiply ?3518 (inverse ?3520))) (inverse (multiply (inverse ?3520) ?3520))) ?3520)))))) (multiply ?3517 ?3521) =?= multiply (inverse (multiply ?3522 ?3519)) (multiply ?3522 ?3521) [3522, 3521, 3520, 3519, 3518, 3517] by Super 869 with 310 at 2,1,1,3
6287 Id : 932, {_}: multiply (inverse (multiply ?3517 ?3519)) (multiply ?3517 ?3521) =?= multiply (inverse (multiply ?3522 ?3519)) (multiply ?3522 ?3521) [3522, 3521, 3519, 3517] by Demod 881 with 310 at 2,1,1,2
6288 Id : 940, {_}: multiply (inverse (multiply ?3765 (inverse (multiply (multiply ?3766 (inverse (multiply (inverse (multiply ?3767 ?3768)) (multiply ?3767 ?3768)))) (multiply ?3769 ?3768))))) (multiply ?3765 (inverse (multiply ?3769 ?3768))) =>= ?3766 [3769, 3768, 3767, 3766, 3765] by Super 106 with 932 at 1,2,1,1,2,1,1,2
6289 Id : 1923, {_}: multiply ?8185 (inverse (multiply (inverse (multiply ?8186 ?8187)) (multiply ?8186 ?8187))) =?= multiply ?8185 (inverse (multiply (inverse (multiply ?8188 ?8187)) (multiply ?8188 ?8187))) [8188, 8187, 8186, 8185] by Super 2 with 940 at 1,2
6290 Id : 6, {_}: multiply (multiply (inverse ?20) (multiply (multiply (inverse (multiply ?21 (inverse (multiply ?20 ?22)))) (multiply ?21 (inverse ?22))) (inverse ?22))) (inverse (multiply (inverse ?22) ?22)) =>= inverse ?22 [22, 21, 20] by Super 3 with 2 at 1,1,1,2
6291 Id : 1927, {_}: multiply ?8210 (inverse (multiply (inverse (multiply ?8211 (inverse (multiply (inverse ?8212) ?8212)))) (multiply ?8211 (inverse (multiply (inverse ?8212) ?8212))))) =?= multiply ?8210 (inverse (multiply (inverse (multiply (multiply (inverse ?8213) (multiply (multiply (inverse (multiply ?8214 (inverse (multiply ?8213 ?8212)))) (multiply ?8214 (inverse ?8212))) (inverse ?8212))) (inverse (multiply (inverse ?8212) ?8212)))) (inverse ?8212))) [8214, 8213, 8212, 8211, 8210] by Super 1923 with 6 at 2,1,2,3
6292 Id : 2148, {_}: multiply ?9208 (inverse (multiply (inverse (multiply ?9209 (inverse (multiply (inverse ?9210) ?9210)))) (multiply ?9209 (inverse (multiply (inverse ?9210) ?9210))))) =>= multiply ?9208 (inverse (multiply (inverse (inverse ?9210)) (inverse ?9210))) [9210, 9209, 9208] by Demod 1927 with 6 at 1,1,1,2,3
6293 Id : 2158, {_}: multiply ?9267 (inverse (multiply (inverse (multiply (multiply (inverse (multiply ?9268 (inverse (multiply ?9269 ?9270)))) (multiply ?9268 (inverse ?9270))) (inverse (multiply (inverse ?9270) ?9270)))) ?9269)) =>= multiply ?9267 (inverse (multiply (inverse (inverse ?9270)) (inverse ?9270))) [9270, 9269, 9268, 9267] by Super 2148 with 2 at 2,1,2,2
6294 Id : 2506, {_}: multiply ?10398 (inverse (multiply (inverse ?10399) ?10399)) =?= multiply ?10398 (inverse (multiply (inverse (inverse ?10400)) (inverse ?10400))) [10400, 10399, 10398] by Demod 2158 with 2 at 1,1,1,2,2
6295 Id : 2315, {_}: multiply ?9267 (inverse (multiply (inverse ?9269) ?9269)) =?= multiply ?9267 (inverse (multiply (inverse (inverse ?9270)) (inverse ?9270))) [9270, 9269, 9267] by Demod 2158 with 2 at 1,1,1,2,2
6296 Id : 2522, {_}: multiply ?10486 (inverse (multiply (inverse ?10487) ?10487)) =?= multiply ?10486 (inverse (multiply (inverse ?10488) ?10488)) [10488, 10487, 10486] by Super 2506 with 2315 at 3
6297 Id : 2588, {_}: multiply (inverse (multiply ?10821 (inverse (multiply (multiply ?10822 (inverse (multiply (inverse ?10823) ?10823))) ?10824)))) (multiply ?10821 (inverse ?10824)) =>= ?10822 [10824, 10823, 10822, 10821] by Super 106 with 2522 at 1,1,2,1,1,2
6298 Id : 4, {_}: multiply (multiply (inverse (multiply (multiply (inverse (multiply ?10 (inverse (multiply ?11 ?12)))) (multiply ?10 (inverse ?12))) (inverse (multiply ?13 (multiply (inverse ?12) ?12))))) ?11) (inverse (multiply (inverse (multiply (inverse ?12) ?12)) (multiply (inverse ?12) ?12))) =>= ?13 [13, 12, 11, 10] by Super 3 with 2 at 2,1,2
6299 Id : 2630, {_}: multiply (multiply (inverse (multiply ?11025 (inverse (multiply ?11026 ?11027)))) (multiply ?11025 (inverse ?11027))) (inverse (multiply (inverse ?11028) ?11028)) =>= ?11026 [11028, 11027, 11026, 11025] by Super 2 with 2522 at 2
6300 Id : 3233, {_}: multiply (multiply (inverse ?14256) ?14256) (inverse (multiply (inverse (multiply (inverse ?14257) ?14257)) (multiply (inverse ?14257) ?14257))) =>= inverse (multiply (inverse ?14257) ?14257) [14257, 14256] by Super 4 with 2630 at 1,1,1,2
6301 Id : 936, {_}: multiply (multiply (inverse (multiply ?3743 (inverse ?3744))) (multiply ?3743 (inverse (multiply ?3745 (inverse ?3746))))) (inverse (multiply (inverse (multiply ?3747 (inverse ?3746))) (multiply ?3747 (inverse ?3746)))) =>= inverse (multiply ?3745 (inverse (multiply (multiply ?3744 (inverse (multiply (inverse ?3746) ?3746))) ?3746))) [3747, 3746, 3745, 3744, 3743] by Super 151 with 932 at 1,2,2
6302 Id : 3267, {_}: inverse (multiply ?14417 (inverse (multiply (multiply (multiply ?14417 (inverse ?14418)) (inverse (multiply (inverse ?14418) ?14418))) ?14418))) =>= inverse (multiply (inverse (inverse ?14418)) (inverse ?14418)) [14418, 14417] by Super 3233 with 936 at 2
6303 Id : 10370, {_}: multiply (inverse (multiply (inverse (inverse ?33757)) (inverse ?33757))) (multiply ?33758 (inverse ?33757)) =>= multiply ?33758 (inverse ?33757) [33758, 33757] by Super 2588 with 3267 at 1,2
6304 Id : 10371, {_}: multiply (inverse (multiply (inverse (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762))))) (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))))) (multiply ?33763 ?33761) =>= multiply ?33763 (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))) [33763, 33762, 33761, 33760] by Super 10370 with 310 at 2,2,2
6305 Id : 10491, {_}: multiply (inverse (multiply (inverse ?33761) (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))))) (multiply ?33763 ?33761) =>= multiply ?33763 (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))) [33763, 33762, 33760, 33761] by Demod 10371 with 310 at 1,1,1,1,2
6306 Id : 10492, {_}: multiply (inverse (multiply (inverse ?33761) ?33761)) (multiply ?33763 ?33761) =?= multiply ?33763 (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))) [33762, 33760, 33763, 33761] by Demod 10491 with 310 at 2,1,1,2
6307 Id : 10722, {_}: multiply (inverse (multiply (inverse ?34484) ?34484)) (multiply ?34485 ?34484) =>= multiply ?34485 ?34484 [34485, 34484] by Demod 10492 with 310 at 2,3
6308 Id : 4568, {_}: multiply (multiply (inverse ?18346) ?18346) (inverse (multiply (inverse ?18347) ?18347)) =?= inverse (multiply (inverse ?18348) ?18348) [18348, 18347, 18346] by Super 3233 with 2522 at 2
6309 Id : 3268, {_}: multiply (multiply (inverse ?14420) ?14420) (inverse (multiply (inverse ?14421) ?14421)) =?= inverse (multiply (inverse ?14422) ?14422) [14422, 14421, 14420] by Super 3233 with 2522 at 2
6310 Id : 4624, {_}: inverse (multiply (inverse ?18648) ?18648) =?= inverse (multiply (inverse ?18649) ?18649) [18649, 18648] by Super 4568 with 3268 at 2
6311 Id : 11120, {_}: multiply (inverse (multiply (inverse ?35665) ?35665)) (multiply ?35666 ?35667) =>= multiply ?35666 ?35667 [35667, 35666, 35665] by Super 10722 with 4624 at 1,2
6312 Id : 11128, {_}: multiply (inverse (multiply (inverse ?35708) ?35708)) ?35709 =?= multiply (inverse (multiply ?35710 (inverse (multiply (multiply ?35709 (inverse (multiply (inverse ?35711) ?35711))) ?35712)))) (multiply ?35710 (inverse ?35712)) [35712, 35711, 35710, 35709, 35708] by Super 11120 with 2588 at 2,2
6313 Id : 11232, {_}: multiply (inverse (multiply (inverse ?35708) ?35708)) ?35709 =>= ?35709 [35709, 35708] by Demod 11128 with 2588 at 3
6314 Id : 11381, {_}: inverse (multiply (inverse (multiply (inverse ?36500) ?36500)) (inverse (multiply (multiply (inverse ?36501) (inverse (multiply (inverse ?36501) ?36501))) ?36501))) =>= inverse (multiply (inverse (inverse ?36501)) (inverse ?36501)) [36501, 36500] by Super 3267 with 11232 at 1,1,1,2,1,2
6315 Id : 11744, {_}: inverse (inverse (multiply (multiply (inverse ?37264) (inverse (multiply (inverse ?37264) ?37264))) ?37264)) =>= inverse (multiply (inverse (inverse ?37264)) (inverse ?37264)) [37264] by Demod 11381 with 11232 at 1,2
6316 Id : 11749, {_}: inverse (inverse (multiply (multiply (inverse (multiply (inverse ?37280) ?37280)) (inverse (multiply (inverse (multiply (inverse ?37281) ?37281)) (multiply (inverse ?37280) ?37280)))) (multiply (inverse ?37280) ?37280))) =>= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37281, 37280] by Super 11744 with 4624 at 1,1,2,1,1,1,2
6317 Id : 12091, {_}: inverse (inverse (multiply (inverse (multiply (inverse (multiply (inverse ?37281) ?37281)) (multiply (inverse ?37280) ?37280))) (multiply (inverse ?37280) ?37280))) =>= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37280, 37281] by Demod 11749 with 11232 at 1,1,1,2
6318 Id : 12092, {_}: inverse (inverse (multiply (inverse (multiply (inverse ?37280) ?37280)) (multiply (inverse ?37280) ?37280))) =<= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37280] by Demod 12091 with 11232 at 1,1,1,1,2
6319 Id : 11177, {_}: multiply (inverse (multiply ?35979 ?35980)) (multiply ?35979 ?35981) =>= multiply (inverse ?35980) ?35981 [35981, 35980, 35979] by Super 11120 with 932 at 2
6320 Id : 12093, {_}: inverse (inverse (multiply (inverse ?37280) ?37280)) =<= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37280] by Demod 12092 with 11177 at 1,1,2
6321 Id : 11551, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (multiply (inverse (inverse (multiply (inverse ?17) ?17))) (inverse (multiply (inverse ?17) ?17)))) =?= multiply (inverse (multiply ?18 (inverse (multiply ?16 ?17)))) (multiply ?18 (inverse ?17)) [18, 17, 16] by Demod 5 with 11177 at 1,2
6322 Id : 11552, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (multiply (inverse (inverse (multiply (inverse ?17) ?17))) (inverse (multiply (inverse ?17) ?17)))) =>= multiply (inverse (inverse (multiply ?16 ?17))) (inverse ?17) [17, 16] by Demod 11551 with 11177 at 3
6323 Id : 11582, {_}: multiply (multiply (inverse (inverse ?36802)) (inverse (inverse (multiply (inverse (multiply ?36803 ?36804)) (multiply ?36803 ?36804))))) (inverse (multiply (inverse (inverse (multiply (inverse (multiply ?36803 ?36804)) (multiply ?36803 ?36804)))) (inverse (multiply (inverse ?36804) ?36804)))) =>= multiply (inverse (inverse (multiply ?36802 (multiply ?36803 ?36804)))) (inverse (multiply ?36803 ?36804)) [36804, 36803, 36802] by Super 11552 with 11177 at 1,2,1,2,2
6324 Id : 11639, {_}: multiply (multiply (inverse (inverse ?36802)) (inverse (inverse (multiply (inverse ?36804) ?36804)))) (inverse (multiply (inverse (inverse (multiply (inverse (multiply ?36803 ?36804)) (multiply ?36803 ?36804)))) (inverse (multiply (inverse ?36804) ?36804)))) =>= multiply (inverse (inverse (multiply ?36802 (multiply ?36803 ?36804)))) (inverse (multiply ?36803 ?36804)) [36803, 36804, 36802] by Demod 11582 with 11177 at 1,1,2,1,2
6325 Id : 11640, {_}: multiply (multiply (inverse (inverse ?36802)) (inverse (inverse (multiply (inverse ?36804) ?36804)))) (inverse (multiply (inverse (inverse (multiply (inverse ?36804) ?36804))) (inverse (multiply (inverse ?36804) ?36804)))) =?= multiply (inverse (inverse (multiply ?36802 (multiply ?36803 ?36804)))) (inverse (multiply ?36803 ?36804)) [36803, 36804, 36802] by Demod 11639 with 11177 at 1,1,1,1,2,2
6326 Id : 12633, {_}: multiply (inverse (inverse (multiply ?38022 ?38023))) (inverse ?38023) =<= multiply (inverse (inverse (multiply ?38022 (multiply ?38024 ?38023)))) (inverse (multiply ?38024 ?38023)) [38024, 38023, 38022] by Demod 11640 with 11552 at 2
6327 Id : 12674, {_}: multiply (inverse (inverse (multiply (inverse (multiply (inverse ?38213) ?38213)) ?38214))) (inverse ?38214) =?= multiply (inverse (inverse (multiply ?38215 ?38214))) (inverse (multiply ?38215 ?38214)) [38215, 38214, 38213] by Super 12633 with 11232 at 1,1,1,3
6328 Id : 12741, {_}: multiply (inverse (inverse ?38214)) (inverse ?38214) =<= multiply (inverse (inverse (multiply ?38215 ?38214))) (inverse (multiply ?38215 ?38214)) [38215, 38214] by Demod 12674 with 11232 at 1,1,1,2
6329 Id : 12768, {_}: multiply (inverse (inverse (multiply (inverse ?38347) ?38347))) (inverse (multiply (inverse ?38348) ?38348)) =>= multiply (inverse (inverse ?38347)) (inverse ?38347) [38348, 38347] by Super 2522 with 12741 at 3
6330 Id : 13687, {_}: inverse (inverse (multiply (inverse ?37280) ?37280)) =<= inverse (multiply (inverse (inverse ?37280)) (inverse ?37280)) [37280] by Demod 12093 with 12768 at 1,3
6331 Id : 13761, {_}: multiply (inverse (inverse (multiply (inverse ?40444) ?40444))) ?40445 =>= ?40445 [40445, 40444] by Super 11232 with 13687 at 1,2
6332 Id : 12748, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (multiply (inverse (inverse ?17)) (inverse ?17))) =>= multiply (inverse (inverse (multiply ?16 ?17))) (inverse ?17) [17, 16] by Demod 11552 with 12741 at 1,2,2
6333 Id : 13691, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (inverse (multiply (inverse ?17) ?17))) =>= multiply (inverse (inverse (multiply ?16 ?17))) (inverse ?17) [17, 16] by Demod 12748 with 13687 at 2,2
6334 Id : 11554, {_}: multiply (multiply (inverse (inverse (multiply ?11026 ?11027))) (inverse ?11027)) (inverse (multiply (inverse ?11028) ?11028)) =>= ?11026 [11028, 11027, 11026] by Demod 2630 with 11177 at 1,2
6335 Id : 14411, {_}: multiply (inverse ?41330) (inverse (multiply (inverse ?41331) ?41331)) =>= inverse ?41330 [41331, 41330] by Super 11554 with 13761 at 1,2
6336 Id : 14443, {_}: multiply ?41451 (inverse (multiply (inverse ?41452) ?41452)) =?= inverse (multiply ?41453 (inverse (multiply (multiply (multiply ?41451 (multiply ?41453 (inverse ?41454))) (inverse (multiply (inverse ?41454) ?41454))) ?41454))) [41454, 41453, 41452, 41451] by Super 14411 with 310 at 1,2
6337 Id : 14559, {_}: multiply ?41451 (inverse (multiply (inverse ?41452) ?41452)) =>= ?41451 [41452, 41451] by Demod 14443 with 310 at 3
6338 Id : 15249, {_}: multiply (inverse (inverse (multiply ?11026 ?11027))) (inverse ?11027) =>= ?11026 [11027, 11026] by Demod 11554 with 14559 at 2
6339 Id : 15257, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (inverse (multiply (inverse ?17) ?17))) =>= ?16 [17, 16] by Demod 13691 with 15249 at 3
6340 Id : 15282, {_}: multiply (inverse (multiply ?41944 ?41945)) ?41944 =?= multiply (inverse ?41945) (inverse (multiply (inverse ?41946) ?41946)) [41946, 41945, 41944] by Super 11177 with 14559 at 2,2
6341 Id : 15420, {_}: multiply (inverse (multiply ?42198 ?42199)) ?42198 =>= inverse ?42199 [42199, 42198] by Demod 15282 with 14559 at 3
6342 Id : 11550, {_}: multiply (multiply (inverse ?20) (multiply (multiply (inverse (inverse (multiply ?20 ?22))) (inverse ?22)) (inverse ?22))) (inverse (multiply (inverse ?22) ?22)) =>= inverse ?22 [22, 20] by Demod 6 with 11177 at 1,2,1,2
6343 Id : 15240, {_}: multiply (inverse ?20) (multiply (multiply (inverse (inverse (multiply ?20 ?22))) (inverse ?22)) (inverse ?22)) =>= inverse ?22 [22, 20] by Demod 11550 with 14559 at 2
6344 Id : 15260, {_}: multiply (inverse ?20) (multiply ?20 (inverse ?22)) =>= inverse ?22 [22, 20] by Demod 15240 with 15249 at 1,2,2
6345 Id : 15431, {_}: multiply (inverse (inverse ?42235)) (inverse ?42236) =>= inverse (multiply ?42236 (inverse ?42235)) [42236, 42235] by Super 15420 with 15260 at 1,1,2
6346 Id : 15458, {_}: multiply (inverse (multiply (inverse (multiply (inverse ?17) ?17)) (inverse ?16))) (inverse (inverse (multiply (inverse ?17) ?17))) =>= ?16 [16, 17] by Demod 15257 with 15431 at 1,2
6347 Id : 15463, {_}: multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17))) =>= ?16 [17, 16] by Demod 15458 with 11232 at 1,1,2
6348 Id : 15464, {_}: inverse (multiply (inverse (multiply (inverse ?17) ?17)) (inverse ?16)) =>= ?16 [16, 17] by Demod 15463 with 15431 at 2
6349 Id : 15465, {_}: inverse (inverse ?16) =>= ?16 [16] by Demod 15464 with 11232 at 1,2
6350 Id : 15470, {_}: multiply (multiply (inverse ?40444) ?40444) ?40445 =>= ?40445 [40445, 40444] by Demod 13761 with 15465 at 1,2
6351 Id : 15583, {_}: a2 === a2 [] by Demod 1 with 15470 at 2
6352 Id : 1, {_}: multiply (multiply (inverse b2) b2) a2 =>= a2 [] by prove_these_axioms_2
6353 % SZS output end CNFRefutation for GRP410-1.p
6354 8866: solved GRP410-1.p in 8.556534 using nrkbo
6355 !! infer_left 65 0.0001 0.0000 0.0000
6356 !! infer_right 66 38.0568 1.5147 0.5766
6357 !! simplify_goal 66 0.0031 0.0001 0.0000
6358 !! keep_simplified 151 0.9107 0.3199 0.0060
6359 !! simplification_step 207 0.9089 0.3050 0.0044
6360 !! simplify 10167 31.8798 0.4064 0.0031
6361 !! orphan_murder 270 0.0037 0.0000 0.0000
6362 !! is_subsumed 9228 0.7303 0.4002 0.0001
6363 !! build_new_clause 8584 5.6344 0.4045 0.0007
6364 !! demodulate 10096 31.1171 0.4063 0.0031
6365 !! demod 323127 27.0167 0.4013 0.0001
6366 !! demod.apply_subst 240000 3.7288 0.4004 0.0000
6367 !! demod.compare_terms 112418 3.8419 0.4002 0.0000
6368 !! demod.retrieve_generalizations 323127 10.3223 0.4013 0.0000
6369 !! demod.unify 203377 4.1608 0.4010 0.0000
6370 !! build_clause 16167 6.3563 0.4045 0.0004
6371 !! compare_terms(nrkbo) 133375 5.9163 0.4044 0.0000
6372 !! compare_terms(nrkbo) 2 0.0000 0.0000 0.0000
6376 (multiply (inverse (multiply ?2 (inverse (multiply ?3 ?4))))
6377 (multiply ?2 (inverse ?4))) (inverse (multiply (inverse ?4) ?4))
6380 [4, 3, 2] by single_axiom ?2 ?3 ?4
6383 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6384 [] by prove_these_axioms_3
6387 Found proof, 44.774240s
6388 % SZS status Unsatisfiable for GRP411-1.p
6389 % SZS output start CNFRefutation for GRP411-1.p
6390 Id : 2, {_}: multiply (multiply (inverse (multiply ?2 (inverse (multiply ?3 ?4)))) (multiply ?2 (inverse ?4))) (inverse (multiply (inverse ?4) ?4)) =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
6391 Id : 3, {_}: multiply (multiply (inverse (multiply ?6 (inverse (multiply ?7 ?8)))) (multiply ?6 (inverse ?8))) (inverse (multiply (inverse ?8) ?8)) =>= ?7 [8, 7, 6] by single_axiom ?6 ?7 ?8
6392 Id : 117, {_}: multiply (multiply (inverse (multiply ?561 (inverse ?562))) (multiply ?561 (inverse (inverse (multiply (inverse ?563) ?563))))) (inverse (multiply (inverse (inverse (multiply (inverse ?563) ?563))) (inverse (multiply (inverse ?563) ?563)))) =?= multiply (inverse (multiply ?564 (inverse (multiply ?562 ?563)))) (multiply ?564 (inverse ?563)) [564, 563, 562, 561] by Super 3 with 2 at 1,2,1,1,1,2
6393 Id : 5, {_}: multiply (multiply (inverse (multiply ?15 (inverse ?16))) (multiply ?15 (inverse (inverse (multiply (inverse ?17) ?17))))) (inverse (multiply (inverse (inverse (multiply (inverse ?17) ?17))) (inverse (multiply (inverse ?17) ?17)))) =?= multiply (inverse (multiply ?18 (inverse (multiply ?16 ?17)))) (multiply ?18 (inverse ?17)) [18, 17, 16, 15] by Super 3 with 2 at 1,2,1,1,1,2
6394 Id : 216, {_}: multiply (inverse (multiply ?1036 (inverse (multiply ?1037 ?1038)))) (multiply ?1036 (inverse ?1038)) =?= multiply (inverse (multiply ?1039 (inverse (multiply ?1037 ?1038)))) (multiply ?1039 (inverse ?1038)) [1039, 1038, 1037, 1036] by Super 117 with 5 at 2
6395 Id : 106, {_}: multiply (inverse (multiply ?503 (inverse (multiply (multiply ?504 (inverse (multiply (inverse ?505) ?505))) ?505)))) (multiply ?503 (inverse ?505)) =>= ?504 [505, 504, 503] by Super 2 with 5 at 2
6396 Id : 229, {_}: multiply (inverse (multiply ?1117 (inverse (multiply (inverse (multiply ?1118 (inverse (multiply (multiply ?1119 (inverse (multiply (inverse ?1120) ?1120))) ?1120)))) (multiply ?1118 (inverse ?1120)))))) (multiply ?1117 (inverse (multiply ?1118 (inverse ?1120)))) =?= multiply (inverse (multiply ?1121 (inverse ?1119))) (multiply ?1121 (inverse (multiply ?1118 (inverse ?1120)))) [1121, 1120, 1119, 1118, 1117] by Super 216 with 106 at 1,2,1,1,3
6397 Id : 704, {_}: multiply (inverse (multiply ?2676 (inverse ?2677))) (multiply ?2676 (inverse (multiply ?2678 (inverse ?2679)))) =?= multiply (inverse (multiply ?2680 (inverse ?2677))) (multiply ?2680 (inverse (multiply ?2678 (inverse ?2679)))) [2680, 2679, 2678, 2677, 2676] by Demod 229 with 106 at 1,2,1,1,2
6398 Id : 151, {_}: multiply (multiply (inverse (multiply ?754 (inverse ?755))) (multiply ?754 (inverse (multiply ?756 (inverse ?757))))) (inverse (multiply (inverse (multiply ?756 (inverse ?757))) (multiply ?756 (inverse ?757)))) =>= inverse (multiply ?756 (inverse (multiply (multiply ?755 (inverse (multiply (inverse ?757) ?757))) ?757))) [757, 756, 755, 754] by Super 2 with 106 at 1,2,1,1,1,2
6399 Id : 310, {_}: inverse (multiply ?1412 (inverse (multiply (multiply (multiply ?1413 (multiply ?1412 (inverse ?1414))) (inverse (multiply (inverse ?1414) ?1414))) ?1414))) =>= ?1413 [1414, 1413, 1412] by Super 2 with 151 at 2
6400 Id : 713, {_}: multiply (inverse (multiply ?2742 (inverse ?2743))) (multiply ?2742 (inverse (multiply ?2744 (inverse (multiply (multiply (multiply ?2745 (multiply ?2744 (inverse ?2746))) (inverse (multiply (inverse ?2746) ?2746))) ?2746))))) =?= multiply (inverse (multiply ?2747 (inverse ?2743))) (multiply ?2747 ?2745) [2747, 2746, 2745, 2744, 2743, 2742] by Super 704 with 310 at 2,2,3
6401 Id : 869, {_}: multiply (inverse (multiply ?3440 (inverse ?3441))) (multiply ?3440 ?3442) =?= multiply (inverse (multiply ?3443 (inverse ?3441))) (multiply ?3443 ?3442) [3443, 3442, 3441, 3440] by Demod 713 with 310 at 2,2,2
6402 Id : 889, {_}: multiply (inverse (multiply ?3569 (inverse (multiply (multiply (multiply ?3570 (multiply ?3571 (inverse ?3572))) (inverse (multiply (inverse ?3572) ?3572))) ?3572)))) (multiply ?3569 ?3573) =>= multiply ?3570 (multiply ?3571 ?3573) [3573, 3572, 3571, 3570, 3569] by Super 869 with 310 at 1,3
6403 Id : 881, {_}: multiply (inverse (multiply ?3517 (inverse (multiply ?3518 (inverse (multiply (multiply (multiply ?3519 (multiply ?3518 (inverse ?3520))) (inverse (multiply (inverse ?3520) ?3520))) ?3520)))))) (multiply ?3517 ?3521) =?= multiply (inverse (multiply ?3522 ?3519)) (multiply ?3522 ?3521) [3522, 3521, 3520, 3519, 3518, 3517] by Super 869 with 310 at 2,1,1,3
6404 Id : 932, {_}: multiply (inverse (multiply ?3517 ?3519)) (multiply ?3517 ?3521) =?= multiply (inverse (multiply ?3522 ?3519)) (multiply ?3522 ?3521) [3522, 3521, 3519, 3517] by Demod 881 with 310 at 2,1,1,2
6405 Id : 940, {_}: multiply (inverse (multiply ?3765 (inverse (multiply (multiply ?3766 (inverse (multiply (inverse (multiply ?3767 ?3768)) (multiply ?3767 ?3768)))) (multiply ?3769 ?3768))))) (multiply ?3765 (inverse (multiply ?3769 ?3768))) =>= ?3766 [3769, 3768, 3767, 3766, 3765] by Super 106 with 932 at 1,2,1,1,2,1,1,2
6406 Id : 1923, {_}: multiply ?8185 (inverse (multiply (inverse (multiply ?8186 ?8187)) (multiply ?8186 ?8187))) =?= multiply ?8185 (inverse (multiply (inverse (multiply ?8188 ?8187)) (multiply ?8188 ?8187))) [8188, 8187, 8186, 8185] by Super 2 with 940 at 1,2
6407 Id : 6, {_}: multiply (multiply (inverse ?20) (multiply (multiply (inverse (multiply ?21 (inverse (multiply ?20 ?22)))) (multiply ?21 (inverse ?22))) (inverse ?22))) (inverse (multiply (inverse ?22) ?22)) =>= inverse ?22 [22, 21, 20] by Super 3 with 2 at 1,1,1,2
6408 Id : 1927, {_}: multiply ?8210 (inverse (multiply (inverse (multiply ?8211 (inverse (multiply (inverse ?8212) ?8212)))) (multiply ?8211 (inverse (multiply (inverse ?8212) ?8212))))) =?= multiply ?8210 (inverse (multiply (inverse (multiply (multiply (inverse ?8213) (multiply (multiply (inverse (multiply ?8214 (inverse (multiply ?8213 ?8212)))) (multiply ?8214 (inverse ?8212))) (inverse ?8212))) (inverse (multiply (inverse ?8212) ?8212)))) (inverse ?8212))) [8214, 8213, 8212, 8211, 8210] by Super 1923 with 6 at 2,1,2,3
6409 Id : 2148, {_}: multiply ?9208 (inverse (multiply (inverse (multiply ?9209 (inverse (multiply (inverse ?9210) ?9210)))) (multiply ?9209 (inverse (multiply (inverse ?9210) ?9210))))) =>= multiply ?9208 (inverse (multiply (inverse (inverse ?9210)) (inverse ?9210))) [9210, 9209, 9208] by Demod 1927 with 6 at 1,1,1,2,3
6410 Id : 2158, {_}: multiply ?9267 (inverse (multiply (inverse (multiply (multiply (inverse (multiply ?9268 (inverse (multiply ?9269 ?9270)))) (multiply ?9268 (inverse ?9270))) (inverse (multiply (inverse ?9270) ?9270)))) ?9269)) =>= multiply ?9267 (inverse (multiply (inverse (inverse ?9270)) (inverse ?9270))) [9270, 9269, 9268, 9267] by Super 2148 with 2 at 2,1,2,2
6411 Id : 2506, {_}: multiply ?10398 (inverse (multiply (inverse ?10399) ?10399)) =?= multiply ?10398 (inverse (multiply (inverse (inverse ?10400)) (inverse ?10400))) [10400, 10399, 10398] by Demod 2158 with 2 at 1,1,1,2,2
6412 Id : 2315, {_}: multiply ?9267 (inverse (multiply (inverse ?9269) ?9269)) =?= multiply ?9267 (inverse (multiply (inverse (inverse ?9270)) (inverse ?9270))) [9270, 9269, 9267] by Demod 2158 with 2 at 1,1,1,2,2
6413 Id : 2522, {_}: multiply ?10486 (inverse (multiply (inverse ?10487) ?10487)) =?= multiply ?10486 (inverse (multiply (inverse ?10488) ?10488)) [10488, 10487, 10486] by Super 2506 with 2315 at 3
6414 Id : 2588, {_}: multiply (inverse (multiply ?10821 (inverse (multiply (multiply ?10822 (inverse (multiply (inverse ?10823) ?10823))) ?10824)))) (multiply ?10821 (inverse ?10824)) =>= ?10822 [10824, 10823, 10822, 10821] by Super 106 with 2522 at 1,1,2,1,1,2
6415 Id : 4, {_}: multiply (multiply (inverse (multiply (multiply (inverse (multiply ?10 (inverse (multiply ?11 ?12)))) (multiply ?10 (inverse ?12))) (inverse (multiply ?13 (multiply (inverse ?12) ?12))))) ?11) (inverse (multiply (inverse (multiply (inverse ?12) ?12)) (multiply (inverse ?12) ?12))) =>= ?13 [13, 12, 11, 10] by Super 3 with 2 at 2,1,2
6416 Id : 2630, {_}: multiply (multiply (inverse (multiply ?11025 (inverse (multiply ?11026 ?11027)))) (multiply ?11025 (inverse ?11027))) (inverse (multiply (inverse ?11028) ?11028)) =>= ?11026 [11028, 11027, 11026, 11025] by Super 2 with 2522 at 2
6417 Id : 3233, {_}: multiply (multiply (inverse ?14256) ?14256) (inverse (multiply (inverse (multiply (inverse ?14257) ?14257)) (multiply (inverse ?14257) ?14257))) =>= inverse (multiply (inverse ?14257) ?14257) [14257, 14256] by Super 4 with 2630 at 1,1,1,2
6418 Id : 936, {_}: multiply (multiply (inverse (multiply ?3743 (inverse ?3744))) (multiply ?3743 (inverse (multiply ?3745 (inverse ?3746))))) (inverse (multiply (inverse (multiply ?3747 (inverse ?3746))) (multiply ?3747 (inverse ?3746)))) =>= inverse (multiply ?3745 (inverse (multiply (multiply ?3744 (inverse (multiply (inverse ?3746) ?3746))) ?3746))) [3747, 3746, 3745, 3744, 3743] by Super 151 with 932 at 1,2,2
6419 Id : 3267, {_}: inverse (multiply ?14417 (inverse (multiply (multiply (multiply ?14417 (inverse ?14418)) (inverse (multiply (inverse ?14418) ?14418))) ?14418))) =>= inverse (multiply (inverse (inverse ?14418)) (inverse ?14418)) [14418, 14417] by Super 3233 with 936 at 2
6420 Id : 10370, {_}: multiply (inverse (multiply (inverse (inverse ?33757)) (inverse ?33757))) (multiply ?33758 (inverse ?33757)) =>= multiply ?33758 (inverse ?33757) [33758, 33757] by Super 2588 with 3267 at 1,2
6421 Id : 10371, {_}: multiply (inverse (multiply (inverse (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762))))) (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))))) (multiply ?33763 ?33761) =>= multiply ?33763 (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))) [33763, 33762, 33761, 33760] by Super 10370 with 310 at 2,2,2
6422 Id : 10491, {_}: multiply (inverse (multiply (inverse ?33761) (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))))) (multiply ?33763 ?33761) =>= multiply ?33763 (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))) [33763, 33762, 33760, 33761] by Demod 10371 with 310 at 1,1,1,1,2
6423 Id : 10492, {_}: multiply (inverse (multiply (inverse ?33761) ?33761)) (multiply ?33763 ?33761) =?= multiply ?33763 (inverse (multiply ?33760 (inverse (multiply (multiply (multiply ?33761 (multiply ?33760 (inverse ?33762))) (inverse (multiply (inverse ?33762) ?33762))) ?33762)))) [33762, 33760, 33763, 33761] by Demod 10491 with 310 at 2,1,1,2
6424 Id : 10722, {_}: multiply (inverse (multiply (inverse ?34484) ?34484)) (multiply ?34485 ?34484) =>= multiply ?34485 ?34484 [34485, 34484] by Demod 10492 with 310 at 2,3
6425 Id : 4568, {_}: multiply (multiply (inverse ?18346) ?18346) (inverse (multiply (inverse ?18347) ?18347)) =?= inverse (multiply (inverse ?18348) ?18348) [18348, 18347, 18346] by Super 3233 with 2522 at 2
6426 Id : 3268, {_}: multiply (multiply (inverse ?14420) ?14420) (inverse (multiply (inverse ?14421) ?14421)) =?= inverse (multiply (inverse ?14422) ?14422) [14422, 14421, 14420] by Super 3233 with 2522 at 2
6427 Id : 4624, {_}: inverse (multiply (inverse ?18648) ?18648) =?= inverse (multiply (inverse ?18649) ?18649) [18649, 18648] by Super 4568 with 3268 at 2
6428 Id : 11120, {_}: multiply (inverse (multiply (inverse ?35665) ?35665)) (multiply ?35666 ?35667) =>= multiply ?35666 ?35667 [35667, 35666, 35665] by Super 10722 with 4624 at 1,2
6429 Id : 11177, {_}: multiply (inverse (multiply ?35979 ?35980)) (multiply ?35979 ?35981) =>= multiply (inverse ?35980) ?35981 [35981, 35980, 35979] by Super 11120 with 932 at 2
6430 Id : 11545, {_}: multiply (inverse (inverse (multiply (multiply (multiply ?3570 (multiply ?3571 (inverse ?3572))) (inverse (multiply (inverse ?3572) ?3572))) ?3572))) ?3573 =>= multiply ?3570 (multiply ?3571 ?3573) [3573, 3572, 3571, 3570] by Demod 889 with 11177 at 2
6431 Id : 11554, {_}: multiply (multiply (inverse (inverse (multiply ?11026 ?11027))) (inverse ?11027)) (inverse (multiply (inverse ?11028) ?11028)) =>= ?11026 [11028, 11027, 11026] by Demod 2630 with 11177 at 1,2
6432 Id : 11128, {_}: multiply (inverse (multiply (inverse ?35708) ?35708)) ?35709 =?= multiply (inverse (multiply ?35710 (inverse (multiply (multiply ?35709 (inverse (multiply (inverse ?35711) ?35711))) ?35712)))) (multiply ?35710 (inverse ?35712)) [35712, 35711, 35710, 35709, 35708] by Super 11120 with 2588 at 2,2
6433 Id : 11232, {_}: multiply (inverse (multiply (inverse ?35708) ?35708)) ?35709 =>= ?35709 [35709, 35708] by Demod 11128 with 2588 at 3
6434 Id : 11381, {_}: inverse (multiply (inverse (multiply (inverse ?36500) ?36500)) (inverse (multiply (multiply (inverse ?36501) (inverse (multiply (inverse ?36501) ?36501))) ?36501))) =>= inverse (multiply (inverse (inverse ?36501)) (inverse ?36501)) [36501, 36500] by Super 3267 with 11232 at 1,1,1,2,1,2
6435 Id : 11744, {_}: inverse (inverse (multiply (multiply (inverse ?37264) (inverse (multiply (inverse ?37264) ?37264))) ?37264)) =>= inverse (multiply (inverse (inverse ?37264)) (inverse ?37264)) [37264] by Demod 11381 with 11232 at 1,2
6436 Id : 11749, {_}: inverse (inverse (multiply (multiply (inverse (multiply (inverse ?37280) ?37280)) (inverse (multiply (inverse (multiply (inverse ?37281) ?37281)) (multiply (inverse ?37280) ?37280)))) (multiply (inverse ?37280) ?37280))) =>= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37281, 37280] by Super 11744 with 4624 at 1,1,2,1,1,1,2
6437 Id : 12091, {_}: inverse (inverse (multiply (inverse (multiply (inverse (multiply (inverse ?37281) ?37281)) (multiply (inverse ?37280) ?37280))) (multiply (inverse ?37280) ?37280))) =>= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37280, 37281] by Demod 11749 with 11232 at 1,1,1,2
6438 Id : 12092, {_}: inverse (inverse (multiply (inverse (multiply (inverse ?37280) ?37280)) (multiply (inverse ?37280) ?37280))) =<= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37280] by Demod 12091 with 11232 at 1,1,1,1,2
6439 Id : 12093, {_}: inverse (inverse (multiply (inverse ?37280) ?37280)) =<= inverse (multiply (inverse (inverse (multiply (inverse ?37280) ?37280))) (inverse (multiply (inverse ?37280) ?37280))) [37280] by Demod 12092 with 11177 at 1,1,2
6440 Id : 11551, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (multiply (inverse (inverse (multiply (inverse ?17) ?17))) (inverse (multiply (inverse ?17) ?17)))) =?= multiply (inverse (multiply ?18 (inverse (multiply ?16 ?17)))) (multiply ?18 (inverse ?17)) [18, 17, 16] by Demod 5 with 11177 at 1,2
6441 Id : 11552, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (multiply (inverse (inverse (multiply (inverse ?17) ?17))) (inverse (multiply (inverse ?17) ?17)))) =>= multiply (inverse (inverse (multiply ?16 ?17))) (inverse ?17) [17, 16] by Demod 11551 with 11177 at 3
6442 Id : 11582, {_}: multiply (multiply (inverse (inverse ?36802)) (inverse (inverse (multiply (inverse (multiply ?36803 ?36804)) (multiply ?36803 ?36804))))) (inverse (multiply (inverse (inverse (multiply (inverse (multiply ?36803 ?36804)) (multiply ?36803 ?36804)))) (inverse (multiply (inverse ?36804) ?36804)))) =>= multiply (inverse (inverse (multiply ?36802 (multiply ?36803 ?36804)))) (inverse (multiply ?36803 ?36804)) [36804, 36803, 36802] by Super 11552 with 11177 at 1,2,1,2,2
6443 Id : 11639, {_}: multiply (multiply (inverse (inverse ?36802)) (inverse (inverse (multiply (inverse ?36804) ?36804)))) (inverse (multiply (inverse (inverse (multiply (inverse (multiply ?36803 ?36804)) (multiply ?36803 ?36804)))) (inverse (multiply (inverse ?36804) ?36804)))) =>= multiply (inverse (inverse (multiply ?36802 (multiply ?36803 ?36804)))) (inverse (multiply ?36803 ?36804)) [36803, 36804, 36802] by Demod 11582 with 11177 at 1,1,2,1,2
6444 Id : 11640, {_}: multiply (multiply (inverse (inverse ?36802)) (inverse (inverse (multiply (inverse ?36804) ?36804)))) (inverse (multiply (inverse (inverse (multiply (inverse ?36804) ?36804))) (inverse (multiply (inverse ?36804) ?36804)))) =?= multiply (inverse (inverse (multiply ?36802 (multiply ?36803 ?36804)))) (inverse (multiply ?36803 ?36804)) [36803, 36804, 36802] by Demod 11639 with 11177 at 1,1,1,1,2,2
6445 Id : 12633, {_}: multiply (inverse (inverse (multiply ?38022 ?38023))) (inverse ?38023) =<= multiply (inverse (inverse (multiply ?38022 (multiply ?38024 ?38023)))) (inverse (multiply ?38024 ?38023)) [38024, 38023, 38022] by Demod 11640 with 11552 at 2
6446 Id : 12674, {_}: multiply (inverse (inverse (multiply (inverse (multiply (inverse ?38213) ?38213)) ?38214))) (inverse ?38214) =?= multiply (inverse (inverse (multiply ?38215 ?38214))) (inverse (multiply ?38215 ?38214)) [38215, 38214, 38213] by Super 12633 with 11232 at 1,1,1,3
6447 Id : 12741, {_}: multiply (inverse (inverse ?38214)) (inverse ?38214) =<= multiply (inverse (inverse (multiply ?38215 ?38214))) (inverse (multiply ?38215 ?38214)) [38215, 38214] by Demod 12674 with 11232 at 1,1,1,2
6448 Id : 12768, {_}: multiply (inverse (inverse (multiply (inverse ?38347) ?38347))) (inverse (multiply (inverse ?38348) ?38348)) =>= multiply (inverse (inverse ?38347)) (inverse ?38347) [38348, 38347] by Super 2522 with 12741 at 3
6449 Id : 13687, {_}: inverse (inverse (multiply (inverse ?37280) ?37280)) =<= inverse (multiply (inverse (inverse ?37280)) (inverse ?37280)) [37280] by Demod 12093 with 12768 at 1,3
6450 Id : 13761, {_}: multiply (inverse (inverse (multiply (inverse ?40444) ?40444))) ?40445 =>= ?40445 [40445, 40444] by Super 11232 with 13687 at 1,2
6451 Id : 14411, {_}: multiply (inverse ?41330) (inverse (multiply (inverse ?41331) ?41331)) =>= inverse ?41330 [41331, 41330] by Super 11554 with 13761 at 1,2
6452 Id : 14443, {_}: multiply ?41451 (inverse (multiply (inverse ?41452) ?41452)) =?= inverse (multiply ?41453 (inverse (multiply (multiply (multiply ?41451 (multiply ?41453 (inverse ?41454))) (inverse (multiply (inverse ?41454) ?41454))) ?41454))) [41454, 41453, 41452, 41451] by Super 14411 with 310 at 1,2
6453 Id : 14559, {_}: multiply ?41451 (inverse (multiply (inverse ?41452) ?41452)) =>= ?41451 [41452, 41451] by Demod 14443 with 310 at 3
6454 Id : 15251, {_}: multiply (inverse (inverse (multiply (multiply ?3570 (multiply ?3571 (inverse ?3572))) ?3572))) ?3573 =>= multiply ?3570 (multiply ?3571 ?3573) [3573, 3572, 3571, 3570] by Demod 11545 with 14559 at 1,1,1,1,2
6455 Id : 12748, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (multiply (inverse (inverse ?17)) (inverse ?17))) =>= multiply (inverse (inverse (multiply ?16 ?17))) (inverse ?17) [17, 16] by Demod 11552 with 12741 at 1,2,2
6456 Id : 13691, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (inverse (multiply (inverse ?17) ?17))) =>= multiply (inverse (inverse (multiply ?16 ?17))) (inverse ?17) [17, 16] by Demod 12748 with 13687 at 2,2
6457 Id : 15249, {_}: multiply (inverse (inverse (multiply ?11026 ?11027))) (inverse ?11027) =>= ?11026 [11027, 11026] by Demod 11554 with 14559 at 2
6458 Id : 15257, {_}: multiply (multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17)))) (inverse (inverse (multiply (inverse ?17) ?17))) =>= ?16 [17, 16] by Demod 13691 with 15249 at 3
6459 Id : 15282, {_}: multiply (inverse (multiply ?41944 ?41945)) ?41944 =?= multiply (inverse ?41945) (inverse (multiply (inverse ?41946) ?41946)) [41946, 41945, 41944] by Super 11177 with 14559 at 2,2
6460 Id : 15420, {_}: multiply (inverse (multiply ?42198 ?42199)) ?42198 =>= inverse ?42199 [42199, 42198] by Demod 15282 with 14559 at 3
6461 Id : 11550, {_}: multiply (multiply (inverse ?20) (multiply (multiply (inverse (inverse (multiply ?20 ?22))) (inverse ?22)) (inverse ?22))) (inverse (multiply (inverse ?22) ?22)) =>= inverse ?22 [22, 20] by Demod 6 with 11177 at 1,2,1,2
6462 Id : 15240, {_}: multiply (inverse ?20) (multiply (multiply (inverse (inverse (multiply ?20 ?22))) (inverse ?22)) (inverse ?22)) =>= inverse ?22 [22, 20] by Demod 11550 with 14559 at 2
6463 Id : 15260, {_}: multiply (inverse ?20) (multiply ?20 (inverse ?22)) =>= inverse ?22 [22, 20] by Demod 15240 with 15249 at 1,2,2
6464 Id : 15431, {_}: multiply (inverse (inverse ?42235)) (inverse ?42236) =>= inverse (multiply ?42236 (inverse ?42235)) [42236, 42235] by Super 15420 with 15260 at 1,1,2
6465 Id : 15458, {_}: multiply (inverse (multiply (inverse (multiply (inverse ?17) ?17)) (inverse ?16))) (inverse (inverse (multiply (inverse ?17) ?17))) =>= ?16 [16, 17] by Demod 15257 with 15431 at 1,2
6466 Id : 15463, {_}: multiply (inverse (inverse ?16)) (inverse (inverse (multiply (inverse ?17) ?17))) =>= ?16 [17, 16] by Demod 15458 with 11232 at 1,1,2
6467 Id : 15464, {_}: inverse (multiply (inverse (multiply (inverse ?17) ?17)) (inverse ?16)) =>= ?16 [16, 17] by Demod 15463 with 15431 at 2
6468 Id : 15465, {_}: inverse (inverse ?16) =>= ?16 [16] by Demod 15464 with 11232 at 1,2
6469 Id : 15473, {_}: multiply (multiply (multiply ?3570 (multiply ?3571 (inverse ?3572))) ?3572) ?3573 =>= multiply ?3570 (multiply ?3571 ?3573) [3573, 3572, 3571, 3570] by Demod 15251 with 15465 at 1,2
6470 Id : 15357, {_}: multiply (inverse (multiply ?41944 ?41945)) ?41944 =>= inverse ?41945 [41945, 41944] by Demod 15282 with 14559 at 3
6471 Id : 15476, {_}: multiply ?42235 (inverse ?42236) =<= inverse (multiply ?42236 (inverse ?42235)) [42236, 42235] by Demod 15431 with 15465 at 1,2
6472 Id : 15513, {_}: multiply (multiply ?42367 (inverse ?42368)) ?42368 =>= inverse (inverse ?42367) [42368, 42367] by Super 15357 with 15476 at 1,2
6473 Id : 15781, {_}: multiply (multiply ?42827 (inverse ?42828)) ?42828 =>= ?42827 [42828, 42827] by Demod 15513 with 15465 at 3
6474 Id : 10493, {_}: multiply (inverse (multiply (inverse ?33761) ?33761)) (multiply ?33763 ?33761) =>= multiply ?33763 ?33761 [33763, 33761] by Demod 10492 with 310 at 2,3
6475 Id : 10681, {_}: multiply (inverse (multiply ?34328 ?34329)) (multiply ?34328 ?34329) =>= multiply (inverse ?34329) ?34329 [34329, 34328] by Super 932 with 10493 at 3
6476 Id : 10817, {_}: multiply (multiply (inverse (multiply ?3743 (inverse ?3744))) (multiply ?3743 (inverse (multiply ?3745 (inverse ?3746))))) (inverse (multiply (inverse (inverse ?3746)) (inverse ?3746))) =>= inverse (multiply ?3745 (inverse (multiply (multiply ?3744 (inverse (multiply (inverse ?3746) ?3746))) ?3746))) [3746, 3745, 3744, 3743] by Demod 936 with 10681 at 1,2,2
6477 Id : 11537, {_}: multiply (multiply (inverse (inverse ?3744)) (inverse (multiply ?3745 (inverse ?3746)))) (inverse (multiply (inverse (inverse ?3746)) (inverse ?3746))) =>= inverse (multiply ?3745 (inverse (multiply (multiply ?3744 (inverse (multiply (inverse ?3746) ?3746))) ?3746))) [3746, 3745, 3744] by Demod 10817 with 11177 at 1,2
6478 Id : 13689, {_}: multiply (multiply (inverse (inverse ?3744)) (inverse (multiply ?3745 (inverse ?3746)))) (inverse (inverse (multiply (inverse ?3746) ?3746))) =>= inverse (multiply ?3745 (inverse (multiply (multiply ?3744 (inverse (multiply (inverse ?3746) ?3746))) ?3746))) [3746, 3745, 3744] by Demod 11537 with 13687 at 2,2
6479 Id : 15253, {_}: multiply (multiply (inverse (inverse ?3744)) (inverse (multiply ?3745 (inverse ?3746)))) (inverse (inverse (multiply (inverse ?3746) ?3746))) =>= inverse (multiply ?3745 (inverse (multiply ?3744 ?3746))) [3746, 3745, 3744] by Demod 13689 with 14559 at 1,1,2,1,3
6480 Id : 15461, {_}: multiply (inverse (multiply (multiply ?3745 (inverse ?3746)) (inverse ?3744))) (inverse (inverse (multiply (inverse ?3746) ?3746))) =>= inverse (multiply ?3745 (inverse (multiply ?3744 ?3746))) [3744, 3746, 3745] by Demod 15253 with 15431 at 1,2
6481 Id : 15475, {_}: multiply (inverse (multiply (multiply ?3745 (inverse ?3746)) (inverse ?3744))) (multiply (inverse ?3746) ?3746) =>= inverse (multiply ?3745 (inverse (multiply ?3744 ?3746))) [3744, 3746, 3745] by Demod 15461 with 15465 at 2,2
6482 Id : 15482, {_}: multiply (multiply ?3744 (inverse (multiply ?3745 (inverse ?3746)))) (multiply (inverse ?3746) ?3746) =>= inverse (multiply ?3745 (inverse (multiply ?3744 ?3746))) [3746, 3745, 3744] by Demod 15475 with 15476 at 1,2
6483 Id : 15483, {_}: multiply (multiply ?3744 (inverse (multiply ?3745 (inverse ?3746)))) (multiply (inverse ?3746) ?3746) =>= multiply (multiply ?3744 ?3746) (inverse ?3745) [3746, 3745, 3744] by Demod 15482 with 15476 at 3
6484 Id : 15484, {_}: multiply (multiply ?3744 (multiply ?3746 (inverse ?3745))) (multiply (inverse ?3746) ?3746) =>= multiply (multiply ?3744 ?3746) (inverse ?3745) [3745, 3746, 3744] by Demod 15483 with 15476 at 2,1,2
6485 Id : 10647, {_}: multiply (multiply (inverse (multiply (multiply (inverse (multiply ?10 (inverse (multiply ?11 ?12)))) (multiply ?10 (inverse ?12))) (inverse (multiply ?13 (multiply (inverse ?12) ?12))))) ?11) (inverse (multiply (inverse ?12) ?12)) =>= ?13 [13, 12, 11, 10] by Demod 4 with 10493 at 1,2,2
6486 Id : 11538, {_}: multiply (multiply (inverse (multiply (multiply (inverse (inverse (multiply ?11 ?12))) (inverse ?12)) (inverse (multiply ?13 (multiply (inverse ?12) ?12))))) ?11) (inverse (multiply (inverse ?12) ?12)) =>= ?13 [13, 12, 11] by Demod 10647 with 11177 at 1,1,1,1,2
6487 Id : 15252, {_}: multiply (inverse (multiply (multiply (inverse (inverse (multiply ?11 ?12))) (inverse ?12)) (inverse (multiply ?13 (multiply (inverse ?12) ?12))))) ?11 =>= ?13 [13, 12, 11] by Demod 11538 with 14559 at 2
6488 Id : 15256, {_}: multiply (inverse (multiply ?11 (inverse (multiply ?13 (multiply (inverse ?12) ?12))))) ?11 =>= ?13 [12, 13, 11] by Demod 15252 with 15249 at 1,1,1,2
6489 Id : 15404, {_}: inverse (inverse (multiply ?13 (multiply (inverse ?12) ?12))) =>= ?13 [12, 13] by Demod 15256 with 15357 at 2
6490 Id : 15466, {_}: multiply ?13 (multiply (inverse ?12) ?12) =>= ?13 [12, 13] by Demod 15404 with 15465 at 2
6491 Id : 15487, {_}: multiply ?3744 (multiply ?3746 (inverse ?3745)) =?= multiply (multiply ?3744 ?3746) (inverse ?3745) [3745, 3746, 3744] by Demod 15484 with 15466 at 2
6492 Id : 15796, {_}: multiply (multiply ?42876 (multiply ?42877 (inverse ?42878))) ?42878 =>= multiply ?42876 ?42877 [42878, 42877, 42876] by Super 15781 with 15487 at 1,2
6493 Id : 17134, {_}: multiply (multiply ?3570 ?3571) ?3573 =?= multiply ?3570 (multiply ?3571 ?3573) [3573, 3571, 3570] by Demod 15473 with 15796 at 1,2
6494 Id : 17261, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 1 with 17134 at 2
6495 Id : 1, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
6496 % SZS output end CNFRefutation for GRP411-1.p
6497 8893: solved GRP411-1.p in 9.008562 using nrkbo
6498 !! infer_left 79 0.0001 0.0000 0.0000
6499 !! infer_right 80 42.2627 1.9371 0.5283
6500 !! simplify_goal 80 0.0052 0.0002 0.0001
6501 !! keep_simplified 179 2.3725 0.4327 0.0133
6502 !! simplification_step 244 2.3706 0.4131 0.0097
6503 !! simplify 11241 39.8396 0.4077 0.0035
6504 !! orphan_murder 387 0.0058 0.0004 0.0000
6505 !! is_subsumed 9905 1.5728 0.4002 0.0002
6506 !! build_new_clause 9344 3.2040 0.4012 0.0003
6507 !! demodulate 11151 38.2308 0.4076 0.0034
6508 !! demod 330026 31.7158 0.4043 0.0001
6509 !! demod.apply_subst 243766 5.9414 0.4041 0.0000
6510 !! demod.compare_terms 113340 3.8778 0.4042 0.0000
6511 !! demod.retrieve_generalizations 330026 13.9509 0.4004 0.0000
6512 !! demod.unify 210438 4.4844 0.4002 0.0000
6513 !! build_clause 17898 5.2963 0.4012 0.0003
6514 !! compare_terms(nrkbo) 136240 7.7503 0.4042 0.0001
6515 !! compare_terms(nrkbo) 2 0.0001 0.0000 0.0000
6523 (multiply (inverse ?3)
6525 (multiply ?4 (inverse (multiply (inverse ?4) ?4))))))))
6529 [4, 3, 2] by single_axiom ?2 ?3 ?4
6532 multiply (multiply (inverse b2) b2) a2 =>= a2
6533 [] by prove_these_axioms_2
6534 % SZS status Timeout for GRP419-1.p
6542 (multiply (inverse ?3)
6544 (multiply ?4 (inverse (multiply (inverse ?4) ?4))))))))
6548 [4, 3, 2] by single_axiom ?2 ?3 ?4
6551 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6552 [] by prove_these_axioms_3
6553 % SZS status Timeout for GRP420-1.p
6561 (multiply (inverse ?3)
6562 (multiply (inverse ?4)
6563 (inverse (multiply (inverse ?4) ?4)))))))
6567 [4, 3, 2] by single_axiom ?2 ?3 ?4
6570 multiply (multiply (inverse b2) b2) a2 =>= a2
6571 [] by prove_these_axioms_2
6572 % SZS status Timeout for GRP422-1.p
6580 (multiply (inverse ?3)
6581 (multiply (inverse ?4)
6582 (inverse (multiply (inverse ?4) ?4)))))))
6586 [4, 3, 2] by single_axiom ?2 ?3 ?4
6589 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6590 [] by prove_these_axioms_3
6591 % SZS status Timeout for GRP423-1.p
6598 (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4)))
6599 ?5) (inverse (multiply ?3 ?5))))
6602 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6605 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6606 [] by prove_these_axioms_3
6609 Found proof, 27.796481s
6610 % SZS status Unsatisfiable for GRP429-1.p
6611 % SZS output start CNFRefutation for GRP429-1.p
6612 Id : 3, {_}: multiply ?7 (inverse (multiply (multiply (inverse (multiply (inverse ?8) (multiply (inverse ?7) ?9))) ?10) (inverse (multiply ?8 ?10)))) =>= ?9 [10, 9, 8, 7] by single_axiom ?7 ?8 ?9 ?10
6613 Id : 2, {_}: multiply ?2 (inverse (multiply (multiply (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4))) ?5) (inverse (multiply ?3 ?5)))) =>= ?4 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6614 Id : 5, {_}: multiply ?19 (inverse (multiply (multiply (inverse (multiply (inverse ?20) ?21)) ?22) (inverse (multiply ?20 ?22)))) =?= inverse (multiply (multiply (inverse (multiply (inverse ?23) (multiply (inverse (inverse ?19)) ?21))) ?24) (inverse (multiply ?23 ?24))) [24, 23, 22, 21, 20, 19] by Super 3 with 2 at 2,1,1,1,1,2,2
6615 Id : 28, {_}: multiply (inverse ?215) (multiply ?215 (inverse (multiply (multiply (inverse (multiply (inverse ?216) ?217)) ?218) (inverse (multiply ?216 ?218))))) =>= ?217 [218, 217, 216, 215] by Super 2 with 5 at 2,2
6616 Id : 29, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?220) (multiply (inverse (inverse ?221)) (multiply (inverse ?221) ?222)))) ?223) (inverse (multiply ?220 ?223))) =>= ?222 [223, 222, 221, 220] by Super 2 with 5 at 2
6617 Id : 282, {_}: multiply (inverse ?2263) (multiply ?2263 ?2264) =?= multiply (inverse (inverse ?2265)) (multiply (inverse ?2265) ?2264) [2265, 2264, 2263] by Super 28 with 29 at 2,2,2
6618 Id : 134, {_}: multiply (inverse ?1132) (multiply ?1132 ?1133) =?= multiply (inverse (inverse ?1134)) (multiply (inverse ?1134) ?1133) [1134, 1133, 1132] by Super 28 with 29 at 2,2,2
6619 Id : 296, {_}: multiply (inverse ?2354) (multiply ?2354 ?2355) =?= multiply (inverse ?2356) (multiply ?2356 ?2355) [2356, 2355, 2354] by Super 282 with 134 at 3
6620 Id : 344, {_}: multiply (inverse ?2537) (multiply ?2537 (inverse (multiply (multiply (inverse (multiply (inverse ?2538) (multiply ?2538 ?2539))) ?2540) (inverse (multiply ?2541 ?2540))))) =>= multiply ?2541 ?2539 [2541, 2540, 2539, 2538, 2537] by Super 28 with 296 at 1,1,1,1,2,2,2
6621 Id : 346, {_}: multiply (inverse ?2549) (multiply ?2549 (inverse (multiply (multiply (inverse ?2550) (multiply ?2550 ?2551)) (inverse (multiply ?2552 (multiply (multiply (inverse ?2552) ?2553) ?2551)))))) =>= ?2553 [2553, 2552, 2551, 2550, 2549] by Super 28 with 296 at 1,1,2,2,2
6622 Id : 368, {_}: multiply ?2697 (inverse (multiply (multiply (inverse ?2698) (multiply ?2698 ?2699)) (inverse (multiply ?2700 (multiply (multiply (inverse ?2700) (multiply (inverse ?2697) ?2701)) ?2699))))) =>= ?2701 [2701, 2700, 2699, 2698, 2697] by Super 2 with 296 at 1,1,2,2
6623 Id : 662, {_}: multiply ?5104 (inverse (multiply (multiply (inverse (multiply (inverse ?5105) (multiply ?5105 ?5106))) ?5107) (inverse (multiply (inverse ?5104) ?5107)))) =>= ?5106 [5107, 5106, 5105, 5104] by Super 2 with 296 at 1,1,1,1,2,2
6624 Id : 3909, {_}: multiply ?31947 (inverse (multiply (multiply (inverse (multiply (inverse ?31948) (multiply ?31948 ?31949))) (multiply ?31947 ?31950)) (inverse (multiply (inverse ?31951) (multiply ?31951 ?31950))))) =>= ?31949 [31951, 31950, 31949, 31948, 31947] by Super 662 with 296 at 1,2,1,2,2
6625 Id : 4008, {_}: multiply (multiply (inverse ?32831) (multiply ?32831 ?32832)) (inverse (multiply ?32833 (inverse (multiply (inverse ?32834) (multiply ?32834 (inverse (multiply (multiply (inverse (multiply (inverse ?32835) ?32833)) ?32836) (inverse (multiply ?32835 ?32836))))))))) =>= ?32832 [32836, 32835, 32834, 32833, 32832, 32831] by Super 3909 with 28 at 1,1,2,2
6626 Id : 4051, {_}: multiply (multiply (inverse ?32831) (multiply ?32831 ?32832)) (inverse (multiply ?32833 (inverse ?32833))) =>= ?32832 [32833, 32832, 32831] by Demod 4008 with 28 at 1,2,1,2,2
6627 Id : 4057, {_}: multiply ?32935 (inverse (multiply (multiply (inverse ?32936) (multiply ?32936 (inverse (multiply ?32937 (inverse ?32937))))) (inverse (multiply (inverse ?32935) ?32938)))) =>= ?32938 [32938, 32937, 32936, 32935] by Super 368 with 4051 at 2,1,2,1,2,2
6628 Id : 7979, {_}: multiply (inverse ?61641) (multiply (multiply (inverse (inverse ?61641)) ?61642) (inverse (multiply ?61643 (inverse ?61643)))) =>= ?61642 [61643, 61642, 61641] by Super 346 with 4057 at 2,2
6629 Id : 4387, {_}: multiply ?35216 (inverse (multiply (multiply (inverse ?35217) (multiply ?35217 (inverse (multiply ?35218 (inverse ?35218))))) (inverse (multiply (inverse ?35216) ?35219)))) =>= ?35219 [35219, 35218, 35217, 35216] by Super 368 with 4051 at 2,1,2,1,2,2
6630 Id : 4442, {_}: multiply ?35663 (inverse (inverse (multiply ?35664 (inverse ?35664)))) =>= inverse (inverse ?35663) [35664, 35663] by Super 4387 with 4051 at 1,2,2
6631 Id : 4524, {_}: multiply (inverse ?36035) (multiply ?36035 (inverse (inverse (multiply ?36036 (inverse ?36036))))) =?= multiply (inverse ?36037) (inverse (inverse ?36037)) [36037, 36036, 36035] by Super 296 with 4442 at 2,3
6632 Id : 5437, {_}: multiply (inverse ?42822) (inverse (inverse ?42822)) =?= multiply (inverse ?42823) (inverse (inverse ?42823)) [42823, 42822] by Demod 4524 with 4442 at 2,2
6633 Id : 136, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1144) (multiply (inverse (inverse ?1145)) (multiply (inverse ?1145) ?1146)))) ?1147) (inverse (multiply ?1144 ?1147))) =>= ?1146 [1147, 1146, 1145, 1144] by Super 2 with 5 at 2
6634 Id : 143, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1197) (multiply (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?1198) (multiply (inverse (inverse ?1199)) (multiply (inverse ?1199) ?1200)))) ?1201) (inverse (multiply ?1198 ?1201))))) (multiply ?1200 ?1202)))) ?1203) (inverse (multiply ?1197 ?1203))) =>= ?1202 [1203, 1202, 1201, 1200, 1199, 1198, 1197] by Super 136 with 29 at 1,2,2,1,1,1,1,2
6635 Id : 165, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1197) (multiply (inverse ?1200) (multiply ?1200 ?1202)))) ?1203) (inverse (multiply ?1197 ?1203))) =>= ?1202 [1203, 1202, 1200, 1197] by Demod 143 with 29 at 1,1,2,1,1,1,1,2
6636 Id : 5438, {_}: multiply (inverse ?42825) (inverse (inverse ?42825)) =?= multiply (inverse (multiply (multiply (inverse (multiply (inverse ?42826) (multiply (inverse ?42827) (multiply ?42827 ?42828)))) ?42829) (inverse (multiply ?42826 ?42829)))) (inverse ?42828) [42829, 42828, 42827, 42826, 42825] by Super 5437 with 165 at 1,2,3
6637 Id : 5708, {_}: multiply (inverse ?44413) (inverse (inverse ?44413)) =?= multiply ?44414 (inverse ?44414) [44414, 44413] by Demod 5438 with 165 at 1,3
6638 Id : 5484, {_}: multiply (inverse ?42825) (inverse (inverse ?42825)) =?= multiply ?42828 (inverse ?42828) [42828, 42825] by Demod 5438 with 165 at 1,3
6639 Id : 5735, {_}: multiply ?44582 (inverse ?44582) =?= multiply ?44583 (inverse ?44583) [44583, 44582] by Super 5708 with 5484 at 2
6640 Id : 8238, {_}: multiply (inverse ?63214) (multiply ?63215 (inverse ?63215)) =>= inverse (inverse (inverse ?63214)) [63215, 63214] by Super 7979 with 5735 at 2,2
6641 Id : 8269, {_}: multiply (inverse ?63378) (multiply ?63378 (inverse ?63379)) =>= inverse (inverse (inverse ?63379)) [63379, 63378] by Super 8238 with 296 at 2
6642 Id : 8601, {_}: inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?2538) (multiply ?2538 ?2539))) ?2540) (inverse (multiply ?2541 ?2540))))) =>= multiply ?2541 ?2539 [2541, 2540, 2539, 2538] by Demod 344 with 8269 at 2
6643 Id : 8750, {_}: multiply (inverse ?65557) (multiply ?65557 (inverse ?65558)) =>= inverse (inverse (inverse ?65558)) [65558, 65557] by Super 8238 with 296 at 2
6644 Id : 8602, {_}: inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?216) ?217)) ?218) (inverse (multiply ?216 ?218))))) =>= ?217 [218, 217, 216] by Demod 28 with 8269 at 2
6645 Id : 8758, {_}: multiply (inverse ?65597) (multiply ?65597 ?65598) =?= inverse (inverse (inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?65599) ?65598)) ?65600) (inverse (multiply ?65599 ?65600))))))) [65600, 65599, 65598, 65597] by Super 8750 with 8602 at 2,2,2
6646 Id : 8828, {_}: multiply (inverse ?65597) (multiply ?65597 ?65598) =>= inverse (inverse ?65598) [65598, 65597] by Demod 8758 with 8602 at 1,1,3
6647 Id : 8847, {_}: inverse (inverse (inverse (multiply (multiply (inverse (inverse (inverse ?2539))) ?2540) (inverse (multiply ?2541 ?2540))))) =>= multiply ?2541 ?2539 [2541, 2540, 2539] by Demod 8601 with 8828 at 1,1,1,1,1,1,2
6648 Id : 8604, {_}: multiply ?32935 (inverse (multiply (inverse (inverse (inverse (multiply ?32937 (inverse ?32937))))) (inverse (multiply (inverse ?32935) ?32938)))) =>= ?32938 [32938, 32937, 32935] by Demod 4057 with 8269 at 1,1,2,2
6649 Id : 8966, {_}: multiply ?66589 (inverse (multiply (inverse (inverse (inverse (multiply ?66590 (inverse ?66590))))) (inverse (inverse (inverse ?66591))))) =>= multiply ?66589 ?66591 [66591, 66590, 66589] by Super 8604 with 8828 at 1,2,1,2,2
6650 Id : 91, {_}: multiply (inverse ?814) (multiply ?814 (inverse (multiply (multiply (inverse (multiply (inverse ?815) ?816)) ?817) (inverse (multiply ?815 ?817))))) =>= ?816 [817, 816, 815, 814] by Super 2 with 5 at 2,2
6651 Id : 759, {_}: multiply (inverse ?5818) (multiply ?5818 (multiply ?5819 (inverse (multiply (multiply (inverse (multiply (inverse ?5820) ?5821)) ?5822) (inverse (multiply ?5820 ?5822)))))) =>= multiply (inverse (inverse ?5819)) ?5821 [5822, 5821, 5820, 5819, 5818] by Super 91 with 5 at 2,2,2
6652 Id : 795, {_}: multiply (inverse ?6138) (multiply ?6138 (multiply ?6139 ?6140)) =?= multiply (inverse (inverse ?6139)) (multiply (inverse ?6141) (multiply ?6141 ?6140)) [6141, 6140, 6139, 6138] by Super 759 with 165 at 2,2,2,2
6653 Id : 8860, {_}: inverse (inverse (multiply ?6139 ?6140)) =<= multiply (inverse (inverse ?6139)) (multiply (inverse ?6141) (multiply ?6141 ?6140)) [6141, 6140, 6139] by Demod 795 with 8828 at 2
6654 Id : 8861, {_}: inverse (inverse (multiply ?6139 ?6140)) =<= multiply (inverse (inverse ?6139)) (inverse (inverse ?6140)) [6140, 6139] by Demod 8860 with 8828 at 2,3
6655 Id : 9170, {_}: multiply ?67690 (inverse (inverse (inverse (multiply (inverse (multiply ?67691 (inverse ?67691))) (inverse ?67692))))) =>= multiply ?67690 ?67692 [67692, 67691, 67690] by Demod 8966 with 8861 at 1,2,2
6656 Id : 5733, {_}: inverse (inverse (inverse (multiply ?44576 (inverse ?44576)))) =?= multiply ?44577 (inverse ?44577) [44577, 44576] by Super 5708 with 4442 at 2
6657 Id : 9232, {_}: multiply ?68073 (multiply ?68074 (inverse ?68074)) =?= multiply ?68073 (inverse (multiply ?68075 (inverse ?68075))) [68075, 68074, 68073] by Super 9170 with 5733 at 2,2
6658 Id : 4096, {_}: multiply (multiply (inverse ?33196) (multiply ?33196 ?33197)) (inverse (multiply ?33198 (inverse ?33198))) =>= ?33197 [33198, 33197, 33196] by Demod 4008 with 28 at 1,2,1,2,2
6659 Id : 4115, {_}: multiply (multiply (inverse (inverse ?33353)) (multiply (inverse ?33354) (multiply ?33354 ?33355))) (inverse (multiply ?33356 (inverse ?33356))) =>= multiply ?33353 ?33355 [33356, 33355, 33354, 33353] by Super 4096 with 296 at 2,1,2
6660 Id : 8052, {_}: multiply (inverse ?62093) (multiply ?62094 (inverse ?62094)) =>= inverse (inverse (inverse ?62093)) [62094, 62093] by Super 7979 with 5735 at 2,2
6661 Id : 8086, {_}: multiply (multiply (inverse (inverse ?62180)) (multiply (inverse (inverse ?62181)) (inverse (inverse (inverse ?62181))))) (inverse (multiply ?62182 (inverse ?62182))) =?= multiply ?62180 (multiply ?62183 (inverse ?62183)) [62183, 62182, 62181, 62180] by Super 4115 with 8052 at 2,2,1,2
6662 Id : 7363, {_}: multiply (multiply (inverse ?57709) (multiply ?57710 (inverse ?57710))) (inverse (multiply ?57711 (inverse ?57711))) =>= inverse ?57709 [57711, 57710, 57709] by Super 4051 with 5735 at 2,1,2
6663 Id : 7398, {_}: multiply (multiply ?57925 (multiply ?57926 (inverse ?57926))) (inverse (multiply ?57927 (inverse ?57927))) =?= inverse (multiply (multiply (inverse (multiply (inverse ?57928) (multiply (inverse ?57929) (multiply ?57929 ?57925)))) ?57930) (inverse (multiply ?57928 ?57930))) [57930, 57929, 57928, 57927, 57926, 57925] by Super 7363 with 165 at 1,1,2
6664 Id : 7426, {_}: multiply (multiply ?57925 (multiply ?57926 (inverse ?57926))) (inverse (multiply ?57927 (inverse ?57927))) =>= ?57925 [57927, 57926, 57925] by Demod 7398 with 165 at 3
6665 Id : 8315, {_}: inverse (inverse ?62180) =<= multiply ?62180 (multiply ?62183 (inverse ?62183)) [62183, 62180] by Demod 8086 with 7426 at 2
6666 Id : 9361, {_}: inverse (inverse ?68073) =<= multiply ?68073 (inverse (multiply ?68075 (inverse ?68075))) [68075, 68073] by Demod 9232 with 8315 at 2
6667 Id : 9874, {_}: inverse (inverse (inverse (multiply (multiply (inverse (inverse (inverse ?72732))) (inverse (multiply ?72733 (inverse ?72733)))) (inverse (inverse (inverse ?72734)))))) =>= multiply ?72734 ?72732 [72734, 72733, 72732] by Super 8847 with 9361 at 1,2,1,1,1,2
6668 Id : 9927, {_}: inverse (inverse (inverse (multiply (inverse (inverse (inverse (inverse (inverse ?72732))))) (inverse (inverse (inverse ?72734)))))) =>= multiply ?72734 ?72732 [72734, 72732] by Demod 9874 with 9361 at 1,1,1,1,2
6669 Id : 9928, {_}: inverse (inverse (inverse (inverse (inverse (multiply (inverse (inverse (inverse ?72732))) (inverse ?72734)))))) =>= multiply ?72734 ?72732 [72734, 72732] by Demod 9927 with 8861 at 1,1,1,2
6670 Id : 8327, {_}: multiply (inverse (inverse ?57925)) (inverse (multiply ?57927 (inverse ?57927))) =>= ?57925 [57927, 57925] by Demod 7426 with 8315 at 1,2
6671 Id : 9747, {_}: inverse (inverse (inverse (inverse ?57925))) =>= ?57925 [57925] by Demod 8327 with 9361 at 2
6672 Id : 10306, {_}: inverse (multiply (inverse (inverse (inverse ?74050))) (inverse ?74051)) =>= multiply ?74051 ?74050 [74051, 74050] by Demod 9928 with 9747 at 2
6673 Id : 10351, {_}: inverse (multiply ?74270 (inverse ?74271)) =>= multiply ?74271 (inverse ?74270) [74271, 74270] by Super 10306 with 9747 at 1,1,2
6674 Id : 10538, {_}: inverse (inverse (multiply (multiply ?2541 ?2540) (inverse (multiply (inverse (inverse (inverse ?2539))) ?2540)))) =>= multiply ?2541 ?2539 [2539, 2540, 2541] by Demod 8847 with 10351 at 1,1,2
6675 Id : 10539, {_}: inverse (multiply (multiply (inverse (inverse (inverse ?2539))) ?2540) (inverse (multiply ?2541 ?2540))) =>= multiply ?2541 ?2539 [2541, 2540, 2539] by Demod 10538 with 10351 at 1,2
6676 Id : 10540, {_}: multiply (multiply ?2541 ?2540) (inverse (multiply (inverse (inverse (inverse ?2539))) ?2540)) =>= multiply ?2541 ?2539 [2539, 2540, 2541] by Demod 10539 with 10351 at 2
6677 Id : 10517, {_}: multiply ?2 (multiply (multiply ?3 ?5) (inverse (multiply (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4))) ?5))) =>= ?4 [4, 5, 3, 2] by Demod 2 with 10351 at 2,2
6678 Id : 107, {_}: multiply (inverse ?942) (multiply ?942 (multiply ?943 (inverse (multiply (multiply (inverse (multiply (inverse ?944) ?945)) ?946) (inverse (multiply ?944 ?946)))))) =>= multiply (inverse (inverse ?943)) ?945 [946, 945, 944, 943, 942] by Super 91 with 5 at 2,2,2
6679 Id : 8859, {_}: inverse (inverse (multiply ?943 (inverse (multiply (multiply (inverse (multiply (inverse ?944) ?945)) ?946) (inverse (multiply ?944 ?946)))))) =>= multiply (inverse (inverse ?943)) ?945 [946, 945, 944, 943] by Demod 107 with 8828 at 2
6680 Id : 10533, {_}: inverse (multiply (multiply (multiply (inverse (multiply (inverse ?944) ?945)) ?946) (inverse (multiply ?944 ?946))) (inverse ?943)) =>= multiply (inverse (inverse ?943)) ?945 [943, 946, 945, 944] by Demod 8859 with 10351 at 1,2
6681 Id : 10534, {_}: multiply ?943 (inverse (multiply (multiply (inverse (multiply (inverse ?944) ?945)) ?946) (inverse (multiply ?944 ?946)))) =>= multiply (inverse (inverse ?943)) ?945 [946, 945, 944, 943] by Demod 10533 with 10351 at 2
6682 Id : 10535, {_}: multiply ?943 (multiply (multiply ?944 ?946) (inverse (multiply (inverse (multiply (inverse ?944) ?945)) ?946))) =>= multiply (inverse (inverse ?943)) ?945 [945, 946, 944, 943] by Demod 10534 with 10351 at 2,2
6683 Id : 10553, {_}: multiply (inverse (inverse ?2)) (multiply (inverse ?2) ?4) =>= ?4 [4, 2] by Demod 10517 with 10535 at 2
6684 Id : 10554, {_}: inverse (inverse ?4) =>= ?4 [4] by Demod 10553 with 8828 at 2
6685 Id : 10571, {_}: multiply (multiply ?2541 ?2540) (inverse (multiply (inverse ?2539) ?2540)) =>= multiply ?2541 ?2539 [2539, 2540, 2541] by Demod 10540 with 10554 at 1,1,2,2
6686 Id : 10622, {_}: multiply (multiply ?74438 (inverse ?74439)) (multiply ?74439 (inverse (inverse ?74440))) =>= multiply ?74438 ?74440 [74440, 74439, 74438] by Super 10571 with 10351 at 2,2
6687 Id : 10693, {_}: multiply (multiply ?74792 (inverse ?74793)) (multiply ?74793 ?74794) =>= multiply ?74792 ?74794 [74794, 74793, 74792] by Demod 10622 with 10554 at 2,2,2
6688 Id : 10568, {_}: multiply (inverse ?65597) (multiply ?65597 ?65598) =>= ?65598 [65598, 65597] by Demod 8828 with 10554 at 3
6689 Id : 10698, {_}: multiply (multiply ?74822 (inverse (inverse ?74823))) ?74824 =>= multiply ?74822 (multiply ?74823 ?74824) [74824, 74823, 74822] by Super 10693 with 10568 at 2,2
6690 Id : 10735, {_}: multiply (multiply ?74822 ?74823) ?74824 =>= multiply ?74822 (multiply ?74823 ?74824) [74824, 74823, 74822] by Demod 10698 with 10554 at 2,1,2
6691 Id : 10883, {_}: multiply a3 (multiply b3 c3) =?= multiply a3 (multiply b3 c3) [] by Demod 1 with 10735 at 2
6692 Id : 1, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
6693 % SZS output end CNFRefutation for GRP429-1.p
6694 9070: solved GRP429-1.p in 6.944433 using kbo
6695 !! infer_left 53 0.0001 0.0000 0.0000
6696 !! infer_right 54 25.4203 3.1670 0.4707
6697 !! simplify_goal 54 0.0035 0.0002 0.0001
6698 !! keep_simplified 137 1.6233 0.3767 0.0118
6699 !! simplification_step 215 1.6214 0.3073 0.0075
6700 !! simplify 10995 21.9471 0.3100 0.0020
6701 !! orphan_murder 277 0.0041 0.0005 0.0000
6702 !! is_subsumed 10227 2.1797 0.3014 0.0002
6703 !! build_new_clause 8953 3.2559 0.3047 0.0004
6704 !! demodulate 10906 19.7353 0.3099 0.0018
6705 !! demod 283463 18.3631 0.3082 0.0001
6706 !! demod.apply_subst 96952 1.5054 0.3002 0.0000
6707 !! demod.compare_terms 46289 1.3479 0.3003 0.0000
6708 !! demod.retrieve_generalizations 283463 8.9253 0.3024 0.0000
6709 !! demod.unify 174180 4.3544 0.3081 0.0000
6710 !! build_clause 11140 2.1402 0.3047 0.0002
6711 !! compare_terms(kbo) 62718 2.2007 0.3003 0.0000
6712 !! compare_terms(nrkbo) 2 0.0001 0.0000 0.0000
6718 (multiply (multiply ?4 (inverse ?4))
6719 (inverse (multiply ?5 (multiply ?2 ?3))))))
6722 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6725 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6726 [] by prove_these_axioms_3
6727 % SZS status Timeout for GRP444-1.p
6731 (divide (divide ?2 ?2)
6732 (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4))))
6736 [4, 3, 2] by single_axiom ?2 ?3 ?4
6738 multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7)
6739 [8, 7, 6] by multiply ?6 ?7 ?8
6741 inverse ?10 =<= divide (divide ?11 ?11) ?10
6742 [11, 10] by inverse ?10 ?11
6745 multiply (multiply (inverse b2) b2) a2 =>= a2
6746 [] by prove_these_axioms_2
6749 Found proof, 0.251580s
6750 % SZS status Unsatisfiable for GRP452-1.p
6751 % SZS output start CNFRefutation for GRP452-1.p
6752 Id : 5, {_}: divide (divide (divide ?13 ?13) (divide ?13 (divide ?14 (divide (divide (divide ?13 ?13) ?13) ?15)))) ?15 =>= ?14 [15, 14, 13] by single_axiom ?13 ?14 ?15
6753 Id : 35, {_}: inverse ?90 =<= divide (divide ?91 ?91) ?90 [91, 90] by inverse ?90 ?91
6754 Id : 2, {_}: divide (divide (divide ?2 ?2) (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
6755 Id : 4, {_}: inverse ?10 =<= divide (divide ?11 ?11) ?10 [11, 10] by inverse ?10 ?11
6756 Id : 3, {_}: multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7) [8, 7, 6] by multiply ?6 ?7 ?8
6757 Id : 29, {_}: multiply ?6 ?7 =<= divide ?6 (inverse ?7) [7, 6] by Demod 3 with 4 at 2,3
6758 Id : 41, {_}: multiply (divide ?104 ?104) ?105 =>= inverse (inverse ?105) [105, 104] by Super 29 with 4 at 3
6759 Id : 43, {_}: multiply (multiply (inverse ?110) ?110) ?111 =>= inverse (inverse ?111) [111, 110] by Super 41 with 29 at 1,2
6760 Id : 13, {_}: divide (multiply (divide (divide ?48 ?48) (divide ?48 ?48)) (divide ?49 (divide (divide (divide (divide ?48 ?48) (divide ?48 ?48)) (divide ?48 ?48)) ?50))) ?50 =>= ?49 [50, 49, 48] by Super 2 with 3 at 1,2
6761 Id : 32, {_}: multiply (divide ?79 ?79) ?80 =>= inverse (inverse ?80) [80, 79] by Super 29 with 4 at 3
6762 Id : 218, {_}: divide (inverse (inverse (divide ?49 (divide (divide (divide (divide ?48 ?48) (divide ?48 ?48)) (divide ?48 ?48)) ?50)))) ?50 =>= ?49 [50, 48, 49] by Demod 13 with 32 at 1,2
6763 Id : 219, {_}: divide (inverse (inverse (divide ?49 (divide (inverse (divide ?48 ?48)) ?50)))) ?50 =>= ?49 [50, 48, 49] by Demod 218 with 4 at 1,2,1,1,1,2
6764 Id : 36, {_}: inverse ?93 =<= divide (inverse (divide ?94 ?94)) ?93 [94, 93] by Super 35 with 4 at 1,3
6765 Id : 220, {_}: divide (inverse (inverse (divide ?49 (inverse ?50)))) ?50 =>= ?49 [50, 49] by Demod 219 with 36 at 2,1,1,1,2
6766 Id : 221, {_}: divide (inverse (inverse (multiply ?49 ?50))) ?50 =>= ?49 [50, 49] by Demod 220 with 29 at 1,1,1,2
6767 Id : 6, {_}: divide (divide (divide ?17 ?17) (divide ?17 ?18)) ?19 =<= divide (divide ?20 ?20) (divide ?20 (divide ?18 (divide (divide (divide ?20 ?20) ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Super 5 with 2 at 2,2,1,2
6768 Id : 61, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= divide (divide ?20 ?20) (divide ?20 (divide ?18 (divide (divide (divide ?20 ?20) ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Demod 6 with 4 at 1,2
6769 Id : 62, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= inverse (divide ?20 (divide ?18 (divide (divide (divide ?20 ?20) ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Demod 61 with 4 at 3
6770 Id : 63, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= inverse (divide ?20 (divide ?18 (divide (inverse ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Demod 62 with 4 at 1,2,2,1,3
6771 Id : 64, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= inverse (divide ?20 (divide ?18 (divide (inverse ?20) (divide (inverse ?17) ?19)))) [20, 19, 18, 17] by Demod 63 with 4 at 1,2,2,2,1,3
6772 Id : 11, {_}: divide (divide (divide ?39 ?39) (multiply ?39 (divide (divide (divide ?39 ?39) ?39) ?40))) ?40 =?= divide ?41 ?41 [41, 40, 39] by Super 2 with 3 at 2,1,2
6773 Id : 114, {_}: divide (inverse (multiply ?39 (divide (divide (divide ?39 ?39) ?39) ?40))) ?40 =?= divide ?41 ?41 [41, 40, 39] by Demod 11 with 4 at 1,2
6774 Id : 134, {_}: divide (inverse (multiply ?398 (divide (inverse ?398) ?399))) ?399 =?= divide ?400 ?400 [400, 399, 398] by Demod 114 with 4 at 1,2,1,1,2
6775 Id : 115, {_}: divide (inverse (multiply ?39 (divide (inverse ?39) ?40))) ?40 =?= divide ?41 ?41 [41, 40, 39] by Demod 114 with 4 at 1,2,1,1,2
6776 Id : 148, {_}: divide ?461 ?461 =?= divide ?462 ?462 [462, 461] by Super 134 with 115 at 2
6777 Id : 305, {_}: divide (inverse (divide ?827 (divide (inverse ?828) (divide (inverse ?827) ?829)))) ?829 =?= inverse (divide ?828 (divide ?830 ?830)) [830, 829, 828, 827] by Super 64 with 148 at 2,1,3
6778 Id : 30, {_}: divide (inverse (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 2 with 4 at 1,2
6779 Id : 31, {_}: divide (inverse (divide ?2 (divide ?3 (divide (inverse ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 30 with 4 at 1,2,2,1,1,2
6780 Id : 382, {_}: inverse ?1021 =<= inverse (divide ?1021 (divide ?1022 ?1022)) [1022, 1021] by Demod 305 with 31 at 2
6781 Id : 384, {_}: inverse ?1027 =<= inverse (divide ?1027 (inverse (divide ?1028 ?1028))) [1028, 1027] by Super 382 with 4 at 2,1,3
6782 Id : 413, {_}: inverse ?1027 =<= inverse (multiply ?1027 (divide ?1028 ?1028)) [1028, 1027] by Demod 384 with 29 at 1,3
6783 Id : 499, {_}: divide (inverse (inverse ?1247)) (divide ?1248 ?1248) =>= ?1247 [1248, 1247] by Super 221 with 413 at 1,1,2
6784 Id : 358, {_}: inverse ?828 =<= inverse (divide ?828 (divide ?830 ?830)) [830, 828] by Demod 305 with 31 at 2
6785 Id : 659, {_}: inverse (inverse (inverse ?1711)) =>= inverse ?1711 [1711] by Super 358 with 499 at 1,3
6786 Id : 781, {_}: divide (inverse (inverse ?1935)) (divide ?1936 ?1936) =>= inverse (inverse ?1935) [1936, 1935] by Super 499 with 659 at 1,1,2
6787 Id : 807, {_}: ?1935 =<= inverse (inverse ?1935) [1935] by Demod 781 with 499 at 2
6788 Id : 825, {_}: multiply (multiply (inverse ?110) ?110) ?111 =>= ?111 [111, 110] by Demod 43 with 807 at 3
6789 Id : 857, {_}: a2 === a2 [] by Demod 1 with 825 at 2
6790 Id : 1, {_}: multiply (multiply (inverse b2) b2) a2 =>= a2 [] by prove_these_axioms_2
6791 % SZS output end CNFRefutation for GRP452-1.p
6792 9133: solved GRP452-1.p in 0.136007 using nrkbo
6793 !! infer_left 41 0.0000 0.0000 0.0000
6794 !! infer_right 26 0.2127 0.1331 0.0082
6795 !! simplify_goal 41 0.0018 0.0001 0.0000
6796 !! keep_simplified 54 0.0331 0.0073 0.0006
6797 !! simplification_step 69 0.0329 0.0014 0.0005
6798 !! simplify 1088 0.2152 0.1245 0.0002
6799 !! orphan_murder 54 0.0003 0.0000 0.0000
6800 !! is_subsumed 984 0.0089 0.0003 0.0000
6801 !! build_new_clause 548 0.0138 0.0006 0.0000
6802 !! demodulate 1100 0.2048 0.1245 0.0002
6803 !! demod 6957 0.1889 0.1243 0.0000
6804 !! demod.apply_subst 2382 0.0039 0.0002 0.0000
6805 !! demod.compare_terms 903 0.0055 0.0002 0.0000
6806 !! demod.retrieve_generalizations 6957 0.0298 0.0005 0.0000
6807 !! demod.unify 3336 0.1333 0.1242 0.0000
6808 !! build_clause 836 0.0126 0.0006 0.0000
6809 !! compare_terms(nrkbo) 1899 0.0113 0.0006 0.0000
6810 !! compare_terms(nrkbo) 4 0.0001 0.0000 0.0000
6814 (divide (divide ?2 ?2)
6815 (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4))))
6819 [4, 3, 2] by single_axiom ?2 ?3 ?4
6821 multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7)
6822 [8, 7, 6] by multiply ?6 ?7 ?8
6824 inverse ?10 =<= divide (divide ?11 ?11) ?10
6825 [11, 10] by inverse ?10 ?11
6828 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6829 [] by prove_these_axioms_3
6832 Found proof, 1.272296s
6833 % SZS status Unsatisfiable for GRP453-1.p
6834 % SZS output start CNFRefutation for GRP453-1.p
6835 Id : 5, {_}: divide (divide (divide ?13 ?13) (divide ?13 (divide ?14 (divide (divide (divide ?13 ?13) ?13) ?15)))) ?15 =>= ?14 [15, 14, 13] by single_axiom ?13 ?14 ?15
6836 Id : 35, {_}: inverse ?90 =<= divide (divide ?91 ?91) ?90 [91, 90] by inverse ?90 ?91
6837 Id : 2, {_}: divide (divide (divide ?2 ?2) (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
6838 Id : 4, {_}: inverse ?10 =<= divide (divide ?11 ?11) ?10 [11, 10] by inverse ?10 ?11
6839 Id : 3, {_}: multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7) [8, 7, 6] by multiply ?6 ?7 ?8
6840 Id : 29, {_}: multiply ?6 ?7 =<= divide ?6 (inverse ?7) [7, 6] by Demod 3 with 4 at 2,3
6841 Id : 10, {_}: divide (divide (divide ?34 ?34) (divide ?34 (divide ?35 (multiply (divide (divide ?34 ?34) ?34) ?36)))) (divide (divide ?37 ?37) ?36) =>= ?35 [37, 36, 35, 34] by Super 2 with 3 at 2,2,2,1,2
6842 Id : 24, {_}: multiply (divide (divide ?34 ?34) (divide ?34 (divide ?35 (multiply (divide (divide ?34 ?34) ?34) ?36)))) ?36 =>= ?35 [36, 35, 34] by Demod 10 with 3 at 2
6843 Id : 431, {_}: multiply (inverse (divide ?34 (divide ?35 (multiply (divide (divide ?34 ?34) ?34) ?36)))) ?36 =>= ?35 [36, 35, 34] by Demod 24 with 4 at 1,2
6844 Id : 432, {_}: multiply (inverse (divide ?34 (divide ?35 (multiply (inverse ?34) ?36)))) ?36 =>= ?35 [36, 35, 34] by Demod 431 with 4 at 1,2,2,1,1,2
6845 Id : 13, {_}: divide (multiply (divide (divide ?48 ?48) (divide ?48 ?48)) (divide ?49 (divide (divide (divide (divide ?48 ?48) (divide ?48 ?48)) (divide ?48 ?48)) ?50))) ?50 =>= ?49 [50, 49, 48] by Super 2 with 3 at 1,2
6846 Id : 32, {_}: multiply (divide ?79 ?79) ?80 =>= inverse (inverse ?80) [80, 79] by Super 29 with 4 at 3
6847 Id : 215, {_}: divide (inverse (inverse (divide ?49 (divide (divide (divide (divide ?48 ?48) (divide ?48 ?48)) (divide ?48 ?48)) ?50)))) ?50 =>= ?49 [50, 48, 49] by Demod 13 with 32 at 1,2
6848 Id : 216, {_}: divide (inverse (inverse (divide ?49 (divide (inverse (divide ?48 ?48)) ?50)))) ?50 =>= ?49 [50, 48, 49] by Demod 215 with 4 at 1,2,1,1,1,2
6849 Id : 36, {_}: inverse ?93 =<= divide (inverse (divide ?94 ?94)) ?93 [94, 93] by Super 35 with 4 at 1,3
6850 Id : 217, {_}: divide (inverse (inverse (divide ?49 (inverse ?50)))) ?50 =>= ?49 [50, 49] by Demod 216 with 36 at 2,1,1,1,2
6851 Id : 218, {_}: divide (inverse (inverse (multiply ?49 ?50))) ?50 =>= ?49 [50, 49] by Demod 217 with 29 at 1,1,1,2
6852 Id : 6, {_}: divide (divide (divide ?17 ?17) (divide ?17 ?18)) ?19 =<= divide (divide ?20 ?20) (divide ?20 (divide ?18 (divide (divide (divide ?20 ?20) ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Super 5 with 2 at 2,2,1,2
6853 Id : 61, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= divide (divide ?20 ?20) (divide ?20 (divide ?18 (divide (divide (divide ?20 ?20) ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Demod 6 with 4 at 1,2
6854 Id : 62, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= inverse (divide ?20 (divide ?18 (divide (divide (divide ?20 ?20) ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Demod 61 with 4 at 3
6855 Id : 63, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= inverse (divide ?20 (divide ?18 (divide (inverse ?20) (divide (divide (divide ?17 ?17) ?17) ?19)))) [20, 19, 18, 17] by Demod 62 with 4 at 1,2,2,1,3
6856 Id : 64, {_}: divide (inverse (divide ?17 ?18)) ?19 =<= inverse (divide ?20 (divide ?18 (divide (inverse ?20) (divide (inverse ?17) ?19)))) [20, 19, 18, 17] by Demod 63 with 4 at 1,2,2,2,1,3
6857 Id : 11, {_}: divide (divide (divide ?39 ?39) (multiply ?39 (divide (divide (divide ?39 ?39) ?39) ?40))) ?40 =?= divide ?41 ?41 [41, 40, 39] by Super 2 with 3 at 2,1,2
6858 Id : 114, {_}: divide (inverse (multiply ?39 (divide (divide (divide ?39 ?39) ?39) ?40))) ?40 =?= divide ?41 ?41 [41, 40, 39] by Demod 11 with 4 at 1,2
6859 Id : 134, {_}: divide (inverse (multiply ?398 (divide (inverse ?398) ?399))) ?399 =?= divide ?400 ?400 [400, 399, 398] by Demod 114 with 4 at 1,2,1,1,2
6860 Id : 115, {_}: divide (inverse (multiply ?39 (divide (inverse ?39) ?40))) ?40 =?= divide ?41 ?41 [41, 40, 39] by Demod 114 with 4 at 1,2,1,1,2
6861 Id : 148, {_}: divide ?461 ?461 =?= divide ?462 ?462 [462, 461] by Super 134 with 115 at 2
6862 Id : 299, {_}: divide (inverse (divide ?827 (divide (inverse ?828) (divide (inverse ?827) ?829)))) ?829 =?= inverse (divide ?828 (divide ?830 ?830)) [830, 829, 828, 827] by Super 64 with 148 at 2,1,3
6863 Id : 30, {_}: divide (inverse (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 2 with 4 at 1,2
6864 Id : 31, {_}: divide (inverse (divide ?2 (divide ?3 (divide (inverse ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 30 with 4 at 1,2,2,1,1,2
6865 Id : 375, {_}: inverse ?1021 =<= inverse (divide ?1021 (divide ?1022 ?1022)) [1022, 1021] by Demod 299 with 31 at 2
6866 Id : 377, {_}: inverse ?1027 =<= inverse (divide ?1027 (inverse (divide ?1028 ?1028))) [1028, 1027] by Super 375 with 4 at 2,1,3
6867 Id : 406, {_}: inverse ?1027 =<= inverse (multiply ?1027 (divide ?1028 ?1028)) [1028, 1027] by Demod 377 with 29 at 1,3
6868 Id : 490, {_}: divide (inverse (inverse ?1247)) (divide ?1248 ?1248) =>= ?1247 [1248, 1247] by Super 218 with 406 at 1,1,2
6869 Id : 645, {_}: multiply ?1708 (divide ?1709 ?1709) =>= ?1708 [1709, 1708] by Super 218 with 490 at 2
6870 Id : 907, {_}: multiply (inverse (divide ?2177 (divide ?2178 (inverse ?2177)))) (divide ?2179 ?2179) =>= ?2178 [2179, 2178, 2177] by Super 432 with 645 at 2,2,1,1,2
6871 Id : 938, {_}: inverse (divide ?2177 (divide ?2178 (inverse ?2177))) =>= ?2178 [2178, 2177] by Demod 907 with 645 at 2
6872 Id : 1015, {_}: inverse (divide ?2385 (multiply ?2386 ?2385)) =>= ?2386 [2386, 2385] by Demod 938 with 29 at 2,1,2
6873 Id : 352, {_}: inverse ?828 =<= inverse (divide ?828 (divide ?830 ?830)) [830, 828] by Demod 299 with 31 at 2
6874 Id : 646, {_}: inverse (inverse (inverse ?1711)) =>= inverse ?1711 [1711] by Super 352 with 490 at 1,3
6875 Id : 766, {_}: divide (inverse (inverse ?1935)) (divide ?1936 ?1936) =>= inverse (inverse ?1935) [1936, 1935] by Super 490 with 646 at 1,1,2
6876 Id : 792, {_}: ?1935 =<= inverse (inverse ?1935) [1935] by Demod 766 with 490 at 2
6877 Id : 812, {_}: divide (multiply ?49 ?50) ?50 =>= ?49 [50, 49] by Demod 218 with 792 at 1,2
6878 Id : 823, {_}: multiply ?2032 (inverse ?2033) =>= divide ?2032 ?2033 [2033, 2032] by Super 29 with 792 at 2,3
6879 Id : 854, {_}: divide (divide ?2110 ?2111) (inverse ?2111) =>= ?2110 [2111, 2110] by Super 812 with 823 at 1,2
6880 Id : 872, {_}: multiply (divide ?2110 ?2111) ?2111 =>= ?2110 [2111, 2110] by Demod 854 with 29 at 2
6881 Id : 1023, {_}: inverse (divide ?2410 ?2411) =>= divide ?2411 ?2410 [2411, 2410] by Super 1015 with 872 at 2,1,2
6882 Id : 1182, {_}: divide (divide ?18 ?17) ?19 =<= inverse (divide ?20 (divide ?18 (divide (inverse ?20) (divide (inverse ?17) ?19)))) [20, 19, 17, 18] by Demod 64 with 1023 at 1,2
6883 Id : 1183, {_}: divide (divide ?18 ?17) ?19 =<= divide (divide ?18 (divide (inverse ?20) (divide (inverse ?17) ?19))) ?20 [20, 19, 17, 18] by Demod 1182 with 1023 at 3
6884 Id : 1206, {_}: inverse (divide ?2791 ?2792) =>= divide ?2792 ?2791 [2792, 2791] by Super 1015 with 872 at 2,1,2
6885 Id : 1213, {_}: inverse (multiply ?2814 ?2815) =<= divide (inverse ?2815) ?2814 [2815, 2814] by Super 1206 with 29 at 1,2
6886 Id : 1234, {_}: divide (divide ?18 ?17) ?19 =<= divide (divide ?18 (inverse (multiply (divide (inverse ?17) ?19) ?20))) ?20 [20, 19, 17, 18] by Demod 1183 with 1213 at 2,1,3
6887 Id : 1235, {_}: divide (divide ?18 ?17) ?19 =<= divide (divide ?18 (inverse (multiply (inverse (multiply ?19 ?17)) ?20))) ?20 [20, 19, 17, 18] by Demod 1234 with 1213 at 1,1,2,1,3
6888 Id : 1243, {_}: divide (divide ?18 ?17) ?19 =<= divide (multiply ?18 (multiply (inverse (multiply ?19 ?17)) ?20)) ?20 [20, 19, 17, 18] by Demod 1235 with 29 at 1,3
6889 Id : 37, {_}: inverse ?96 =<= divide (multiply (inverse ?97) ?97) ?96 [97, 96] by Super 35 with 29 at 1,3
6890 Id : 1026, {_}: inverse (inverse (multiply ?2419 (multiply (inverse ?2420) ?2420))) =>= ?2419 [2420, 2419] by Super 1015 with 37 at 1,2
6891 Id : 1037, {_}: multiply ?2419 (multiply (inverse ?2420) ?2420) =>= ?2419 [2420, 2419] by Demod 1026 with 792 at 2
6892 Id : 1450, {_}: divide (divide ?3221 ?3222) ?3223 =>= divide ?3221 (multiply ?3223 ?3222) [3223, 3222, 3221] by Super 1243 with 1037 at 1,3
6893 Id : 1519, {_}: inverse (divide ?3333 (multiply ?3334 ?3335)) =>= divide ?3334 (divide ?3333 ?3335) [3335, 3334, 3333] by Super 1023 with 1450 at 1,2
6894 Id : 1539, {_}: divide (multiply ?3334 ?3335) ?3333 =>= divide ?3334 (divide ?3333 ?3335) [3333, 3335, 3334] by Demod 1519 with 1023 at 2
6895 Id : 1196, {_}: multiply ?2750 (divide ?2751 ?2752) =<= divide ?2750 (divide ?2752 ?2751) [2752, 2751, 2750] by Super 823 with 1023 at 2,2
6896 Id : 1540, {_}: divide (multiply ?3334 ?3335) ?3333 =>= multiply ?3334 (divide ?3335 ?3333) [3333, 3335, 3334] by Demod 1539 with 1196 at 3
6897 Id : 1686, {_}: multiply (multiply ?3635 ?3636) ?3637 =<= multiply ?3635 (divide ?3636 (inverse ?3637)) [3637, 3636, 3635] by Super 29 with 1540 at 3
6898 Id : 1716, {_}: multiply (multiply ?3635 ?3636) ?3637 =>= multiply ?3635 (multiply ?3636 ?3637) [3637, 3636, 3635] by Demod 1686 with 29 at 2,3
6899 Id : 1789, {_}: multiply a3 (multiply b3 c3) =?= multiply a3 (multiply b3 c3) [] by Demod 1 with 1716 at 2
6900 Id : 1, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
6901 % SZS output end CNFRefutation for GRP453-1.p
6902 9142: solved GRP453-1.p in 0.260016 using kbo
6903 !! infer_left 40 0.0000 0.0000 0.0000
6904 !! infer_right 41 1.1972 0.4135 0.0292
6905 !! simplify_goal 41 0.0030 0.0002 0.0001
6906 !! keep_simplified 80 0.0641 0.0078 0.0008
6907 !! simplification_step 120 0.0632 0.0019 0.0005
6908 !! simplify 2070 1.2035 0.4045 0.0006
6909 !! orphan_murder 100 0.0013 0.0002 0.0000
6910 !! is_subsumed 1789 0.0197 0.0004 0.0000
6911 !! build_new_clause 997 0.0224 0.0007 0.0000
6912 !! demodulate 2062 0.7800 0.4045 0.0004
6913 !! demod 11933 0.7421 0.4041 0.0001
6914 !! demod.apply_subst 4650 0.0074 0.0004 0.0000
6915 !! demod.compare_terms 1545 0.0095 0.0004 0.0000
6916 !! demod.retrieve_generalizations 11933 0.2666 0.2161 0.0000
6917 !! demod.unify 7595 0.4254 0.4041 0.0001
6918 !! build_clause 1777 0.0293 0.0007 0.0000
6919 !! compare_terms(kbo) 3605 0.0223 0.0005 0.0000
6920 !! compare_terms(nrkbo) 4 0.0001 0.0000 0.0000
6923 divide (inverse (divide ?2 (divide ?3 (divide ?4 ?5))))
6924 (divide (divide ?5 ?4) ?2)
6927 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6929 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
6930 [8, 7] by multiply ?7 ?8
6933 multiply (inverse a1) a1 =<= multiply (inverse b1) b1
6934 [] by prove_these_axioms_1
6935 % SZS status Timeout for GRP469-1.p
6938 divide (inverse (divide ?2 (divide ?3 (divide ?4 ?5))))
6939 (divide (divide ?5 ?4) ?2)
6942 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6944 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
6945 [8, 7] by multiply ?7 ?8
6948 multiply (multiply (inverse b2) b2) a2 =>= a2
6949 [] by prove_these_axioms_2
6950 % SZS status Timeout for GRP470-1.p
6953 divide (inverse (divide ?2 (divide ?3 (divide ?4 ?5))))
6954 (divide (divide ?5 ?4) ?2)
6957 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6959 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
6960 [8, 7] by multiply ?7 ?8
6963 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
6964 [] by prove_these_axioms_3
6965 % SZS status Timeout for GRP471-1.p
6968 divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4)))
6972 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6974 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
6975 [8, 7] by multiply ?7 ?8
6978 multiply (inverse a1) a1 =<= multiply (inverse b1) b1
6979 [] by prove_these_axioms_1
6980 % SZS status Timeout for GRP475-1.p
6983 divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4)))
6987 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
6989 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
6990 [8, 7] by multiply ?7 ?8
6993 multiply (multiply (inverse b2) b2) a2 =>= a2
6994 [] by prove_these_axioms_2
6997 Found proof, 51.912704s
6998 % SZS status Unsatisfiable for GRP476-1.p
6999 % SZS output start CNFRefutation for GRP476-1.p
7000 Id : 2, {_}: divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4))) (divide ?3 ?2) =>= ?5 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
7001 Id : 4, {_}: divide (inverse (divide (divide (divide ?10 ?11) ?12) (divide ?13 ?12))) (divide ?11 ?10) =>= ?13 [13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13
7002 Id : 3, {_}: multiply ?7 ?8 =<= divide ?7 (inverse ?8) [8, 7] by multiply ?7 ?8
7003 Id : 5, {_}: divide (inverse (divide (divide (divide (divide ?15 ?16) (inverse (divide (divide (divide ?16 ?15) ?17) (divide ?18 ?17)))) ?19) (divide ?20 ?19))) ?18 =>= ?20 [20, 19, 18, 17, 16, 15] by Super 4 with 2 at 2,2
7004 Id : 17, {_}: divide (inverse (divide (divide (multiply (divide ?15 ?16) (divide (divide (divide ?16 ?15) ?17) (divide ?18 ?17))) ?19) (divide ?20 ?19))) ?18 =>= ?20 [20, 19, 18, 17, 16, 15] by Demod 5 with 3 at 1,1,1,1,2
7005 Id : 18, {_}: multiply (inverse (divide (divide (multiply (divide ?64 ?65) (divide (divide (divide ?65 ?64) ?66) (divide (inverse ?67) ?66))) ?68) (divide ?69 ?68))) ?67 =>= ?69 [69, 68, 67, 66, 65, 64] by Super 3 with 17 at 3
7006 Id : 20, {_}: divide (inverse (divide (divide (divide ?80 ?81) ?82) ?83)) (divide ?81 ?80) =?= inverse (divide (divide (multiply (divide ?84 ?85) (divide (divide (divide ?85 ?84) ?86) (divide ?82 ?86))) ?87) (divide ?83 ?87)) [87, 86, 85, 84, 83, 82, 81, 80] by Super 2 with 17 at 2,1,1,2
7007 Id : 886, {_}: multiply (divide (inverse (divide (divide (divide ?4983 ?4984) (inverse ?4985)) ?4986)) (divide ?4984 ?4983)) ?4985 =>= ?4986 [4986, 4985, 4984, 4983] by Super 18 with 20 at 1,2
7008 Id : 983, {_}: multiply (divide (inverse (divide (multiply (divide ?4983 ?4984) ?4985) ?4986)) (divide ?4984 ?4983)) ?4985 =>= ?4986 [4986, 4985, 4984, 4983] by Demod 886 with 3 at 1,1,1,1,2
7009 Id : 1147, {_}: divide (divide (inverse (divide (divide (divide ?6397 ?6398) ?6399) ?6400)) (divide ?6398 ?6397)) ?6399 =>= ?6400 [6400, 6399, 6398, 6397] by Super 17 with 20 at 1,2
7010 Id : 1614, {_}: divide (divide (inverse (divide (divide (divide (inverse ?8515) ?8516) ?8517) ?8518)) (multiply ?8516 ?8515)) ?8517 =>= ?8518 [8518, 8517, 8516, 8515] by Super 1147 with 3 at 2,1,2
7011 Id : 1636, {_}: divide (divide (inverse (divide (divide (multiply (inverse ?8693) ?8694) ?8695) ?8696)) (multiply (inverse ?8694) ?8693)) ?8695 =>= ?8696 [8696, 8695, 8694, 8693] by Super 1614 with 3 at 1,1,1,1,1,2
7012 Id : 7, {_}: divide (inverse (divide (divide ?29 ?30) (divide ?31 ?30))) (divide (divide ?32 ?33) (inverse (divide (divide (divide ?33 ?32) ?34) (divide ?29 ?34)))) =>= ?31 [34, 33, 32, 31, 30, 29] by Super 4 with 2 at 1,1,1,1,2
7013 Id : 306, {_}: divide (inverse (divide (divide ?1495 ?1496) (divide ?1497 ?1496))) (multiply (divide ?1498 ?1499) (divide (divide (divide ?1499 ?1498) ?1500) (divide ?1495 ?1500))) =>= ?1497 [1500, 1499, 1498, 1497, 1496, 1495] by Demod 7 with 3 at 2,2
7014 Id : 6, {_}: divide (inverse (divide (divide (divide ?22 ?23) (divide ?24 ?25)) ?26)) (divide ?23 ?22) =?= inverse (divide (divide (divide ?25 ?24) ?27) (divide ?26 ?27)) [27, 26, 25, 24, 23, 22] by Super 4 with 2 at 2,1,1,2
7015 Id : 117, {_}: inverse (divide (divide (divide ?560 ?561) ?562) (divide (divide ?563 (divide ?561 ?560)) ?562)) =>= ?563 [563, 562, 561, 560] by Super 2 with 6 at 2
7016 Id : 343, {_}: divide ?1844 (multiply (divide ?1845 ?1846) (divide (divide (divide ?1846 ?1845) ?1847) (divide (divide ?1848 ?1849) ?1847))) =>= divide ?1844 (divide ?1849 ?1848) [1849, 1848, 1847, 1846, 1845, 1844] by Super 306 with 117 at 1,2
7017 Id : 13688, {_}: divide (divide (inverse (divide (divide (multiply (inverse ?74033) ?74034) ?74035) (divide ?74036 ?74037))) (multiply (inverse ?74034) ?74033)) ?74035 =?= multiply (divide ?74038 ?74039) (divide (divide (divide ?74039 ?74038) ?74040) (divide (divide ?74037 ?74036) ?74040)) [74040, 74039, 74038, 74037, 74036, 74035, 74034, 74033] by Super 1636 with 343 at 1,1,1,2
7018 Id : 13919, {_}: divide ?74036 ?74037 =<= multiply (divide ?74038 ?74039) (divide (divide (divide ?74039 ?74038) ?74040) (divide (divide ?74037 ?74036) ?74040)) [74040, 74039, 74038, 74037, 74036] by Demod 13688 with 1636 at 2
7019 Id : 1174, {_}: divide (divide (inverse (multiply (divide (divide ?6597 ?6598) ?6599) ?6600)) (divide ?6598 ?6597)) ?6599 =>= inverse ?6600 [6600, 6599, 6598, 6597] by Super 1147 with 3 at 1,1,1,2
7020 Id : 14271, {_}: divide (divide (inverse (divide ?76146 ?76147)) (divide ?76148 ?76149)) ?76150 =<= inverse (divide (divide (divide ?76150 (divide ?76149 ?76148)) ?76151) (divide (divide ?76147 ?76146) ?76151)) [76151, 76150, 76149, 76148, 76147, 76146] by Super 1174 with 13919 at 1,1,1,2
7021 Id : 14577, {_}: divide (divide (divide (inverse (divide ?77568 ?77569)) (divide ?77570 ?77571)) ?77572) (divide (divide ?77571 ?77570) ?77572) =>= divide ?77569 ?77568 [77572, 77571, 77570, 77569, 77568] by Super 2 with 14271 at 1,2
7022 Id : 21464, {_}: divide ?110283 ?110284 =<= multiply (divide (divide ?110283 ?110284) (inverse (divide ?110285 ?110286))) (divide ?110286 ?110285) [110286, 110285, 110284, 110283] by Super 13919 with 14577 at 2,3
7023 Id : 22077, {_}: divide ?114166 ?114167 =<= multiply (multiply (divide ?114166 ?114167) (divide ?114168 ?114169)) (divide ?114169 ?114168) [114169, 114168, 114167, 114166] by Demod 21464 with 3 at 1,3
7024 Id : 22134, {_}: divide (inverse (divide (divide (divide ?114625 ?114626) ?114627) (divide ?114628 ?114627))) (divide ?114626 ?114625) =?= multiply (multiply ?114628 (divide ?114629 ?114630)) (divide ?114630 ?114629) [114630, 114629, 114628, 114627, 114626, 114625] by Super 22077 with 2 at 1,1,3
7025 Id : 22280, {_}: ?114628 =<= multiply (multiply ?114628 (divide ?114629 ?114630)) (divide ?114630 ?114629) [114630, 114629, 114628] by Demod 22134 with 2 at 2
7026 Id : 214, {_}: inverse (divide (divide (divide ?1015 ?1016) ?1017) (divide (divide ?1018 (divide ?1016 ?1015)) ?1017)) =>= ?1018 [1018, 1017, 1016, 1015] by Super 2 with 6 at 2
7027 Id : 225, {_}: inverse (divide (divide (divide ?1093 ?1094) (inverse ?1095)) (multiply (divide ?1096 (divide ?1094 ?1093)) ?1095)) =>= ?1096 [1096, 1095, 1094, 1093] by Super 214 with 3 at 2,1,2
7028 Id : 244, {_}: inverse (divide (multiply (divide ?1093 ?1094) ?1095) (multiply (divide ?1096 (divide ?1094 ?1093)) ?1095)) =>= ?1096 [1096, 1095, 1094, 1093] by Demod 225 with 3 at 1,1,2
7029 Id : 21627, {_}: divide (divide (inverse (divide ?111807 ?111808)) (divide ?111808 ?111807)) (inverse (divide ?111809 ?111810)) =>= inverse (divide ?111810 ?111809) [111810, 111809, 111808, 111807] by Super 14271 with 14577 at 1,3
7030 Id : 21811, {_}: multiply (divide (inverse (divide ?111807 ?111808)) (divide ?111808 ?111807)) (divide ?111809 ?111810) =>= inverse (divide ?111810 ?111809) [111810, 111809, 111808, 111807] by Demod 21627 with 3 at 2
7031 Id : 24956, {_}: inverse (divide (inverse (divide ?127751 ?127752)) (multiply (divide ?127753 (divide (divide ?127754 ?127755) (inverse (divide ?127755 ?127754)))) (divide ?127752 ?127751))) =>= ?127753 [127755, 127754, 127753, 127752, 127751] by Super 244 with 21811 at 1,1,2
7032 Id : 9, {_}: divide (inverse (divide (divide (divide (inverse ?38) ?39) ?40) (divide ?41 ?40))) (multiply ?39 ?38) =>= ?41 [41, 40, 39, 38] by Super 2 with 3 at 2,2
7033 Id : 21526, {_}: divide (inverse (divide ?110864 ?110865)) (multiply (divide ?110866 ?110867) (divide ?110865 ?110864)) =>= divide ?110867 ?110866 [110867, 110866, 110865, 110864] by Super 9 with 14577 at 1,1,2
7034 Id : 25225, {_}: inverse (divide (divide (divide ?127754 ?127755) (inverse (divide ?127755 ?127754))) ?127753) =>= ?127753 [127753, 127755, 127754] by Demod 24956 with 21526 at 1,2
7035 Id : 25226, {_}: inverse (divide (multiply (divide ?127754 ?127755) (divide ?127755 ?127754)) ?127753) =>= ?127753 [127753, 127755, 127754] by Demod 25225 with 3 at 1,1,2
7036 Id : 25436, {_}: multiply (divide ?129669 (divide ?129670 ?129671)) (divide ?129670 ?129671) =>= ?129669 [129671, 129670, 129669] by Super 244 with 25226 at 2
7037 Id : 25620, {_}: divide ?130549 (divide ?130550 ?130551) =>= multiply ?130549 (divide ?130551 ?130550) [130551, 130550, 130549] by Super 22280 with 25436 at 1,3
7038 Id : 25989, {_}: multiply (multiply (inverse (divide (multiply (divide ?4983 ?4984) ?4985) ?4986)) (divide ?4983 ?4984)) ?4985 =>= ?4986 [4986, 4985, 4984, 4983] by Demod 983 with 25620 at 1,2
7039 Id : 26321, {_}: multiply (multiply (inverse (multiply (multiply (divide ?133710 ?133711) ?133712) (divide ?133713 ?133714))) (divide ?133710 ?133711)) ?133712 =>= divide ?133714 ?133713 [133714, 133713, 133712, 133711, 133710] by Super 25989 with 25620 at 1,1,1,2
7040 Id : 1240, {_}: multiply (divide (inverse (divide (multiply (divide ?6752 ?6753) ?6754) ?6755)) (divide ?6753 ?6752)) ?6754 =>= ?6755 [6755, 6754, 6753, 6752] by Demod 886 with 3 at 1,1,1,1,2
7041 Id : 1266, {_}: multiply (divide (inverse (multiply (multiply (divide ?6947 ?6948) ?6949) ?6950)) (divide ?6948 ?6947)) ?6949 =>= inverse ?6950 [6950, 6949, 6948, 6947] by Super 1240 with 3 at 1,1,1,2
7042 Id : 25988, {_}: multiply (multiply (inverse (multiply (multiply (divide ?6947 ?6948) ?6949) ?6950)) (divide ?6947 ?6948)) ?6949 =>= inverse ?6950 [6950, 6949, 6948, 6947] by Demod 1266 with 25620 at 1,2
7043 Id : 26758, {_}: inverse (divide ?134572 ?134573) =>= divide ?134573 ?134572 [134573, 134572] by Demod 26321 with 25988 at 2
7044 Id : 26801, {_}: inverse (multiply ?134835 ?134836) =<= divide (inverse ?134836) ?134835 [134836, 134835] by Super 26758 with 3 at 1,2
7045 Id : 27001, {_}: multiply (inverse ?135446) ?135447 =<= inverse (multiply (inverse ?135447) ?135446) [135447, 135446] by Super 3 with 26801 at 3
7046 Id : 26434, {_}: inverse (divide ?133713 ?133714) =>= divide ?133714 ?133713 [133714, 133713] by Demod 26321 with 25988 at 2
7047 Id : 26678, {_}: divide ?127753 (multiply (divide ?127754 ?127755) (divide ?127755 ?127754)) =>= ?127753 [127755, 127754, 127753] by Demod 25226 with 26434 at 2
7048 Id : 677, {_}: inverse (divide (divide (divide (inverse ?3469) ?3470) ?3471) (divide (divide ?3472 (multiply ?3470 ?3469)) ?3471)) =>= ?3472 [3472, 3471, 3470, 3469] by Super 214 with 3 at 2,1,2,1,2
7049 Id : 285, {_}: divide (inverse (divide (divide ?29 ?30) (divide ?31 ?30))) (multiply (divide ?32 ?33) (divide (divide (divide ?33 ?32) ?34) (divide ?29 ?34))) =>= ?31 [34, 33, 32, 31, 30, 29] by Demod 7 with 3 at 2,2
7050 Id : 682, {_}: inverse (divide (divide (divide (inverse (divide (divide (divide ?3504 ?3505) ?3506) (divide ?3507 ?3506))) (divide ?3505 ?3504)) ?3508) (divide ?3509 ?3508)) =?= inverse (divide (divide ?3507 ?3510) (divide ?3509 ?3510)) [3510, 3509, 3508, 3507, 3506, 3505, 3504] by Super 677 with 285 at 1,2,1,2
7051 Id : 5821, {_}: inverse (divide (divide ?31423 ?31424) (divide ?31425 ?31424)) =?= inverse (divide (divide ?31423 ?31426) (divide ?31425 ?31426)) [31426, 31425, 31424, 31423] by Demod 682 with 2 at 1,1,1,2
7052 Id : 5822, {_}: inverse (divide (divide ?31428 ?31429) (divide (inverse (divide (divide (divide ?31430 ?31431) ?31432) (divide ?31433 ?31432))) ?31429)) =>= inverse (divide (divide ?31428 (divide ?31431 ?31430)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Super 5821 with 2 at 2,1,3
7053 Id : 25971, {_}: inverse (multiply (divide ?31428 ?31429) (divide ?31429 (inverse (divide (divide (divide ?31430 ?31431) ?31432) (divide ?31433 ?31432))))) =>= inverse (divide (divide ?31428 (divide ?31431 ?31430)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 5822 with 25620 at 1,2
7054 Id : 25972, {_}: inverse (multiply (divide ?31428 ?31429) (divide ?31429 (inverse (divide (divide (divide ?31430 ?31431) ?31432) (divide ?31433 ?31432))))) =>= inverse (divide (multiply ?31428 (divide ?31430 ?31431)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 25971 with 25620 at 1,1,3
7055 Id : 25973, {_}: inverse (multiply (divide ?31428 ?31429) (divide ?31429 (inverse (multiply (divide (divide ?31430 ?31431) ?31432) (divide ?31432 ?31433))))) =>= inverse (divide (multiply ?31428 (divide ?31430 ?31431)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 25972 with 25620 at 1,2,2,1,2
7056 Id : 26094, {_}: inverse (multiply (divide ?31428 ?31429) (multiply ?31429 (multiply (divide (divide ?31430 ?31431) ?31432) (divide ?31432 ?31433)))) =>= inverse (divide (multiply ?31428 (divide ?31430 ?31431)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 25973 with 3 at 2,1,2
7057 Id : 26692, {_}: inverse (multiply (divide ?31428 ?31429) (multiply ?31429 (multiply (divide (divide ?31430 ?31431) ?31432) (divide ?31432 ?31433)))) =>= divide ?31433 (multiply ?31428 (divide ?31430 ?31431)) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 26094 with 26434 at 3
7058 Id : 5846, {_}: inverse (divide (divide (inverse (divide (divide (divide ?31616 ?31617) ?31618) (divide ?31619 ?31618))) ?31620) (divide ?31621 ?31620)) =>= inverse (divide ?31619 (divide ?31621 (divide ?31617 ?31616))) [31621, 31620, 31619, 31618, 31617, 31616] by Super 5821 with 2 at 1,1,3
7059 Id : 25966, {_}: inverse (multiply (divide (inverse (divide (divide (divide ?31616 ?31617) ?31618) (divide ?31619 ?31618))) ?31620) (divide ?31620 ?31621)) =>= inverse (divide ?31619 (divide ?31621 (divide ?31617 ?31616))) [31621, 31620, 31619, 31618, 31617, 31616] by Demod 5846 with 25620 at 1,2
7060 Id : 25967, {_}: inverse (multiply (divide (inverse (divide (divide (divide ?31616 ?31617) ?31618) (divide ?31619 ?31618))) ?31620) (divide ?31620 ?31621)) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31621, 31620, 31619, 31618, 31617, 31616] by Demod 25966 with 25620 at 1,3
7061 Id : 25968, {_}: inverse (multiply (divide (inverse (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619))) ?31620) (divide ?31620 ?31621)) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31621, 31620, 31619, 31618, 31617, 31616] by Demod 25967 with 25620 at 1,1,1,1,2
7062 Id : 26869, {_}: inverse (multiply (inverse (multiply ?31620 (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619)))) (divide ?31620 ?31621)) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31621, 31619, 31618, 31617, 31616, 31620] by Demod 25968 with 26801 at 1,1,2
7063 Id : 27339, {_}: multiply (inverse (divide ?31620 ?31621)) (multiply ?31620 (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619))) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31619, 31618, 31617, 31616, 31621, 31620] by Demod 26869 with 27001 at 2
7064 Id : 27340, {_}: multiply (divide ?31621 ?31620) (multiply ?31620 (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619))) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31619, 31618, 31617, 31616, 31620, 31621] by Demod 27339 with 26434 at 1,2
7065 Id : 27341, {_}: inverse (inverse (multiply ?31433 (divide (divide ?31431 ?31430) ?31428))) =>= divide ?31433 (multiply ?31428 (divide ?31430 ?31431)) [31428, 31430, 31431, 31433] by Demod 26692 with 27340 at 1,2
7066 Id : 26937, {_}: inverse (inverse (multiply ?135004 ?135005)) =>= divide ?135004 (inverse ?135005) [135005, 135004] by Super 26434 with 26801 at 1,2
7067 Id : 27295, {_}: inverse (inverse (multiply ?135004 ?135005)) =>= multiply ?135004 ?135005 [135005, 135004] by Demod 26937 with 3 at 3
7068 Id : 27547, {_}: multiply ?31433 (divide (divide ?31431 ?31430) ?31428) =<= divide ?31433 (multiply ?31428 (divide ?31430 ?31431)) [31428, 31430, 31431, 31433] by Demod 27341 with 27295 at 2
7069 Id : 27548, {_}: multiply ?127753 (divide (divide ?127754 ?127755) (divide ?127754 ?127755)) =>= ?127753 [127755, 127754, 127753] by Demod 26678 with 27547 at 2
7070 Id : 27557, {_}: multiply ?127753 (multiply (divide ?127754 ?127755) (divide ?127755 ?127754)) =>= ?127753 [127755, 127754, 127753] by Demod 27548 with 25620 at 2,2
7071 Id : 22430, {_}: ?115839 =<= multiply (multiply ?115839 (divide ?115840 ?115841)) (divide ?115841 ?115840) [115841, 115840, 115839] by Demod 22134 with 2 at 2
7072 Id : 22486, {_}: ?116237 =<= multiply (multiply ?116237 (multiply ?116238 ?116239)) (divide (inverse ?116239) ?116238) [116239, 116238, 116237] by Super 22430 with 3 at 2,1,3
7073 Id : 26885, {_}: ?116237 =<= multiply (multiply ?116237 (multiply ?116238 ?116239)) (inverse (multiply ?116238 ?116239)) [116239, 116238, 116237] by Demod 22486 with 26801 at 2,3
7074 Id : 27593, {_}: inverse (inverse (multiply ?137071 ?137072)) =>= multiply ?137071 ?137072 [137072, 137071] by Demod 26937 with 3 at 3
7075 Id : 26003, {_}: multiply (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4))) (divide ?2 ?3) =>= ?5 [5, 4, 3, 2] by Demod 2 with 25620 at 2
7076 Id : 26004, {_}: multiply (inverse (multiply (divide (divide ?2 ?3) ?4) (divide ?4 ?5))) (divide ?2 ?3) =>= ?5 [5, 4, 3, 2] by Demod 26003 with 25620 at 1,1,2
7077 Id : 27597, {_}: inverse (inverse ?137091) =<= multiply (inverse (multiply (divide (divide ?137092 ?137093) ?137094) (divide ?137094 ?137091))) (divide ?137092 ?137093) [137094, 137093, 137092, 137091] by Super 27593 with 26004 at 1,1,2
7078 Id : 27673, {_}: inverse (inverse ?137091) =>= ?137091 [137091] by Demod 27597 with 26004 at 3
7079 Id : 27775, {_}: multiply ?137570 (inverse ?137571) =>= divide ?137570 ?137571 [137571, 137570] by Super 3 with 27673 at 2,3
7080 Id : 27864, {_}: ?116237 =<= divide (multiply ?116237 (multiply ?116238 ?116239)) (multiply ?116238 ?116239) [116239, 116238, 116237] by Demod 26885 with 27775 at 3
7081 Id : 22, {_}: divide (inverse (divide (divide (multiply (divide ?98 ?99) (divide (divide (divide ?99 ?98) ?100) (divide ?101 ?100))) ?102) (divide ?103 ?102))) ?101 =>= ?103 [103, 102, 101, 100, 99, 98] by Demod 5 with 3 at 1,1,1,1,2
7082 Id : 26, {_}: divide (inverse (divide (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137) (divide ?138 ?137))) (inverse (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139))) =>= ?138 [139, 138, 137, 136, 135, 134, 133, 132] by Super 22 with 2 at 2,2,1,1,1,1,2
7083 Id : 42, {_}: multiply (inverse (divide (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137) (divide ?138 ?137))) (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139)) =>= ?138 [139, 138, 137, 136, 135, 134, 133, 132] by Demod 26 with 3 at 2
7084 Id : 27019, {_}: inverse (multiply (divide ?135546 ?135547) ?135548) =<= multiply (inverse ?135548) (divide ?135547 ?135546) [135548, 135547, 135546] by Super 25620 with 26801 at 2
7085 Id : 31814, {_}: inverse (multiply (divide (divide ?136 ?139) (divide (divide ?135 ?134) ?139)) (divide (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137) (divide ?138 ?137))) =>= ?138 [138, 137, 133, 132, 134, 135, 139, 136] by Demod 42 with 27019 at 2
7086 Id : 26761, {_}: inverse (multiply ?134585 (divide ?134586 ?134587)) =>= divide (divide ?134587 ?134586) ?134585 [134587, 134586, 134585] by Super 26758 with 25620 at 1,2
7087 Id : 31815, {_}: divide (divide (divide ?138 ?137) (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137)) (divide (divide ?136 ?139) (divide (divide ?135 ?134) ?139)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31814 with 26761 at 2
7088 Id : 31816, {_}: multiply (divide (divide ?138 ?137) (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137)) (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31815 with 25620 at 2
7089 Id : 31817, {_}: multiply (multiply (divide ?138 ?137) (divide ?137 (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)))) (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31816 with 25620 at 1,2
7090 Id : 31818, {_}: multiply (multiply (divide ?138 ?137) (divide ?137 (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31817 with 25620 at 2,2
7091 Id : 31819, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (divide (divide ?136 (divide (divide ?133 ?132) (divide ?134 ?135))) (divide ?132 ?133)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 135, 134, 132, 133, 136, 137, 138] by Demod 31818 with 27547 at 2,1,2
7092 Id : 31820, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (multiply (divide ?136 (divide (divide ?133 ?132) (divide ?134 ?135))) (divide ?133 ?132)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 135, 134, 132, 133, 136, 137, 138] by Demod 31819 with 25620 at 2,2,1,2
7093 Id : 31821, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (multiply (multiply ?136 (divide (divide ?134 ?135) (divide ?133 ?132))) (divide ?133 ?132)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 132, 133, 135, 134, 136, 137, 138] by Demod 31820 with 25620 at 1,2,2,1,2
7094 Id : 31822, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (multiply (multiply ?136 (multiply (divide ?134 ?135) (divide ?132 ?133))) (divide ?133 ?132)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 133, 132, 135, 134, 136, 137, 138] by Demod 31821 with 25620 at 2,1,2,2,1,2
7095 Id : 31911, {_}: ?147430 =<= divide (multiply ?147430 (multiply (multiply (divide ?147431 ?147432) (multiply ?147432 (multiply (multiply ?147433 (multiply (divide ?147434 ?147435) (divide ?147436 ?147437))) (divide ?147437 ?147436)))) (multiply (divide (divide ?147435 ?147434) ?147438) (divide ?147438 ?147433)))) ?147431 [147438, 147437, 147436, 147435, 147434, 147433, 147432, 147431, 147430] by Super 27864 with 31822 at 2,3
7096 Id : 32286, {_}: ?147430 =<= divide (multiply ?147430 ?147431) ?147431 [147431, 147430] by Demod 31911 with 31822 at 2,1,3
7097 Id : 33196, {_}: inverse ?153407 =<= divide ?153408 (multiply ?153407 ?153408) [153408, 153407] by Super 26434 with 32286 at 1,2
7098 Id : 33577, {_}: multiply ?155064 (multiply (divide (multiply ?155065 ?155066) ?155066) (inverse ?155065)) =>= ?155064 [155066, 155065, 155064] by Super 27557 with 33196 at 2,2,2
7099 Id : 34075, {_}: multiply ?155064 (divide (divide (multiply ?155065 ?155066) ?155066) ?155065) =>= ?155064 [155066, 155065, 155064] by Demod 33577 with 27775 at 2,2
7100 Id : 34076, {_}: multiply ?155064 (divide ?155065 ?155065) =>= ?155064 [155065, 155064] by Demod 34075 with 32286 at 1,2,2
7101 Id : 34411, {_}: multiply (inverse (divide ?156649 ?156649)) ?156650 =>= inverse (inverse ?156650) [156650, 156649] by Super 27001 with 34076 at 1,3
7102 Id : 34876, {_}: multiply (divide ?156649 ?156649) ?156650 =>= inverse (inverse ?156650) [156650, 156649] by Demod 34411 with 26434 at 1,2
7103 Id : 36150, {_}: multiply (divide ?160821 ?160821) ?160822 =>= ?160822 [160822, 160821] by Demod 34876 with 27673 at 3
7104 Id : 36165, {_}: multiply (multiply (inverse ?160898) ?160898) ?160899 =>= ?160899 [160899, 160898] by Super 36150 with 3 at 1,2
7105 Id : 40093, {_}: a2 === a2 [] by Demod 1 with 36165 at 2
7106 Id : 1, {_}: multiply (multiply (inverse b2) b2) a2 =>= a2 [] by prove_these_axioms_2
7107 % SZS output end CNFRefutation for GRP476-1.p
7108 9290: solved GRP476-1.p in 12.724794 using nrkbo
7109 !! infer_left 122 0.0002 0.0000 0.0000
7110 !! infer_right 123 38.7369 1.5371 0.3149
7111 !! simplify_goal 123 0.0065 0.0003 0.0001
7112 !! keep_simplified 384 11.6083 1.9929 0.0302
7113 !! simplification_step 618 11.6013 0.4467 0.0188
7114 !! simplify 44062 37.7771 0.4363 0.0009
7115 !! orphan_murder 463 0.0193 0.0006 0.0000
7116 !! is_subsumed 39183 2.7269 0.3069 0.0001
7117 !! build_new_clause 19877 7.3817 0.5643 0.0004
7118 !! demodulate 43990 34.3038 0.4362 0.0008
7119 !! demod 582631 27.8571 0.4002 0.0000
7120 !! demod.apply_subst 143776 2.1223 0.3003 0.0000
7121 !! demod.compare_terms 51557 2.7433 0.3203 0.0001
7122 !! demod.retrieve_generalizations 582631 13.7114 0.4001 0.0000
7123 !! demod.unify 108902 3.1753 0.4001 0.0000
7124 !! build_clause 40208 6.8644 0.5642 0.0002
7125 !! compare_terms(nrkbo) 95576 5.7477 0.4002 0.0001
7126 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
7129 divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4)))
7133 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
7135 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
7136 [8, 7] by multiply ?7 ?8
7139 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
7140 [] by prove_these_axioms_3
7143 Found proof, 64.946659s
7144 % SZS status Unsatisfiable for GRP477-1.p
7145 % SZS output start CNFRefutation for GRP477-1.p
7146 Id : 2, {_}: divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4))) (divide ?3 ?2) =>= ?5 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
7147 Id : 4, {_}: divide (inverse (divide (divide (divide ?10 ?11) ?12) (divide ?13 ?12))) (divide ?11 ?10) =>= ?13 [13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13
7148 Id : 3, {_}: multiply ?7 ?8 =<= divide ?7 (inverse ?8) [8, 7] by multiply ?7 ?8
7149 Id : 5, {_}: divide (inverse (divide (divide (divide (divide ?15 ?16) (inverse (divide (divide (divide ?16 ?15) ?17) (divide ?18 ?17)))) ?19) (divide ?20 ?19))) ?18 =>= ?20 [20, 19, 18, 17, 16, 15] by Super 4 with 2 at 2,2
7150 Id : 17, {_}: divide (inverse (divide (divide (multiply (divide ?15 ?16) (divide (divide (divide ?16 ?15) ?17) (divide ?18 ?17))) ?19) (divide ?20 ?19))) ?18 =>= ?20 [20, 19, 18, 17, 16, 15] by Demod 5 with 3 at 1,1,1,1,2
7151 Id : 20, {_}: divide (inverse (divide (divide (divide ?80 ?81) ?82) ?83)) (divide ?81 ?80) =?= inverse (divide (divide (multiply (divide ?84 ?85) (divide (divide (divide ?85 ?84) ?86) (divide ?82 ?86))) ?87) (divide ?83 ?87)) [87, 86, 85, 84, 83, 82, 81, 80] by Super 2 with 17 at 2,1,1,2
7152 Id : 1147, {_}: divide (divide (inverse (divide (divide (divide ?6397 ?6398) ?6399) ?6400)) (divide ?6398 ?6397)) ?6399 =>= ?6400 [6400, 6399, 6398, 6397] by Super 17 with 20 at 1,2
7153 Id : 1159, {_}: divide (divide (inverse (divide (divide (divide (inverse ?6489) ?6490) ?6491) ?6492)) (multiply ?6490 ?6489)) ?6491 =>= ?6492 [6492, 6491, 6490, 6489] by Super 1147 with 3 at 2,1,2
7154 Id : 18, {_}: multiply (inverse (divide (divide (multiply (divide ?64 ?65) (divide (divide (divide ?65 ?64) ?66) (divide (inverse ?67) ?66))) ?68) (divide ?69 ?68))) ?67 =>= ?69 [69, 68, 67, 66, 65, 64] by Super 3 with 17 at 3
7155 Id : 886, {_}: multiply (divide (inverse (divide (divide (divide ?4983 ?4984) (inverse ?4985)) ?4986)) (divide ?4984 ?4983)) ?4985 =>= ?4986 [4986, 4985, 4984, 4983] by Super 18 with 20 at 1,2
7156 Id : 983, {_}: multiply (divide (inverse (divide (multiply (divide ?4983 ?4984) ?4985) ?4986)) (divide ?4984 ?4983)) ?4985 =>= ?4986 [4986, 4985, 4984, 4983] by Demod 886 with 3 at 1,1,1,1,2
7157 Id : 1614, {_}: divide (divide (inverse (divide (divide (divide (inverse ?8515) ?8516) ?8517) ?8518)) (multiply ?8516 ?8515)) ?8517 =>= ?8518 [8518, 8517, 8516, 8515] by Super 1147 with 3 at 2,1,2
7158 Id : 1636, {_}: divide (divide (inverse (divide (divide (multiply (inverse ?8693) ?8694) ?8695) ?8696)) (multiply (inverse ?8694) ?8693)) ?8695 =>= ?8696 [8696, 8695, 8694, 8693] by Super 1614 with 3 at 1,1,1,1,1,2
7159 Id : 7, {_}: divide (inverse (divide (divide ?29 ?30) (divide ?31 ?30))) (divide (divide ?32 ?33) (inverse (divide (divide (divide ?33 ?32) ?34) (divide ?29 ?34)))) =>= ?31 [34, 33, 32, 31, 30, 29] by Super 4 with 2 at 1,1,1,1,2
7160 Id : 306, {_}: divide (inverse (divide (divide ?1495 ?1496) (divide ?1497 ?1496))) (multiply (divide ?1498 ?1499) (divide (divide (divide ?1499 ?1498) ?1500) (divide ?1495 ?1500))) =>= ?1497 [1500, 1499, 1498, 1497, 1496, 1495] by Demod 7 with 3 at 2,2
7161 Id : 6, {_}: divide (inverse (divide (divide (divide ?22 ?23) (divide ?24 ?25)) ?26)) (divide ?23 ?22) =?= inverse (divide (divide (divide ?25 ?24) ?27) (divide ?26 ?27)) [27, 26, 25, 24, 23, 22] by Super 4 with 2 at 2,1,1,2
7162 Id : 117, {_}: inverse (divide (divide (divide ?560 ?561) ?562) (divide (divide ?563 (divide ?561 ?560)) ?562)) =>= ?563 [563, 562, 561, 560] by Super 2 with 6 at 2
7163 Id : 343, {_}: divide ?1844 (multiply (divide ?1845 ?1846) (divide (divide (divide ?1846 ?1845) ?1847) (divide (divide ?1848 ?1849) ?1847))) =>= divide ?1844 (divide ?1849 ?1848) [1849, 1848, 1847, 1846, 1845, 1844] by Super 306 with 117 at 1,2
7164 Id : 13688, {_}: divide (divide (inverse (divide (divide (multiply (inverse ?74033) ?74034) ?74035) (divide ?74036 ?74037))) (multiply (inverse ?74034) ?74033)) ?74035 =?= multiply (divide ?74038 ?74039) (divide (divide (divide ?74039 ?74038) ?74040) (divide (divide ?74037 ?74036) ?74040)) [74040, 74039, 74038, 74037, 74036, 74035, 74034, 74033] by Super 1636 with 343 at 1,1,1,2
7165 Id : 13919, {_}: divide ?74036 ?74037 =<= multiply (divide ?74038 ?74039) (divide (divide (divide ?74039 ?74038) ?74040) (divide (divide ?74037 ?74036) ?74040)) [74040, 74039, 74038, 74037, 74036] by Demod 13688 with 1636 at 2
7166 Id : 1174, {_}: divide (divide (inverse (multiply (divide (divide ?6597 ?6598) ?6599) ?6600)) (divide ?6598 ?6597)) ?6599 =>= inverse ?6600 [6600, 6599, 6598, 6597] by Super 1147 with 3 at 1,1,1,2
7167 Id : 14271, {_}: divide (divide (inverse (divide ?76146 ?76147)) (divide ?76148 ?76149)) ?76150 =<= inverse (divide (divide (divide ?76150 (divide ?76149 ?76148)) ?76151) (divide (divide ?76147 ?76146) ?76151)) [76151, 76150, 76149, 76148, 76147, 76146] by Super 1174 with 13919 at 1,1,1,2
7168 Id : 14577, {_}: divide (divide (divide (inverse (divide ?77568 ?77569)) (divide ?77570 ?77571)) ?77572) (divide (divide ?77571 ?77570) ?77572) =>= divide ?77569 ?77568 [77572, 77571, 77570, 77569, 77568] by Super 2 with 14271 at 1,2
7169 Id : 21464, {_}: divide ?110283 ?110284 =<= multiply (divide (divide ?110283 ?110284) (inverse (divide ?110285 ?110286))) (divide ?110286 ?110285) [110286, 110285, 110284, 110283] by Super 13919 with 14577 at 2,3
7170 Id : 22077, {_}: divide ?114166 ?114167 =<= multiply (multiply (divide ?114166 ?114167) (divide ?114168 ?114169)) (divide ?114169 ?114168) [114169, 114168, 114167, 114166] by Demod 21464 with 3 at 1,3
7171 Id : 22134, {_}: divide (inverse (divide (divide (divide ?114625 ?114626) ?114627) (divide ?114628 ?114627))) (divide ?114626 ?114625) =?= multiply (multiply ?114628 (divide ?114629 ?114630)) (divide ?114630 ?114629) [114630, 114629, 114628, 114627, 114626, 114625] by Super 22077 with 2 at 1,1,3
7172 Id : 22280, {_}: ?114628 =<= multiply (multiply ?114628 (divide ?114629 ?114630)) (divide ?114630 ?114629) [114630, 114629, 114628] by Demod 22134 with 2 at 2
7173 Id : 214, {_}: inverse (divide (divide (divide ?1015 ?1016) ?1017) (divide (divide ?1018 (divide ?1016 ?1015)) ?1017)) =>= ?1018 [1018, 1017, 1016, 1015] by Super 2 with 6 at 2
7174 Id : 225, {_}: inverse (divide (divide (divide ?1093 ?1094) (inverse ?1095)) (multiply (divide ?1096 (divide ?1094 ?1093)) ?1095)) =>= ?1096 [1096, 1095, 1094, 1093] by Super 214 with 3 at 2,1,2
7175 Id : 244, {_}: inverse (divide (multiply (divide ?1093 ?1094) ?1095) (multiply (divide ?1096 (divide ?1094 ?1093)) ?1095)) =>= ?1096 [1096, 1095, 1094, 1093] by Demod 225 with 3 at 1,1,2
7176 Id : 21627, {_}: divide (divide (inverse (divide ?111807 ?111808)) (divide ?111808 ?111807)) (inverse (divide ?111809 ?111810)) =>= inverse (divide ?111810 ?111809) [111810, 111809, 111808, 111807] by Super 14271 with 14577 at 1,3
7177 Id : 21811, {_}: multiply (divide (inverse (divide ?111807 ?111808)) (divide ?111808 ?111807)) (divide ?111809 ?111810) =>= inverse (divide ?111810 ?111809) [111810, 111809, 111808, 111807] by Demod 21627 with 3 at 2
7178 Id : 24956, {_}: inverse (divide (inverse (divide ?127751 ?127752)) (multiply (divide ?127753 (divide (divide ?127754 ?127755) (inverse (divide ?127755 ?127754)))) (divide ?127752 ?127751))) =>= ?127753 [127755, 127754, 127753, 127752, 127751] by Super 244 with 21811 at 1,1,2
7179 Id : 9, {_}: divide (inverse (divide (divide (divide (inverse ?38) ?39) ?40) (divide ?41 ?40))) (multiply ?39 ?38) =>= ?41 [41, 40, 39, 38] by Super 2 with 3 at 2,2
7180 Id : 21526, {_}: divide (inverse (divide ?110864 ?110865)) (multiply (divide ?110866 ?110867) (divide ?110865 ?110864)) =>= divide ?110867 ?110866 [110867, 110866, 110865, 110864] by Super 9 with 14577 at 1,1,2
7181 Id : 25225, {_}: inverse (divide (divide (divide ?127754 ?127755) (inverse (divide ?127755 ?127754))) ?127753) =>= ?127753 [127753, 127755, 127754] by Demod 24956 with 21526 at 1,2
7182 Id : 25226, {_}: inverse (divide (multiply (divide ?127754 ?127755) (divide ?127755 ?127754)) ?127753) =>= ?127753 [127753, 127755, 127754] by Demod 25225 with 3 at 1,1,2
7183 Id : 25436, {_}: multiply (divide ?129669 (divide ?129670 ?129671)) (divide ?129670 ?129671) =>= ?129669 [129671, 129670, 129669] by Super 244 with 25226 at 2
7184 Id : 25620, {_}: divide ?130549 (divide ?130550 ?130551) =>= multiply ?130549 (divide ?130551 ?130550) [130551, 130550, 130549] by Super 22280 with 25436 at 1,3
7185 Id : 25989, {_}: multiply (multiply (inverse (divide (multiply (divide ?4983 ?4984) ?4985) ?4986)) (divide ?4983 ?4984)) ?4985 =>= ?4986 [4986, 4985, 4984, 4983] by Demod 983 with 25620 at 1,2
7186 Id : 26321, {_}: multiply (multiply (inverse (multiply (multiply (divide ?133710 ?133711) ?133712) (divide ?133713 ?133714))) (divide ?133710 ?133711)) ?133712 =>= divide ?133714 ?133713 [133714, 133713, 133712, 133711, 133710] by Super 25989 with 25620 at 1,1,1,2
7187 Id : 1240, {_}: multiply (divide (inverse (divide (multiply (divide ?6752 ?6753) ?6754) ?6755)) (divide ?6753 ?6752)) ?6754 =>= ?6755 [6755, 6754, 6753, 6752] by Demod 886 with 3 at 1,1,1,1,2
7188 Id : 1266, {_}: multiply (divide (inverse (multiply (multiply (divide ?6947 ?6948) ?6949) ?6950)) (divide ?6948 ?6947)) ?6949 =>= inverse ?6950 [6950, 6949, 6948, 6947] by Super 1240 with 3 at 1,1,1,2
7189 Id : 25988, {_}: multiply (multiply (inverse (multiply (multiply (divide ?6947 ?6948) ?6949) ?6950)) (divide ?6947 ?6948)) ?6949 =>= inverse ?6950 [6950, 6949, 6948, 6947] by Demod 1266 with 25620 at 1,2
7190 Id : 26434, {_}: inverse (divide ?133713 ?133714) =>= divide ?133714 ?133713 [133714, 133713] by Demod 26321 with 25988 at 2
7191 Id : 26673, {_}: divide (divide (divide ?6492 (divide (divide (inverse ?6489) ?6490) ?6491)) (multiply ?6490 ?6489)) ?6491 =>= ?6492 [6491, 6490, 6489, 6492] by Demod 1159 with 26434 at 1,1,2
7192 Id : 26710, {_}: divide (divide (multiply ?6492 (divide ?6491 (divide (inverse ?6489) ?6490))) (multiply ?6490 ?6489)) ?6491 =>= ?6492 [6490, 6489, 6491, 6492] by Demod 26673 with 25620 at 1,1,2
7193 Id : 26711, {_}: divide (divide (multiply ?6492 (multiply ?6491 (divide ?6490 (inverse ?6489)))) (multiply ?6490 ?6489)) ?6491 =>= ?6492 [6489, 6490, 6491, 6492] by Demod 26710 with 25620 at 2,1,1,2
7194 Id : 26712, {_}: divide (divide (multiply ?6492 (multiply ?6491 (multiply ?6490 ?6489))) (multiply ?6490 ?6489)) ?6491 =>= ?6492 [6489, 6490, 6491, 6492] by Demod 26711 with 3 at 2,2,1,1,2
7195 Id : 22430, {_}: ?115839 =<= multiply (multiply ?115839 (divide ?115840 ?115841)) (divide ?115841 ?115840) [115841, 115840, 115839] by Demod 22134 with 2 at 2
7196 Id : 22458, {_}: ?116038 =<= multiply (multiply ?116038 (divide (inverse ?116039) ?116040)) (multiply ?116040 ?116039) [116040, 116039, 116038] by Super 22430 with 3 at 2,3
7197 Id : 26758, {_}: inverse (divide ?134572 ?134573) =>= divide ?134573 ?134572 [134573, 134572] by Demod 26321 with 25988 at 2
7198 Id : 26801, {_}: inverse (multiply ?134835 ?134836) =<= divide (inverse ?134836) ?134835 [134836, 134835] by Super 26758 with 3 at 1,2
7199 Id : 26886, {_}: ?116038 =<= multiply (multiply ?116038 (inverse (multiply ?116040 ?116039))) (multiply ?116040 ?116039) [116039, 116040, 116038] by Demod 22458 with 26801 at 2,1,3
7200 Id : 26937, {_}: inverse (inverse (multiply ?135004 ?135005)) =>= divide ?135004 (inverse ?135005) [135005, 135004] by Super 26434 with 26801 at 1,2
7201 Id : 27593, {_}: inverse (inverse (multiply ?137071 ?137072)) =>= multiply ?137071 ?137072 [137072, 137071] by Demod 26937 with 3 at 3
7202 Id : 26003, {_}: multiply (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4))) (divide ?2 ?3) =>= ?5 [5, 4, 3, 2] by Demod 2 with 25620 at 2
7203 Id : 26004, {_}: multiply (inverse (multiply (divide (divide ?2 ?3) ?4) (divide ?4 ?5))) (divide ?2 ?3) =>= ?5 [5, 4, 3, 2] by Demod 26003 with 25620 at 1,1,2
7204 Id : 27597, {_}: inverse (inverse ?137091) =<= multiply (inverse (multiply (divide (divide ?137092 ?137093) ?137094) (divide ?137094 ?137091))) (divide ?137092 ?137093) [137094, 137093, 137092, 137091] by Super 27593 with 26004 at 1,1,2
7205 Id : 27673, {_}: inverse (inverse ?137091) =>= ?137091 [137091] by Demod 27597 with 26004 at 3
7206 Id : 27775, {_}: multiply ?137570 (inverse ?137571) =>= divide ?137570 ?137571 [137571, 137570] by Super 3 with 27673 at 2,3
7207 Id : 27862, {_}: ?116038 =<= multiply (divide ?116038 (multiply ?116040 ?116039)) (multiply ?116040 ?116039) [116039, 116040, 116038] by Demod 26886 with 27775 at 1,3
7208 Id : 22, {_}: divide (inverse (divide (divide (multiply (divide ?98 ?99) (divide (divide (divide ?99 ?98) ?100) (divide ?101 ?100))) ?102) (divide ?103 ?102))) ?101 =>= ?103 [103, 102, 101, 100, 99, 98] by Demod 5 with 3 at 1,1,1,1,2
7209 Id : 26, {_}: divide (inverse (divide (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137) (divide ?138 ?137))) (inverse (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139))) =>= ?138 [139, 138, 137, 136, 135, 134, 133, 132] by Super 22 with 2 at 2,2,1,1,1,1,2
7210 Id : 42, {_}: multiply (inverse (divide (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137) (divide ?138 ?137))) (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139)) =>= ?138 [139, 138, 137, 136, 135, 134, 133, 132] by Demod 26 with 3 at 2
7211 Id : 27019, {_}: inverse (multiply (divide ?135546 ?135547) ?135548) =<= multiply (inverse ?135548) (divide ?135547 ?135546) [135548, 135547, 135546] by Super 25620 with 26801 at 2
7212 Id : 31814, {_}: inverse (multiply (divide (divide ?136 ?139) (divide (divide ?135 ?134) ?139)) (divide (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137) (divide ?138 ?137))) =>= ?138 [138, 137, 133, 132, 134, 135, 139, 136] by Demod 42 with 27019 at 2
7213 Id : 26761, {_}: inverse (multiply ?134585 (divide ?134586 ?134587)) =>= divide (divide ?134587 ?134586) ?134585 [134587, 134586, 134585] by Super 26758 with 25620 at 1,2
7214 Id : 31815, {_}: divide (divide (divide ?138 ?137) (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137)) (divide (divide ?136 ?139) (divide (divide ?135 ?134) ?139)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31814 with 26761 at 2
7215 Id : 31816, {_}: multiply (divide (divide ?138 ?137) (divide (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)) ?137)) (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31815 with 25620 at 2
7216 Id : 31817, {_}: multiply (multiply (divide ?138 ?137) (divide ?137 (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)))) (divide (divide (divide ?135 ?134) ?139) (divide ?136 ?139)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31816 with 25620 at 1,2
7217 Id : 31818, {_}: multiply (multiply (divide ?138 ?137) (divide ?137 (multiply (divide ?132 ?133) (divide (divide (divide ?133 ?132) (divide ?134 ?135)) ?136)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 136, 135, 134, 133, 132, 137, 138] by Demod 31817 with 25620 at 2,2
7218 Id : 677, {_}: inverse (divide (divide (divide (inverse ?3469) ?3470) ?3471) (divide (divide ?3472 (multiply ?3470 ?3469)) ?3471)) =>= ?3472 [3472, 3471, 3470, 3469] by Super 214 with 3 at 2,1,2,1,2
7219 Id : 285, {_}: divide (inverse (divide (divide ?29 ?30) (divide ?31 ?30))) (multiply (divide ?32 ?33) (divide (divide (divide ?33 ?32) ?34) (divide ?29 ?34))) =>= ?31 [34, 33, 32, 31, 30, 29] by Demod 7 with 3 at 2,2
7220 Id : 682, {_}: inverse (divide (divide (divide (inverse (divide (divide (divide ?3504 ?3505) ?3506) (divide ?3507 ?3506))) (divide ?3505 ?3504)) ?3508) (divide ?3509 ?3508)) =?= inverse (divide (divide ?3507 ?3510) (divide ?3509 ?3510)) [3510, 3509, 3508, 3507, 3506, 3505, 3504] by Super 677 with 285 at 1,2,1,2
7221 Id : 5821, {_}: inverse (divide (divide ?31423 ?31424) (divide ?31425 ?31424)) =?= inverse (divide (divide ?31423 ?31426) (divide ?31425 ?31426)) [31426, 31425, 31424, 31423] by Demod 682 with 2 at 1,1,1,2
7222 Id : 5822, {_}: inverse (divide (divide ?31428 ?31429) (divide (inverse (divide (divide (divide ?31430 ?31431) ?31432) (divide ?31433 ?31432))) ?31429)) =>= inverse (divide (divide ?31428 (divide ?31431 ?31430)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Super 5821 with 2 at 2,1,3
7223 Id : 25971, {_}: inverse (multiply (divide ?31428 ?31429) (divide ?31429 (inverse (divide (divide (divide ?31430 ?31431) ?31432) (divide ?31433 ?31432))))) =>= inverse (divide (divide ?31428 (divide ?31431 ?31430)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 5822 with 25620 at 1,2
7224 Id : 25972, {_}: inverse (multiply (divide ?31428 ?31429) (divide ?31429 (inverse (divide (divide (divide ?31430 ?31431) ?31432) (divide ?31433 ?31432))))) =>= inverse (divide (multiply ?31428 (divide ?31430 ?31431)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 25971 with 25620 at 1,1,3
7225 Id : 25973, {_}: inverse (multiply (divide ?31428 ?31429) (divide ?31429 (inverse (multiply (divide (divide ?31430 ?31431) ?31432) (divide ?31432 ?31433))))) =>= inverse (divide (multiply ?31428 (divide ?31430 ?31431)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 25972 with 25620 at 1,2,2,1,2
7226 Id : 26094, {_}: inverse (multiply (divide ?31428 ?31429) (multiply ?31429 (multiply (divide (divide ?31430 ?31431) ?31432) (divide ?31432 ?31433)))) =>= inverse (divide (multiply ?31428 (divide ?31430 ?31431)) ?31433) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 25973 with 3 at 2,1,2
7227 Id : 26692, {_}: inverse (multiply (divide ?31428 ?31429) (multiply ?31429 (multiply (divide (divide ?31430 ?31431) ?31432) (divide ?31432 ?31433)))) =>= divide ?31433 (multiply ?31428 (divide ?31430 ?31431)) [31433, 31432, 31431, 31430, 31429, 31428] by Demod 26094 with 26434 at 3
7228 Id : 5846, {_}: inverse (divide (divide (inverse (divide (divide (divide ?31616 ?31617) ?31618) (divide ?31619 ?31618))) ?31620) (divide ?31621 ?31620)) =>= inverse (divide ?31619 (divide ?31621 (divide ?31617 ?31616))) [31621, 31620, 31619, 31618, 31617, 31616] by Super 5821 with 2 at 1,1,3
7229 Id : 25966, {_}: inverse (multiply (divide (inverse (divide (divide (divide ?31616 ?31617) ?31618) (divide ?31619 ?31618))) ?31620) (divide ?31620 ?31621)) =>= inverse (divide ?31619 (divide ?31621 (divide ?31617 ?31616))) [31621, 31620, 31619, 31618, 31617, 31616] by Demod 5846 with 25620 at 1,2
7230 Id : 25967, {_}: inverse (multiply (divide (inverse (divide (divide (divide ?31616 ?31617) ?31618) (divide ?31619 ?31618))) ?31620) (divide ?31620 ?31621)) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31621, 31620, 31619, 31618, 31617, 31616] by Demod 25966 with 25620 at 1,3
7231 Id : 25968, {_}: inverse (multiply (divide (inverse (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619))) ?31620) (divide ?31620 ?31621)) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31621, 31620, 31619, 31618, 31617, 31616] by Demod 25967 with 25620 at 1,1,1,1,2
7232 Id : 26869, {_}: inverse (multiply (inverse (multiply ?31620 (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619)))) (divide ?31620 ?31621)) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31621, 31619, 31618, 31617, 31616, 31620] by Demod 25968 with 26801 at 1,1,2
7233 Id : 27001, {_}: multiply (inverse ?135446) ?135447 =<= inverse (multiply (inverse ?135447) ?135446) [135447, 135446] by Super 3 with 26801 at 3
7234 Id : 27339, {_}: multiply (inverse (divide ?31620 ?31621)) (multiply ?31620 (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619))) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31619, 31618, 31617, 31616, 31621, 31620] by Demod 26869 with 27001 at 2
7235 Id : 27340, {_}: multiply (divide ?31621 ?31620) (multiply ?31620 (multiply (divide (divide ?31616 ?31617) ?31618) (divide ?31618 ?31619))) =>= inverse (multiply ?31619 (divide (divide ?31617 ?31616) ?31621)) [31619, 31618, 31617, 31616, 31620, 31621] by Demod 27339 with 26434 at 1,2
7236 Id : 27341, {_}: inverse (inverse (multiply ?31433 (divide (divide ?31431 ?31430) ?31428))) =>= divide ?31433 (multiply ?31428 (divide ?31430 ?31431)) [31428, 31430, 31431, 31433] by Demod 26692 with 27340 at 1,2
7237 Id : 27295, {_}: inverse (inverse (multiply ?135004 ?135005)) =>= multiply ?135004 ?135005 [135005, 135004] by Demod 26937 with 3 at 3
7238 Id : 27547, {_}: multiply ?31433 (divide (divide ?31431 ?31430) ?31428) =<= divide ?31433 (multiply ?31428 (divide ?31430 ?31431)) [31428, 31430, 31431, 31433] by Demod 27341 with 27295 at 2
7239 Id : 31819, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (divide (divide ?136 (divide (divide ?133 ?132) (divide ?134 ?135))) (divide ?132 ?133)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 135, 134, 132, 133, 136, 137, 138] by Demod 31818 with 27547 at 2,1,2
7240 Id : 31820, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (multiply (divide ?136 (divide (divide ?133 ?132) (divide ?134 ?135))) (divide ?133 ?132)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 135, 134, 132, 133, 136, 137, 138] by Demod 31819 with 25620 at 2,2,1,2
7241 Id : 31821, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (multiply (multiply ?136 (divide (divide ?134 ?135) (divide ?133 ?132))) (divide ?133 ?132)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 132, 133, 135, 134, 136, 137, 138] by Demod 31820 with 25620 at 1,2,2,1,2
7242 Id : 31822, {_}: multiply (multiply (divide ?138 ?137) (multiply ?137 (multiply (multiply ?136 (multiply (divide ?134 ?135) (divide ?132 ?133))) (divide ?133 ?132)))) (multiply (divide (divide ?135 ?134) ?139) (divide ?139 ?136)) =>= ?138 [139, 133, 132, 135, 134, 136, 137, 138] by Demod 31821 with 25620 at 2,1,2,2,1,2
7243 Id : 31914, {_}: ?147459 =<= multiply (divide ?147459 (multiply (multiply (divide ?147460 ?147461) (multiply ?147461 (multiply (multiply ?147462 (multiply (divide ?147463 ?147464) (divide ?147465 ?147466))) (divide ?147466 ?147465)))) (multiply (divide (divide ?147464 ?147463) ?147467) (divide ?147467 ?147462)))) ?147460 [147467, 147466, 147465, 147464, 147463, 147462, 147461, 147460, 147459] by Super 27862 with 31822 at 2,3
7244 Id : 32284, {_}: ?147459 =<= multiply (divide ?147459 ?147460) ?147460 [147460, 147459] by Demod 31914 with 31822 at 2,1,3
7245 Id : 42945, {_}: divide (divide ?174307 (multiply ?174308 ?174309)) ?174310 =>= divide ?174307 (multiply ?174310 (multiply ?174308 ?174309)) [174310, 174309, 174308, 174307] by Super 26712 with 32284 at 1,1,2
7246 Id : 1473, {_}: multiply (divide (inverse (multiply (multiply (divide ?7790 ?7791) ?7792) ?7793)) (divide ?7791 ?7790)) ?7792 =>= inverse ?7793 [7793, 7792, 7791, 7790] by Super 1240 with 3 at 1,1,1,2
7247 Id : 1499, {_}: multiply (divide (inverse (multiply (multiply (multiply ?7988 ?7989) ?7990) ?7991)) (divide (inverse ?7989) ?7988)) ?7990 =>= inverse ?7991 [7991, 7990, 7989, 7988] by Super 1473 with 3 at 1,1,1,1,1,2
7248 Id : 25984, {_}: multiply (multiply (inverse (multiply (multiply (multiply ?7988 ?7989) ?7990) ?7991)) (divide ?7988 (inverse ?7989))) ?7990 =>= inverse ?7991 [7991, 7990, 7989, 7988] by Demod 1499 with 25620 at 1,2
7249 Id : 26092, {_}: multiply (multiply (inverse (multiply (multiply (multiply ?7988 ?7989) ?7990) ?7991)) (multiply ?7988 ?7989)) ?7990 =>= inverse ?7991 [7991, 7990, 7989, 7988] by Demod 25984 with 3 at 2,1,2
7250 Id : 42946, {_}: divide (divide ?174312 (inverse ?174313)) ?174314 =<= divide ?174312 (multiply ?174314 (multiply (multiply (inverse (multiply (multiply (multiply ?174315 ?174316) ?174317) ?174313)) (multiply ?174315 ?174316)) ?174317)) [174317, 174316, 174315, 174314, 174313, 174312] by Super 42945 with 26092 at 2,1,2
7251 Id : 43271, {_}: divide (multiply ?174312 ?174313) ?174314 =<= divide ?174312 (multiply ?174314 (multiply (multiply (inverse (multiply (multiply (multiply ?174315 ?174316) ?174317) ?174313)) (multiply ?174315 ?174316)) ?174317)) [174317, 174316, 174315, 174314, 174313, 174312] by Demod 42946 with 3 at 1,2
7252 Id : 43272, {_}: divide (multiply ?174312 ?174313) ?174314 =<= divide ?174312 (multiply ?174314 (inverse ?174313)) [174314, 174313, 174312] by Demod 43271 with 26092 at 2,2,3
7253 Id : 43273, {_}: divide (multiply ?174312 ?174313) ?174314 =>= divide ?174312 (divide ?174314 ?174313) [174314, 174313, 174312] by Demod 43272 with 27775 at 2,3
7254 Id : 43274, {_}: divide (multiply ?174312 ?174313) ?174314 =>= multiply ?174312 (divide ?174313 ?174314) [174314, 174313, 174312] by Demod 43273 with 25620 at 3
7255 Id : 43783, {_}: multiply (multiply ?175395 ?175396) ?175397 =<= multiply ?175395 (divide ?175396 (inverse ?175397)) [175397, 175396, 175395] by Super 3 with 43274 at 3
7256 Id : 43947, {_}: multiply (multiply ?175395 ?175396) ?175397 =>= multiply ?175395 (multiply ?175396 ?175397) [175397, 175396, 175395] by Demod 43783 with 3 at 2,3
7257 Id : 44792, {_}: multiply a3 (multiply b3 c3) =?= multiply a3 (multiply b3 c3) [] by Demod 1 with 43947 at 2
7258 Id : 1, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
7259 % SZS output end CNFRefutation for GRP477-1.p
7260 9309: solved GRP477-1.p in 14.404899 using kbo
7261 !! infer_left 128 0.0002 0.0000 0.0000
7262 !! infer_right 129 46.8829 1.9968 0.3634
7263 !! simplify_goal 129 0.2569 0.2441 0.0020
7264 !! keep_simplified 442 15.6226 2.4764 0.0353
7265 !! simplification_step 795 15.6128 0.8136 0.0196
7266 !! simplify 49647 46.6288 0.8045 0.0009
7267 !! orphan_murder 525 0.0219 0.0005 0.0000
7268 !! is_subsumed 44239 4.8168 0.8045 0.0001
7269 !! build_new_clause 21388 7.4291 0.8064 0.0003
7270 !! demodulate 49576 41.2861 0.4124 0.0008
7271 !! demod 632193 31.2988 0.4122 0.0000
7272 !! demod.apply_subst 159302 2.3384 0.4005 0.0000
7273 !! demod.compare_terms 56056 2.7296 0.4002 0.0000
7274 !! demod.retrieve_generalizations 632193 18.1739 0.4122 0.0000
7275 !! demod.unify 151415 3.4036 0.4005 0.0000
7276 !! build_clause 44983 7.0199 0.8063 0.0002
7277 !! compare_terms(kbo) 105544 6.7275 0.6569 0.0001
7278 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
7283 (divide (divide (divide ?2 ?2) ?3) (divide ?4 (divide ?3 ?5))))
7287 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
7289 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
7290 [8, 7] by multiply ?7 ?8
7293 multiply (inverse a1) a1 =<= multiply (inverse b1) b1
7294 [] by prove_these_axioms_1
7295 % SZS status Timeout for GRP478-1.p
7300 (divide (divide (divide ?2 ?2) ?3) (divide ?4 (divide ?3 ?5))))
7304 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
7306 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
7307 [8, 7] by multiply ?7 ?8
7310 multiply (multiply (inverse b2) b2) a2 =>= a2
7311 [] by prove_these_axioms_2
7312 % SZS status Timeout for GRP479-1.p
7317 (divide (divide (divide ?2 ?2) ?3) (divide ?4 (divide ?3 ?5))))
7321 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
7323 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
7324 [8, 7] by multiply ?7 ?8
7327 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
7328 [] by prove_these_axioms_3
7329 % SZS status Timeout for GRP480-1.p
7336 (multiply (inverse (multiply ?2 ?3)) (multiply ?3 ?2)))
7337 (multiply (inverse (multiply ?4 ?5))
7340 (multiply (multiply ?6 (inverse ?7)) (inverse ?5)))))))
7344 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
7347 multiply (inverse a1) a1 =<= multiply (inverse b1) b1
7348 [] by prove_these_axioms_1
7349 % SZS status Timeout for GRP505-1.p
7356 (multiply (inverse (multiply ?2 ?3)) (multiply ?3 ?2)))
7357 (multiply (inverse (multiply ?4 ?5))
7360 (multiply (multiply ?6 (inverse ?7)) (inverse ?5)))))))
7364 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
7367 multiply (multiply (inverse b2) b2) a2 =>= a2
7368 [] by prove_these_axioms_2
7369 % SZS status Timeout for GRP506-1.p
7376 (multiply (inverse (multiply ?2 ?3)) (multiply ?3 ?2)))
7377 (multiply (inverse (multiply ?4 ?5))
7380 (multiply (multiply ?6 (inverse ?7)) (inverse ?5)))))))
7384 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
7387 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
7388 [] by prove_these_axioms_3
7389 % SZS status Timeout for GRP507-1.p
7396 (multiply (inverse (multiply ?2 ?3)) (multiply ?3 ?2)))
7397 (multiply (inverse (multiply ?4 ?5))
7400 (multiply (multiply ?6 (inverse ?7)) (inverse ?5)))))))
7404 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
7406 9608: Id : 1, {_}: multiply a b =<= multiply b a [] by prove_these_axioms_4
7407 % SZS status Timeout for GRP508-1.p
7408 Fatal error: exception Assert_failure("matitaprover.ml", 280, 46)
7410 9651: Id : 2, {_}: meet ?2 (join ?2 ?3) =>= ?2 [3, 2] by absorption ?2 ?3
7412 meet ?5 (join ?6 ?7) =<= join (meet ?7 ?5) (meet ?6 ?5)
7413 [7, 6, 5] by distribution ?5 ?6 ?7
7416 join (join a b) c =>= join a (join b c)
7417 [] by prove_associativity_of_join
7420 Found proof, 58.434253s
7421 % SZS status Unsatisfiable for LAT007-1.p
7422 % SZS output start CNFRefutation for LAT007-1.p
7423 Id : 3, {_}: meet ?5 (join ?6 ?7) =<= join (meet ?7 ?5) (meet ?6 ?5) [7, 6, 5] by distribution ?5 ?6 ?7
7424 Id : 2, {_}: meet ?2 (join ?2 ?3) =>= ?2 [3, 2] by absorption ?2 ?3
7425 Id : 7, {_}: meet ?18 (join ?19 ?20) =<= join (meet ?20 ?18) (meet ?19 ?18) [20, 19, 18] by distribution ?18 ?19 ?20
7426 Id : 8, {_}: meet (join ?22 ?23) (join ?22 ?24) =<= join (meet ?24 (join ?22 ?23)) ?22 [24, 23, 22] by Super 7 with 2 at 2,3
7427 Id : 13, {_}: meet (meet ?44 ?45) (meet ?45 (join ?46 ?44)) =>= meet ?44 ?45 [46, 45, 44] by Super 2 with 3 at 2,2
7428 Id : 15, {_}: meet (meet ?53 ?54) ?54 =>= meet ?53 ?54 [54, 53] by Super 13 with 2 at 2,2
7429 Id : 21, {_}: meet ?68 (join (meet ?69 ?68) ?70) =<= join (meet ?70 ?68) (meet ?69 ?68) [70, 69, 68] by Super 3 with 15 at 2,3
7430 Id : 69, {_}: meet ?209 (join (meet ?210 ?209) ?211) =>= meet ?209 (join ?210 ?211) [211, 210, 209] by Demod 21 with 3 at 3
7431 Id : 74, {_}: meet ?231 (meet ?231 (join ?232 ?233)) =<= meet ?231 (join ?233 (meet ?232 ?231)) [233, 232, 231] by Super 69 with 3 at 2,2
7432 Id : 22, {_}: meet ?72 (join ?73 (meet ?74 ?72)) =<= join (meet ?74 ?72) (meet ?73 ?72) [74, 73, 72] by Super 3 with 15 at 1,3
7433 Id : 33, {_}: meet ?72 (join ?73 (meet ?74 ?72)) =>= meet ?72 (join ?73 ?74) [74, 73, 72] by Demod 22 with 3 at 3
7434 Id : 219, {_}: meet ?572 (meet ?572 (join ?573 ?574)) =>= meet ?572 (join ?574 ?573) [574, 573, 572] by Demod 74 with 33 at 3
7435 Id : 224, {_}: meet ?597 ?597 =<= meet ?597 (join ?598 ?597) [598, 597] by Super 219 with 2 at 2,2
7436 Id : 244, {_}: meet (join ?635 ?636) (join ?635 ?636) =>= join (meet ?636 ?636) ?635 [636, 635] by Super 8 with 224 at 1,3
7437 Id : 247, {_}: meet ?644 ?644 =>= ?644 [644] by Super 2 with 224 at 2
7438 Id : 1690, {_}: join ?635 ?636 =<= join (meet ?636 ?636) ?635 [636, 635] by Demod 244 with 247 at 2
7439 Id : 1691, {_}: join ?635 ?636 =?= join ?636 ?635 [636, 635] by Demod 1690 with 247 at 1,3
7440 Id : 359, {_}: meet ?904 (join ?905 ?904) =<= join ?904 (meet ?905 ?904) [905, 904] by Super 3 with 247 at 1,3
7441 Id : 349, {_}: ?597 =<= meet ?597 (join ?598 ?597) [598, 597] by Demod 224 with 247 at 2
7442 Id : 386, {_}: ?904 =<= join ?904 (meet ?905 ?904) [905, 904] by Demod 359 with 349 at 2
7443 Id : 32, {_}: meet ?68 (join (meet ?69 ?68) ?70) =>= meet ?68 (join ?69 ?70) [70, 69, 68] by Demod 21 with 3 at 3
7444 Id : 36, {_}: meet (join ?109 ?110) (join ?109 ?111) =<= join (meet ?111 (join ?109 ?110)) ?109 [111, 110, 109] by Super 7 with 2 at 2,3
7445 Id : 39, {_}: meet (join ?123 ?124) (join ?123 ?123) =>= join ?123 ?123 [124, 123] by Super 36 with 2 at 1,3
7446 Id : 6, {_}: meet (meet ?14 ?15) (meet ?15 (join ?16 ?14)) =>= meet ?14 ?15 [16, 15, 14] by Super 2 with 3 at 2,2
7447 Id : 11, {_}: meet (meet ?34 (join ?35 ?36)) (join (meet ?36 ?34) ?37) =<= join (meet ?37 (meet ?34 (join ?35 ?36))) (meet ?36 ?34) [37, 36, 35, 34] by Super 3 with 6 at 2,3
7448 Id : 364, {_}: meet (meet ?919 (join ?920 ?919)) (join (meet ?919 ?919) ?921) =>= join (meet ?921 (meet ?919 (join ?920 ?919))) ?919 [921, 920, 919] by Super 11 with 247 at 2,3
7449 Id : 370, {_}: meet ?919 (join (meet ?919 ?919) ?921) =<= join (meet ?921 (meet ?919 (join ?920 ?919))) ?919 [920, 921, 919] by Demod 364 with 349 at 1,2
7450 Id : 371, {_}: meet ?919 (join ?919 ?921) =<= join (meet ?921 (meet ?919 (join ?920 ?919))) ?919 [920, 921, 919] by Demod 370 with 247 at 1,2,2
7451 Id : 372, {_}: meet ?919 (join ?919 ?921) =<= join (meet ?921 ?919) ?919 [921, 919] by Demod 371 with 349 at 2,1,3
7452 Id : 411, {_}: ?977 =<= join (meet ?978 ?977) ?977 [978, 977] by Demod 372 with 2 at 2
7453 Id : 419, {_}: ?1004 =<= join ?1004 ?1004 [1004] by Super 411 with 247 at 1,3
7454 Id : 438, {_}: meet (join ?123 ?124) ?123 =>= join ?123 ?123 [124, 123] by Demod 39 with 419 at 2,2
7455 Id : 439, {_}: meet (join ?123 ?124) ?123 =>= ?123 [124, 123] by Demod 438 with 419 at 3
7456 Id : 420, {_}: join ?1006 ?1007 =<= join ?1007 (join ?1006 ?1007) [1007, 1006] by Super 411 with 349 at 1,3
7457 Id : 709, {_}: meet (join ?1606 ?1607) ?1607 =>= ?1607 [1607, 1606] by Super 439 with 420 at 1,2
7458 Id : 1055, {_}: meet ?2275 (join ?2275 ?2276) =<= meet ?2275 (join (join ?2277 ?2275) ?2276) [2277, 2276, 2275] by Super 32 with 709 at 1,2,2
7459 Id : 1088, {_}: ?2275 =<= meet ?2275 (join (join ?2277 ?2275) ?2276) [2276, 2277, 2275] by Demod 1055 with 2 at 2
7460 Id : 2970, {_}: join (join ?5647 ?5648) ?5649 =<= join (join (join ?5647 ?5648) ?5649) ?5648 [5649, 5648, 5647] by Super 386 with 1088 at 2,3
7461 Id : 7417, {_}: join (join ?13817 ?13818) ?13819 =<= join ?13818 (join (join ?13817 ?13818) ?13819) [13819, 13818, 13817] by Demod 2970 with 1691 at 3
7462 Id : 7418, {_}: join (join ?13821 ?13822) ?13823 =<= join ?13822 (join (join ?13822 ?13821) ?13823) [13823, 13822, 13821] by Super 7417 with 1691 at 1,2,3
7463 Id : 2981, {_}: ?5692 =<= meet ?5692 (join (join ?5693 ?5692) ?5694) [5694, 5693, 5692] by Demod 1055 with 2 at 2
7464 Id : 2982, {_}: ?5696 =<= meet ?5696 (join (join ?5696 ?5697) ?5698) [5698, 5697, 5696] by Super 2981 with 1691 at 1,2,3
7465 Id : 7195, {_}: join (join ?13316 ?13317) ?13318 =<= join (join (join ?13316 ?13317) ?13318) ?13316 [13318, 13317, 13316] by Super 386 with 2982 at 2,3
7466 Id : 7303, {_}: join (join ?13316 ?13317) ?13318 =<= join ?13316 (join (join ?13316 ?13317) ?13318) [13318, 13317, 13316] by Demod 7195 with 1691 at 3
7467 Id : 13196, {_}: join (join ?13821 ?13822) ?13823 =?= join (join ?13822 ?13821) ?13823 [13823, 13822, 13821] by Demod 7418 with 7303 at 3
7468 Id : 706, {_}: meet (join ?1593 (join ?1594 ?1593)) (join ?1593 ?1595) =>= join (meet ?1595 (join ?1594 ?1593)) ?1593 [1595, 1594, 1593] by Super 8 with 420 at 2,1,3
7469 Id : 729, {_}: meet (join ?1594 ?1593) (join ?1593 ?1595) =<= join (meet ?1595 (join ?1594 ?1593)) ?1593 [1595, 1593, 1594] by Demod 706 with 420 at 1,2
7470 Id : 2151, {_}: meet (join ?4188 ?4189) (join ?4189 ?4190) =<= join ?4189 (meet ?4190 (join ?4188 ?4189)) [4190, 4189, 4188] by Demod 729 with 1691 at 3
7471 Id : 446, {_}: meet ?1028 (join ?1029 ?1029) =>= meet ?1029 ?1028 [1029, 1028] by Super 3 with 419 at 3
7472 Id : 462, {_}: meet ?1028 ?1029 =?= meet ?1029 ?1028 [1029, 1028] by Demod 446 with 419 at 2,2
7473 Id : 2167, {_}: meet (join ?4254 ?4255) (join ?4255 ?4256) =<= join ?4255 (meet (join ?4254 ?4255) ?4256) [4256, 4255, 4254] by Super 2151 with 462 at 2,3
7474 Id : 2164, {_}: meet (join (meet ?4243 ?4244) ?4245) (join ?4245 ?4244) =>= join ?4245 (meet ?4244 (join ?4243 ?4245)) [4245, 4244, 4243] by Super 2151 with 32 at 2,3
7475 Id : 2223, {_}: meet (join ?4245 ?4244) (join (meet ?4243 ?4244) ?4245) =>= join ?4245 (meet ?4244 (join ?4243 ?4245)) [4243, 4244, 4245] by Demod 2164 with 462 at 2
7476 Id : 2132, {_}: meet (join ?1594 ?1593) (join ?1593 ?1595) =<= join ?1593 (meet ?1595 (join ?1594 ?1593)) [1595, 1593, 1594] by Demod 729 with 1691 at 3
7477 Id : 2224, {_}: meet (join ?4245 ?4244) (join (meet ?4243 ?4244) ?4245) =>= meet (join ?4243 ?4245) (join ?4245 ?4244) [4243, 4244, 4245] by Demod 2223 with 2132 at 3
7478 Id : 210, {_}: meet ?231 (meet ?231 (join ?232 ?233)) =>= meet ?231 (join ?233 ?232) [233, 232, 231] by Demod 74 with 33 at 3
7479 Id : 449, {_}: meet ?1037 (meet ?1037 ?1038) =?= meet ?1037 (join ?1038 ?1038) [1038, 1037] by Super 210 with 419 at 2,2,2
7480 Id : 457, {_}: meet ?1037 (meet ?1037 ?1038) =>= meet ?1037 ?1038 [1038, 1037] by Demod 449 with 419 at 2,3
7481 Id : 763, {_}: meet (meet ?1697 ?1698) (join (meet ?1697 ?1698) ?1699) =>= meet (meet ?1697 ?1698) (join ?1697 ?1699) [1699, 1698, 1697] by Super 32 with 457 at 1,2,2
7482 Id : 794, {_}: meet ?1697 ?1698 =<= meet (meet ?1697 ?1698) (join ?1697 ?1699) [1699, 1698, 1697] by Demod 763 with 2 at 2
7483 Id : 26342, {_}: meet (join ?48276 ?48277) (join ?48277 (meet ?48276 ?48278)) =>= join ?48277 (meet ?48276 ?48278) [48278, 48277, 48276] by Super 2132 with 794 at 2,3
7484 Id : 26351, {_}: meet (join ?48317 ?48318) (join ?48318 (meet ?48319 ?48317)) =>= join ?48318 (meet ?48317 ?48319) [48319, 48318, 48317] by Super 26342 with 462 at 2,2,2
7485 Id : 9, {_}: meet (join ?26 ?27) (join ?28 ?26) =<= join ?26 (meet ?28 (join ?26 ?27)) [28, 27, 26] by Super 7 with 2 at 1,3
7486 Id : 81, {_}: meet (join ?248 (meet ?249 ?250)) (join ?250 ?248) =>= join ?248 (meet ?250 (join ?248 ?249)) [250, 249, 248] by Super 9 with 33 at 2,3
7487 Id : 112, {_}: meet (join ?248 (meet ?249 ?250)) (join ?250 ?248) =>= meet (join ?248 ?249) (join ?250 ?248) [250, 249, 248] by Demod 81 with 9 at 3
7488 Id : 16863, {_}: meet (join ?250 ?248) (join ?248 (meet ?249 ?250)) =>= meet (join ?248 ?249) (join ?250 ?248) [249, 248, 250] by Demod 112 with 462 at 2
7489 Id : 26588, {_}: meet (join ?48318 ?48319) (join ?48317 ?48318) =>= join ?48318 (meet ?48317 ?48319) [48317, 48319, 48318] by Demod 26351 with 16863 at 2
7490 Id : 26835, {_}: join ?4245 (meet (meet ?4243 ?4244) ?4244) =?= meet (join ?4243 ?4245) (join ?4245 ?4244) [4244, 4243, 4245] by Demod 2224 with 26588 at 2
7491 Id : 26836, {_}: join ?4245 (meet ?4244 (meet ?4243 ?4244)) =?= meet (join ?4243 ?4245) (join ?4245 ?4244) [4243, 4244, 4245] by Demod 26835 with 462 at 2,2
7492 Id : 448, {_}: meet ?1034 (meet ?1035 ?1034) =<= meet ?1034 (join (meet ?1035 ?1034) ?1035) [1035, 1034] by Super 33 with 419 at 2,2
7493 Id : 458, {_}: meet ?1034 (meet ?1035 ?1034) =?= meet ?1034 (join ?1035 ?1035) [1035, 1034] by Demod 448 with 32 at 3
7494 Id : 459, {_}: meet ?1034 (meet ?1035 ?1034) =>= meet ?1034 ?1035 [1035, 1034] by Demod 458 with 419 at 2,3
7495 Id : 26837, {_}: join ?4245 (meet ?4244 ?4243) =<= meet (join ?4243 ?4245) (join ?4245 ?4244) [4243, 4244, 4245] by Demod 26836 with 459 at 2,2
7496 Id : 26838, {_}: join ?4255 (meet ?4256 ?4254) =<= join ?4255 (meet (join ?4254 ?4255) ?4256) [4254, 4256, 4255] by Demod 2167 with 26837 at 2
7497 Id : 26932, {_}: join ?49225 (meet (join ?49226 ?49227) ?49227) =?= join ?49225 (join ?49227 (meet ?49226 ?49225)) [49227, 49226, 49225] by Super 26838 with 26588 at 2,3
7498 Id : 27040, {_}: join ?49225 (meet ?49227 (join ?49226 ?49227)) =?= join ?49225 (join ?49227 (meet ?49226 ?49225)) [49226, 49227, 49225] by Demod 26932 with 462 at 2,2
7499 Id : 28159, {_}: join ?51708 ?51709 =<= join ?51708 (join ?51709 (meet ?51710 ?51708)) [51710, 51709, 51708] by Demod 27040 with 349 at 2,2
7500 Id : 28160, {_}: join (join ?51712 ?51713) ?51714 =<= join (join ?51712 ?51713) (join ?51714 ?51712) [51714, 51713, 51712] by Super 28159 with 2 at 2,2,3
7501 Id : 30454, {_}: join (join ?55473 ?55474) (join ?55474 ?55475) =>= join (join ?55474 ?55475) ?55473 [55475, 55474, 55473] by Super 1691 with 28160 at 3
7502 Id : 1053, {_}: meet ?2267 (meet ?2267 (join ?2268 (join ?2269 ?2267))) =>= meet (join ?2269 ?2267) ?2267 [2269, 2268, 2267] by Super 6 with 709 at 1,2
7503 Id : 1090, {_}: meet ?2267 (join ?2268 (join ?2269 ?2267)) =>= meet (join ?2269 ?2267) ?2267 [2269, 2268, 2267] by Demod 1053 with 457 at 2
7504 Id : 1091, {_}: meet ?2267 (join ?2268 (join ?2269 ?2267)) =>= ?2267 [2269, 2268, 2267] by Demod 1090 with 709 at 3
7505 Id : 3083, {_}: join ?5841 (join ?5842 ?5843) =<= join (join ?5841 (join ?5842 ?5843)) ?5843 [5843, 5842, 5841] by Super 386 with 1091 at 2,3
7506 Id : 8228, {_}: join ?15528 (join ?15529 ?15530) =<= join ?15530 (join ?15528 (join ?15529 ?15530)) [15530, 15529, 15528] by Demod 3083 with 1691 at 3
7507 Id : 8229, {_}: join ?15532 (join ?15533 ?15534) =<= join ?15534 (join ?15532 (join ?15534 ?15533)) [15534, 15533, 15532] by Super 8228 with 1691 at 2,2,3
7508 Id : 3108, {_}: meet ?5950 (join ?5951 (join ?5952 ?5950)) =>= ?5950 [5952, 5951, 5950] by Demod 1090 with 709 at 3
7509 Id : 3109, {_}: meet ?5954 (join ?5955 (join ?5954 ?5956)) =>= ?5954 [5956, 5955, 5954] by Super 3108 with 1691 at 2,2,2
7510 Id : 7993, {_}: join ?15004 (join ?15005 ?15006) =<= join (join ?15004 (join ?15005 ?15006)) ?15005 [15006, 15005, 15004] by Super 386 with 3109 at 2,3
7511 Id : 8109, {_}: join ?15004 (join ?15005 ?15006) =<= join ?15005 (join ?15004 (join ?15005 ?15006)) [15006, 15005, 15004] by Demod 7993 with 1691 at 3
7512 Id : 14115, {_}: join ?15532 (join ?15533 ?15534) =?= join ?15532 (join ?15534 ?15533) [15534, 15533, 15532] by Demod 8229 with 8109 at 3
7513 Id : 27041, {_}: join ?49225 ?49227 =<= join ?49225 (join ?49227 (meet ?49226 ?49225)) [49226, 49227, 49225] by Demod 27040 with 349 at 2,2
7514 Id : 28963, {_}: join ?53277 (join (meet ?53278 ?53277) ?53279) =>= join ?53277 ?53279 [53279, 53278, 53277] by Super 14115 with 27041 at 3
7515 Id : 28992, {_}: join (join ?53418 ?53419) (join ?53419 ?53420) =>= join (join ?53418 ?53419) ?53420 [53420, 53419, 53418] by Super 28963 with 349 at 1,2,2
7516 Id : 32176, {_}: join (join ?55473 ?55474) ?55475 =?= join (join ?55474 ?55475) ?55473 [55475, 55474, 55473] by Demod 30454 with 28992 at 2
7517 Id : 32269, {_}: join ?59536 (join ?59537 ?59538) =<= join (join ?59538 ?59536) ?59537 [59538, 59537, 59536] by Super 1691 with 32176 at 3
7518 Id : 32611, {_}: join ?13822 (join ?13823 ?13821) =<= join (join ?13822 ?13821) ?13823 [13821, 13823, 13822] by Demod 13196 with 32269 at 2
7519 Id : 32612, {_}: join ?13822 (join ?13823 ?13821) =?= join ?13821 (join ?13823 ?13822) [13821, 13823, 13822] by Demod 32611 with 32269 at 3
7520 Id : 32593, {_}: join ?53419 (join (join ?53419 ?53420) ?53418) =>= join (join ?53418 ?53419) ?53420 [53418, 53420, 53419] by Demod 28992 with 32269 at 2
7521 Id : 32594, {_}: join ?53419 (join (join ?53419 ?53420) ?53418) =>= join ?53419 (join ?53420 ?53418) [53418, 53420, 53419] by Demod 32593 with 32269 at 3
7522 Id : 32595, {_}: join ?53419 (join ?53420 (join ?53418 ?53419)) =>= join ?53419 (join ?53420 ?53418) [53418, 53420, 53419] by Demod 32594 with 32269 at 2,2
7523 Id : 3172, {_}: join ?5841 (join ?5842 ?5843) =<= join ?5843 (join ?5841 (join ?5842 ?5843)) [5843, 5842, 5841] by Demod 3083 with 1691 at 3
7524 Id : 32642, {_}: join ?53420 (join ?53418 ?53419) =?= join ?53419 (join ?53420 ?53418) [53419, 53418, 53420] by Demod 32595 with 3172 at 2
7525 Id : 33043, {_}: join a (join b c) =?= join a (join b c) [] by Demod 33042 with 1691 at 2,2
7526 Id : 33042, {_}: join a (join c b) =?= join a (join b c) [] by Demod 33041 with 32642 at 2
7527 Id : 33041, {_}: join b (join a c) =>= join a (join b c) [] by Demod 33040 with 32612 at 2
7528 Id : 33040, {_}: join c (join a b) =>= join a (join b c) [] by Demod 1 with 1691 at 2
7529 Id : 1, {_}: join (join a b) c =>= join a (join b c) [] by prove_associativity_of_join
7530 % SZS output end CNFRefutation for LAT007-1.p
7531 9652: solved LAT007-1.p in 14.596912 using kbo
7532 !! infer_left 203 0.0003 0.0000 0.0000
7533 !! infer_right 118 55.4218 3.2814 0.4697
7534 !! simplify_goal 203 0.0579 0.0016 0.0003
7535 !! keep_simplified 501 2.2669 0.3590 0.0045
7536 !! simplification_step 603 2.2650 0.3133 0.0038
7537 !! simplify 22012 52.3472 0.3403 0.0024
7538 !! orphan_murder 501 0.6142 0.3002 0.0012
7539 !! is_subsumed 16973 4.5385 0.3004 0.0003
7540 !! build_new_clause 14594 3.4126 0.3082 0.0002
7541 !! demodulate 21554 47.1885 0.3403 0.0022
7542 !! demod 173155 44.9647 0.3364 0.0003
7543 !! demod.apply_subst 774336 7.0628 0.3041 0.0000
7544 !! demod.compare_terms 371671 19.7209 0.3321 0.0001
7545 !! demod.retrieve_generalizations 173155 3.2162 0.3041 0.0000
7546 !! demod.unify 755496 6.3850 0.3361 0.0000
7547 !! build_clause 34450 3.8866 0.3133 0.0001
7548 !! compare_terms(kbo) 410252 19.6929 0.3321 0.0000
7549 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
7551 9671: Id : 2, {_}: join (complement ?2) ?2 =>= n1 [2] by top ?2
7552 9671: Id : 3, {_}: meet (complement ?4) ?4 =>= n0 [4] by bottom ?4
7553 9671: Id : 4, {_}: join ?6 (meet ?6 ?7) =>= ?6 [7, 6] by absorption2 ?6 ?7
7555 meet ?9 ?10 =<->= meet ?10 ?9
7556 [10, 9] by commutativity_of_meet ?9 ?10
7558 join ?12 ?13 =<->= join ?13 ?12
7559 [13, 12] by commutativity_of_join ?12 ?13
7561 meet (meet ?15 ?16) ?17 =?= meet ?15 (meet ?16 ?17)
7562 [17, 16, 15] by associativity_of_meet ?15 ?16 ?17
7564 join (join ?19 ?20) ?21 =?= join ?19 (join ?20 ?21)
7565 [21, 20, 19] by associativity_of_join ?19 ?20 ?21
7567 complement (complement ?23) =>= ?23
7568 [23] by complement_involution ?23
7570 join ?25 (join ?26 (complement ?26)) =>= join ?26 (complement ?26)
7571 [26, 25] by join_complement ?25 ?26
7573 meet ?28 ?29 =<= complement (join (complement ?28) (complement ?29))
7574 [29, 28] by meet_complement ?28 ?29
7577 join (complement (join (meet a (complement b)) (complement a)))
7578 (join (meet a (complement b))
7580 (meet (complement a) (meet (join a (complement b)) (join a b)))
7581 (meet (complement a)
7582 (complement (meet (join a (complement b)) (join a b))))))
7586 % SZS status Timeout for LAT016-1.p
7588 9698: Id : 2, {_}: join (complement ?2) ?2 =>= n1 [2] by top ?2
7589 9698: Id : 3, {_}: meet (complement ?4) ?4 =>= n0 [4] by bottom ?4
7590 9698: Id : 4, {_}: join ?6 (meet ?6 ?7) =>= ?6 [7, 6] by absorption2 ?6 ?7
7592 meet ?9 ?10 =<->= meet ?10 ?9
7593 [10, 9] by commutativity_of_meet ?9 ?10
7595 join ?12 ?13 =<->= join ?13 ?12
7596 [13, 12] by commutativity_of_join ?12 ?13
7598 meet (meet ?15 ?16) ?17 =?= meet ?15 (meet ?16 ?17)
7599 [17, 16, 15] by associativity_of_meet ?15 ?16 ?17
7601 join (join ?19 ?20) ?21 =?= join ?19 (join ?20 ?21)
7602 [21, 20, 19] by associativity_of_join ?19 ?20 ?21
7604 complement (complement ?23) =>= ?23
7605 [23] by complement_involution ?23
7607 join ?25 (join ?26 (complement ?26)) =>= join ?26 (complement ?26)
7608 [26, 25] by join_complement ?25 ?26
7610 meet ?28 ?29 =<= complement (join (complement ?28) (complement ?29))
7611 [29, 28] by meet_complement ?28 ?29
7616 (meet (complement a) (meet (join a (complement b)) (join a b)))
7617 (meet (complement a)
7618 (join (meet (complement a) b)
7619 (meet (complement a) (complement b)))))
7623 % SZS status Timeout for LAT017-1.p
7625 9737: Id : 2, {_}: join (complement ?2) ?2 =>= n1 [2] by top ?2
7626 9737: Id : 3, {_}: meet (complement ?4) ?4 =>= n0 [4] by bottom ?4
7627 9737: Id : 4, {_}: join ?6 (meet ?6 ?7) =>= ?6 [7, 6] by absorption2 ?6 ?7
7629 meet ?9 ?10 =<->= meet ?10 ?9
7630 [10, 9] by commutativity_of_meet ?9 ?10
7632 join ?12 ?13 =<->= join ?13 ?12
7633 [13, 12] by commutativity_of_join ?12 ?13
7635 meet (meet ?15 ?16) ?17 =?= meet ?15 (meet ?16 ?17)
7636 [17, 16, 15] by associativity_of_meet ?15 ?16 ?17
7638 join (join ?19 ?20) ?21 =?= join ?19 (join ?20 ?21)
7639 [21, 20, 19] by associativity_of_join ?19 ?20 ?21
7641 complement (complement ?23) =>= ?23
7642 [23] by complement_involution ?23
7644 join ?25 (join ?26 (complement ?26)) =>= join ?26 (complement ?26)
7645 [26, 25] by join_complement ?25 ?26
7647 meet ?28 ?29 =<= complement (join (complement ?28) (complement ?29))
7648 [29, 28] by meet_complement ?28 ?29
7654 (join (meet (complement a) b)
7655 (meet (complement a) (complement b)))
7656 (meet a (join (complement a) b)))) (join (complement a) b)
7660 % SZS status Timeout for LAT018-1.p
7662 9764: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7663 9764: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7665 meet ?6 ?7 =<->= meet ?7 ?6
7666 [7, 6] by commutativity_of_meet ?6 ?7
7668 join ?9 ?10 =<->= join ?10 ?9
7669 [10, 9] by commutativity_of_join ?9 ?10
7671 meet (meet ?12 ?13) ?14 =?= meet ?12 (meet ?13 ?14)
7672 [14, 13, 12] by associativity_of_meet ?12 ?13 ?14
7674 join (join ?16 ?17) ?18 =?= join ?16 (join ?17 ?18)
7675 [18, 17, 16] by associativity_of_join ?16 ?17 ?18
7677 join (meet ?20 (join ?21 ?22)) (meet ?20 ?21)
7679 meet ?20 (join ?21 ?22)
7680 [22, 21, 20] by quasi_lattice1 ?20 ?21 ?22
7682 meet (join ?24 (meet ?25 ?26)) (join ?24 ?25)
7684 join ?24 (meet ?25 ?26)
7685 [26, 25, 24] by quasi_lattice2 ?24 ?25 ?26
7687 join (meet (join (meet ?28 ?29) ?30) ?29) (meet ?30 ?28)
7689 meet (join (meet (join ?28 ?29) ?30) ?29) (join ?30 ?28)
7690 [30, 29, 28] by self_dual_distributivity ?28 ?29 ?30
7693 meet a (join b c) =<= join (meet a b) (meet a c)
7694 [] by prove_distributivity
7695 % SZS status Timeout for LAT020-1.p
7697 9802: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7698 9802: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7700 meet ?6 ?7 =<->= meet ?7 ?6
7701 [7, 6] by commutativity_of_meet ?6 ?7
7703 join ?9 ?10 =<->= join ?10 ?9
7704 [10, 9] by commutativity_of_join ?9 ?10
7706 meet (meet ?12 ?13) ?14 =?= meet ?12 (meet ?13 ?14)
7707 [14, 13, 12] by associativity_of_meet ?12 ?13 ?14
7709 join (join ?16 ?17) ?18 =?= join ?16 (join ?17 ?18)
7710 [18, 17, 16] by associativity_of_join ?16 ?17 ?18
7712 join (meet ?20 (join ?21 ?22)) (meet ?20 ?21)
7714 meet ?20 (join ?21 ?22)
7715 [22, 21, 20] by quasi_lattice1 ?20 ?21 ?22
7717 meet (join ?24 (meet ?25 ?26)) (join ?24 ?25)
7719 join ?24 (meet ?25 ?26)
7720 [26, 25, 24] by quasi_lattice2 ?24 ?25 ?26
7721 9802: Id : 10, {_}: meet2 ?28 ?28 =>= ?28 [28] by idempotence_of_meet2 ?28
7723 meet2 ?30 ?31 =<->= meet2 ?31 ?30
7724 [31, 30] by commutativity_of_meet2 ?30 ?31
7726 meet2 (meet2 ?33 ?34) ?35 =?= meet2 ?33 (meet2 ?34 ?35)
7727 [35, 34, 33] by associativity_of_meet2 ?33 ?34 ?35
7729 join (meet2 ?37 (join ?38 ?39)) (meet2 ?37 ?38)
7731 meet2 ?37 (join ?38 ?39)
7732 [39, 38, 37] by quasi_lattice1_2 ?37 ?38 ?39
7734 meet2 (join ?41 (meet2 ?42 ?43)) (join ?41 ?42)
7736 join ?41 (meet2 ?42 ?43)
7737 [43, 42, 41] by quasi_lattice2_2 ?41 ?42 ?43
7739 9802: Id : 1, {_}: meet a b =<= meet2 a b [] by prove_meets_equal
7740 % SZS status Timeout for LAT024-1.p
7742 9894: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7743 9894: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7744 9894: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7745 9894: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7747 meet ?12 ?13 =<->= meet ?13 ?12
7748 [13, 12] by commutativity_of_meet ?12 ?13
7750 join ?15 ?16 =<->= join ?16 ?15
7751 [16, 15] by commutativity_of_join ?15 ?16
7753 join ?18 (meet ?19 (meet ?18 ?20)) =>= ?18
7754 [20, 19, 18] by tnl_1 ?18 ?19 ?20
7756 meet ?22 (join ?23 (join ?22 ?24)) =>= ?22
7757 [24, 23, 22] by tnl_2 ?22 ?23 ?24
7758 9894: Id : 10, {_}: meet2 ?26 ?26 =>= ?26 [26] by idempotence_of_meet2 ?26
7760 meet2 ?28 (join ?28 ?29) =>= ?28
7761 [29, 28] by absorption1_2 ?28 ?29
7763 join ?31 (meet2 ?31 ?32) =>= ?31
7764 [32, 31] by absorption2_2 ?31 ?32
7766 meet2 ?34 ?35 =<->= meet2 ?35 ?34
7767 [35, 34] by commutativity_of_meet2 ?34 ?35
7769 join ?37 (meet2 ?38 (meet2 ?37 ?39)) =>= ?37
7770 [39, 38, 37] by tnl_1_2 ?37 ?38 ?39
7772 meet2 ?41 (join ?42 (join ?41 ?43)) =>= ?41
7773 [43, 42, 41] by tnl_2_2 ?41 ?42 ?43
7775 9894: Id : 1, {_}: meet a b =<= meet2 a b [] by prove_meets_equal
7776 % SZS status Timeout for LAT025-1.p
7778 9936: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7779 9936: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7780 9936: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7781 9936: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7783 meet ?12 ?13 =<->= meet ?13 ?12
7784 [13, 12] by commutativity_of_meet ?12 ?13
7786 join ?15 ?16 =<->= join ?16 ?15
7787 [16, 15] by commutativity_of_join ?15 ?16
7789 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7790 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7792 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7793 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7795 complement (join ?26 ?27) =<= meet (complement ?26) (complement ?27)
7796 [27, 26] by compatibility1 ?26 ?27
7798 complement (meet ?29 ?30) =<= join (complement ?29) (complement ?30)
7799 [30, 29] by compatibility2 ?29 ?30
7800 9936: Id : 12, {_}: join (complement ?32) ?32 =>= n1 [32] by invertability1 ?32
7801 9936: Id : 13, {_}: meet (complement ?34) ?34 =>= n0 [34] by invertability2 ?34
7802 9936: Id : 14, {_}: complement (complement ?36) =>= ?36 [36] by invertability3 ?36
7804 join ?38 (meet ?39 (join ?38 ?40))
7806 meet (join ?38 ?39) (join ?38 ?40)
7807 [40, 39, 38] by modular_law ?38 ?39 ?40
7810 meet a (join b c) =<= join (meet a b) (meet a c)
7811 [] by prove_distributivity
7812 % SZS status Timeout for LAT046-1.p
7814 9983: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7815 9983: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7816 9983: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7817 9983: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7819 meet ?12 ?13 =<->= meet ?13 ?12
7820 [13, 12] by commutativity_of_meet ?12 ?13
7822 join ?15 ?16 =<->= join ?16 ?15
7823 [16, 15] by commutativity_of_join ?15 ?16
7825 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7826 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7828 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7829 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7832 join a (meet b (join a c)) =>= meet (join a b) (join a c)
7833 [] by prove_modularity
7834 % SZS status Timeout for LAT047-1.p
7836 10021: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7837 10021: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7838 10021: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7839 10021: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7841 meet ?12 ?13 =<->= meet ?13 ?12
7842 [13, 12] by commutativity_of_meet ?12 ?13
7844 join ?15 ?16 =<->= join ?16 ?15
7845 [16, 15] by commutativity_of_join ?15 ?16
7847 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7848 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7850 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7851 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7852 10021: Id : 10, {_}:
7853 complement (join ?26 ?27) =<= meet (complement ?26) (complement ?27)
7854 [27, 26] by compatibility1 ?26 ?27
7855 10021: Id : 11, {_}:
7856 complement (meet ?29 ?30) =<= join (complement ?29) (complement ?30)
7857 [30, 29] by compatibility2 ?29 ?30
7858 10021: Id : 12, {_}: join (complement ?32) ?32 =>= n1 [32] by invertability1 ?32
7859 10021: Id : 13, {_}: meet (complement ?34) ?34 =>= n0 [34] by invertability2 ?34
7860 10021: Id : 14, {_}: complement (complement ?36) =>= ?36 [36] by invertability3 ?36
7861 10021: Id : 15, {_}:
7862 join (meet (complement ?38) (join ?38 ?39))
7863 (join (complement ?39) (meet ?38 ?39))
7866 [39, 38] by weak_orthomodular_law ?38 ?39
7869 join a (meet (complement a) (join a b)) =>= join a b
7870 [] by prove_orthomodular_law
7871 % SZS status Timeout for LAT048-1.p
7873 10048: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7874 10048: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7875 10048: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7876 10048: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7878 meet ?12 ?13 =<->= meet ?13 ?12
7879 [13, 12] by commutativity_of_meet ?12 ?13
7881 join ?15 ?16 =<->= join ?16 ?15
7882 [16, 15] by commutativity_of_join ?15 ?16
7884 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7885 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7887 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7888 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7889 10048: Id : 10, {_}:
7890 complement (join ?26 ?27) =<= meet (complement ?26) (complement ?27)
7891 [27, 26] by compatibility1 ?26 ?27
7892 10048: Id : 11, {_}:
7893 complement (meet ?29 ?30) =<= join (complement ?29) (complement ?30)
7894 [30, 29] by compatibility2 ?29 ?30
7895 10048: Id : 12, {_}: join (complement ?32) ?32 =>= n1 [32] by invertability1 ?32
7896 10048: Id : 13, {_}: meet (complement ?34) ?34 =>= n0 [34] by invertability2 ?34
7897 10048: Id : 14, {_}: complement (complement ?36) =>= ?36 [36] by invertability3 ?36
7900 join (meet (complement a) (join a b))
7901 (join (complement b) (meet a b))
7904 [] by prove_weak_orthomodular_law
7905 % SZS status Timeout for LAT049-1.p
7907 10087: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7908 10087: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7909 10087: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7910 10087: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7912 meet ?12 ?13 =<->= meet ?13 ?12
7913 [13, 12] by commutativity_of_meet ?12 ?13
7915 join ?15 ?16 =<->= join ?16 ?15
7916 [16, 15] by commutativity_of_join ?15 ?16
7918 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7919 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7921 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7922 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7923 10087: Id : 10, {_}:
7924 complement (join ?26 ?27) =<= meet (complement ?26) (complement ?27)
7925 [27, 26] by compatibility1 ?26 ?27
7926 10087: Id : 11, {_}:
7927 complement (meet ?29 ?30) =<= join (complement ?29) (complement ?30)
7928 [30, 29] by compatibility2 ?29 ?30
7929 10087: Id : 12, {_}: join (complement ?32) ?32 =>= n1 [32] by invertability1 ?32
7930 10087: Id : 13, {_}: meet (complement ?34) ?34 =>= n0 [34] by invertability2 ?34
7931 10087: Id : 14, {_}: complement (complement ?36) =>= ?36 [36] by invertability3 ?36
7932 10087: Id : 15, {_}:
7933 join ?38 (meet (complement ?38) (join ?38 ?39)) =>= join ?38 ?39
7934 [39, 38] by orthomodular_law ?38 ?39
7937 join a (meet b (join a c)) =>= meet (join a b) (join a c)
7938 [] by prove_modular_law
7939 % SZS status Timeout for LAT050-1.p
7941 10116: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7942 10116: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7943 10116: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7944 10116: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7946 meet ?12 ?13 =<->= meet ?13 ?12
7947 [13, 12] by commutativity_of_meet ?12 ?13
7949 join ?15 ?16 =<->= join ?16 ?15
7950 [16, 15] by commutativity_of_join ?15 ?16
7952 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7953 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7955 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7956 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7957 10116: Id : 10, {_}: join (complement ?26) ?26 =>= n1 [26] by invertability1 ?26
7958 10116: Id : 11, {_}: meet (complement ?28) ?28 =>= n0 [28] by invertability2 ?28
7959 10116: Id : 12, {_}: complement (complement ?30) =>= ?30 [30] by invertability3 ?30
7962 complement (join a b) =<= meet (complement a) (complement b)
7963 [] by prove_compatibility_law
7964 % SZS status Timeout for LAT051-1.p
7966 10155: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7967 10155: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7968 10155: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7969 10155: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7971 meet ?12 ?13 =<->= meet ?13 ?12
7972 [13, 12] by commutativity_of_meet ?12 ?13
7974 join ?15 ?16 =<->= join ?16 ?15
7975 [16, 15] by commutativity_of_join ?15 ?16
7977 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7978 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7980 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7981 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7982 10155: Id : 10, {_}: join (complement ?26) ?26 =>= n1 [26] by invertability1 ?26
7983 10155: Id : 11, {_}: meet (complement ?28) ?28 =>= n0 [28] by invertability2 ?28
7984 10155: Id : 12, {_}: complement (complement ?30) =>= ?30 [30] by invertability3 ?30
7985 10155: Id : 13, {_}:
7986 join ?32 (meet ?33 (join ?32 ?34))
7988 meet (join ?32 ?33) (join ?32 ?34)
7989 [34, 33, 32] by modular_law ?32 ?33 ?34
7992 complement (join a b) =<= meet (complement a) (complement b)
7993 [] by prove_compatibility_law
7994 % SZS status Timeout for LAT052-1.p
7996 10183: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7997 10183: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7998 10183: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7999 10183: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
8001 meet ?12 ?13 =<->= meet ?13 ?12
8002 [13, 12] by commutativity_of_meet ?12 ?13
8004 join ?15 ?16 =<->= join ?16 ?15
8005 [16, 15] by commutativity_of_join ?15 ?16
8007 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
8008 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
8010 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
8011 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
8012 10183: Id : 10, {_}:
8013 complement (join ?26 ?27) =<= meet (complement ?26) (complement ?27)
8014 [27, 26] by compatibility1 ?26 ?27
8015 10183: Id : 11, {_}:
8016 complement (meet ?29 ?30) =<= join (complement ?29) (complement ?30)
8017 [30, 29] by compatibility2 ?29 ?30
8018 10183: Id : 12, {_}: join (complement ?32) ?32 =>= n1 [32] by invertability1 ?32
8019 10183: Id : 13, {_}: meet (complement ?34) ?34 =>= n0 [34] by invertability2 ?34
8020 10183: Id : 14, {_}: complement (complement ?36) =>= ?36 [36] by invertability3 ?36
8021 10183: Id : 15, {_}:
8022 join (meet (complement ?38) (join ?38 ?39))
8023 (join (complement ?39) (meet ?38 ?39))
8026 [39, 38] by megill ?38 ?39
8029 meet a (join b (meet a (join (complement a) (meet a b))))
8031 meet a (join (complement a) (meet a b))
8033 % SZS status Timeout for LAT053-1.p
8035 10221: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
8036 10221: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
8037 10221: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
8038 10221: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
8040 meet ?12 ?13 =<->= meet ?13 ?12
8041 [13, 12] by commutativity_of_meet ?12 ?13
8043 join ?15 ?16 =<->= join ?16 ?15
8044 [16, 15] by commutativity_of_join ?15 ?16
8046 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
8047 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
8049 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
8050 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
8051 10221: Id : 10, {_}:
8052 complement (join ?26 ?27) =<= meet (complement ?26) (complement ?27)
8053 [27, 26] by compatibility1 ?26 ?27
8054 10221: Id : 11, {_}:
8055 complement (meet ?29 ?30) =<= join (complement ?29) (complement ?30)
8056 [30, 29] by compatibility2 ?29 ?30
8057 10221: Id : 12, {_}: join (complement ?32) ?32 =>= n1 [32] by invertability1 ?32
8058 10221: Id : 13, {_}: meet (complement ?34) ?34 =>= n0 [34] by invertability2 ?34
8059 10221: Id : 14, {_}: complement (complement ?36) =>= ?36 [36] by invertability3 ?36
8063 (meet (complement b)
8064 (join (complement a)
8065 (meet (complement b)
8066 (join a (meet (complement b) (complement a))))))
8069 (meet (complement b)
8070 (join (complement a)
8071 (meet (complement b)
8073 (meet (complement b)
8074 (join (complement a) (meet (complement b) a)))))))
8076 % SZS status Timeout for LAT054-1.p
8078 10248: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
8079 10248: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
8080 10248: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
8081 10248: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
8083 meet ?12 ?13 =<->= meet ?13 ?12
8084 [13, 12] by commutativity_of_meet ?12 ?13
8086 join ?15 ?16 =<->= join ?16 ?15
8087 [16, 15] by commutativity_of_join ?15 ?16
8089 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
8090 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
8092 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
8093 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
8094 10248: Id : 10, {_}: join (complement ?26) ?26 =>= n1 [26] by top ?26
8095 10248: Id : 11, {_}: meet (complement ?28) ?28 =>= n0 [28] by bottom ?28
8096 10248: Id : 12, {_}:
8097 meet ?30 ?31 =<= complement (join (complement ?30) (complement ?31))
8098 [31, 30] by compatibility ?30 ?31
8101 meet (join a (complement b))
8102 (join (join (meet a b) (meet (complement a) b))
8103 (meet (complement a) (complement b)))
8105 join (meet a b) (meet (complement a) (complement b))
8107 % SZS status Timeout for LAT062-1.p
8109 11279: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
8110 11279: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
8111 11279: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
8112 11279: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
8114 meet ?12 ?13 =<->= meet ?13 ?12
8115 [13, 12] by commutativity_of_meet ?12 ?13
8117 join ?15 ?16 =<->= join ?16 ?15
8118 [16, 15] by commutativity_of_join ?15 ?16
8120 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
8121 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
8123 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
8124 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
8125 11279: Id : 10, {_}: join (complement ?26) ?26 =>= n1 [26] by top ?26
8126 11279: Id : 11, {_}: meet (complement ?28) ?28 =>= n0 [28] by bottom ?28
8127 11279: Id : 12, {_}:
8128 meet ?30 ?31 =<= complement (join (complement ?30) (complement ?31))
8129 [31, 30] by compatibility ?30 ?31
8132 meet a (join b (meet a (join (complement a) (meet a b))))
8134 meet a (join (complement a) (meet a b))
8136 % SZS status Timeout for LAT063-1.p
8139 f (f (f (f ?2 ?3) (f ?3 ?4)) ?5)
8140 (f ?3 (f (f ?3 (f (f ?2 ?2) ?2)) ?4))
8143 [5, 4, 3, 2] by ol_23A ?2 ?3 ?4 ?5
8146 f a (f (f b c) (f b c)) =<= f c (f (f b a) (f b a))
8148 % SZS status Timeout for LAT070-1.p
8151 f (f ?2 ?3) (f (f (f (f ?2 ?3) ?3) (f ?4 ?3)) (f (f ?3 ?3) ?5))
8154 [5, 4, 3, 2] by oml_21C ?2 ?3 ?4 ?5
8157 f a (f (f b c) (f b c)) =<= f c (f (f b a) (f b a))
8159 % SZS status Timeout for LAT071-1.p
8162 f (f (f (f ?2 ?3) (f ?3 ?4)) ?5)
8163 (f ?3 (f (f ?4 (f (f ?3 ?3) ?4)) ?4))
8166 [5, 4, 3, 2] by oml_23A ?2 ?3 ?4 ?5
8169 f a (f (f b c) (f b c)) =<= f c (f (f b a) (f b a))
8171 % SZS status Timeout for LAT072-1.p
8174 f (f (f ?2 (f ?3 ?2)) ?2)
8175 (f ?3 (f ?4 (f (f ?3 ?2) (f (f ?4 ?4) ?5))))
8178 [5, 4, 3, 2] by mol_23C ?2 ?3 ?4 ?5
8181 f a (f b (f a (f c c))) =<= f a (f c (f a (f b b)))
8183 % SZS status Timeout for LAT073-1.p
8187 (f (f (f ?3 ?3) ?4) (f (f (f (f (f ?3 ?2) ?4) ?4) ?3) (f ?3 ?5)))
8190 [5, 4, 3, 2] by mol_25A ?2 ?3 ?4 ?5
8193 f a (f (f b c) (f b c)) =<= f c (f (f b a) (f b a))
8195 % SZS status Timeout for LAT074-1.p
8199 (f (f (f ?3 ?3) ?4) (f (f (f (f (f ?3 ?2) ?4) ?4) ?3) (f ?3 ?5)))
8202 [5, 4, 3, 2] by mol_25A ?2 ?3 ?4 ?5
8205 f a (f b (f a (f c c))) =<= f a (f c (f a (f b b)))
8207 % SZS status Timeout for LAT075-1.p
8210 f (f (f (f ?2 ?3) (f ?4 ?3)) ?5)
8211 (f ?3 (f (f (f (f (f (f ?2 ?2) ?3) ?4) ?4) ?3) ?2))
8214 [5, 4, 3, 2] by mol_27B1 ?2 ?3 ?4 ?5
8217 f a (f (f b c) (f b c)) =<= f c (f (f b a) (f b a))
8219 % SZS status Timeout for LAT076-1.p
8222 f (f (f (f ?2 ?3) (f ?4 ?3)) ?5)
8223 (f ?3 (f (f (f (f (f (f ?2 ?2) ?3) ?4) ?4) ?3) ?2))
8226 [5, 4, 3, 2] by mol_27B1 ?2 ?3 ?4 ?5
8229 f a (f b (f a (f c c))) =<= f a (f c (f a (f b b)))
8231 % SZS status Timeout for LAT077-1.p
8234 f (f (f (f ?2 ?3) (f ?3 ?4)) ?5)
8235 (f ?3 (f (f (f ?2 (f ?2 (f (f ?4 ?4) ?3))) ?3) ?4))
8238 [5, 4, 3, 2] by mol_27B2 ?2 ?3 ?4 ?5
8241 f a (f (f b c) (f b c)) =<= f c (f (f b a) (f b a))
8243 % SZS status Timeout for LAT078-1.p
8246 f (f (f (f ?2 ?3) (f ?3 ?4)) ?5)
8247 (f ?3 (f (f (f ?2 (f ?2 (f (f ?4 ?4) ?3))) ?3) ?4))
8250 [5, 4, 3, 2] by mol_27B2 ?2 ?3 ?4 ?5
8253 f a (f b (f a (f c c))) =<= f a (f c (f a (f b b)))
8255 % SZS status Timeout for LAT079-1.p
8258 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8260 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8264 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8267 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8268 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8269 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8272 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8274 11789: Id : 1, {_}: meet a a =>= a [] by prove_normal_axioms_1
8277 Found proof, 80.600970s
8278 % SZS status Unsatisfiable for LAT080-1.p
8279 % SZS output start CNFRefutation for LAT080-1.p
8280 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)) (meet (join (meet ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)) (meet ?8 (join ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)))) (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8281 Id : 3, {_}: join (meet (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12) (meet (join (meet ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)) (meet (join (meet ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)) (meet ?16 (join ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)))) (join ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)))) (join (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12)) =>= ?11 [16, 15, 14, 13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13 ?14 ?15 ?16
8282 Id : 11, {_}: join (meet (join (meet ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) (join ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))))) ?109) (meet (join (meet ?106 (join (join (meet ?110 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) ?111)) (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))))) (meet ?108 (join ?106 (join (join (meet ?110 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) ?111)) (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))))))) (join (join (meet ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) (join ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))))) ?109)) =>= join (meet ?107 ?108) (meet ?108 (join ?107 ?108)) [111, 110, 109, 108, 107, 106] by Super 3 with 2 at 1,2,1,2,2
8283 Id : 37, {_}: join (meet (join (meet ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) (join ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))))) ?276) (meet (join (meet ?273 (join (join (meet ?277 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) ?278)) (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))))) (meet ?275 (join ?273 (join (join (meet ?277 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) ?278)) (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))))))) (join (join (meet ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) (join ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))))) ?276)) =>= join (meet ?274 ?275) (meet ?275 (join ?274 ?275)) [278, 277, 276, 275, 274, 273] by Super 3 with 2 at 1,2,1,2,2
8284 Id : 40, {_}: join (meet (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))))) ?310) (meet (join (meet ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 305, 304, 303] by Super 37 with 2 at 2,2,2,1,2,2,2
8285 Id : 124, {_}: join (meet (join (meet ?303 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 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(join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 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8286 Id : 125, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) 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(meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 304, 305, 303] by Demod 124 with 2 at 1,2,1,1,2
8287 Id : 126, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet 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?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 309, 308, 307, 306, 304, 311, 310, 305, 303] by Demod 125 with 2 at 2,2,2,1,1,2
8288 Id : 127, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join 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?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 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8289 Id : 128, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) 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(meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join 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8290 Id : 129, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join 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?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 128 with 2 at 2,2,1,1,2,2
8291 Id : 130, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 129 with 2 at 2,1,1,2,2,2,1,2,2
8292 Id : 131, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 130 with 2 at 1,2,1,2,2,2,1,2,2
8293 Id : 132, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 131 with 2 at 2,2,2,2,1,2,2
8294 Id : 133, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 132 with 2 at 2,1,1,2,2,2
8295 Id : 134, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310)) =?= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 133 with 2 at 1,2,1,2,2,2
8296 Id : 712, {_}: join (meet (join (meet ?1349 ?1350) (meet ?1350 (join ?1349 ?1350))) ?1351) (meet (join (meet ?1349 (join (join (meet ?1352 ?1350) (meet ?1350 ?1353)) ?1350)) (meet (join (meet ?1354 (join (join (meet ?1355 ?1350) (meet ?1350 ?1356)) ?1350)) (meet (join (meet ?1350 (meet (meet (join ?1355 (join ?1350 ?1356)) (join ?1357 ?1350)) ?1350)) (meet ?1358 (join ?1350 (meet (meet (join ?1355 (join ?1350 ?1356)) (join ?1357 ?1350)) ?1350)))) (join ?1354 (join (join (meet ?1355 ?1350) (meet ?1350 ?1356)) ?1350)))) (join ?1349 (join (join (meet ?1352 ?1350) (meet ?1350 ?1353)) ?1350)))) (join (join (meet ?1349 ?1350) (meet ?1350 (join ?1349 ?1350))) ?1351)) =>= ?1350 [1358, 1357, 1356, 1355, 1354, 1353, 1352, 1351, 1350, 1349] by Demod 134 with 2 at 3
8297 Id : 746, {_}: join (meet (join (meet (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865) (meet ?1865 (join (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865))) ?1866) (meet ?1865 (join (join (meet (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865) (meet ?1865 (join (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865))) ?1866)) =>= ?1865 [1866, 1865, 1864] by Super 712 with 2 at 1,2,2
8298 Id : 1090, {_}: join (meet (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1977, 1976, 1975] by Super 11 with 746 at 2,2,2,1,2,2,2
8299 Id : 1216, {_}: join (meet (join (meet ?1975 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1976, 1977, 1975] by Demod 1090 with 746 at 2,1,1,1,2
8300 Id : 1217, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1976, 1977, 1975] by Demod 1216 with 746 at 1,2,1,1,2
8301 Id : 1218, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1976, 1979, 1978, 1977, 1975] by Demod 1217 with 746 at 2,2,2,1,1,2
8302 Id : 1219, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1976, 1979, 1978, 1977, 1975] by Demod 1218 with 746 at 2,1,1,2,1,1,2,2
8303 Id : 1220, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1219 with 746 at 1,2,1,2,1,1,2,2
8304 Id : 1221, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1220 with 746 at 2,2,1,1,2,2
8305 Id : 1222, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1221 with 746 at 2,1,1,2,2,2,1,2,2
8306 Id : 1223, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1222 with 746 at 1,2,1,2,2,2,1,2,2
8307 Id : 1224, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1223 with 746 at 2,2,2,2,1,2,2
8308 Id : 1225, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1224 with 746 at 2,1,1,2,2,2
8309 Id : 1226, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =?= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1225 with 746 at 1,2,1,2,2,2
8310 Id : 1227, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =>= ?1977 [1980, 1979, 1978, 1977, 1975] by Demod 1226 with 746 at 3
8311 Id : 2529, {_}: join (meet (join (meet ?4347 ?4348) (meet ?4348 (join ?4347 ?4348))) ?4349) (meet (join (meet ?4347 (join (join (meet ?4350 ?4348) (meet ?4348 ?4351)) ?4348)) (meet ?4348 (join ?4347 (join (join (meet ?4350 ?4348) (meet ?4348 ?4351)) ?4348)))) (join (join (meet ?4347 ?4348) (meet ?4348 (join ?4347 ?4348))) ?4349)) =>= ?4348 [4351, 4350, 4349, 4348, 4347] by Demod 1226 with 746 at 3
8312 Id : 2542, {_}: join (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))))) ?4464) (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))))) (join ?4461 ?4464)) =>= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4466, 4465, 4464, 4463, 4462, 4461, 4460] by Super 2529 with 1227 at 1,2,2,2
8313 Id : 2936, {_}: join (meet ?4461 ?4464) (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))))) (join ?4461 ?4464)) =>= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4466, 4463, 4462, 4465, 4460, 4464, 4461] by Demod 2542 with 1227 at 1,1,2
8314 Id : 2937, {_}: join (meet ?4461 ?4464) (meet ?4461 (join ?4461 ?4464)) =?= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4463, 4462, 4460, 4464, 4461] by Demod 2936 with 1227 at 1,2,2
8315 Id : 1145, {_}: join (meet (join (meet (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441) (meet ?2441 (join (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441))) ?2442) (meet ?2441 (join (join (meet (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441) (meet ?2441 (join (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441))) ?2442)) =>= ?2441 [2442, 2441, 2440] by Super 712 with 2 at 1,2,2
8316 Id : 1162, {_}: join (meet (join (meet (join (meet (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573) (meet ?2573 (join (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573))) ?2573) (meet ?2573 (join (join (meet (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573) (meet ?2573 (join (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573))) ?2573))) ?2574) (meet ?2573 (join ?2573 ?2574)) =>= ?2573 [2574, 2573, 2572] by Super 1145 with 746 at 1,2,2,2
8317 Id : 1542, {_}: join (meet ?2573 ?2574) (meet ?2573 (join ?2573 ?2574)) =>= ?2573 [2574, 2573] by Demod 1162 with 746 at 1,1,2
8318 Id : 2938, {_}: ?4461 =<= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4463, 4462, 4460, 4461] by Demod 2937 with 1542 at 2
8319 Id : 2996, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet ?1977 (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1975] by Demod 1227 with 2938 at 1,2,2
8320 Id : 3021, {_}: join (meet ?4917 (join (join (meet ?4918 ?4919) (meet ?4919 ?4920)) ?4919)) (meet (join (meet ?4919 (meet (meet (join ?4918 (join ?4919 ?4920)) (join ?4921 ?4919)) ?4919)) (meet ?4922 (join ?4919 (meet (meet (join ?4918 (join ?4919 ?4920)) (join ?4921 ?4919)) ?4919)))) (join ?4917 (join (join (meet ?4918 ?4919) (meet ?4919 ?4920)) ?4919))) =>= ?4919 [4922, 4921, 4920, 4919, 4918, 4917] by Super 2 with 2938 at 2
8321 Id : 3908, {_}: ?5996 =<= join (meet ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996)) (meet ?6000 (join ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996))) [6000, 5999, 5998, 5997, 5996] by Super 2996 with 3021 at 2
8322 Id : 4215, {_}: join (meet ?6881 ?6882) (meet ?6882 (join ?6881 ?6882)) =>= ?6882 [6882, 6881] by Super 2996 with 3908 at 2
8323 Id : 4640, {_}: ?7259 =<= meet (meet (join ?7260 (join ?7259 ?7261)) (join ?7262 ?7259)) ?7259 [7262, 7261, 7260, 7259] by Super 3908 with 4215 at 3
8324 Id : 4676, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 (join ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996))) [5999, 5998, 5997, 6000, 5996] by Demod 3908 with 4640 at 2,1,3
8325 Id : 4677, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 (join ?5996 ?5996)) [6000, 5996] by Demod 4676 with 4640 at 2,2,2,3
8326 Id : 4678, {_}: ?7310 =<= join (meet ?7310 ?7310) (join ?7310 ?7310) [7310] by Super 4677 with 4640 at 2,3
8327 Id : 4849, {_}: ?7745 =<= meet (meet ?7745 (join ?7746 ?7745)) ?7745 [7746, 7745] by Super 4640 with 4678 at 1,1,3
8328 Id : 4859, {_}: join ?7779 ?7779 =<= meet (meet (join ?7779 ?7779) ?7779) (join ?7779 ?7779) [7779] by Super 4849 with 4678 at 2,1,3
8329 Id : 4805, {_}: ?7615 =<= meet (meet ?7615 (join ?7616 ?7615)) ?7615 [7616, 7615] by Super 4640 with 4678 at 1,1,3
8330 Id : 4817, {_}: join ?7624 (meet ?7624 (join (meet ?7624 (join ?7625 ?7624)) ?7624)) =>= ?7624 [7625, 7624] by Super 4215 with 4805 at 1,2
8331 Id : 5276, {_}: ?8252 =<= meet (meet (join ?8253 ?8252) (join ?8254 ?8252)) ?8252 [8254, 8253, 8252] by Super 4640 with 4817 at 2,1,1,3
8332 Id : 5515, {_}: join ?8563 ?8563 =<= meet (meet (join ?8564 (join ?8563 ?8563)) ?8563) (join ?8563 ?8563) [8564, 8563] by Super 5276 with 4678 at 2,1,3
8333 Id : 5517, {_}: join ?8569 ?8569 =<= meet (meet ?8569 ?8569) (join ?8569 ?8569) [8569] by Super 5515 with 4678 at 1,1,3
8334 Id : 5583, {_}: join (join ?8575 ?8575) (meet (join ?8575 ?8575) (join (meet ?8575 ?8575) (join ?8575 ?8575))) =>= join ?8575 ?8575 [8575] by Super 4215 with 5517 at 1,2
8335 Id : 5700, {_}: join (join ?8575 ?8575) (meet (join ?8575 ?8575) ?8575) =>= join ?8575 ?8575 [8575] by Demod 5583 with 4678 at 2,2,2
8336 Id : 5728, {_}: join (meet (join ?8697 ?8697) (meet (join ?8697 ?8697) ?8697)) (meet (meet (join ?8697 ?8697) ?8697) (join ?8697 ?8697)) =>= meet (join ?8697 ?8697) ?8697 [8697] by Super 4215 with 5700 at 2,2,2
8337 Id : 4856, {_}: meet ?7768 (join ?7769 ?7768) =<= meet (meet (meet ?7768 (join ?7769 ?7768)) ?7768) (meet ?7768 (join ?7769 ?7768)) [7769, 7768] by Super 4849 with 4215 at 2,1,3
8338 Id : 4947, {_}: meet ?7857 (join ?7858 ?7857) =<= meet ?7857 (meet ?7857 (join ?7858 ?7857)) [7858, 7857] by Demod 4856 with 4805 at 1,3
8339 Id : 4957, {_}: meet (join ?7891 ?7891) (join (meet ?7891 ?7891) (join ?7891 ?7891)) =>= meet (join ?7891 ?7891) (meet (join ?7891 ?7891) ?7891) [7891] by Super 4947 with 4678 at 2,2,3
8340 Id : 5024, {_}: meet (join ?7891 ?7891) ?7891 =<= meet (join ?7891 ?7891) (meet (join ?7891 ?7891) ?7891) [7891] by Demod 4957 with 4678 at 2,2
8341 Id : 5763, {_}: join (meet (join ?8697 ?8697) ?8697) (meet (meet (join ?8697 ?8697) ?8697) (join ?8697 ?8697)) =>= meet (join ?8697 ?8697) ?8697 [8697] by Demod 5728 with 5024 at 1,2
8342 Id : 5764, {_}: join (meet (join ?8697 ?8697) ?8697) (join ?8697 ?8697) =>= meet (join ?8697 ?8697) ?8697 [8697] by Demod 5763 with 4859 at 2,2
8343 Id : 6078, {_}: ?9071 =<= meet (meet (meet (join ?9071 ?9071) ?9071) (join ?9072 ?9071)) ?9071 [9072, 9071] by Super 4640 with 5764 at 1,1,3
8344 Id : 6094, {_}: ?9119 =<= meet (join ?9119 ?9119) ?9119 [9119] by Super 6078 with 4859 at 1,3
8345 Id : 6176, {_}: join ?7779 ?7779 =<= meet ?7779 (join ?7779 ?7779) [7779] by Demod 4859 with 6094 at 1,3
8346 Id : 4626, {_}: ?7201 =<= join (meet ?7202 (join (join (meet ?7203 ?7201) (meet ?7201 (join ?7203 ?7201))) ?7201)) (meet ?7201 (join ?7202 (join ?7201 ?7201))) [7203, 7202, 7201] by Super 2938 with 4215 at 1,2,2,2,3
8347 Id : 4674, {_}: ?7201 =<= join (meet ?7202 (join ?7201 ?7201)) (meet ?7201 (join ?7202 (join ?7201 ?7201))) [7202, 7201] by Demod 4626 with 4215 at 1,2,1,3
8348 Id : 6362, {_}: join ?9266 ?9266 =>= ?9266 [9266] by Super 4677 with 4674 at 3
8349 Id : 6434, {_}: ?7779 =<= meet ?7779 (join ?7779 ?7779) [7779] by Demod 6176 with 6362 at 2
8350 Id : 6435, {_}: ?7779 =<= meet ?7779 ?7779 [7779] by Demod 6434 with 6362 at 2,3
8351 Id : 6629, {_}: a === a [] by Demod 1 with 6435 at 2
8352 Id : 1, {_}: meet a a =>= a [] by prove_normal_axioms_1
8353 % SZS output end CNFRefutation for LAT080-1.p
8354 11792: solved LAT080-1.p in 19.2052 using nrkbo
8355 !! infer_left 35 0.0001 0.0000 0.0000
8356 !! infer_right 36 79.0430 21.2542 2.1956
8357 !! simplify_goal 36 0.0010 0.0002 0.0000
8358 !! keep_simplified 62 0.0999 0.0115 0.0016
8359 !! simplification_step 87 0.0995 0.0053 0.0011
8360 !! simplify 2189 70.7493 0.7924 0.0323
8361 !! orphan_murder 90 0.0022 0.0002 0.0000
8362 !! is_subsumed 2007 2.1665 0.4007 0.0011
8363 !! build_new_clause 1446 7.1748 0.4067 0.0050
8364 !! demodulate 2173 68.5745 0.7879 0.0316
8365 !! demod 496725 34.9789 0.4124 0.0001
8366 !! demod.apply_subst 10290 0.5165 0.4001 0.0001
8367 !! demod.retrieve_generalizations 496725 30.0889 0.4123 0.0001
8368 !! demod.unify 32076 1.5655 0.4005 0.0000
8369 !! build_clause 6591 33.6153 0.4051 0.0051
8370 !! compare_terms(nrkbo) 6593 17.2478 0.4044 0.0026
8371 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
8374 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8376 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8380 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8383 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8384 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8385 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8388 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8390 11828: Id : 1, {_}: meet a b =<= meet b a [] by prove_normal_axioms_2
8391 % SZS status Timeout for LAT081-1.p
8394 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8396 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8400 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8403 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8404 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8405 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8408 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8411 meet (meet a b) c =>= meet a (meet b c)
8412 [] by prove_normal_axioms_3
8413 % SZS status Timeout for LAT082-1.p
8416 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8418 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8422 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8425 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8426 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8427 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8430 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8432 11903: Id : 1, {_}: join a a =>= a [] by prove_normal_axioms_4
8435 Found proof, 86.180942s
8436 % SZS status Unsatisfiable for LAT083-1.p
8437 % SZS output start CNFRefutation for LAT083-1.p
8438 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)) (meet (join (meet ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)) (meet ?8 (join ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)))) (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8439 Id : 3, {_}: join (meet (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12) (meet (join (meet ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)) (meet (join (meet ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)) (meet ?16 (join ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)))) (join ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)))) (join (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12)) =>= ?11 [16, 15, 14, 13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13 ?14 ?15 ?16
8440 Id : 11, {_}: join (meet (join (meet ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) (join ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))))) ?109) (meet (join (meet ?106 (join (join (meet ?110 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) ?111)) (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))))) (meet ?108 (join ?106 (join (join (meet ?110 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) ?111)) (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))))))) (join (join (meet ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) (join ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))))) ?109)) =>= join (meet ?107 ?108) (meet ?108 (join ?107 ?108)) [111, 110, 109, 108, 107, 106] by Super 3 with 2 at 1,2,1,2,2
8441 Id : 37, {_}: join (meet (join (meet ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) (join ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))))) ?276) (meet (join (meet ?273 (join (join (meet ?277 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) ?278)) (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))))) (meet ?275 (join ?273 (join (join (meet ?277 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) ?278)) (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))))))) (join (join (meet ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) (join ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))))) ?276)) =>= join (meet ?274 ?275) (meet ?275 (join ?274 ?275)) [278, 277, 276, 275, 274, 273] by Super 3 with 2 at 1,2,1,2,2
8442 Id : 40, {_}: join (meet (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))))) ?310) (meet (join (meet ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join 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8443 Id : 124, {_}: join (meet (join (meet ?303 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 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?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 304, 305, 303] by Demod 40 with 2 at 2,1,1,1,2
8444 Id : 125, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) 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(meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 304, 305, 303] by Demod 124 with 2 at 1,2,1,1,2
8445 Id : 126, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet 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?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 309, 308, 307, 306, 304, 311, 310, 305, 303] by Demod 125 with 2 at 2,2,2,1,1,2
8446 Id : 127, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join 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?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join 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8447 Id : 128, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) 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(meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join 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?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 127 with 2 at 1,2,1,2,1,1,2,2
8448 Id : 129, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join 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?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 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(meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 128 with 2 at 2,2,1,1,2,2
8449 Id : 130, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet 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(meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 129 with 2 at 2,1,1,2,2,2,1,2,2
8450 Id : 131, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 130 with 2 at 1,2,1,2,2,2,1,2,2
8451 Id : 132, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 131 with 2 at 2,2,2,2,1,2,2
8452 Id : 133, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 132 with 2 at 2,1,1,2,2,2
8453 Id : 134, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310)) =?= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 133 with 2 at 1,2,1,2,2,2
8454 Id : 712, {_}: join (meet (join (meet ?1349 ?1350) (meet ?1350 (join ?1349 ?1350))) ?1351) (meet (join (meet ?1349 (join (join (meet ?1352 ?1350) (meet ?1350 ?1353)) ?1350)) (meet (join (meet ?1354 (join (join (meet ?1355 ?1350) (meet ?1350 ?1356)) ?1350)) (meet (join (meet ?1350 (meet (meet (join ?1355 (join ?1350 ?1356)) (join ?1357 ?1350)) ?1350)) (meet ?1358 (join ?1350 (meet (meet (join ?1355 (join ?1350 ?1356)) (join ?1357 ?1350)) ?1350)))) (join ?1354 (join (join (meet ?1355 ?1350) (meet ?1350 ?1356)) ?1350)))) (join ?1349 (join (join (meet ?1352 ?1350) (meet ?1350 ?1353)) ?1350)))) (join (join (meet ?1349 ?1350) (meet ?1350 (join ?1349 ?1350))) ?1351)) =>= ?1350 [1358, 1357, 1356, 1355, 1354, 1353, 1352, 1351, 1350, 1349] by Demod 134 with 2 at 3
8455 Id : 746, {_}: join (meet (join (meet (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865) (meet ?1865 (join (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865))) ?1866) (meet ?1865 (join (join (meet (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865) (meet ?1865 (join (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865))) ?1866)) =>= ?1865 [1866, 1865, 1864] by Super 712 with 2 at 1,2,2
8456 Id : 1090, {_}: join (meet (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1977, 1976, 1975] by Super 11 with 746 at 2,2,2,1,2,2,2
8457 Id : 1216, {_}: join (meet (join (meet ?1975 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1976, 1977, 1975] by Demod 1090 with 746 at 2,1,1,1,2
8458 Id : 1217, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1976, 1977, 1975] by Demod 1216 with 746 at 1,2,1,1,2
8459 Id : 1218, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1976, 1979, 1978, 1977, 1975] by Demod 1217 with 746 at 2,2,2,1,1,2
8460 Id : 1219, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1976, 1979, 1978, 1977, 1975] by Demod 1218 with 746 at 2,1,1,2,1,1,2,2
8461 Id : 1220, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1219 with 746 at 1,2,1,2,1,1,2,2
8462 Id : 1221, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1220 with 746 at 2,2,1,1,2,2
8463 Id : 1222, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1221 with 746 at 2,1,1,2,2,2,1,2,2
8464 Id : 1223, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1222 with 746 at 1,2,1,2,2,2,1,2,2
8465 Id : 1224, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1223 with 746 at 2,2,2,2,1,2,2
8466 Id : 1225, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1224 with 746 at 2,1,1,2,2,2
8467 Id : 1226, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =?= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1225 with 746 at 1,2,1,2,2,2
8468 Id : 1227, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =>= ?1977 [1980, 1979, 1978, 1977, 1975] by Demod 1226 with 746 at 3
8469 Id : 2529, {_}: join (meet (join (meet ?4347 ?4348) (meet ?4348 (join ?4347 ?4348))) ?4349) (meet (join (meet ?4347 (join (join (meet ?4350 ?4348) (meet ?4348 ?4351)) ?4348)) (meet ?4348 (join ?4347 (join (join (meet ?4350 ?4348) (meet ?4348 ?4351)) ?4348)))) (join (join (meet ?4347 ?4348) (meet ?4348 (join ?4347 ?4348))) ?4349)) =>= ?4348 [4351, 4350, 4349, 4348, 4347] by Demod 1226 with 746 at 3
8470 Id : 2542, {_}: join (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))))) ?4464) (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))))) (join ?4461 ?4464)) =>= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4466, 4465, 4464, 4463, 4462, 4461, 4460] by Super 2529 with 1227 at 1,2,2,2
8471 Id : 2936, {_}: join (meet ?4461 ?4464) (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))))) (join ?4461 ?4464)) =>= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4466, 4463, 4462, 4465, 4460, 4464, 4461] by Demod 2542 with 1227 at 1,1,2
8472 Id : 2937, {_}: join (meet ?4461 ?4464) (meet ?4461 (join ?4461 ?4464)) =?= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4463, 4462, 4460, 4464, 4461] by Demod 2936 with 1227 at 1,2,2
8473 Id : 1145, {_}: join (meet (join (meet (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441) (meet ?2441 (join (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441))) ?2442) (meet ?2441 (join (join (meet (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441) (meet ?2441 (join (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441))) ?2442)) =>= ?2441 [2442, 2441, 2440] by Super 712 with 2 at 1,2,2
8474 Id : 1162, {_}: join (meet (join (meet (join (meet (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573) (meet ?2573 (join (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573))) ?2573) (meet ?2573 (join (join (meet (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573) (meet ?2573 (join (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573))) ?2573))) ?2574) (meet ?2573 (join ?2573 ?2574)) =>= ?2573 [2574, 2573, 2572] by Super 1145 with 746 at 1,2,2,2
8475 Id : 1542, {_}: join (meet ?2573 ?2574) (meet ?2573 (join ?2573 ?2574)) =>= ?2573 [2574, 2573] by Demod 1162 with 746 at 1,1,2
8476 Id : 2938, {_}: ?4461 =<= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4463, 4462, 4460, 4461] by Demod 2937 with 1542 at 2
8477 Id : 2996, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet ?1977 (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1975] by Demod 1227 with 2938 at 1,2,2
8478 Id : 3021, {_}: join (meet ?4917 (join (join (meet ?4918 ?4919) (meet ?4919 ?4920)) ?4919)) (meet (join (meet ?4919 (meet (meet (join ?4918 (join ?4919 ?4920)) (join ?4921 ?4919)) ?4919)) (meet ?4922 (join ?4919 (meet (meet (join ?4918 (join ?4919 ?4920)) (join ?4921 ?4919)) ?4919)))) (join ?4917 (join (join (meet ?4918 ?4919) (meet ?4919 ?4920)) ?4919))) =>= ?4919 [4922, 4921, 4920, 4919, 4918, 4917] by Super 2 with 2938 at 2
8479 Id : 3908, {_}: ?5996 =<= join (meet ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996)) (meet ?6000 (join ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996))) [6000, 5999, 5998, 5997, 5996] by Super 2996 with 3021 at 2
8480 Id : 4215, {_}: join (meet ?6881 ?6882) (meet ?6882 (join ?6881 ?6882)) =>= ?6882 [6882, 6881] by Super 2996 with 3908 at 2
8481 Id : 4640, {_}: ?7259 =<= meet (meet (join ?7260 (join ?7259 ?7261)) (join ?7262 ?7259)) ?7259 [7262, 7261, 7260, 7259] by Super 3908 with 4215 at 3
8482 Id : 4676, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 (join ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996))) [5999, 5998, 5997, 6000, 5996] by Demod 3908 with 4640 at 2,1,3
8483 Id : 4677, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 (join ?5996 ?5996)) [6000, 5996] by Demod 4676 with 4640 at 2,2,2,3
8484 Id : 4626, {_}: ?7201 =<= join (meet ?7202 (join (join (meet ?7203 ?7201) (meet ?7201 (join ?7203 ?7201))) ?7201)) (meet ?7201 (join ?7202 (join ?7201 ?7201))) [7203, 7202, 7201] by Super 2938 with 4215 at 1,2,2,2,3
8485 Id : 4674, {_}: ?7201 =<= join (meet ?7202 (join ?7201 ?7201)) (meet ?7201 (join ?7202 (join ?7201 ?7201))) [7202, 7201] by Demod 4626 with 4215 at 1,2,1,3
8486 Id : 6362, {_}: join ?9266 ?9266 =>= ?9266 [9266] by Super 4677 with 4674 at 3
8487 Id : 6629, {_}: a === a [] by Demod 1 with 6362 at 2
8488 Id : 1, {_}: join a a =>= a [] by prove_normal_axioms_4
8489 % SZS output end CNFRefutation for LAT083-1.p
8490 11906: solved LAT083-1.p in 19.133195 using nrkbo
8491 !! infer_left 35 0.0000 0.0000 0.0000
8492 !! infer_right 36 85.9283 26.4639 2.3869
8493 !! simplify_goal 36 0.0010 0.0002 0.0000
8494 !! keep_simplified 62 0.0986 0.0114 0.0016
8495 !! simplification_step 87 0.0983 0.0053 0.0011
8496 !! simplify 2189 76.6411 0.9920 0.0350
8497 !! orphan_murder 90 0.0022 0.0002 0.0000
8498 !! is_subsumed 2007 1.6498 0.4143 0.0008
8499 !! build_new_clause 1446 8.9689 0.4172 0.0062
8500 !! demodulate 2173 74.9830 0.9877 0.0345
8501 !! demod 496725 44.9967 0.4086 0.0001
8502 !! demod.apply_subst 10290 0.5159 0.4001 0.0001
8503 !! demod.retrieve_generalizations 496725 37.3133 0.4084 0.0001
8504 !! demod.unify 32076 0.9640 0.3001 0.0000
8505 !! build_clause 6591 31.9684 0.4104 0.0049
8506 !! compare_terms(nrkbo) 6593 14.5968 0.4047 0.0022
8507 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
8510 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8512 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8516 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8519 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8520 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8521 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8524 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8526 11930: Id : 1, {_}: join a b =<= join b a [] by prove_normal_axioms_5
8527 % SZS status Timeout for LAT084-1.p
8530 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8532 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8536 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8539 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8540 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8541 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8544 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8547 join (join a b) c =>= join a (join b c)
8548 [] by prove_normal_axioms_6
8549 % SZS status Timeout for LAT085-1.p
8552 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8554 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8558 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8561 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8562 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8563 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8566 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8568 12001: Id : 1, {_}: meet a (join a b) =>= a [] by prove_normal_axioms_7
8569 % SZS status Timeout for LAT086-1.p
8572 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8574 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
8578 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
8581 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
8582 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
8583 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8586 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8588 12043: Id : 1, {_}: join a (meet a b) =>= a [] by prove_normal_axioms_8
8591 Found proof, 81.776020s
8592 % SZS status Unsatisfiable for LAT087-1.p
8593 % SZS output start CNFRefutation for LAT087-1.p
8594 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)) (meet (join (meet ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)) (meet ?8 (join ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)))) (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
8595 Id : 3, {_}: join (meet (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12) (meet (join (meet ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)) (meet (join (meet ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)) (meet ?16 (join ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)))) (join ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)))) (join (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12)) =>= ?11 [16, 15, 14, 13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13 ?14 ?15 ?16
8596 Id : 37, {_}: join (meet (join (meet ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) (join ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))))) ?276) (meet (join (meet ?273 (join (join (meet ?277 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) ?278)) (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))))) (meet ?275 (join ?273 (join (join (meet ?277 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) ?278)) (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))))))) (join (join (meet ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))) (meet (join (meet ?274 ?275) (meet ?275 (join ?274 ?275))) (join ?273 (join (meet ?274 ?275) (meet ?275 (join ?274 ?275)))))) ?276)) =>= join (meet ?274 ?275) (meet ?275 (join ?274 ?275)) [278, 277, 276, 275, 274, 273] by Super 3 with 2 at 1,2,1,2,2
8597 Id : 40, {_}: join (meet (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))))) ?310) (meet (join (meet ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 305, 304, 303] by Super 37 with 2 at 2,2,2,1,2,2,2
8598 Id : 124, {_}: join (meet (join (meet ?303 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 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(join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 304, 305, 303] by Demod 40 with 2 at 2,1,1,1,2
8599 Id : 125, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) 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?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet 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(meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 311, 310, 309, 308, 307, 306, 304, 305, 303] by Demod 124 with 2 at 1,2,1,1,2
8600 Id : 126, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet 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(join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 309, 308, 307, 306, 304, 311, 310, 305, 303] by Demod 125 with 2 at 2,2,2,1,1,2
8601 Id : 127, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join 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?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [312, 309, 308, 307, 306, 304, 311, 310, 305, 303] by Demod 126 with 2 at 2,1,1,2,1,1,2,2
8602 Id : 128, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) 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(meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 127 with 2 at 1,2,1,2,1,1,2,2
8603 Id : 129, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join 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?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 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?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 128 with 2 at 2,2,1,1,2,2
8604 Id : 130, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 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(join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 129 with 2 at 2,1,1,2,2,2,1,2,2
8605 Id : 131, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))))))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 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?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 130 with 2 at 1,2,1,2,2,2,1,2,2
8606 Id : 132, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))))) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 131 with 2 at 2,2,2,2,1,2,2
8607 Id : 133, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 ?305) (meet (join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))))) (join ?303 ?305))) ?310)) =>= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 132 with 2 at 2,1,1,2,2,2
8608 Id : 134, {_}: join (meet (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310) (meet (join (meet ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join ?303 (join (join (meet ?311 ?305) (meet ?305 ?312)) ?305)))) (join (join (meet ?303 ?305) (meet ?305 (join ?303 ?305))) ?310)) =?= join (meet (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305))))) (meet (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))) (join (join (meet ?304 ?305) (meet ?305 (join ?304 ?305))) (join (meet ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)) (meet (join (meet ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)) (meet ?309 (join ?305 (meet (meet (join ?306 (join ?305 ?307)) (join ?308 ?305)) ?305)))) (join ?304 (join (join (meet ?306 ?305) (meet ?305 ?307)) ?305)))))) [309, 308, 307, 306, 304, 312, 311, 310, 305, 303] by Demod 133 with 2 at 1,2,1,2,2,2
8609 Id : 712, {_}: join (meet (join (meet ?1349 ?1350) (meet ?1350 (join ?1349 ?1350))) ?1351) (meet (join (meet ?1349 (join (join (meet ?1352 ?1350) (meet ?1350 ?1353)) ?1350)) (meet (join (meet ?1354 (join (join (meet ?1355 ?1350) (meet ?1350 ?1356)) ?1350)) (meet (join (meet ?1350 (meet (meet (join ?1355 (join ?1350 ?1356)) (join ?1357 ?1350)) ?1350)) (meet ?1358 (join ?1350 (meet (meet (join ?1355 (join ?1350 ?1356)) (join ?1357 ?1350)) ?1350)))) (join ?1354 (join (join (meet ?1355 ?1350) (meet ?1350 ?1356)) ?1350)))) (join ?1349 (join (join (meet ?1352 ?1350) (meet ?1350 ?1353)) ?1350)))) (join (join (meet ?1349 ?1350) (meet ?1350 (join ?1349 ?1350))) ?1351)) =>= ?1350 [1358, 1357, 1356, 1355, 1354, 1353, 1352, 1351, 1350, 1349] by Demod 134 with 2 at 3
8610 Id : 1145, {_}: join (meet (join (meet (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441) (meet ?2441 (join (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441))) ?2442) (meet ?2441 (join (join (meet (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441) (meet ?2441 (join (join (meet ?2440 ?2441) (meet ?2441 (join ?2440 ?2441))) ?2441))) ?2442)) =>= ?2441 [2442, 2441, 2440] by Super 712 with 2 at 1,2,2
8611 Id : 746, {_}: join (meet (join (meet (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865) (meet ?1865 (join (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865))) ?1866) (meet ?1865 (join (join (meet (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865) (meet ?1865 (join (join (meet ?1864 ?1865) (meet ?1865 (join ?1864 ?1865))) ?1865))) ?1866)) =>= ?1865 [1866, 1865, 1864] by Super 712 with 2 at 1,2,2
8612 Id : 1162, {_}: join (meet (join (meet (join (meet (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573) (meet ?2573 (join (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573))) ?2573) (meet ?2573 (join (join (meet (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573) (meet ?2573 (join (join (meet ?2572 ?2573) (meet ?2573 (join ?2572 ?2573))) ?2573))) ?2573))) ?2574) (meet ?2573 (join ?2573 ?2574)) =>= ?2573 [2574, 2573, 2572] by Super 1145 with 746 at 1,2,2,2
8613 Id : 1542, {_}: join (meet ?2573 ?2574) (meet ?2573 (join ?2573 ?2574)) =>= ?2573 [2574, 2573] by Demod 1162 with 746 at 1,1,2
8614 Id : 11, {_}: join (meet (join (meet ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) (join ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))))) ?109) (meet (join (meet ?106 (join (join (meet ?110 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) ?111)) (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))))) (meet ?108 (join ?106 (join (join (meet ?110 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) ?111)) (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))))))) (join (join (meet ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))) (meet (join (meet ?107 ?108) (meet ?108 (join ?107 ?108))) (join ?106 (join (meet ?107 ?108) (meet ?108 (join ?107 ?108)))))) ?109)) =>= join (meet ?107 ?108) (meet ?108 (join ?107 ?108)) [111, 110, 109, 108, 107, 106] by Super 3 with 2 at 1,2,1,2,2
8615 Id : 1090, {_}: join (meet (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1977, 1976, 1975] by Super 11 with 746 at 2,2,2,1,2,2,2
8616 Id : 1216, {_}: join (meet (join (meet ?1975 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1976, 1977, 1975] by Demod 1090 with 746 at 2,1,1,1,2
8617 Id : 1217, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1979, 1978, 1976, 1977, 1975] by Demod 1216 with 746 at 1,2,1,1,2
8618 Id : 1218, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1976, 1979, 1978, 1977, 1975] by Demod 1217 with 746 at 2,2,2,1,1,2
8619 Id : 1219, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1980, 1976, 1979, 1978, 1977, 1975] by Demod 1218 with 746 at 2,1,1,2,1,1,2,2
8620 Id : 1220, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1219 with 746 at 1,2,1,2,1,1,2,2
8621 Id : 1221, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1220 with 746 at 2,2,1,1,2,2
8622 Id : 1222, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1221 with 746 at 2,1,1,2,2,2,1,2,2
8623 Id : 1223, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))))))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1222 with 746 at 1,2,1,2,2,2,1,2,2
8624 Id : 1224, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)))) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1223 with 746 at 2,2,2,2,1,2,2
8625 Id : 1225, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet (join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977))) (join ?1975 ?1977))) ?1978)) =>= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1224 with 746 at 2,1,1,2,2,2
8626 Id : 1226, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =?= join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1977)) [1976, 1980, 1979, 1978, 1977, 1975] by Demod 1225 with 746 at 1,2,1,2,2,2
8627 Id : 2529, {_}: join (meet (join (meet ?4347 ?4348) (meet ?4348 (join ?4347 ?4348))) ?4349) (meet (join (meet ?4347 (join (join (meet ?4350 ?4348) (meet ?4348 ?4351)) ?4348)) (meet ?4348 (join ?4347 (join (join (meet ?4350 ?4348) (meet ?4348 ?4351)) ?4348)))) (join (join (meet ?4347 ?4348) (meet ?4348 (join ?4347 ?4348))) ?4349)) =>= ?4348 [4351, 4350, 4349, 4348, 4347] by Demod 1226 with 746 at 3
8628 Id : 1227, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet (join (meet ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)) (meet ?1977 (join ?1975 (join (join (meet ?1979 ?1977) (meet ?1977 ?1980)) ?1977)))) (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =>= ?1977 [1980, 1979, 1978, 1977, 1975] by Demod 1226 with 746 at 3
8629 Id : 2542, {_}: join (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))))) ?4464) (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))))) (join ?4461 ?4464)) =>= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4466, 4465, 4464, 4463, 4462, 4461, 4460] by Super 2529 with 1227 at 1,2,2,2
8630 Id : 2936, {_}: join (meet ?4461 ?4464) (meet (join (meet (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) (join (join (meet ?4460 ?4461) (meet ?4461 (join ?4460 ?4461))) (join (join (meet ?4465 (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))))) (meet (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))) ?4466)) (join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)))))))) (join ?4461 ?4464)) =>= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4466, 4463, 4462, 4465, 4460, 4464, 4461] by Demod 2542 with 1227 at 1,1,2
8631 Id : 2937, {_}: join (meet ?4461 ?4464) (meet ?4461 (join ?4461 ?4464)) =?= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4463, 4462, 4460, 4464, 4461] by Demod 2936 with 1227 at 1,2,2
8632 Id : 2938, {_}: ?4461 =<= join (meet ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461)) (meet ?4461 (join ?4460 (join (join (meet ?4462 ?4461) (meet ?4461 ?4463)) ?4461))) [4463, 4462, 4460, 4461] by Demod 2937 with 1542 at 2
8633 Id : 2996, {_}: join (meet (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978) (meet ?1977 (join (join (meet ?1975 ?1977) (meet ?1977 (join ?1975 ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1975] by Demod 1227 with 2938 at 1,2,2
8634 Id : 3021, {_}: join (meet ?4917 (join (join (meet ?4918 ?4919) (meet ?4919 ?4920)) ?4919)) (meet (join (meet ?4919 (meet (meet (join ?4918 (join ?4919 ?4920)) (join ?4921 ?4919)) ?4919)) (meet ?4922 (join ?4919 (meet (meet (join ?4918 (join ?4919 ?4920)) (join ?4921 ?4919)) ?4919)))) (join ?4917 (join (join (meet ?4918 ?4919) (meet ?4919 ?4920)) ?4919))) =>= ?4919 [4922, 4921, 4920, 4919, 4918, 4917] by Super 2 with 2938 at 2
8635 Id : 3908, {_}: ?5996 =<= join (meet ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996)) (meet ?6000 (join ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996))) [6000, 5999, 5998, 5997, 5996] by Super 2996 with 3021 at 2
8636 Id : 4215, {_}: join (meet ?6881 ?6882) (meet ?6882 (join ?6881 ?6882)) =>= ?6882 [6882, 6881] by Super 2996 with 3908 at 2
8637 Id : 4640, {_}: ?7259 =<= meet (meet (join ?7260 (join ?7259 ?7261)) (join ?7262 ?7259)) ?7259 [7262, 7261, 7260, 7259] by Super 3908 with 4215 at 3
8638 Id : 4676, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 (join ?5996 (meet (meet (join ?5997 (join ?5996 ?5998)) (join ?5999 ?5996)) ?5996))) [5999, 5998, 5997, 6000, 5996] by Demod 3908 with 4640 at 2,1,3
8639 Id : 4677, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 (join ?5996 ?5996)) [6000, 5996] by Demod 4676 with 4640 at 2,2,2,3
8640 Id : 4626, {_}: ?7201 =<= join (meet ?7202 (join (join (meet ?7203 ?7201) (meet ?7201 (join ?7203 ?7201))) ?7201)) (meet ?7201 (join ?7202 (join ?7201 ?7201))) [7203, 7202, 7201] by Super 2938 with 4215 at 1,2,2,2,3
8641 Id : 4674, {_}: ?7201 =<= join (meet ?7202 (join ?7201 ?7201)) (meet ?7201 (join ?7202 (join ?7201 ?7201))) [7202, 7201] by Demod 4626 with 4215 at 1,2,1,3
8642 Id : 6362, {_}: join ?9266 ?9266 =>= ?9266 [9266] by Super 4677 with 4674 at 3
8643 Id : 6467, {_}: ?9374 =<= join (meet (join (join (meet ?9375 ?9374) (meet ?9374 ?9376)) ?9374) (join (join (meet ?9375 ?9374) (meet ?9374 ?9376)) ?9374)) (meet ?9374 (join (join (meet ?9375 ?9374) (meet ?9374 ?9376)) ?9374)) [9376, 9375, 9374] by Super 2938 with 6362 at 2,2,3
8644 Id : 4678, {_}: ?7310 =<= join (meet ?7310 ?7310) (join ?7310 ?7310) [7310] by Super 4677 with 4640 at 2,3
8645 Id : 4849, {_}: ?7745 =<= meet (meet ?7745 (join ?7746 ?7745)) ?7745 [7746, 7745] by Super 4640 with 4678 at 1,1,3
8646 Id : 4859, {_}: join ?7779 ?7779 =<= meet (meet (join ?7779 ?7779) ?7779) (join ?7779 ?7779) [7779] by Super 4849 with 4678 at 2,1,3
8647 Id : 4805, {_}: ?7615 =<= meet (meet ?7615 (join ?7616 ?7615)) ?7615 [7616, 7615] by Super 4640 with 4678 at 1,1,3
8648 Id : 4817, {_}: join ?7624 (meet ?7624 (join (meet ?7624 (join ?7625 ?7624)) ?7624)) =>= ?7624 [7625, 7624] by Super 4215 with 4805 at 1,2
8649 Id : 5276, {_}: ?8252 =<= meet (meet (join ?8253 ?8252) (join ?8254 ?8252)) ?8252 [8254, 8253, 8252] by Super 4640 with 4817 at 2,1,1,3
8650 Id : 5515, {_}: join ?8563 ?8563 =<= meet (meet (join ?8564 (join ?8563 ?8563)) ?8563) (join ?8563 ?8563) [8564, 8563] by Super 5276 with 4678 at 2,1,3
8651 Id : 5517, {_}: join ?8569 ?8569 =<= meet (meet ?8569 ?8569) (join ?8569 ?8569) [8569] by Super 5515 with 4678 at 1,1,3
8652 Id : 5583, {_}: join (join ?8575 ?8575) (meet (join ?8575 ?8575) (join (meet ?8575 ?8575) (join ?8575 ?8575))) =>= join ?8575 ?8575 [8575] by Super 4215 with 5517 at 1,2
8653 Id : 5700, {_}: join (join ?8575 ?8575) (meet (join ?8575 ?8575) ?8575) =>= join ?8575 ?8575 [8575] by Demod 5583 with 4678 at 2,2,2
8654 Id : 5728, {_}: join (meet (join ?8697 ?8697) (meet (join ?8697 ?8697) ?8697)) (meet (meet (join ?8697 ?8697) ?8697) (join ?8697 ?8697)) =>= meet (join ?8697 ?8697) ?8697 [8697] by Super 4215 with 5700 at 2,2,2
8655 Id : 4856, {_}: meet ?7768 (join ?7769 ?7768) =<= meet (meet (meet ?7768 (join ?7769 ?7768)) ?7768) (meet ?7768 (join ?7769 ?7768)) [7769, 7768] by Super 4849 with 4215 at 2,1,3
8656 Id : 4947, {_}: meet ?7857 (join ?7858 ?7857) =<= meet ?7857 (meet ?7857 (join ?7858 ?7857)) [7858, 7857] by Demod 4856 with 4805 at 1,3
8657 Id : 4957, {_}: meet (join ?7891 ?7891) (join (meet ?7891 ?7891) (join ?7891 ?7891)) =>= meet (join ?7891 ?7891) (meet (join ?7891 ?7891) ?7891) [7891] by Super 4947 with 4678 at 2,2,3
8658 Id : 5024, {_}: meet (join ?7891 ?7891) ?7891 =<= meet (join ?7891 ?7891) (meet (join ?7891 ?7891) ?7891) [7891] by Demod 4957 with 4678 at 2,2
8659 Id : 5763, {_}: join (meet (join ?8697 ?8697) ?8697) (meet (meet (join ?8697 ?8697) ?8697) (join ?8697 ?8697)) =>= meet (join ?8697 ?8697) ?8697 [8697] by Demod 5728 with 5024 at 1,2
8660 Id : 5764, {_}: join (meet (join ?8697 ?8697) ?8697) (join ?8697 ?8697) =>= meet (join ?8697 ?8697) ?8697 [8697] by Demod 5763 with 4859 at 2,2
8661 Id : 6078, {_}: ?9071 =<= meet (meet (meet (join ?9071 ?9071) ?9071) (join ?9072 ?9071)) ?9071 [9072, 9071] by Super 4640 with 5764 at 1,1,3
8662 Id : 6094, {_}: ?9119 =<= meet (join ?9119 ?9119) ?9119 [9119] by Super 6078 with 4859 at 1,3
8663 Id : 6176, {_}: join ?7779 ?7779 =<= meet ?7779 (join ?7779 ?7779) [7779] by Demod 4859 with 6094 at 1,3
8664 Id : 6434, {_}: ?7779 =<= meet ?7779 (join ?7779 ?7779) [7779] by Demod 6176 with 6362 at 2
8665 Id : 6435, {_}: ?7779 =<= meet ?7779 ?7779 [7779] by Demod 6434 with 6362 at 2,3
8666 Id : 6509, {_}: ?9374 =<= join (join (join (meet ?9375 ?9374) (meet ?9374 ?9376)) ?9374) (meet ?9374 (join (join (meet ?9375 ?9374) (meet ?9374 ?9376)) ?9374)) [9376, 9375, 9374] by Demod 6467 with 6435 at 1,3
8667 Id : 6416, {_}: ?5996 =<= join (meet ?5996 ?5996) (meet ?6000 ?5996) [6000, 5996] by Demod 4677 with 6362 at 2,2,3
8668 Id : 6447, {_}: ?5996 =<= join ?5996 (meet ?6000 ?5996) [6000, 5996] by Demod 6416 with 6435 at 1,3
8669 Id : 6510, {_}: ?9374 =<= join (join (meet ?9375 ?9374) (meet ?9374 ?9376)) ?9374 [9376, 9375, 9374] by Demod 6509 with 6447 at 3
8670 Id : 7103, {_}: join (meet (join (meet ?10067 ?10068) (meet ?10068 ?10069)) ?10068) (meet (join (meet ?10067 ?10068) (meet ?10068 ?10069)) ?10068) =>= join (meet ?10067 ?10068) (meet ?10068 ?10069) [10069, 10068, 10067] by Super 1542 with 6510 at 2,2,2
8671 Id : 8420, {_}: meet (join (meet ?11111 ?11112) (meet ?11112 ?11113)) ?11112 =>= join (meet ?11111 ?11112) (meet ?11112 ?11113) [11113, 11112, 11111] by Demod 7103 with 6362 at 2
8672 Id : 8437, {_}: meet (join ?11185 (meet ?11185 ?11186)) ?11185 =<= join (meet (meet (join ?11187 (join ?11185 ?11188)) (join ?11189 ?11185)) ?11185) (meet ?11185 ?11186) [11189, 11188, 11187, 11186, 11185] by Super 8420 with 4640 at 1,1,2
8673 Id : 6659, {_}: ?9553 =<= meet (meet (join ?9554 (join ?9553 ?9555)) ?9553) ?9553 [9555, 9554, 9553] by Super 4640 with 6362 at 2,1,3
8674 Id : 6673, {_}: ?9610 =<= meet (meet (join ?9610 ?9611) ?9610) ?9610 [9611, 9610] by Super 6659 with 6362 at 1,1,3
8675 Id : 3253, {_}: join (meet (meet ?5411 (join (join (meet ?5412 ?5413) (meet ?5413 ?5414)) ?5413)) (meet ?5413 (join ?5411 (join (join (meet ?5412 ?5413) (meet ?5413 ?5414)) ?5413)))) (meet (meet ?5411 (join (join (meet ?5412 ?5413) (meet ?5413 ?5414)) ?5413)) ?5413) =>= meet ?5411 (join (join (meet ?5412 ?5413) (meet ?5413 ?5414)) ?5413) [5414, 5413, 5412, 5411] by Super 1542 with 2938 at 2,2,2
8676 Id : 3257, {_}: join (meet (meet ?5442 (join (join (meet ?5443 ?5443) (meet ?5443 (join ?5443 ?5443))) ?5443)) (meet ?5443 (join ?5442 (join (join (meet ?5443 ?5443) (meet ?5443 (join ?5443 ?5443))) ?5443)))) (meet (meet ?5442 (join ?5443 ?5443)) ?5443) =>= meet ?5442 (join (join (meet ?5443 ?5443) (meet ?5443 (join ?5443 ?5443))) ?5443) [5443, 5442] by Super 3253 with 1542 at 1,2,1,2,2
8677 Id : 3442, {_}: join (meet (meet ?5442 (join ?5443 ?5443)) (meet ?5443 (join ?5442 (join (join (meet ?5443 ?5443) (meet ?5443 (join ?5443 ?5443))) ?5443)))) (meet (meet ?5442 (join ?5443 ?5443)) ?5443) =>= meet ?5442 (join (join (meet ?5443 ?5443) (meet ?5443 (join ?5443 ?5443))) ?5443) [5443, 5442] by Demod 3257 with 1542 at 1,2,1,1,2
8678 Id : 3443, {_}: join (meet (meet ?5442 (join ?5443 ?5443)) (meet ?5443 (join ?5442 (join ?5443 ?5443)))) (meet (meet ?5442 (join ?5443 ?5443)) ?5443) =>= meet ?5442 (join (join (meet ?5443 ?5443) (meet ?5443 (join ?5443 ?5443))) ?5443) [5443, 5442] by Demod 3442 with 1542 at 1,2,2,2,1,2
8679 Id : 3444, {_}: join (meet (meet ?5442 (join ?5443 ?5443)) (meet ?5443 (join ?5442 (join ?5443 ?5443)))) (meet (meet ?5442 (join ?5443 ?5443)) ?5443) =>= meet ?5442 (join ?5443 ?5443) [5443, 5442] by Demod 3443 with 1542 at 1,2,3
8680 Id : 6417, {_}: join (meet (meet ?5442 ?5443) (meet ?5443 (join ?5442 (join ?5443 ?5443)))) (meet (meet ?5442 (join ?5443 ?5443)) ?5443) =>= meet ?5442 (join ?5443 ?5443) [5443, 5442] by Demod 3444 with 6362 at 2,1,1,2
8681 Id : 6418, {_}: join (meet (meet ?5442 ?5443) (meet ?5443 (join ?5442 ?5443))) (meet (meet ?5442 (join ?5443 ?5443)) ?5443) =>= meet ?5442 (join ?5443 ?5443) [5443, 5442] by Demod 6417 with 6362 at 2,2,2,1,2
8682 Id : 6419, {_}: join (meet (meet ?5442 ?5443) (meet ?5443 (join ?5442 ?5443))) (meet (meet ?5442 ?5443) ?5443) =>= meet ?5442 (join ?5443 ?5443) [5443, 5442] by Demod 6418 with 6362 at 2,1,2,2
8683 Id : 6420, {_}: join (meet (meet ?5442 ?5443) (meet ?5443 (join ?5442 ?5443))) (meet (meet ?5442 ?5443) ?5443) =>= meet ?5442 ?5443 [5443, 5442] by Demod 6419 with 6362 at 2,3
8684 Id : 3506, {_}: join (meet (meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet (meet ?5735 (join ?5736 ?5736)) ?5736)) (meet (meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet ?5735 (join ?5736 ?5736))) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Super 1542 with 3444 at 2,2,2
8685 Id : 6421, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet (meet ?5735 (join ?5736 ?5736)) ?5736)) (meet (meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet ?5735 (join ?5736 ?5736))) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 3506 with 6362 at 2,1,1,1,2
8686 Id : 6422, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 (join ?5736 ?5736)) ?5736)) (meet (meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet ?5735 (join ?5736 ?5736))) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 6421 with 6362 at 2,2,2,1,1,2
8687 Id : 6423, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 ?5736) ?5736)) (meet (meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet ?5735 (join ?5736 ?5736))) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 6422 with 6362 at 2,1,2,1,2
8688 Id : 6424, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 ?5736) ?5736)) (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 (join ?5736 ?5736)))) (meet ?5735 (join ?5736 ?5736))) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 6423 with 6362 at 2,1,1,2,2
8689 Id : 6425, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 ?5736) ?5736)) (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet ?5735 (join ?5736 ?5736))) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 6424 with 6362 at 2,2,2,1,2,2
8690 Id : 6426, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 ?5736) ?5736)) (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet ?5735 ?5736)) =>= meet (meet ?5735 (join ?5736 ?5736)) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 6425 with 6362 at 2,2,2,2
8691 Id : 6427, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 ?5736) ?5736)) (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet ?5735 ?5736)) =>= meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 (join ?5736 ?5736))) [5736, 5735] by Demod 6426 with 6362 at 2,1,3
8692 Id : 6428, {_}: join (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet (meet ?5735 ?5736) ?5736)) (meet (meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736))) (meet ?5735 ?5736)) =>= meet (meet ?5735 ?5736) (meet ?5736 (join ?5735 ?5736)) [5736, 5735] by Demod 6427 with 6362 at 2,2,2,3
8693 Id : 6775, {_}: join (meet (meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) (meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) ?9617)) (meet (meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Super 6428 with 6673 at 2,2,2
8694 Id : 6876, {_}: join (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) (meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) ?9617)) (meet (meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6775 with 6673 at 1,1,1,2
8695 Id : 6877, {_}: join (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) (meet ?9617 ?9617)) (meet (meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6876 with 6673 at 1,2,1,2
8696 Id : 6878, {_}: join (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) (meet ?9617 ?9617)) (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet (meet (meet (join ?9617 ?9618) ?9617) ?9617) (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6877 with 6673 at 1,1,2,2
8697 Id : 6879, {_}: join (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) (meet ?9617 ?9617)) (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6878 with 6673 at 1,3
8698 Id : 4928, {_}: meet ?7768 (join ?7769 ?7768) =<= meet ?7768 (meet ?7768 (join ?7769 ?7768)) [7769, 7768] by Demod 4856 with 4805 at 1,3
8699 Id : 6880, {_}: join (meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) (meet ?9617 ?9617)) (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6879 with 4928 at 1,1,2
8700 Id : 6881, {_}: join (meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) ?9617) (meet (meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617))) ?9617) =>= meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6880 with 6435 at 2,1,2
8701 Id : 6882, {_}: join (meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) ?9617) (meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) ?9617) =>= meet ?9617 (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) [9618, 9617] by Demod 6881 with 4928 at 1,2,2
8702 Id : 6883, {_}: join (meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) ?9617) (meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) ?9617) =>= meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617) [9618, 9617] by Demod 6882 with 4928 at 3
8703 Id : 6884, {_}: meet (meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617)) ?9617 =>= meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617) [9618, 9617] by Demod 6883 with 6362 at 2
8704 Id : 6885, {_}: ?9617 =<= meet ?9617 (join (meet (join ?9617 ?9618) ?9617) ?9617) [9618, 9617] by Demod 6884 with 4805 at 2
8705 Id : 7621, {_}: ?10564 =<= join (join (meet ?10565 ?10564) ?10564) ?10564 [10565, 10564] by Super 6510 with 6885 at 2,1,3
8706 Id : 7775, {_}: join (meet (meet (join (meet ?10668 ?10669) ?10669) ?10669) (meet ?10669 ?10669)) (meet (meet (join (meet ?10668 ?10669) ?10669) ?10669) ?10669) =>= meet (join (meet ?10668 ?10669) ?10669) ?10669 [10669, 10668] by Super 6420 with 7621 at 2,2,1,2
8707 Id : 7797, {_}: join (meet (meet (join (meet ?10668 ?10669) ?10669) ?10669) ?10669) (meet (meet (join (meet ?10668 ?10669) ?10669) ?10669) ?10669) =>= meet (join (meet ?10668 ?10669) ?10669) ?10669 [10669, 10668] by Demod 7775 with 6435 at 2,1,2
8708 Id : 5287, {_}: join ?8300 ?8300 =<= meet (meet (join ?8301 (join ?8300 ?8300)) ?8300) (join ?8300 ?8300) [8301, 8300] by Super 5276 with 4678 at 2,1,3
8709 Id : 6430, {_}: ?8300 =<= meet (meet (join ?8301 (join ?8300 ?8300)) ?8300) (join ?8300 ?8300) [8301, 8300] by Demod 5287 with 6362 at 2
8710 Id : 6431, {_}: ?8300 =<= meet (meet (join ?8301 ?8300) ?8300) (join ?8300 ?8300) [8301, 8300] by Demod 6430 with 6362 at 2,1,1,3
8711 Id : 6432, {_}: ?8300 =<= meet (meet (join ?8301 ?8300) ?8300) ?8300 [8301, 8300] by Demod 6431 with 6362 at 2,3
8712 Id : 7798, {_}: join (meet (meet (join (meet ?10668 ?10669) ?10669) ?10669) ?10669) ?10669 =>= meet (join (meet ?10668 ?10669) ?10669) ?10669 [10669, 10668] by Demod 7797 with 6432 at 2,2
8713 Id : 7799, {_}: join ?10669 ?10669 =<= meet (join (meet ?10668 ?10669) ?10669) ?10669 [10668, 10669] by Demod 7798 with 6432 at 1,2
8714 Id : 7800, {_}: ?10669 =<= meet (join (meet ?10668 ?10669) ?10669) ?10669 [10668, 10669] by Demod 7799 with 6362 at 2
8715 Id : 7890, {_}: join ?10746 (meet (join (meet ?10747 ?10746) ?10746) (join (join (meet ?10747 ?10746) ?10746) ?10746)) =>= join (meet ?10747 ?10746) ?10746 [10747, 10746] by Super 1542 with 7800 at 1,2
8716 Id : 8044, {_}: join ?10746 (meet (join (meet ?10747 ?10746) ?10746) ?10746) =>= join (meet ?10747 ?10746) ?10746 [10747, 10746] by Demod 7890 with 7621 at 2,2,2
8717 Id : 8045, {_}: ?10746 =<= join (meet ?10747 ?10746) ?10746 [10747, 10746] by Demod 8044 with 6447 at 2
8718 Id : 8118, {_}: join (meet (meet ?10849 ?10850) ?10850) (meet (meet ?10849 ?10850) ?10850) =>= meet ?10849 ?10850 [10850, 10849] by Super 1542 with 8045 at 2,2,2
8719 Id : 8166, {_}: meet (meet ?10849 ?10850) ?10850 =>= meet ?10849 ?10850 [10850, 10849] by Demod 8118 with 6362 at 2
8720 Id : 8210, {_}: ?9610 =<= meet (join ?9610 ?9611) ?9610 [9611, 9610] by Demod 6673 with 8166 at 3
8721 Id : 8593, {_}: ?11185 =<= join (meet (meet (join ?11187 (join ?11185 ?11188)) (join ?11189 ?11185)) ?11185) (meet ?11185 ?11186) [11186, 11189, 11188, 11187, 11185] by Demod 8437 with 8210 at 2
8722 Id : 8594, {_}: ?11185 =<= join ?11185 (meet ?11185 ?11186) [11186, 11185] by Demod 8593 with 4640 at 1,3
8723 Id : 8714, {_}: a === a [] by Demod 1 with 8594 at 2
8724 Id : 1, {_}: join a (meet a b) =>= a [] by prove_normal_axioms_8
8725 % SZS output end CNFRefutation for LAT087-1.p
8726 12046: solved LAT087-1.p in 19.561222 using nrkbo
8727 !! infer_left 48 0.0001 0.0000 0.0000
8728 !! infer_right 49 80.2851 21.1689 1.6385
8729 !! simplify_goal 49 0.0021 0.0004 0.0000
8730 !! keep_simplified 75 0.1266 0.0117 0.0017
8731 !! simplification_step 112 0.1261 0.0041 0.0011
8732 !! simplify 3183 72.7510 0.7916 0.0229
8733 !! orphan_murder 124 0.0032 0.0001 0.0000
8734 !! is_subsumed 2729 1.3735 0.3073 0.0005
8735 !! build_new_clause 1998 7.5174 0.4032 0.0038
8736 !! demodulate 3151 71.3670 0.7862 0.0226
8737 !! demod 509908 42.0933 0.4082 0.0001
8738 !! demod.apply_subst 13330 1.0290 0.3002 0.0001
8739 !! demod.retrieve_generalizations 509908 35.3943 0.4082 0.0001
8740 !! demod.unify 48639 1.5278 0.4081 0.0000
8741 !! build_clause 8663 29.1567 0.4030 0.0034
8742 !! compare_terms(nrkbo) 8665 14.3735 0.4024 0.0017
8743 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
8746 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8748 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
8750 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
8752 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
8753 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
8754 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8757 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
8759 12078: Id : 1, {_}: meet a a =>= a [] by prove_wal_axioms_1
8762 Found proof, 73.610206s
8763 % SZS status Unsatisfiable for LAT092-1.p
8764 % SZS output start CNFRefutation for LAT092-1.p
8765 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)) (meet (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)) (meet ?7 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)))) (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
8766 Id : 3, {_}: join (meet (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11) (meet (join (meet ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)) (meet (join (meet ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)) (meet ?14 (join ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)))) (join ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)))) (join (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11)) =>= ?10 [14, 13, 12, 11, 10, 9] by single_axiom ?9 ?10 ?11 ?12 ?13 ?14
8767 Id : 31, {_}: join (meet (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208) (meet (join (meet ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (meet ?207 (join ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))))) (join (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208)) =>= join (meet ?206 ?207) (meet ?207 (join ?206 ?207)) [210, 209, 208, 207, 206, 205] by Super 3 with 2 at 1,2,1,2,2
8768 Id : 34, {_}: join (meet (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 236, 235, 234] by Super 31 with 2 at 2,2,2,1,2,2,2
8769 Id : 116, {_}: join (meet (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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(meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet 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?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 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(join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 34 with 2 at 2,1,1,1,2
8770 Id : 117, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join 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(meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 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(join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 116 with 2 at 1,2,1,1,2
8771 Id : 118, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) 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(join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 239, 238, 237, 235, 240, 236, 234] by Demod 117 with 2 at 2,2,2,1,1,2
8772 Id : 119, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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(join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 118 with 2 at 1,1,1,2,1,1,2,2
8773 Id : 120, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 119 with 2 at 2,2,1,2,1,1,2,2
8774 Id : 121, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join 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?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 120 with 2 at 2,2,1,1,2,2
8775 Id : 122, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 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?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 121 with 2 at 1,1,1,2,2,2,1,2,2
8776 Id : 123, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 122 with 2 at 2,2,1,2,2,2,1,2,2
8777 Id : 124, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 123 with 2 at 2,2,2,2,1,2,2
8778 Id : 125, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 124 with 2 at 2,1,1,2,2,2
8779 Id : 126, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240)) =?= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 125 with 2 at 1,2,1,2,2,2
8780 Id : 702, {_}: join (meet (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189) (meet (join (meet ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)) (meet (join (meet ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)) (meet (join (meet ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)) (meet ?1195 (join ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)))) (join ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)))) (join ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)))) (join (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189)) =>= ?1188 [1195, 1194, 1193, 1192, 1191, 1190, 1189, 1188, 1187] by Demod 126 with 2 at 3
8781 Id : 1101, {_}: join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1976] by Super 702 with 2 at 1,2,2
8782 Id : 724, {_}: join (meet (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497) (meet ?1496 (join (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497)) =>= ?1496 [1497, 1496, 1495] by Super 702 with 2 at 1,2,2
8783 Id : 1118, {_}: join (meet (join (meet (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101) (meet ?2101 (join (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101))) ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101, 2100] by Super 1101 with 724 at 1,2,2,2
8784 Id : 1490, {_}: join (meet ?2101 ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101] by Demod 1118 with 724 at 1,1,2
8785 Id : 1594, {_}: join (meet ?2599 ?2600) (meet ?2599 (join ?2599 ?2600)) =>= ?2599 [2600, 2599] by Demod 1118 with 724 at 1,1,2
8786 Id : 1599, {_}: join (meet (meet ?2630 ?2631) (meet ?2630 (join ?2630 ?2631))) (meet (meet ?2630 ?2631) ?2630) =>= meet ?2630 ?2631 [2631, 2630] by Super 1594 with 1490 at 2,2,2
8787 Id : 10, {_}: join (meet (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84) (meet (join (meet ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (meet ?83 (join ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))))) (join (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84)) =>= join (meet ?82 ?83) (meet ?83 (join ?82 ?83)) [86, 85, 84, 83, 82, 81] by Super 3 with 2 at 1,2,1,2,2
8788 Id : 1054, {_}: join (meet (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1598, 1597, 1596] by Super 10 with 724 at 2,2,2,1,2,2,2
8789 Id : 1166, {_}: join (meet (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1054 with 724 at 2,1,1,1,2
8790 Id : 1167, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1166 with 724 at 1,2,1,1,2
8791 Id : 1168, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1597, 1599, 1598, 1596] by Demod 1167 with 724 at 2,2,2,1,1,2
8792 Id : 1169, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1168 with 724 at 1,1,1,2,1,1,2,2
8793 Id : 1170, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1169 with 724 at 2,2,1,2,1,1,2,2
8794 Id : 1171, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1170 with 724 at 2,2,1,1,2,2
8795 Id : 1172, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1171 with 724 at 1,1,1,2,2,2,1,2,2
8796 Id : 1173, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1172 with 724 at 2,2,1,2,2,2,1,2,2
8797 Id : 1174, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1173 with 724 at 2,2,2,2,1,2,2
8798 Id : 1175, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1174 with 724 at 2,1,1,2,2,2
8799 Id : 1176, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =?= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1175 with 724 at 1,2,1,2,2,2
8800 Id : 1177, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1601, 1600, 1599, 1598, 1596] by Demod 1176 with 724 at 3
8801 Id : 2455, {_}: join (meet (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678) (meet (join (meet ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)) (meet ?3677 (join ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)))) (join (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678)) =>= ?3677 [3680, 3679, 3678, 3677, 3676] by Demod 1176 with 724 at 3
8802 Id : 2468, {_}: join (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))))) ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3789, 3788, 3787, 3786, 3785] by Super 2455 with 1177 at 1,2,2,2
8803 Id : 2844, {_}: join (meet ?3786 ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3788, 3787, 3785, 3789, 3786] by Demod 2468 with 1177 at 1,1,2
8804 Id : 2845, {_}: join (meet ?3786 ?3789) (meet ?3786 (join ?3786 ?3789)) =?= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3789, 3786] by Demod 2844 with 1177 at 1,2,2
8805 Id : 2846, {_}: ?3786 =<= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3786] by Demod 2845 with 1490 at 2
8806 Id : 2892, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet ?1598 (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1599, 1598, 1596] by Demod 1177 with 2846 at 1,2,2
8807 Id : 2917, {_}: join (meet ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141)) (meet (join (meet ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)) (meet ?4144 (join ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)))) (join ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141))) =>= ?4141 [4144, 4143, 4142, 4141, 4140] by Super 2 with 2846 at 2
8808 Id : 3327, {_}: ?4574 =<= join (meet ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574)) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4577, 4576, 4575, 4574] by Super 2892 with 2917 at 2
8809 Id : 3603, {_}: join (meet ?5256 ?5257) (meet ?5257 (join ?5256 ?5257)) =>= ?5257 [5257, 5256] by Super 2892 with 3327 at 2
8810 Id : 3994, {_}: ?5513 =<= meet (meet (join ?5513 ?5514) (join ?5515 ?5513)) ?5513 [5515, 5514, 5513] by Super 3327 with 3603 at 3
8811 Id : 4017, {_}: join ?5557 (meet ?5557 (join (meet (join ?5557 ?5558) (join ?5559 ?5557)) ?5557)) =>= ?5557 [5559, 5558, 5557] by Super 3603 with 3994 at 1,2
8812 Id : 4299, {_}: ?6141 =<= meet (meet ?6141 (join ?6142 ?6141)) ?6141 [6142, 6141] by Super 3994 with 4017 at 1,1,3
8813 Id : 4014, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4576, 4575, 4577, 4574] by Demod 3327 with 3994 at 2,1,3
8814 Id : 4015, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 ?4574)) [4577, 4574] by Demod 4014 with 3994 at 2,2,2,3
8815 Id : 5114, {_}: meet ?7036 (join ?7037 ?7037) =<= meet (meet (meet ?7036 (join ?7037 ?7037)) ?7037) (meet ?7036 (join ?7037 ?7037)) [7037, 7036] by Super 4299 with 4015 at 2,1,3
8816 Id : 4016, {_}: ?5555 =<= join (meet ?5555 ?5555) (join ?5555 ?5555) [5555] by Super 4015 with 3994 at 2,3
8817 Id : 4107, {_}: meet ?5754 ?5754 =<= meet (meet ?5754 (join ?5755 (meet ?5754 ?5754))) (meet ?5754 ?5754) [5755, 5754] by Super 3994 with 4016 at 1,1,3
8818 Id : 5124, {_}: meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066)) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Super 5114 with 4107 at 1,3
8819 Id : 4250, {_}: join ?5957 (meet ?5957 (join (meet (join ?5957 ?5958) (join ?5959 ?5957)) ?5957)) =>= ?5957 [5959, 5958, 5957] by Super 3603 with 3994 at 1,2
8820 Id : 4265, {_}: join ?6023 (meet ?6023 (join (meet ?6023 (join ?6024 ?6023)) ?6023)) =>= ?6023 [6024, 6023] by Super 4250 with 4017 at 1,1,2,2,2
8821 Id : 4601, {_}: join (meet ?6429 (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429))) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Super 3603 with 4265 at 2,2,2
8822 Id : 4304, {_}: meet ?6158 (join ?6159 ?6158) =<= meet (meet (meet ?6158 (join ?6159 ?6158)) ?6158) (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Super 4299 with 3603 at 2,1,3
8823 Id : 4244, {_}: ?5934 =<= meet (meet ?5934 (join ?5935 ?5934)) ?5934 [5935, 5934] by Super 3994 with 4017 at 1,1,3
8824 Id : 4357, {_}: meet ?6158 (join ?6159 ?6158) =<= meet ?6158 (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Demod 4304 with 4244 at 1,3
8825 Id : 4627, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4601 with 4357 at 1,2
8826 Id : 4628, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429 =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4627 with 4244 at 2,2
8827 Id : 1972, {_}: join (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet (meet ?2837 ?2838) ?2837)) (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet ?2837 ?2838)) =>= meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838)) [2838, 2837] by Super 1490 with 1599 at 2,2,2
8828 Id : 4599, {_}: join (meet ?6423 (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423))) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Super 1490 with 4265 at 2,2,2
8829 Id : 4633, {_}: join (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423)) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Demod 4599 with 4357 at 1,2
8830 Id : 5646, {_}: meet ?7542 ?7542 =<= meet (meet ?7542 ?7542) (meet ?7542 ?7542) [7542] by Super 4107 with 4633 at 2,1,3
8831 Id : 5765, {_}: join (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Super 1972 with 5646 at 2,2,2
8832 Id : 5836, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5765 with 5646 at 1,1,1,2
8833 Id : 5837, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5836 with 5646 at 1,2,1,2
8834 Id : 5838, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5837 with 5646 at 1,1,2,2
8835 Id : 5839, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5838 with 5646 at 1,3
8836 Id : 5840, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5839 with 4357 at 1,1,2
8837 Id : 5841, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5840 with 5646 at 2,1,2
8838 Id : 5842, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5841 with 4357 at 1,2,2
8839 Id : 5843, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5842 with 4357 at 3
8840 Id : 5844, {_}: join (meet ?7691 ?7691) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5843 with 4244 at 1,2
8841 Id : 5845, {_}: join (meet ?7691 ?7691) (meet ?7691 ?7691) =<= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5844 with 4244 at 2,2
8842 Id : 6090, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (join (meet ?7953 ?7953) (join (meet ?7953 ?7953) (meet ?7953 ?7953)))) =>= meet ?7953 ?7953 [7953] by Super 1490 with 5845 at 1,2
8843 Id : 5775, {_}: meet ?7723 ?7723 =<= join (meet ?7723 ?7723) (join (meet ?7723 ?7723) (meet ?7723 ?7723)) [7723] by Super 4016 with 5646 at 1,3
8844 Id : 6158, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (meet ?7953 ?7953)) =>= meet ?7953 ?7953 [7953] by Demod 6090 with 5775 at 2,2,2
8845 Id : 6159, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet ?7953 ?7953) =>= meet ?7953 ?7953 [7953] by Demod 6158 with 5646 at 2,2
8846 Id : 6371, {_}: join (meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Super 4628 with 6159 at 2,1,2,1,2
8847 Id : 6404, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Demod 6371 with 5646 at 1,2,1,2
8848 Id : 6405, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6404 with 6159 at 2,1,2,3
8849 Id : 6406, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6405 with 5845 at 1,2
8850 Id : 6407, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6406 with 5646 at 1,2,3
8851 Id : 6408, {_}: meet ?8123 ?8123 =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6407 with 6159 at 2
8852 Id : 6409, {_}: meet ?8123 ?8123 =<= join (meet ?8123 ?8123) (meet ?8123 ?8123) [8123] by Demod 6408 with 5845 at 3
8853 Id : 7067, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Demod 5124 with 6409 at 2,2
8854 Id : 7068, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (meet ?7066 ?7066)) [7066] by Demod 7067 with 6409 at 2,2,3
8855 Id : 7080, {_}: join (meet (meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Super 1599 with 7068 at 1,2,2
8856 Id : 7097, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7080 with 7068 at 1,1,2
8857 Id : 6508, {_}: meet ?8193 ?8193 =<= join (meet (meet ?8193 ?8193) (meet ?8193 ?8193)) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Super 4015 with 6409 at 2,2,3
8858 Id : 6644, {_}: meet ?8193 ?8193 =<= join (meet ?8193 ?8193) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Demod 6508 with 5646 at 1,3
8859 Id : 7098, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7097 with 6644 at 2,2,1,2
8860 Id : 6520, {_}: meet ?8223 ?8223 =<= meet (meet ?8223 (meet ?8223 ?8223)) (meet ?8223 ?8223) [8223] by Super 4107 with 6409 at 2,1,3
8861 Id : 7099, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7098 with 6520 at 2,2
8862 Id : 7100, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7099 with 7068 at 3
8863 Id : 7101, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7100 with 5646 at 2,1,2
8864 Id : 7102, {_}: join (meet ?8706 ?8706) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7101 with 6520 at 1,2
8865 Id : 7103, {_}: meet ?8706 ?8706 =<= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7102 with 6409 at 2
8866 Id : 7221, {_}: join (meet ?8760 ?8760) (meet ?8760 (join ?8760 (meet ?8760 ?8760))) =>= ?8760 [8760] by Super 1490 with 7103 at 1,2
8867 Id : 4105, {_}: join (meet (meet ?5749 ?5749) (join ?5749 ?5749)) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Super 3603 with 4016 at 2,2,2
8868 Id : 5654, {_}: ?7568 =<= join (meet ?7569 (join (join (meet ?7568 (join (meet ?7568 (join ?7570 ?7568)) ?7568)) (meet ?7568 ?7568)) ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7570, 7569, 7568] by Super 2846 with 4633 at 1,2,2,2,3
8869 Id : 5717, {_}: ?7568 =<= join (meet ?7569 (join ?7568 ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7569, 7568] by Demod 5654 with 4633 at 1,2,1,3
8870 Id : 8505, {_}: join ?9550 ?9550 =>= ?9550 [9550] by Super 4015 with 5717 at 3
8871 Id : 8587, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Demod 4105 with 8505 at 2,1,2
8872 Id : 8588, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= join ?5749 ?5749 [5749] by Demod 8587 with 8505 at 1,2,2
8873 Id : 8589, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8588 with 8505 at 3
8874 Id : 4106, {_}: join ?5751 ?5751 =<= meet (meet (join (join ?5751 ?5751) ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Super 3994 with 4016 at 2,1,3
8875 Id : 4242, {_}: join ?5927 ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Super 4106 with 4017 at 1,1,3
8876 Id : 8576, {_}: ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Demod 4242 with 8505 at 2
8877 Id : 8577, {_}: ?5927 =<= meet (meet ?5927 ?5927) (join ?5927 ?5927) [5927] by Demod 8576 with 8505 at 1,1,3
8878 Id : 8578, {_}: ?5927 =<= meet (meet ?5927 ?5927) ?5927 [5927] by Demod 8577 with 8505 at 2,3
8879 Id : 8604, {_}: join ?5749 (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8589 with 8578 at 1,2
8880 Id : 8605, {_}: join (meet ?8760 ?8760) (meet ?8760 ?8760) =>= ?8760 [8760] by Demod 7221 with 8604 at 2,2,2
8881 Id : 8606, {_}: meet ?8760 ?8760 =>= ?8760 [8760] by Demod 8605 with 8505 at 2
8882 Id : 8811, {_}: a === a [] by Demod 1 with 8606 at 2
8883 Id : 1, {_}: meet a a =>= a [] by prove_wal_axioms_1
8884 % SZS output end CNFRefutation for LAT092-1.p
8885 12081: solved LAT092-1.p in 17.29308 using nrkbo
8886 !! infer_left 52 0.0001 0.0000 0.0000
8887 !! infer_right 53 72.5999 22.2678 1.3698
8888 !! simplify_goal 53 0.0015 0.0003 0.0000
8889 !! keep_simplified 98 0.4693 0.3033 0.0048
8890 !! simplification_step 136 0.4687 0.3033 0.0034
8891 !! simplify 3578 65.0030 0.9771 0.0182
8892 !! orphan_murder 121 0.0030 0.0001 0.0000
8893 !! is_subsumed 3035 1.1068 0.4015 0.0004
8894 !! build_new_clause 1940 7.3169 0.4159 0.0038
8895 !! demodulate 3553 63.8813 0.9707 0.0180
8896 !! demod 440042 34.6025 0.4044 0.0001
8897 !! demod.apply_subst 13632 0.8216 0.4002 0.0001
8898 !! demod.retrieve_generalizations 440042 30.0174 0.4044 0.0001
8899 !! demod.unify 44511 1.2798 0.3002 0.0000
8900 !! build_clause 8756 29.6825 0.4098 0.0034
8901 !! compare_terms(nrkbo) 8758 13.4325 0.4041 0.0015
8902 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
8905 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
8907 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
8909 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
8911 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
8912 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
8913 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
8916 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
8918 12113: Id : 1, {_}: meet b a =<= meet a b [] by prove_wal_axioms_2
8921 Found proof, 88.383880s
8922 % SZS status Unsatisfiable for LAT093-1.p
8923 % SZS output start CNFRefutation for LAT093-1.p
8924 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)) (meet (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)) (meet ?7 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)))) (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
8925 Id : 3, {_}: join (meet (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11) (meet (join (meet ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)) (meet (join (meet ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)) (meet ?14 (join ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)))) (join ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)))) (join (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11)) =>= ?10 [14, 13, 12, 11, 10, 9] by single_axiom ?9 ?10 ?11 ?12 ?13 ?14
8926 Id : 31, {_}: join (meet (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208) (meet (join (meet ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (meet ?207 (join ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))))) (join (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208)) =>= join (meet ?206 ?207) (meet ?207 (join ?206 ?207)) [210, 209, 208, 207, 206, 205] by Super 3 with 2 at 1,2,1,2,2
8927 Id : 34, {_}: join (meet (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 236, 235, 234] by Super 31 with 2 at 2,2,2,1,2,2,2
8928 Id : 116, {_}: join (meet (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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(join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 34 with 2 at 2,1,1,1,2
8929 Id : 117, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join 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(meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 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(join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 116 with 2 at 1,2,1,1,2
8930 Id : 118, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) 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(join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 239, 238, 237, 235, 240, 236, 234] by Demod 117 with 2 at 2,2,2,1,1,2
8931 Id : 119, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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(join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 118 with 2 at 1,1,1,2,1,1,2,2
8932 Id : 120, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) 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(join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 119 with 2 at 2,2,1,2,1,1,2,2
8933 Id : 121, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 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?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 120 with 2 at 2,2,1,1,2,2
8934 Id : 122, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet 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?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 121 with 2 at 1,1,1,2,2,2,1,2,2
8935 Id : 123, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 122 with 2 at 2,2,1,2,2,2,1,2,2
8936 Id : 124, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 123 with 2 at 2,2,2,2,1,2,2
8937 Id : 125, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 124 with 2 at 2,1,1,2,2,2
8938 Id : 126, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240)) =?= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 125 with 2 at 1,2,1,2,2,2
8939 Id : 702, {_}: join (meet (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189) (meet (join (meet ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)) (meet (join (meet ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)) (meet (join (meet ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)) (meet ?1195 (join ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)))) (join ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)))) (join ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)))) (join (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189)) =>= ?1188 [1195, 1194, 1193, 1192, 1191, 1190, 1189, 1188, 1187] by Demod 126 with 2 at 3
8940 Id : 1101, {_}: join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1976] by Super 702 with 2 at 1,2,2
8941 Id : 724, {_}: join (meet (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497) (meet ?1496 (join (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497)) =>= ?1496 [1497, 1496, 1495] by Super 702 with 2 at 1,2,2
8942 Id : 1118, {_}: join (meet (join (meet (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101) (meet ?2101 (join (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101))) ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101, 2100] by Super 1101 with 724 at 1,2,2,2
8943 Id : 1490, {_}: join (meet ?2101 ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101] by Demod 1118 with 724 at 1,1,2
8944 Id : 10, {_}: join (meet (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84) (meet (join (meet ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (meet ?83 (join ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))))) (join (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84)) =>= join (meet ?82 ?83) (meet ?83 (join ?82 ?83)) [86, 85, 84, 83, 82, 81] by Super 3 with 2 at 1,2,1,2,2
8945 Id : 1054, {_}: join (meet (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1598, 1597, 1596] by Super 10 with 724 at 2,2,2,1,2,2,2
8946 Id : 1166, {_}: join (meet (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1054 with 724 at 2,1,1,1,2
8947 Id : 1167, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1166 with 724 at 1,2,1,1,2
8948 Id : 1168, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1597, 1599, 1598, 1596] by Demod 1167 with 724 at 2,2,2,1,1,2
8949 Id : 1169, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1168 with 724 at 1,1,1,2,1,1,2,2
8950 Id : 1170, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1169 with 724 at 2,2,1,2,1,1,2,2
8951 Id : 1171, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1170 with 724 at 2,2,1,1,2,2
8952 Id : 1172, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1171 with 724 at 1,1,1,2,2,2,1,2,2
8953 Id : 1173, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1172 with 724 at 2,2,1,2,2,2,1,2,2
8954 Id : 1174, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1173 with 724 at 2,2,2,2,1,2,2
8955 Id : 1175, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1174 with 724 at 2,1,1,2,2,2
8956 Id : 1176, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =?= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1175 with 724 at 1,2,1,2,2,2
8957 Id : 1177, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1601, 1600, 1599, 1598, 1596] by Demod 1176 with 724 at 3
8958 Id : 2455, {_}: join (meet (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678) (meet (join (meet ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)) (meet ?3677 (join ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)))) (join (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678)) =>= ?3677 [3680, 3679, 3678, 3677, 3676] by Demod 1176 with 724 at 3
8959 Id : 2468, {_}: join (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))))) ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3789, 3788, 3787, 3786, 3785] by Super 2455 with 1177 at 1,2,2,2
8960 Id : 2844, {_}: join (meet ?3786 ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3788, 3787, 3785, 3789, 3786] by Demod 2468 with 1177 at 1,1,2
8961 Id : 2845, {_}: join (meet ?3786 ?3789) (meet ?3786 (join ?3786 ?3789)) =?= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3789, 3786] by Demod 2844 with 1177 at 1,2,2
8962 Id : 2846, {_}: ?3786 =<= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3786] by Demod 2845 with 1490 at 2
8963 Id : 2892, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet ?1598 (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1599, 1598, 1596] by Demod 1177 with 2846 at 1,2,2
8964 Id : 2917, {_}: join (meet ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141)) (meet (join (meet ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)) (meet ?4144 (join ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)))) (join ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141))) =>= ?4141 [4144, 4143, 4142, 4141, 4140] by Super 2 with 2846 at 2
8965 Id : 3327, {_}: ?4574 =<= join (meet ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574)) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4577, 4576, 4575, 4574] by Super 2892 with 2917 at 2
8966 Id : 3603, {_}: join (meet ?5256 ?5257) (meet ?5257 (join ?5256 ?5257)) =>= ?5257 [5257, 5256] by Super 2892 with 3327 at 2
8967 Id : 3994, {_}: ?5513 =<= meet (meet (join ?5513 ?5514) (join ?5515 ?5513)) ?5513 [5515, 5514, 5513] by Super 3327 with 3603 at 3
8968 Id : 4017, {_}: join ?5557 (meet ?5557 (join (meet (join ?5557 ?5558) (join ?5559 ?5557)) ?5557)) =>= ?5557 [5559, 5558, 5557] by Super 3603 with 3994 at 1,2
8969 Id : 4299, {_}: ?6141 =<= meet (meet ?6141 (join ?6142 ?6141)) ?6141 [6142, 6141] by Super 3994 with 4017 at 1,1,3
8970 Id : 4014, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4576, 4575, 4577, 4574] by Demod 3327 with 3994 at 2,1,3
8971 Id : 4015, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 ?4574)) [4577, 4574] by Demod 4014 with 3994 at 2,2,2,3
8972 Id : 5114, {_}: meet ?7036 (join ?7037 ?7037) =<= meet (meet (meet ?7036 (join ?7037 ?7037)) ?7037) (meet ?7036 (join ?7037 ?7037)) [7037, 7036] by Super 4299 with 4015 at 2,1,3
8973 Id : 5213, {_}: meet (join ?7149 ?7150) (join ?7149 ?7149) =<= meet ?7149 (meet (join ?7149 ?7150) (join ?7149 ?7149)) [7150, 7149] by Super 5114 with 3994 at 1,3
8974 Id : 5218, {_}: meet (join (meet ?7166 ?7167) (meet ?7167 (join ?7166 ?7167))) (join (meet ?7166 ?7167) (meet ?7166 ?7167)) =>= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7167, 7166] by Super 5213 with 3603 at 1,2,3
8975 Id : 5280, {_}: meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167)) =<= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7166, 7167] by Demod 5218 with 3603 at 1,2
8976 Id : 4250, {_}: join ?5957 (meet ?5957 (join (meet (join ?5957 ?5958) (join ?5959 ?5957)) ?5957)) =>= ?5957 [5959, 5958, 5957] by Super 3603 with 3994 at 1,2
8977 Id : 4265, {_}: join ?6023 (meet ?6023 (join (meet ?6023 (join ?6024 ?6023)) ?6023)) =>= ?6023 [6024, 6023] by Super 4250 with 4017 at 1,1,2,2,2
8978 Id : 4599, {_}: join (meet ?6423 (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423))) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Super 1490 with 4265 at 2,2,2
8979 Id : 4304, {_}: meet ?6158 (join ?6159 ?6158) =<= meet (meet (meet ?6158 (join ?6159 ?6158)) ?6158) (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Super 4299 with 3603 at 2,1,3
8980 Id : 4244, {_}: ?5934 =<= meet (meet ?5934 (join ?5935 ?5934)) ?5934 [5935, 5934] by Super 3994 with 4017 at 1,1,3
8981 Id : 4357, {_}: meet ?6158 (join ?6159 ?6158) =<= meet ?6158 (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Demod 4304 with 4244 at 1,3
8982 Id : 4633, {_}: join (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423)) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Demod 4599 with 4357 at 1,2
8983 Id : 5654, {_}: ?7568 =<= join (meet ?7569 (join (join (meet ?7568 (join (meet ?7568 (join ?7570 ?7568)) ?7568)) (meet ?7568 ?7568)) ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7570, 7569, 7568] by Super 2846 with 4633 at 1,2,2,2,3
8984 Id : 5717, {_}: ?7568 =<= join (meet ?7569 (join ?7568 ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7569, 7568] by Demod 5654 with 4633 at 1,2,1,3
8985 Id : 8505, {_}: join ?9550 ?9550 =>= ?9550 [9550] by Super 4015 with 5717 at 3
8986 Id : 8599, {_}: meet ?7167 (meet ?7166 ?7167) =<= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7166, 7167] by Demod 5280 with 8505 at 2,2
8987 Id : 8600, {_}: meet ?7167 (meet ?7166 ?7167) =<= meet (meet ?7166 ?7167) (meet ?7167 (meet ?7166 ?7167)) [7166, 7167] by Demod 8599 with 8505 at 2,2,3
8988 Id : 1594, {_}: join (meet ?2599 ?2600) (meet ?2599 (join ?2599 ?2600)) =>= ?2599 [2600, 2599] by Demod 1118 with 724 at 1,1,2
8989 Id : 1599, {_}: join (meet (meet ?2630 ?2631) (meet ?2630 (join ?2630 ?2631))) (meet (meet ?2630 ?2631) ?2630) =>= meet ?2630 ?2631 [2631, 2630] by Super 1594 with 1490 at 2,2,2
8990 Id : 8580, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 ?4574) [4577, 4574] by Demod 4015 with 8505 at 2,2,3
8991 Id : 4016, {_}: ?5555 =<= join (meet ?5555 ?5555) (join ?5555 ?5555) [5555] by Super 4015 with 3994 at 2,3
8992 Id : 4107, {_}: meet ?5754 ?5754 =<= meet (meet ?5754 (join ?5755 (meet ?5754 ?5754))) (meet ?5754 ?5754) [5755, 5754] by Super 3994 with 4016 at 1,1,3
8993 Id : 5124, {_}: meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066)) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Super 5114 with 4107 at 1,3
8994 Id : 4601, {_}: join (meet ?6429 (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429))) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Super 3603 with 4265 at 2,2,2
8995 Id : 4627, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4601 with 4357 at 1,2
8996 Id : 4628, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429 =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4627 with 4244 at 2,2
8997 Id : 1972, {_}: join (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet (meet ?2837 ?2838) ?2837)) (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet ?2837 ?2838)) =>= meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838)) [2838, 2837] by Super 1490 with 1599 at 2,2,2
8998 Id : 5646, {_}: meet ?7542 ?7542 =<= meet (meet ?7542 ?7542) (meet ?7542 ?7542) [7542] by Super 4107 with 4633 at 2,1,3
8999 Id : 5765, {_}: join (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Super 1972 with 5646 at 2,2,2
9000 Id : 5836, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5765 with 5646 at 1,1,1,2
9001 Id : 5837, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5836 with 5646 at 1,2,1,2
9002 Id : 5838, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5837 with 5646 at 1,1,2,2
9003 Id : 5839, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5838 with 5646 at 1,3
9004 Id : 5840, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5839 with 4357 at 1,1,2
9005 Id : 5841, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5840 with 5646 at 2,1,2
9006 Id : 5842, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5841 with 4357 at 1,2,2
9007 Id : 5843, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5842 with 4357 at 3
9008 Id : 5844, {_}: join (meet ?7691 ?7691) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5843 with 4244 at 1,2
9009 Id : 5845, {_}: join (meet ?7691 ?7691) (meet ?7691 ?7691) =<= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5844 with 4244 at 2,2
9010 Id : 6090, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (join (meet ?7953 ?7953) (join (meet ?7953 ?7953) (meet ?7953 ?7953)))) =>= meet ?7953 ?7953 [7953] by Super 1490 with 5845 at 1,2
9011 Id : 5775, {_}: meet ?7723 ?7723 =<= join (meet ?7723 ?7723) (join (meet ?7723 ?7723) (meet ?7723 ?7723)) [7723] by Super 4016 with 5646 at 1,3
9012 Id : 6158, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (meet ?7953 ?7953)) =>= meet ?7953 ?7953 [7953] by Demod 6090 with 5775 at 2,2,2
9013 Id : 6159, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet ?7953 ?7953) =>= meet ?7953 ?7953 [7953] by Demod 6158 with 5646 at 2,2
9014 Id : 6371, {_}: join (meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Super 4628 with 6159 at 2,1,2,1,2
9015 Id : 6404, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Demod 6371 with 5646 at 1,2,1,2
9016 Id : 6405, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6404 with 6159 at 2,1,2,3
9017 Id : 6406, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6405 with 5845 at 1,2
9018 Id : 6407, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6406 with 5646 at 1,2,3
9019 Id : 6408, {_}: meet ?8123 ?8123 =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6407 with 6159 at 2
9020 Id : 6409, {_}: meet ?8123 ?8123 =<= join (meet ?8123 ?8123) (meet ?8123 ?8123) [8123] by Demod 6408 with 5845 at 3
9021 Id : 7067, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Demod 5124 with 6409 at 2,2
9022 Id : 7068, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (meet ?7066 ?7066)) [7066] by Demod 7067 with 6409 at 2,2,3
9023 Id : 7080, {_}: join (meet (meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Super 1599 with 7068 at 1,2,2
9024 Id : 7097, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7080 with 7068 at 1,1,2
9025 Id : 6508, {_}: meet ?8193 ?8193 =<= join (meet (meet ?8193 ?8193) (meet ?8193 ?8193)) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Super 4015 with 6409 at 2,2,3
9026 Id : 6644, {_}: meet ?8193 ?8193 =<= join (meet ?8193 ?8193) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Demod 6508 with 5646 at 1,3
9027 Id : 7098, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7097 with 6644 at 2,2,1,2
9028 Id : 6520, {_}: meet ?8223 ?8223 =<= meet (meet ?8223 (meet ?8223 ?8223)) (meet ?8223 ?8223) [8223] by Super 4107 with 6409 at 2,1,3
9029 Id : 7099, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7098 with 6520 at 2,2
9030 Id : 7100, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7099 with 7068 at 3
9031 Id : 7101, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7100 with 5646 at 2,1,2
9032 Id : 7102, {_}: join (meet ?8706 ?8706) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7101 with 6520 at 1,2
9033 Id : 7103, {_}: meet ?8706 ?8706 =<= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7102 with 6409 at 2
9034 Id : 7221, {_}: join (meet ?8760 ?8760) (meet ?8760 (join ?8760 (meet ?8760 ?8760))) =>= ?8760 [8760] by Super 1490 with 7103 at 1,2
9035 Id : 4105, {_}: join (meet (meet ?5749 ?5749) (join ?5749 ?5749)) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Super 3603 with 4016 at 2,2,2
9036 Id : 8587, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Demod 4105 with 8505 at 2,1,2
9037 Id : 8588, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= join ?5749 ?5749 [5749] by Demod 8587 with 8505 at 1,2,2
9038 Id : 8589, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8588 with 8505 at 3
9039 Id : 4106, {_}: join ?5751 ?5751 =<= meet (meet (join (join ?5751 ?5751) ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Super 3994 with 4016 at 2,1,3
9040 Id : 4242, {_}: join ?5927 ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Super 4106 with 4017 at 1,1,3
9041 Id : 8576, {_}: ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Demod 4242 with 8505 at 2
9042 Id : 8577, {_}: ?5927 =<= meet (meet ?5927 ?5927) (join ?5927 ?5927) [5927] by Demod 8576 with 8505 at 1,1,3
9043 Id : 8578, {_}: ?5927 =<= meet (meet ?5927 ?5927) ?5927 [5927] by Demod 8577 with 8505 at 2,3
9044 Id : 8604, {_}: join ?5749 (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8589 with 8578 at 1,2
9045 Id : 8605, {_}: join (meet ?8760 ?8760) (meet ?8760 ?8760) =>= ?8760 [8760] by Demod 7221 with 8604 at 2,2,2
9046 Id : 8606, {_}: meet ?8760 ?8760 =>= ?8760 [8760] by Demod 8605 with 8505 at 2
9047 Id : 8625, {_}: ?4574 =<= join ?4574 (meet ?4577 ?4574) [4577, 4574] by Demod 8580 with 8606 at 1,3
9048 Id : 8662, {_}: ?9653 =<= join (meet (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653) (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) (meet ?9653 (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) [9655, 9654, 9653] by Super 2846 with 8505 at 2,2,3
9049 Id : 8767, {_}: ?9653 =<= join (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653) (meet ?9653 (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) [9655, 9654, 9653] by Demod 8662 with 8606 at 1,3
9050 Id : 8768, {_}: ?9653 =<= join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653 [9655, 9654, 9653] by Demod 8767 with 8625 at 3
9051 Id : 8832, {_}: join (meet (join (meet ?9751 ?9752) (meet ?9753 ?9751)) ?9751) (meet (join (meet ?9751 ?9752) (meet ?9753 ?9751)) ?9751) =>= join (meet ?9751 ?9752) (meet ?9753 ?9751) [9753, 9752, 9751] by Super 1490 with 8768 at 2,2,2
9052 Id : 8936, {_}: meet (join (meet ?9970 ?9971) (meet ?9972 ?9970)) ?9970 =>= join (meet ?9970 ?9971) (meet ?9972 ?9970) [9972, 9971, 9970] by Demod 8832 with 8505 at 2
9053 Id : 8937, {_}: meet (join (meet ?9974 ?9975) ?9974) ?9974 =>= join (meet ?9974 ?9975) (meet ?9974 ?9974) [9975, 9974] by Super 8936 with 8606 at 2,1,2
9054 Id : 9092, {_}: meet (join (meet ?9974 ?9975) ?9974) ?9974 =>= join (meet ?9974 ?9975) ?9974 [9975, 9974] by Demod 8937 with 8606 at 2,3
9055 Id : 9140, {_}: ?10108 =<= join ?10108 (join (meet ?10108 ?10109) ?10108) [10109, 10108] by Super 8625 with 9092 at 2,3
9056 Id : 9413, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) (meet ?10366 ?10366)) (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Super 1599 with 9140 at 2,2,1,2
9057 Id : 9473, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9413 with 8606 at 2,1,2
9058 Id : 9474, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) ?10366 =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9473 with 4244 at 2,2
9059 Id : 9475, {_}: join ?10366 ?10366 =<= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9474 with 4244 at 1,2
9060 Id : 9476, {_}: ?10366 =<= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9475 with 8505 at 2
9061 Id : 9701, {_}: meet (join (meet ?10626 ?10627) ?10626) (meet ?10626 (join (meet ?10626 ?10627) ?10626)) =<= meet (meet ?10626 (join (meet ?10626 ?10627) ?10626)) (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Super 8600 with 9476 at 2,2,3
9062 Id : 9740, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =<= meet (meet ?10626 (join (meet ?10626 ?10627) ?10626)) (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Demod 9701 with 9476 at 2,2
9063 Id : 9741, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =<= meet ?10626 (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Demod 9740 with 9476 at 1,3
9064 Id : 9742, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =?= meet ?10626 (join (meet ?10626 ?10627) ?10626) [10627, 10626] by Demod 9741 with 9092 at 2,3
9065 Id : 9743, {_}: join (meet ?10626 ?10627) ?10626 =<= meet ?10626 (join (meet ?10626 ?10627) ?10626) [10627, 10626] by Demod 9742 with 9092 at 2
9066 Id : 9744, {_}: join (meet ?10626 ?10627) ?10626 =>= ?10626 [10627, 10626] by Demod 9743 with 9476 at 3
9067 Id : 9898, {_}: join (meet (meet ?10737 ?10738) ?10737) (meet (meet ?10737 ?10738) ?10737) =>= meet ?10737 ?10738 [10738, 10737] by Super 1490 with 9744 at 2,2,2
9068 Id : 9933, {_}: meet (meet ?10737 ?10738) ?10737 =>= meet ?10737 ?10738 [10738, 10737] by Demod 9898 with 8505 at 2
9069 Id : 10160, {_}: ?10995 =<= join ?10995 (meet ?10995 ?10996) [10996, 10995] by Super 8625 with 9933 at 2,3
9070 Id : 18660, {_}: meet ?24249 ?24250 =<= meet (meet (join (meet ?24249 ?24250) ?24251) ?24249) (meet ?24249 ?24250) [24251, 24250, 24249] by Super 3994 with 10160 at 2,1,3
9071 Id : 10148, {_}: ?5934 =<= meet ?5934 (join ?5935 ?5934) [5935, 5934] by Demod 4244 with 9933 at 3
9072 Id : 10149, {_}: join (meet ?5256 ?5257) ?5257 =>= ?5257 [5257, 5256] by Demod 3603 with 10148 at 2,2
9073 Id : 18724, {_}: meet ?24541 ?24542 =<= meet (meet ?24542 ?24541) (meet ?24541 ?24542) [24542, 24541] by Super 18660 with 10149 at 1,1,3
9074 Id : 19052, {_}: meet (meet ?24692 ?24693) (meet ?24693 ?24692) =<->= meet (meet ?24693 ?24692) (meet ?24692 ?24693) [24693, 24692] by Super 9933 with 18724 at 1,2
9075 Id : 19187, {_}: meet ?24693 ?24692 =<= meet (meet ?24693 ?24692) (meet ?24692 ?24693) [24692, 24693] by Demod 19052 with 18724 at 2
9076 Id : 19188, {_}: meet ?24693 ?24692 =<->= meet ?24692 ?24693 [24692, 24693] by Demod 19187 with 18724 at 3
9077 Id : 19630, {_}: meet b a === meet b a [] by Demod 1 with 19188 at 3
9078 Id : 1, {_}: meet b a =<= meet a b [] by prove_wal_axioms_2
9079 % SZS output end CNFRefutation for LAT093-1.p
9080 12116: solved LAT093-1.p in 18.853178 using nrkbo
9081 !! infer_left 110 0.0001 0.0000 0.0000
9082 !! infer_right 111 86.1213 25.0859 0.7759
9083 !! simplify_goal 111 0.0055 0.0004 0.0000
9084 !! keep_simplified 212 0.9959 0.4020 0.0047
9085 !! simplification_step 268 0.9943 0.4020 0.0037
9086 !! simplify 9725 78.2409 0.9920 0.0080
9087 !! orphan_murder 284 0.0075 0.0001 0.0000
9088 !! is_subsumed 6559 2.0830 0.4074 0.0003
9089 !! build_new_clause 5888 7.5057 0.4135 0.0013
9090 !! demodulate 9520 75.8249 0.9872 0.0080
9091 !! demod 483466 45.5498 0.4128 0.0001
9092 !! demod.apply_subst 33178 0.8581 0.4001 0.0000
9093 !! demod.compare_terms 2986 0.0444 0.0006 0.0000
9094 !! demod.retrieve_generalizations 483466 33.7243 0.4124 0.0001
9095 !! demod.unify 139781 4.6955 0.4008 0.0000
9096 !! build_clause 19556 31.5016 0.4095 0.0016
9097 !! compare_terms(nrkbo) 22747 15.5727 0.4090 0.0007
9098 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
9101 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
9103 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
9105 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
9107 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
9108 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
9109 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
9112 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9114 12155: Id : 1, {_}: join a a =>= a [] by prove_wal_axioms_3
9117 Found proof, 67.902857s
9118 % SZS status Unsatisfiable for LAT094-1.p
9119 % SZS output start CNFRefutation for LAT094-1.p
9120 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)) (meet (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)) (meet ?7 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)))) (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9121 Id : 3, {_}: join (meet (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11) (meet (join (meet ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)) (meet (join (meet ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)) (meet ?14 (join ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)))) (join ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)))) (join (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11)) =>= ?10 [14, 13, 12, 11, 10, 9] by single_axiom ?9 ?10 ?11 ?12 ?13 ?14
9122 Id : 10, {_}: join (meet (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84) (meet (join (meet ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (meet ?83 (join ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))))) (join (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84)) =>= join (meet ?82 ?83) (meet ?83 (join ?82 ?83)) [86, 85, 84, 83, 82, 81] by Super 3 with 2 at 1,2,1,2,2
9123 Id : 31, {_}: join (meet (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208) (meet (join (meet ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (meet ?207 (join ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))))) (join (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208)) =>= join (meet ?206 ?207) (meet ?207 (join ?206 ?207)) [210, 209, 208, 207, 206, 205] by Super 3 with 2 at 1,2,1,2,2
9124 Id : 34, {_}: join (meet (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 236, 235, 234] by Super 31 with 2 at 2,2,2,1,2,2,2
9125 Id : 116, {_}: join (meet (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 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(meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 116 with 2 at 1,2,1,1,2
9127 Id : 118, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) 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(meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join 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9128 Id : 119, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 118 with 2 at 1,1,1,2,1,1,2,2
9129 Id : 120, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) 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?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 119 with 2 at 2,2,1,2,1,1,2,2
9130 Id : 121, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 120 with 2 at 2,2,1,1,2,2
9131 Id : 122, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 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(meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 121 with 2 at 1,1,1,2,2,2,1,2,2
9132 Id : 123, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 122 with 2 at 2,2,1,2,2,2,1,2,2
9133 Id : 124, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 123 with 2 at 2,2,2,2,1,2,2
9134 Id : 125, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 124 with 2 at 2,1,1,2,2,2
9135 Id : 126, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240)) =?= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 125 with 2 at 1,2,1,2,2,2
9136 Id : 702, {_}: join (meet (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189) (meet (join (meet ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)) (meet (join (meet ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)) (meet (join (meet ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)) (meet ?1195 (join ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)))) (join ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)))) (join ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)))) (join (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189)) =>= ?1188 [1195, 1194, 1193, 1192, 1191, 1190, 1189, 1188, 1187] by Demod 126 with 2 at 3
9137 Id : 724, {_}: join (meet (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497) (meet ?1496 (join (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497)) =>= ?1496 [1497, 1496, 1495] by Super 702 with 2 at 1,2,2
9138 Id : 1054, {_}: join (meet (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1598, 1597, 1596] by Super 10 with 724 at 2,2,2,1,2,2,2
9139 Id : 1166, {_}: join (meet (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1054 with 724 at 2,1,1,1,2
9140 Id : 1167, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1166 with 724 at 1,2,1,1,2
9141 Id : 1168, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1597, 1599, 1598, 1596] by Demod 1167 with 724 at 2,2,2,1,1,2
9142 Id : 1169, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1168 with 724 at 1,1,1,2,1,1,2,2
9143 Id : 1170, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1169 with 724 at 2,2,1,2,1,1,2,2
9144 Id : 1171, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1170 with 724 at 2,2,1,1,2,2
9145 Id : 1172, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1171 with 724 at 1,1,1,2,2,2,1,2,2
9146 Id : 1173, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1172 with 724 at 2,2,1,2,2,2,1,2,2
9147 Id : 1174, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1173 with 724 at 2,2,2,2,1,2,2
9148 Id : 1175, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1174 with 724 at 2,1,1,2,2,2
9149 Id : 1176, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =?= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1175 with 724 at 1,2,1,2,2,2
9150 Id : 1177, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1601, 1600, 1599, 1598, 1596] by Demod 1176 with 724 at 3
9151 Id : 2455, {_}: join (meet (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678) (meet (join (meet ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)) (meet ?3677 (join ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)))) (join (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678)) =>= ?3677 [3680, 3679, 3678, 3677, 3676] by Demod 1176 with 724 at 3
9152 Id : 2468, {_}: join (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))))) ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3789, 3788, 3787, 3786, 3785] by Super 2455 with 1177 at 1,2,2,2
9153 Id : 2844, {_}: join (meet ?3786 ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3788, 3787, 3785, 3789, 3786] by Demod 2468 with 1177 at 1,1,2
9154 Id : 2845, {_}: join (meet ?3786 ?3789) (meet ?3786 (join ?3786 ?3789)) =?= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3789, 3786] by Demod 2844 with 1177 at 1,2,2
9155 Id : 1101, {_}: join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1976] by Super 702 with 2 at 1,2,2
9156 Id : 1118, {_}: join (meet (join (meet (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101) (meet ?2101 (join (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101))) ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101, 2100] by Super 1101 with 724 at 1,2,2,2
9157 Id : 1490, {_}: join (meet ?2101 ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101] by Demod 1118 with 724 at 1,1,2
9158 Id : 2846, {_}: ?3786 =<= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3786] by Demod 2845 with 1490 at 2
9159 Id : 2892, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet ?1598 (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1599, 1598, 1596] by Demod 1177 with 2846 at 1,2,2
9160 Id : 2917, {_}: join (meet ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141)) (meet (join (meet ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)) (meet ?4144 (join ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)))) (join ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141))) =>= ?4141 [4144, 4143, 4142, 4141, 4140] by Super 2 with 2846 at 2
9161 Id : 3327, {_}: ?4574 =<= join (meet ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574)) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4577, 4576, 4575, 4574] by Super 2892 with 2917 at 2
9162 Id : 3603, {_}: join (meet ?5256 ?5257) (meet ?5257 (join ?5256 ?5257)) =>= ?5257 [5257, 5256] by Super 2892 with 3327 at 2
9163 Id : 3994, {_}: ?5513 =<= meet (meet (join ?5513 ?5514) (join ?5515 ?5513)) ?5513 [5515, 5514, 5513] by Super 3327 with 3603 at 3
9164 Id : 4014, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4576, 4575, 4577, 4574] by Demod 3327 with 3994 at 2,1,3
9165 Id : 4015, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 ?4574)) [4577, 4574] by Demod 4014 with 3994 at 2,2,2,3
9166 Id : 4250, {_}: join ?5957 (meet ?5957 (join (meet (join ?5957 ?5958) (join ?5959 ?5957)) ?5957)) =>= ?5957 [5959, 5958, 5957] by Super 3603 with 3994 at 1,2
9167 Id : 4017, {_}: join ?5557 (meet ?5557 (join (meet (join ?5557 ?5558) (join ?5559 ?5557)) ?5557)) =>= ?5557 [5559, 5558, 5557] by Super 3603 with 3994 at 1,2
9168 Id : 4265, {_}: join ?6023 (meet ?6023 (join (meet ?6023 (join ?6024 ?6023)) ?6023)) =>= ?6023 [6024, 6023] by Super 4250 with 4017 at 1,1,2,2,2
9169 Id : 4599, {_}: join (meet ?6423 (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423))) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Super 1490 with 4265 at 2,2,2
9170 Id : 4299, {_}: ?6141 =<= meet (meet ?6141 (join ?6142 ?6141)) ?6141 [6142, 6141] by Super 3994 with 4017 at 1,1,3
9171 Id : 4304, {_}: meet ?6158 (join ?6159 ?6158) =<= meet (meet (meet ?6158 (join ?6159 ?6158)) ?6158) (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Super 4299 with 3603 at 2,1,3
9172 Id : 4244, {_}: ?5934 =<= meet (meet ?5934 (join ?5935 ?5934)) ?5934 [5935, 5934] by Super 3994 with 4017 at 1,1,3
9173 Id : 4357, {_}: meet ?6158 (join ?6159 ?6158) =<= meet ?6158 (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Demod 4304 with 4244 at 1,3
9174 Id : 4633, {_}: join (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423)) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Demod 4599 with 4357 at 1,2
9175 Id : 5654, {_}: ?7568 =<= join (meet ?7569 (join (join (meet ?7568 (join (meet ?7568 (join ?7570 ?7568)) ?7568)) (meet ?7568 ?7568)) ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7570, 7569, 7568] by Super 2846 with 4633 at 1,2,2,2,3
9176 Id : 5717, {_}: ?7568 =<= join (meet ?7569 (join ?7568 ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7569, 7568] by Demod 5654 with 4633 at 1,2,1,3
9177 Id : 8505, {_}: join ?9550 ?9550 =>= ?9550 [9550] by Super 4015 with 5717 at 3
9178 Id : 8811, {_}: a === a [] by Demod 1 with 8505 at 2
9179 Id : 1, {_}: join a a =>= a [] by prove_wal_axioms_3
9180 % SZS output end CNFRefutation for LAT094-1.p
9181 12158: solved LAT094-1.p in 17.29708 using nrkbo
9182 !! infer_left 52 0.0001 0.0000 0.0000
9183 !! infer_right 53 67.0029 19.9642 1.2642
9184 !! simplify_goal 53 0.0015 0.0003 0.0000
9185 !! keep_simplified 98 0.4607 0.3056 0.0047
9186 !! simplification_step 136 0.4602 0.3028 0.0034
9187 !! simplify 3578 60.3991 0.7946 0.0169
9188 !! orphan_murder 121 0.0031 0.0001 0.0000
9189 !! is_subsumed 3035 1.9189 0.3281 0.0006
9190 !! build_new_clause 1940 6.0112 0.3156 0.0031
9191 !! demodulate 3553 58.4660 0.7875 0.0165
9192 !! demod 440042 31.4566 0.3077 0.0001
9193 !! demod.apply_subst 13632 0.7294 0.3001 0.0001
9194 !! demod.retrieve_generalizations 440042 24.4262 0.3077 0.0001
9195 !! demod.unify 44511 1.2775 0.3001 0.0000
9196 !! build_clause 8756 27.2039 0.3099 0.0031
9197 !! compare_terms(nrkbo) 8758 14.0859 0.3050 0.0016
9198 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
9201 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
9203 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
9205 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
9207 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
9208 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
9209 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
9212 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9214 12174: Id : 1, {_}: join b a =<= join a b [] by prove_wal_axioms_4
9215 % SZS status Timeout for LAT095-1.p
9218 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
9220 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
9222 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
9224 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
9225 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
9226 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
9229 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9232 meet (meet (join a b) (join c b)) b =>= b
9233 [] by prove_wal_axioms_5
9236 Found proof, 71.319399s
9237 % SZS status Unsatisfiable for LAT096-1.p
9238 % SZS output start CNFRefutation for LAT096-1.p
9239 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)) (meet (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)) (meet ?7 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)))) (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9240 Id : 3, {_}: join (meet (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11) (meet (join (meet ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)) (meet (join (meet ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)) (meet ?14 (join ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)))) (join ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)))) (join (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11)) =>= ?10 [14, 13, 12, 11, 10, 9] by single_axiom ?9 ?10 ?11 ?12 ?13 ?14
9241 Id : 10, {_}: join (meet (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84) (meet (join (meet ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (meet ?83 (join ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))))) (join (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84)) =>= join (meet ?82 ?83) (meet ?83 (join ?82 ?83)) [86, 85, 84, 83, 82, 81] by Super 3 with 2 at 1,2,1,2,2
9242 Id : 31, {_}: join (meet (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208) (meet (join (meet ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (meet ?207 (join ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))))) (join (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208)) =>= join (meet ?206 ?207) (meet ?207 (join ?206 ?207)) [210, 209, 208, 207, 206, 205] by Super 3 with 2 at 1,2,1,2,2
9243 Id : 34, {_}: join (meet (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 236, 235, 234] by Super 31 with 2 at 2,2,2,1,2,2,2
9244 Id : 116, {_}: join (meet (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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9245 Id : 117, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join 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(meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 116 with 2 at 1,2,1,1,2
9246 Id : 118, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) 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(meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join 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9247 Id : 119, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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9248 Id : 120, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) 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?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 119 with 2 at 2,2,1,2,1,1,2,2
9249 Id : 121, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 120 with 2 at 2,2,1,1,2,2
9250 Id : 122, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 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(meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 121 with 2 at 1,1,1,2,2,2,1,2,2
9251 Id : 123, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 122 with 2 at 2,2,1,2,2,2,1,2,2
9252 Id : 124, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 123 with 2 at 2,2,2,2,1,2,2
9253 Id : 125, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 124 with 2 at 2,1,1,2,2,2
9254 Id : 126, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240)) =?= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 125 with 2 at 1,2,1,2,2,2
9255 Id : 702, {_}: join (meet (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189) (meet (join (meet ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)) (meet (join (meet ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)) (meet (join (meet ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)) (meet ?1195 (join ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)))) (join ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)))) (join ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)))) (join (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189)) =>= ?1188 [1195, 1194, 1193, 1192, 1191, 1190, 1189, 1188, 1187] by Demod 126 with 2 at 3
9256 Id : 724, {_}: join (meet (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497) (meet ?1496 (join (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497)) =>= ?1496 [1497, 1496, 1495] by Super 702 with 2 at 1,2,2
9257 Id : 1054, {_}: join (meet (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1598, 1597, 1596] by Super 10 with 724 at 2,2,2,1,2,2,2
9258 Id : 1166, {_}: join (meet (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1054 with 724 at 2,1,1,1,2
9259 Id : 1167, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1166 with 724 at 1,2,1,1,2
9260 Id : 1168, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1597, 1599, 1598, 1596] by Demod 1167 with 724 at 2,2,2,1,1,2
9261 Id : 1169, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1168 with 724 at 1,1,1,2,1,1,2,2
9262 Id : 1170, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1169 with 724 at 2,2,1,2,1,1,2,2
9263 Id : 1171, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1170 with 724 at 2,2,1,1,2,2
9264 Id : 1172, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1171 with 724 at 1,1,1,2,2,2,1,2,2
9265 Id : 1173, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1172 with 724 at 2,2,1,2,2,2,1,2,2
9266 Id : 1174, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1173 with 724 at 2,2,2,2,1,2,2
9267 Id : 1175, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1174 with 724 at 2,1,1,2,2,2
9268 Id : 1176, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =?= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1175 with 724 at 1,2,1,2,2,2
9269 Id : 1177, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1601, 1600, 1599, 1598, 1596] by Demod 1176 with 724 at 3
9270 Id : 2455, {_}: join (meet (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678) (meet (join (meet ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)) (meet ?3677 (join ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)))) (join (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678)) =>= ?3677 [3680, 3679, 3678, 3677, 3676] by Demod 1176 with 724 at 3
9271 Id : 2468, {_}: join (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))))) ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3789, 3788, 3787, 3786, 3785] by Super 2455 with 1177 at 1,2,2,2
9272 Id : 2844, {_}: join (meet ?3786 ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3788, 3787, 3785, 3789, 3786] by Demod 2468 with 1177 at 1,1,2
9273 Id : 2845, {_}: join (meet ?3786 ?3789) (meet ?3786 (join ?3786 ?3789)) =?= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3789, 3786] by Demod 2844 with 1177 at 1,2,2
9274 Id : 1101, {_}: join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1976] by Super 702 with 2 at 1,2,2
9275 Id : 1118, {_}: join (meet (join (meet (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101) (meet ?2101 (join (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101))) ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101, 2100] by Super 1101 with 724 at 1,2,2,2
9276 Id : 1490, {_}: join (meet ?2101 ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101] by Demod 1118 with 724 at 1,1,2
9277 Id : 2846, {_}: ?3786 =<= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3786] by Demod 2845 with 1490 at 2
9278 Id : 2892, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet ?1598 (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1599, 1598, 1596] by Demod 1177 with 2846 at 1,2,2
9279 Id : 2917, {_}: join (meet ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141)) (meet (join (meet ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)) (meet ?4144 (join ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)))) (join ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141))) =>= ?4141 [4144, 4143, 4142, 4141, 4140] by Super 2 with 2846 at 2
9280 Id : 3327, {_}: ?4574 =<= join (meet ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574)) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4577, 4576, 4575, 4574] by Super 2892 with 2917 at 2
9281 Id : 3603, {_}: join (meet ?5256 ?5257) (meet ?5257 (join ?5256 ?5257)) =>= ?5257 [5257, 5256] by Super 2892 with 3327 at 2
9282 Id : 3994, {_}: ?5513 =<= meet (meet (join ?5513 ?5514) (join ?5515 ?5513)) ?5513 [5515, 5514, 5513] by Super 3327 with 3603 at 3
9283 Id : 4017, {_}: join ?5557 (meet ?5557 (join (meet (join ?5557 ?5558) (join ?5559 ?5557)) ?5557)) =>= ?5557 [5559, 5558, 5557] by Super 3603 with 3994 at 1,2
9284 Id : 4299, {_}: ?6141 =<= meet (meet ?6141 (join ?6142 ?6141)) ?6141 [6142, 6141] by Super 3994 with 4017 at 1,1,3
9285 Id : 4014, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4576, 4575, 4577, 4574] by Demod 3327 with 3994 at 2,1,3
9286 Id : 4015, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 ?4574)) [4577, 4574] by Demod 4014 with 3994 at 2,2,2,3
9287 Id : 5114, {_}: meet ?7036 (join ?7037 ?7037) =<= meet (meet (meet ?7036 (join ?7037 ?7037)) ?7037) (meet ?7036 (join ?7037 ?7037)) [7037, 7036] by Super 4299 with 4015 at 2,1,3
9288 Id : 5213, {_}: meet (join ?7149 ?7150) (join ?7149 ?7149) =<= meet ?7149 (meet (join ?7149 ?7150) (join ?7149 ?7149)) [7150, 7149] by Super 5114 with 3994 at 1,3
9289 Id : 5218, {_}: meet (join (meet ?7166 ?7167) (meet ?7167 (join ?7166 ?7167))) (join (meet ?7166 ?7167) (meet ?7166 ?7167)) =>= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7167, 7166] by Super 5213 with 3603 at 1,2,3
9290 Id : 5280, {_}: meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167)) =<= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7166, 7167] by Demod 5218 with 3603 at 1,2
9291 Id : 4250, {_}: join ?5957 (meet ?5957 (join (meet (join ?5957 ?5958) (join ?5959 ?5957)) ?5957)) =>= ?5957 [5959, 5958, 5957] by Super 3603 with 3994 at 1,2
9292 Id : 4265, {_}: join ?6023 (meet ?6023 (join (meet ?6023 (join ?6024 ?6023)) ?6023)) =>= ?6023 [6024, 6023] by Super 4250 with 4017 at 1,1,2,2,2
9293 Id : 4599, {_}: join (meet ?6423 (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423))) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Super 1490 with 4265 at 2,2,2
9294 Id : 4304, {_}: meet ?6158 (join ?6159 ?6158) =<= meet (meet (meet ?6158 (join ?6159 ?6158)) ?6158) (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Super 4299 with 3603 at 2,1,3
9295 Id : 4244, {_}: ?5934 =<= meet (meet ?5934 (join ?5935 ?5934)) ?5934 [5935, 5934] by Super 3994 with 4017 at 1,1,3
9296 Id : 4357, {_}: meet ?6158 (join ?6159 ?6158) =<= meet ?6158 (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Demod 4304 with 4244 at 1,3
9297 Id : 4633, {_}: join (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423)) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Demod 4599 with 4357 at 1,2
9298 Id : 5654, {_}: ?7568 =<= join (meet ?7569 (join (join (meet ?7568 (join (meet ?7568 (join ?7570 ?7568)) ?7568)) (meet ?7568 ?7568)) ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7570, 7569, 7568] by Super 2846 with 4633 at 1,2,2,2,3
9299 Id : 5717, {_}: ?7568 =<= join (meet ?7569 (join ?7568 ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7569, 7568] by Demod 5654 with 4633 at 1,2,1,3
9300 Id : 8505, {_}: join ?9550 ?9550 =>= ?9550 [9550] by Super 4015 with 5717 at 3
9301 Id : 8599, {_}: meet ?7167 (meet ?7166 ?7167) =<= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7166, 7167] by Demod 5280 with 8505 at 2,2
9302 Id : 8600, {_}: meet ?7167 (meet ?7166 ?7167) =<= meet (meet ?7166 ?7167) (meet ?7167 (meet ?7166 ?7167)) [7166, 7167] by Demod 8599 with 8505 at 2,2,3
9303 Id : 1594, {_}: join (meet ?2599 ?2600) (meet ?2599 (join ?2599 ?2600)) =>= ?2599 [2600, 2599] by Demod 1118 with 724 at 1,1,2
9304 Id : 1599, {_}: join (meet (meet ?2630 ?2631) (meet ?2630 (join ?2630 ?2631))) (meet (meet ?2630 ?2631) ?2630) =>= meet ?2630 ?2631 [2631, 2630] by Super 1594 with 1490 at 2,2,2
9305 Id : 8580, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 ?4574) [4577, 4574] by Demod 4015 with 8505 at 2,2,3
9306 Id : 4016, {_}: ?5555 =<= join (meet ?5555 ?5555) (join ?5555 ?5555) [5555] by Super 4015 with 3994 at 2,3
9307 Id : 4107, {_}: meet ?5754 ?5754 =<= meet (meet ?5754 (join ?5755 (meet ?5754 ?5754))) (meet ?5754 ?5754) [5755, 5754] by Super 3994 with 4016 at 1,1,3
9308 Id : 5124, {_}: meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066)) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Super 5114 with 4107 at 1,3
9309 Id : 4601, {_}: join (meet ?6429 (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429))) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Super 3603 with 4265 at 2,2,2
9310 Id : 4627, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4601 with 4357 at 1,2
9311 Id : 4628, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429 =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4627 with 4244 at 2,2
9312 Id : 1972, {_}: join (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet (meet ?2837 ?2838) ?2837)) (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet ?2837 ?2838)) =>= meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838)) [2838, 2837] by Super 1490 with 1599 at 2,2,2
9313 Id : 5646, {_}: meet ?7542 ?7542 =<= meet (meet ?7542 ?7542) (meet ?7542 ?7542) [7542] by Super 4107 with 4633 at 2,1,3
9314 Id : 5765, {_}: join (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Super 1972 with 5646 at 2,2,2
9315 Id : 5836, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5765 with 5646 at 1,1,1,2
9316 Id : 5837, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5836 with 5646 at 1,2,1,2
9317 Id : 5838, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5837 with 5646 at 1,1,2,2
9318 Id : 5839, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5838 with 5646 at 1,3
9319 Id : 5840, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5839 with 4357 at 1,1,2
9320 Id : 5841, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5840 with 5646 at 2,1,2
9321 Id : 5842, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5841 with 4357 at 1,2,2
9322 Id : 5843, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5842 with 4357 at 3
9323 Id : 5844, {_}: join (meet ?7691 ?7691) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5843 with 4244 at 1,2
9324 Id : 5845, {_}: join (meet ?7691 ?7691) (meet ?7691 ?7691) =<= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5844 with 4244 at 2,2
9325 Id : 6090, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (join (meet ?7953 ?7953) (join (meet ?7953 ?7953) (meet ?7953 ?7953)))) =>= meet ?7953 ?7953 [7953] by Super 1490 with 5845 at 1,2
9326 Id : 5775, {_}: meet ?7723 ?7723 =<= join (meet ?7723 ?7723) (join (meet ?7723 ?7723) (meet ?7723 ?7723)) [7723] by Super 4016 with 5646 at 1,3
9327 Id : 6158, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (meet ?7953 ?7953)) =>= meet ?7953 ?7953 [7953] by Demod 6090 with 5775 at 2,2,2
9328 Id : 6159, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet ?7953 ?7953) =>= meet ?7953 ?7953 [7953] by Demod 6158 with 5646 at 2,2
9329 Id : 6371, {_}: join (meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Super 4628 with 6159 at 2,1,2,1,2
9330 Id : 6404, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Demod 6371 with 5646 at 1,2,1,2
9331 Id : 6405, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6404 with 6159 at 2,1,2,3
9332 Id : 6406, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6405 with 5845 at 1,2
9333 Id : 6407, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6406 with 5646 at 1,2,3
9334 Id : 6408, {_}: meet ?8123 ?8123 =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6407 with 6159 at 2
9335 Id : 6409, {_}: meet ?8123 ?8123 =<= join (meet ?8123 ?8123) (meet ?8123 ?8123) [8123] by Demod 6408 with 5845 at 3
9336 Id : 7067, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Demod 5124 with 6409 at 2,2
9337 Id : 7068, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (meet ?7066 ?7066)) [7066] by Demod 7067 with 6409 at 2,2,3
9338 Id : 7080, {_}: join (meet (meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Super 1599 with 7068 at 1,2,2
9339 Id : 7097, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7080 with 7068 at 1,1,2
9340 Id : 6508, {_}: meet ?8193 ?8193 =<= join (meet (meet ?8193 ?8193) (meet ?8193 ?8193)) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Super 4015 with 6409 at 2,2,3
9341 Id : 6644, {_}: meet ?8193 ?8193 =<= join (meet ?8193 ?8193) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Demod 6508 with 5646 at 1,3
9342 Id : 7098, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7097 with 6644 at 2,2,1,2
9343 Id : 6520, {_}: meet ?8223 ?8223 =<= meet (meet ?8223 (meet ?8223 ?8223)) (meet ?8223 ?8223) [8223] by Super 4107 with 6409 at 2,1,3
9344 Id : 7099, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7098 with 6520 at 2,2
9345 Id : 7100, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7099 with 7068 at 3
9346 Id : 7101, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7100 with 5646 at 2,1,2
9347 Id : 7102, {_}: join (meet ?8706 ?8706) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7101 with 6520 at 1,2
9348 Id : 7103, {_}: meet ?8706 ?8706 =<= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7102 with 6409 at 2
9349 Id : 7221, {_}: join (meet ?8760 ?8760) (meet ?8760 (join ?8760 (meet ?8760 ?8760))) =>= ?8760 [8760] by Super 1490 with 7103 at 1,2
9350 Id : 4105, {_}: join (meet (meet ?5749 ?5749) (join ?5749 ?5749)) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Super 3603 with 4016 at 2,2,2
9351 Id : 8587, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Demod 4105 with 8505 at 2,1,2
9352 Id : 8588, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= join ?5749 ?5749 [5749] by Demod 8587 with 8505 at 1,2,2
9353 Id : 8589, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8588 with 8505 at 3
9354 Id : 4106, {_}: join ?5751 ?5751 =<= meet (meet (join (join ?5751 ?5751) ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Super 3994 with 4016 at 2,1,3
9355 Id : 4242, {_}: join ?5927 ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Super 4106 with 4017 at 1,1,3
9356 Id : 8576, {_}: ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Demod 4242 with 8505 at 2
9357 Id : 8577, {_}: ?5927 =<= meet (meet ?5927 ?5927) (join ?5927 ?5927) [5927] by Demod 8576 with 8505 at 1,1,3
9358 Id : 8578, {_}: ?5927 =<= meet (meet ?5927 ?5927) ?5927 [5927] by Demod 8577 with 8505 at 2,3
9359 Id : 8604, {_}: join ?5749 (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8589 with 8578 at 1,2
9360 Id : 8605, {_}: join (meet ?8760 ?8760) (meet ?8760 ?8760) =>= ?8760 [8760] by Demod 7221 with 8604 at 2,2,2
9361 Id : 8606, {_}: meet ?8760 ?8760 =>= ?8760 [8760] by Demod 8605 with 8505 at 2
9362 Id : 8625, {_}: ?4574 =<= join ?4574 (meet ?4577 ?4574) [4577, 4574] by Demod 8580 with 8606 at 1,3
9363 Id : 8662, {_}: ?9653 =<= join (meet (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653) (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) (meet ?9653 (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) [9655, 9654, 9653] by Super 2846 with 8505 at 2,2,3
9364 Id : 8767, {_}: ?9653 =<= join (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653) (meet ?9653 (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) [9655, 9654, 9653] by Demod 8662 with 8606 at 1,3
9365 Id : 8768, {_}: ?9653 =<= join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653 [9655, 9654, 9653] by Demod 8767 with 8625 at 3
9366 Id : 8832, {_}: join (meet (join (meet ?9751 ?9752) (meet ?9753 ?9751)) ?9751) (meet (join (meet ?9751 ?9752) (meet ?9753 ?9751)) ?9751) =>= join (meet ?9751 ?9752) (meet ?9753 ?9751) [9753, 9752, 9751] by Super 1490 with 8768 at 2,2,2
9367 Id : 8936, {_}: meet (join (meet ?9970 ?9971) (meet ?9972 ?9970)) ?9970 =>= join (meet ?9970 ?9971) (meet ?9972 ?9970) [9972, 9971, 9970] by Demod 8832 with 8505 at 2
9368 Id : 8937, {_}: meet (join (meet ?9974 ?9975) ?9974) ?9974 =>= join (meet ?9974 ?9975) (meet ?9974 ?9974) [9975, 9974] by Super 8936 with 8606 at 2,1,2
9369 Id : 9092, {_}: meet (join (meet ?9974 ?9975) ?9974) ?9974 =>= join (meet ?9974 ?9975) ?9974 [9975, 9974] by Demod 8937 with 8606 at 2,3
9370 Id : 9140, {_}: ?10108 =<= join ?10108 (join (meet ?10108 ?10109) ?10108) [10109, 10108] by Super 8625 with 9092 at 2,3
9371 Id : 9413, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) (meet ?10366 ?10366)) (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Super 1599 with 9140 at 2,2,1,2
9372 Id : 9473, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9413 with 8606 at 2,1,2
9373 Id : 9474, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) ?10366 =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9473 with 4244 at 2,2
9374 Id : 9475, {_}: join ?10366 ?10366 =<= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9474 with 4244 at 1,2
9375 Id : 9476, {_}: ?10366 =<= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9475 with 8505 at 2
9376 Id : 9701, {_}: meet (join (meet ?10626 ?10627) ?10626) (meet ?10626 (join (meet ?10626 ?10627) ?10626)) =<= meet (meet ?10626 (join (meet ?10626 ?10627) ?10626)) (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Super 8600 with 9476 at 2,2,3
9377 Id : 9740, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =<= meet (meet ?10626 (join (meet ?10626 ?10627) ?10626)) (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Demod 9701 with 9476 at 2,2
9378 Id : 9741, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =<= meet ?10626 (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Demod 9740 with 9476 at 1,3
9379 Id : 9742, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =?= meet ?10626 (join (meet ?10626 ?10627) ?10626) [10627, 10626] by Demod 9741 with 9092 at 2,3
9380 Id : 9743, {_}: join (meet ?10626 ?10627) ?10626 =<= meet ?10626 (join (meet ?10626 ?10627) ?10626) [10627, 10626] by Demod 9742 with 9092 at 2
9381 Id : 9744, {_}: join (meet ?10626 ?10627) ?10626 =>= ?10626 [10627, 10626] by Demod 9743 with 9476 at 3
9382 Id : 9159, {_}: meet (join (meet ?10167 ?10168) ?10167) ?10167 =>= join (meet ?10167 ?10168) ?10167 [10168, 10167] by Demod 8937 with 8606 at 2,3
9383 Id : 8581, {_}: ?5751 =<= meet (meet (join (join ?5751 ?5751) ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Demod 4106 with 8505 at 2
9384 Id : 8582, {_}: ?5751 =<= meet (meet (join ?5751 ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Demod 8581 with 8505 at 1,1,1,3
9385 Id : 8583, {_}: ?5751 =<= meet (meet (join ?5751 ?5752) ?5751) ?5751 [5752, 5751] by Demod 8582 with 8505 at 2,3
9386 Id : 9170, {_}: meet (join ?10201 (meet (join ?10201 ?10202) ?10201)) (meet (join ?10201 ?10202) ?10201) =>= join (meet (meet (join ?10201 ?10202) ?10201) ?10201) (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Super 9159 with 8583 at 1,1,2
9387 Id : 9274, {_}: meet ?10201 (meet (join ?10201 ?10202) ?10201) =<= join (meet (meet (join ?10201 ?10202) ?10201) ?10201) (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Demod 9170 with 8625 at 1,2
9388 Id : 9275, {_}: meet ?10201 (meet (join ?10201 ?10202) ?10201) =>= join ?10201 (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Demod 9274 with 8583 at 1,3
9389 Id : 5123, {_}: meet (join ?7063 ?7064) (join ?7063 ?7063) =<= meet ?7063 (meet (join ?7063 ?7064) (join ?7063 ?7063)) [7064, 7063] by Super 5114 with 3994 at 1,3
9390 Id : 8567, {_}: meet (join ?7063 ?7064) ?7063 =<= meet ?7063 (meet (join ?7063 ?7064) (join ?7063 ?7063)) [7064, 7063] by Demod 5123 with 8505 at 2,2
9391 Id : 8568, {_}: meet (join ?7063 ?7064) ?7063 =<= meet ?7063 (meet (join ?7063 ?7064) ?7063) [7064, 7063] by Demod 8567 with 8505 at 2,2,3
9392 Id : 9276, {_}: meet (join ?10201 ?10202) ?10201 =<= join ?10201 (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Demod 9275 with 8568 at 2
9393 Id : 9277, {_}: meet (join ?10201 ?10202) ?10201 =>= ?10201 [10202, 10201] by Demod 9276 with 8625 at 3
9394 Id : 11746, {_}: join ?13518 ?13519 =<= join (join ?13518 (meet ?13520 (join ?13518 ?13519))) (join ?13518 ?13519) [13520, 13519, 13518] by Super 8768 with 9277 at 1,1,3
9395 Id : 9898, {_}: join (meet (meet ?10737 ?10738) ?10737) (meet (meet ?10737 ?10738) ?10737) =>= meet ?10737 ?10738 [10738, 10737] by Super 1490 with 9744 at 2,2,2
9396 Id : 9933, {_}: meet (meet ?10737 ?10738) ?10737 =>= meet ?10737 ?10738 [10738, 10737] by Demod 9898 with 8505 at 2
9397 Id : 10148, {_}: ?5934 =<= meet ?5934 (join ?5935 ?5934) [5935, 5934] by Demod 4244 with 9933 at 3
9398 Id : 10149, {_}: join (meet ?5256 ?5257) ?5257 =>= ?5257 [5257, 5256] by Demod 3603 with 10148 at 2,2
9399 Id : 11750, {_}: join (meet ?13533 ?13534) ?13534 =<= join (join (meet ?13533 ?13534) (meet ?13535 (join (meet ?13533 ?13534) ?13534))) ?13534 [13535, 13534, 13533] by Super 11746 with 10149 at 2,3
9400 Id : 11822, {_}: ?13534 =<= join (join (meet ?13533 ?13534) (meet ?13535 (join (meet ?13533 ?13534) ?13534))) ?13534 [13535, 13533, 13534] by Demod 11750 with 10149 at 2
9401 Id : 11823, {_}: ?13534 =<= join (join (meet ?13533 ?13534) (meet ?13535 ?13534)) ?13534 [13535, 13533, 13534] by Demod 11822 with 10149 at 2,2,1,3
9402 Id : 12263, {_}: meet ?14390 (join (meet ?14391 ?14390) (meet ?14392 ?14390)) =>= join (meet ?14391 ?14390) (meet ?14392 ?14390) [14392, 14391, 14390] by Super 9277 with 11823 at 1,2
9403 Id : 12298, {_}: meet ?14546 (meet ?14547 ?14546) =<= join (meet ?14547 ?14546) (meet ?14547 ?14546) [14547, 14546] by Super 12263 with 8505 at 2,2
9404 Id : 12448, {_}: meet ?14664 (meet ?14665 ?14664) =>= meet ?14665 ?14664 [14665, 14664] by Demod 12298 with 8505 at 3
9405 Id : 12463, {_}: meet (join ?14715 ?14716) ?14716 =?= meet ?14716 (join ?14715 ?14716) [14716, 14715] by Super 12448 with 10148 at 2,2
9406 Id : 12536, {_}: meet (join ?14715 ?14716) ?14716 =>= ?14716 [14716, 14715] by Demod 12463 with 10148 at 3
9407 Id : 12564, {_}: join ?14801 (join ?14802 ?14801) =>= join ?14802 ?14801 [14802, 14801] by Super 9744 with 12536 at 1,2
9408 Id : 12677, {_}: ?14960 =<= meet (meet (join ?14961 ?14960) (join ?14962 ?14960)) ?14960 [14962, 14961, 14960] by Super 3994 with 12564 at 1,1,3
9409 Id : 14691, {_}: b === b [] by Demod 1 with 12677 at 2
9410 Id : 1, {_}: meet (meet (join a b) (join c b)) b =>= b [] by prove_wal_axioms_5
9411 % SZS output end CNFRefutation for LAT096-1.p
9412 12238: solved LAT096-1.p in 18.273141 using nrkbo
9413 !! infer_left 95 0.0001 0.0000 0.0000
9414 !! infer_right 96 69.3833 20.3105 0.7227
9415 !! simplify_goal 96 0.0093 0.0004 0.0001
9416 !! keep_simplified 172 1.4714 0.3402 0.0086
9417 !! simplification_step 228 1.4704 0.3034 0.0064
9418 !! simplify 7185 63.2021 0.7953 0.0088
9419 !! orphan_murder 241 0.0066 0.0002 0.0000
9420 !! is_subsumed 5162 1.0452 0.3061 0.0002
9421 !! build_new_clause 4144 7.1311 0.3124 0.0017
9422 !! demodulate 7025 62.1338 0.7899 0.0088
9423 !! demod 464997 36.3165 0.3281 0.0001
9424 !! demod.apply_subst 20898 0.7469 0.3002 0.0000
9425 !! demod.retrieve_generalizations 464997 28.6847 0.3101 0.0001
9426 !! demod.unify 89908 2.3321 0.3010 0.0000
9427 !! build_clause 14593 27.7186 0.3097 0.0019
9428 !! compare_terms(nrkbo) 14595 14.0340 0.3042 0.0010
9429 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
9432 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
9434 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
9436 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
9438 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
9439 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
9440 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
9443 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9446 join (join (meet a b) (meet c b)) b =>= b
9447 [] by prove_wal_axioms_6
9450 Found proof, 73.830469s
9451 % SZS status Unsatisfiable for LAT097-1.p
9452 % SZS output start CNFRefutation for LAT097-1.p
9453 Id : 2, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)) (meet (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)) (meet ?7 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)))) (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
9454 Id : 3, {_}: join (meet (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11) (meet (join (meet ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)) (meet (join (meet ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)) (meet ?14 (join ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)))) (join ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)))) (join (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11)) =>= ?10 [14, 13, 12, 11, 10, 9] by single_axiom ?9 ?10 ?11 ?12 ?13 ?14
9455 Id : 10, {_}: join (meet (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84) (meet (join (meet ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (meet ?83 (join ?81 (join (join (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) ?85) (meet ?86 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))) (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))))))) (join (join (meet ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))) (meet (join (meet ?82 ?83) (meet ?83 (join ?82 ?83))) (join ?81 (join (meet ?82 ?83) (meet ?83 (join ?82 ?83)))))) ?84)) =>= join (meet ?82 ?83) (meet ?83 (join ?82 ?83)) [86, 85, 84, 83, 82, 81] by Super 3 with 2 at 1,2,1,2,2
9456 Id : 31, {_}: join (meet (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208) (meet (join (meet ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (meet ?207 (join ?205 (join (join (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) ?209) (meet ?210 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))) (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))))))) (join (join (meet ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))) (meet (join (meet ?206 ?207) (meet ?207 (join ?206 ?207))) (join ?205 (join (meet ?206 ?207) (meet ?207 (join ?206 ?207)))))) ?208)) =>= join (meet ?206 ?207) (meet ?207 (join ?206 ?207)) [210, 209, 208, 207, 206, 205] by Super 3 with 2 at 1,2,1,2,2
9457 Id : 34, {_}: join (meet (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet 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?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 236, 235, 234] by Super 31 with 2 at 2,2,2,1,2,2,2
9458 Id : 116, {_}: join (meet (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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9459 Id : 117, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join 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(meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 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(meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [242, 241, 240, 239, 238, 237, 235, 236, 234] by Demod 116 with 2 at 1,2,1,1,2
9460 Id : 118, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) 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(meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join 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9461 Id : 119, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join 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(join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 118 with 2 at 1,1,1,2,1,1,2,2
9462 Id : 120, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) 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?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 119 with 2 at 2,2,1,2,1,1,2,2
9463 Id : 121, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) 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(meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 120 with 2 at 2,2,1,1,2,2
9464 Id : 122, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 121 with 2 at 1,1,1,2,2,2,1,2,2
9465 Id : 123, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))))))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 122 with 2 at 2,2,1,2,2,2,1,2,2
9466 Id : 124, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))))) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 123 with 2 at 2,2,2,2,1,2,2
9467 Id : 125, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet (join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))))) (join ?234 ?236))) ?240)) =>= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 124 with 2 at 2,1,1,2,2,2
9468 Id : 126, {_}: join (meet (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240) (meet (join (meet ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join ?234 (join (join (meet ?236 ?241) (meet ?242 ?236)) ?236)))) (join (join (meet ?234 ?236) (meet ?236 (join ?234 ?236))) ?240)) =?= join (meet (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236))))) (meet (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))) (join (join (meet ?235 ?236) (meet ?236 (join ?235 ?236))) (join (meet ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)) (meet (join (meet ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)) (meet ?239 (join ?236 (meet (meet (join ?236 ?237) (join ?238 ?236)) ?236)))) (join ?235 (join (join (meet ?236 ?237) (meet ?238 ?236)) ?236)))))) [239, 238, 237, 235, 242, 241, 240, 236, 234] by Demod 125 with 2 at 1,2,1,2,2,2
9469 Id : 702, {_}: join (meet (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189) (meet (join (meet ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)) (meet (join (meet ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)) (meet (join (meet ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)) (meet ?1195 (join ?1188 (meet (meet (join ?1188 ?1193) (join ?1194 ?1188)) ?1188)))) (join ?1192 (join (join (meet ?1188 ?1193) (meet ?1194 ?1188)) ?1188)))) (join ?1187 (join (join (meet ?1188 ?1190) (meet ?1191 ?1188)) ?1188)))) (join (join (meet ?1187 ?1188) (meet ?1188 (join ?1187 ?1188))) ?1189)) =>= ?1188 [1195, 1194, 1193, 1192, 1191, 1190, 1189, 1188, 1187] by Demod 126 with 2 at 3
9470 Id : 724, {_}: join (meet (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497) (meet ?1496 (join (join (meet (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496) (meet ?1496 (join (join (meet ?1495 ?1496) (meet ?1496 (join ?1495 ?1496))) ?1496))) ?1497)) =>= ?1496 [1497, 1496, 1495] by Super 702 with 2 at 1,2,2
9471 Id : 1054, {_}: join (meet (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1598, 1597, 1596] by Super 10 with 724 at 2,2,2,1,2,2,2
9472 Id : 1166, {_}: join (meet (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1054 with 724 at 2,1,1,1,2
9473 Id : 1167, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1599, 1597, 1598, 1596] by Demod 1166 with 724 at 1,2,1,1,2
9474 Id : 1168, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1601, 1600, 1597, 1599, 1598, 1596] by Demod 1167 with 724 at 2,2,2,1,1,2
9475 Id : 1169, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1168 with 724 at 1,1,1,2,1,1,2,2
9476 Id : 1170, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1169 with 724 at 2,2,1,2,1,1,2,2
9477 Id : 1171, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1170 with 724 at 2,2,1,1,2,2
9478 Id : 1172, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1171 with 724 at 1,1,1,2,2,2,1,2,2
9479 Id : 1173, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))))))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1172 with 724 at 2,2,1,2,2,2,1,2,2
9480 Id : 1174, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)))) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1173 with 724 at 2,2,2,2,1,2,2
9481 Id : 1175, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet (join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598))) (join ?1596 ?1598))) ?1599)) =>= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1174 with 724 at 2,1,1,2,2,2
9482 Id : 1176, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =?= join (meet (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598) (meet ?1598 (join (join (meet (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598) (meet ?1598 (join (join (meet ?1597 ?1598) (meet ?1598 (join ?1597 ?1598))) ?1598))) ?1598)) [1597, 1601, 1600, 1599, 1598, 1596] by Demod 1175 with 724 at 1,2,1,2,2,2
9483 Id : 2455, {_}: join (meet (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678) (meet (join (meet ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)) (meet ?3677 (join ?3676 (join (join (meet ?3677 ?3679) (meet ?3680 ?3677)) ?3677)))) (join (join (meet ?3676 ?3677) (meet ?3677 (join ?3676 ?3677))) ?3678)) =>= ?3677 [3680, 3679, 3678, 3677, 3676] by Demod 1176 with 724 at 3
9484 Id : 1177, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet (join (meet ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)) (meet ?1598 (join ?1596 (join (join (meet ?1598 ?1600) (meet ?1601 ?1598)) ?1598)))) (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1601, 1600, 1599, 1598, 1596] by Demod 1176 with 724 at 3
9485 Id : 2468, {_}: join (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))))))) ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3789, 3788, 3787, 3786, 3785] by Super 2455 with 1177 at 1,2,2,2
9486 Id : 2844, {_}: join (meet ?3786 ?3789) (meet (join (meet (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) (join (join (meet ?3785 ?3786) (meet ?3786 (join ?3785 ?3786))) (join (join (meet (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))) ?3790) (meet ?3791 (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))) (join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)))))))) (join ?3786 ?3789)) =>= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3791, 3790, 3788, 3787, 3785, 3789, 3786] by Demod 2468 with 1177 at 1,1,2
9487 Id : 2845, {_}: join (meet ?3786 ?3789) (meet ?3786 (join ?3786 ?3789)) =?= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3789, 3786] by Demod 2844 with 1177 at 1,2,2
9488 Id : 1101, {_}: join (meet (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978) (meet ?1977 (join (join (meet (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977) (meet ?1977 (join (join (meet ?1976 ?1977) (meet ?1977 (join ?1976 ?1977))) ?1977))) ?1978)) =>= ?1977 [1978, 1977, 1976] by Super 702 with 2 at 1,2,2
9489 Id : 1118, {_}: join (meet (join (meet (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101) (meet ?2101 (join (join (meet (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101) (meet ?2101 (join (join (meet ?2100 ?2101) (meet ?2101 (join ?2100 ?2101))) ?2101))) ?2101))) ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101, 2100] by Super 1101 with 724 at 1,2,2,2
9490 Id : 1490, {_}: join (meet ?2101 ?2102) (meet ?2101 (join ?2101 ?2102)) =>= ?2101 [2102, 2101] by Demod 1118 with 724 at 1,1,2
9491 Id : 2846, {_}: ?3786 =<= join (meet ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786)) (meet ?3786 (join ?3785 (join (join (meet ?3786 ?3787) (meet ?3788 ?3786)) ?3786))) [3788, 3787, 3785, 3786] by Demod 2845 with 1490 at 2
9492 Id : 2892, {_}: join (meet (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599) (meet ?1598 (join (join (meet ?1596 ?1598) (meet ?1598 (join ?1596 ?1598))) ?1599)) =>= ?1598 [1599, 1598, 1596] by Demod 1177 with 2846 at 1,2,2
9493 Id : 2917, {_}: join (meet ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141)) (meet (join (meet ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)) (meet ?4144 (join ?4141 (meet (meet (join ?4141 ?4142) (join ?4143 ?4141)) ?4141)))) (join ?4140 (join (join (meet ?4141 ?4142) (meet ?4143 ?4141)) ?4141))) =>= ?4141 [4144, 4143, 4142, 4141, 4140] by Super 2 with 2846 at 2
9494 Id : 3327, {_}: ?4574 =<= join (meet ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574)) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4577, 4576, 4575, 4574] by Super 2892 with 2917 at 2
9495 Id : 3603, {_}: join (meet ?5256 ?5257) (meet ?5257 (join ?5256 ?5257)) =>= ?5257 [5257, 5256] by Super 2892 with 3327 at 2
9496 Id : 3994, {_}: ?5513 =<= meet (meet (join ?5513 ?5514) (join ?5515 ?5513)) ?5513 [5515, 5514, 5513] by Super 3327 with 3603 at 3
9497 Id : 4014, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 (meet (meet (join ?4574 ?4575) (join ?4576 ?4574)) ?4574))) [4576, 4575, 4577, 4574] by Demod 3327 with 3994 at 2,1,3
9498 Id : 4015, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 (join ?4574 ?4574)) [4577, 4574] by Demod 4014 with 3994 at 2,2,2,3
9499 Id : 4250, {_}: join ?5957 (meet ?5957 (join (meet (join ?5957 ?5958) (join ?5959 ?5957)) ?5957)) =>= ?5957 [5959, 5958, 5957] by Super 3603 with 3994 at 1,2
9500 Id : 4017, {_}: join ?5557 (meet ?5557 (join (meet (join ?5557 ?5558) (join ?5559 ?5557)) ?5557)) =>= ?5557 [5559, 5558, 5557] by Super 3603 with 3994 at 1,2
9501 Id : 4265, {_}: join ?6023 (meet ?6023 (join (meet ?6023 (join ?6024 ?6023)) ?6023)) =>= ?6023 [6024, 6023] by Super 4250 with 4017 at 1,1,2,2,2
9502 Id : 4599, {_}: join (meet ?6423 (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423))) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Super 1490 with 4265 at 2,2,2
9503 Id : 4299, {_}: ?6141 =<= meet (meet ?6141 (join ?6142 ?6141)) ?6141 [6142, 6141] by Super 3994 with 4017 at 1,1,3
9504 Id : 4304, {_}: meet ?6158 (join ?6159 ?6158) =<= meet (meet (meet ?6158 (join ?6159 ?6158)) ?6158) (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Super 4299 with 3603 at 2,1,3
9505 Id : 4244, {_}: ?5934 =<= meet (meet ?5934 (join ?5935 ?5934)) ?5934 [5935, 5934] by Super 3994 with 4017 at 1,1,3
9506 Id : 4357, {_}: meet ?6158 (join ?6159 ?6158) =<= meet ?6158 (meet ?6158 (join ?6159 ?6158)) [6159, 6158] by Demod 4304 with 4244 at 1,3
9507 Id : 4633, {_}: join (meet ?6423 (join (meet ?6423 (join ?6424 ?6423)) ?6423)) (meet ?6423 ?6423) =>= ?6423 [6424, 6423] by Demod 4599 with 4357 at 1,2
9508 Id : 5654, {_}: ?7568 =<= join (meet ?7569 (join (join (meet ?7568 (join (meet ?7568 (join ?7570 ?7568)) ?7568)) (meet ?7568 ?7568)) ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7570, 7569, 7568] by Super 2846 with 4633 at 1,2,2,2,3
9509 Id : 5717, {_}: ?7568 =<= join (meet ?7569 (join ?7568 ?7568)) (meet ?7568 (join ?7569 (join ?7568 ?7568))) [7569, 7568] by Demod 5654 with 4633 at 1,2,1,3
9510 Id : 8505, {_}: join ?9550 ?9550 =>= ?9550 [9550] by Super 4015 with 5717 at 3
9511 Id : 8662, {_}: ?9653 =<= join (meet (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653) (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) (meet ?9653 (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) [9655, 9654, 9653] by Super 2846 with 8505 at 2,2,3
9512 Id : 1594, {_}: join (meet ?2599 ?2600) (meet ?2599 (join ?2599 ?2600)) =>= ?2599 [2600, 2599] by Demod 1118 with 724 at 1,1,2
9513 Id : 1599, {_}: join (meet (meet ?2630 ?2631) (meet ?2630 (join ?2630 ?2631))) (meet (meet ?2630 ?2631) ?2630) =>= meet ?2630 ?2631 [2631, 2630] by Super 1594 with 1490 at 2,2,2
9514 Id : 5114, {_}: meet ?7036 (join ?7037 ?7037) =<= meet (meet (meet ?7036 (join ?7037 ?7037)) ?7037) (meet ?7036 (join ?7037 ?7037)) [7037, 7036] by Super 4299 with 4015 at 2,1,3
9515 Id : 4016, {_}: ?5555 =<= join (meet ?5555 ?5555) (join ?5555 ?5555) [5555] by Super 4015 with 3994 at 2,3
9516 Id : 4107, {_}: meet ?5754 ?5754 =<= meet (meet ?5754 (join ?5755 (meet ?5754 ?5754))) (meet ?5754 ?5754) [5755, 5754] by Super 3994 with 4016 at 1,1,3
9517 Id : 5124, {_}: meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066)) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Super 5114 with 4107 at 1,3
9518 Id : 4601, {_}: join (meet ?6429 (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429))) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Super 3603 with 4265 at 2,2,2
9519 Id : 4627, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) (meet (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429) =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4601 with 4357 at 1,2
9520 Id : 4628, {_}: join (meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429)) ?6429 =>= meet ?6429 (join (meet ?6429 (join ?6430 ?6429)) ?6429) [6430, 6429] by Demod 4627 with 4244 at 2,2
9521 Id : 1972, {_}: join (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet (meet ?2837 ?2838) ?2837)) (meet (meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838))) (meet ?2837 ?2838)) =>= meet (meet ?2837 ?2838) (meet ?2837 (join ?2837 ?2838)) [2838, 2837] by Super 1490 with 1599 at 2,2,2
9522 Id : 5646, {_}: meet ?7542 ?7542 =<= meet (meet ?7542 ?7542) (meet ?7542 ?7542) [7542] by Super 4107 with 4633 at 2,1,3
9523 Id : 5765, {_}: join (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Super 1972 with 5646 at 2,2,2
9524 Id : 5836, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5765 with 5646 at 1,1,1,2
9525 Id : 5837, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5836 with 5646 at 1,2,1,2
9526 Id : 5838, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet (meet ?7691 ?7691) (meet ?7691 ?7691)) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5837 with 5646 at 1,1,2,2
9527 Id : 5839, {_}: join (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5838 with 5646 at 1,3
9528 Id : 5840, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5839 with 4357 at 1,1,2
9529 Id : 5841, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5840 with 5646 at 2,1,2
9530 Id : 5842, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) [7691] by Demod 5841 with 4357 at 1,2,2
9531 Id : 5843, {_}: join (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5842 with 4357 at 3
9532 Id : 5844, {_}: join (meet ?7691 ?7691) (meet (meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691))) (meet ?7691 ?7691)) =>= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5843 with 4244 at 1,2
9533 Id : 5845, {_}: join (meet ?7691 ?7691) (meet ?7691 ?7691) =<= meet (meet ?7691 ?7691) (join (meet ?7691 ?7691) (meet ?7691 ?7691)) [7691] by Demod 5844 with 4244 at 2,2
9534 Id : 6090, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (join (meet ?7953 ?7953) (join (meet ?7953 ?7953) (meet ?7953 ?7953)))) =>= meet ?7953 ?7953 [7953] by Super 1490 with 5845 at 1,2
9535 Id : 5775, {_}: meet ?7723 ?7723 =<= join (meet ?7723 ?7723) (join (meet ?7723 ?7723) (meet ?7723 ?7723)) [7723] by Super 4016 with 5646 at 1,3
9536 Id : 6158, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet (meet ?7953 ?7953) (meet ?7953 ?7953)) =>= meet ?7953 ?7953 [7953] by Demod 6090 with 5775 at 2,2,2
9537 Id : 6159, {_}: join (join (meet ?7953 ?7953) (meet ?7953 ?7953)) (meet ?7953 ?7953) =>= meet ?7953 ?7953 [7953] by Demod 6158 with 5646 at 2,2
9538 Id : 6371, {_}: join (meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Super 4628 with 6159 at 2,1,2,1,2
9539 Id : 6404, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet ?8123 ?8123)) [8123] by Demod 6371 with 5646 at 1,2,1,2
9540 Id : 6405, {_}: join (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123) =>= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6404 with 6159 at 2,1,2,3
9541 Id : 6406, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123)) [8123] by Demod 6405 with 5845 at 1,2
9542 Id : 6407, {_}: join (join (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123) =>= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6406 with 5646 at 1,2,3
9543 Id : 6408, {_}: meet ?8123 ?8123 =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6407 with 6159 at 2
9544 Id : 6409, {_}: meet ?8123 ?8123 =<= join (meet ?8123 ?8123) (meet ?8123 ?8123) [8123] by Demod 6408 with 5845 at 3
9545 Id : 7067, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (join (meet ?7066 ?7066) (meet ?7066 ?7066))) [7066] by Demod 5124 with 6409 at 2,2
9546 Id : 7068, {_}: meet ?7066 (meet ?7066 ?7066) =<= meet (meet ?7066 ?7066) (meet ?7066 (meet ?7066 ?7066)) [7066] by Demod 7067 with 6409 at 2,2,3
9547 Id : 7080, {_}: join (meet (meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Super 1599 with 7068 at 1,2,2
9548 Id : 7097, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (join (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706))))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7080 with 7068 at 1,1,2
9549 Id : 6508, {_}: meet ?8193 ?8193 =<= join (meet (meet ?8193 ?8193) (meet ?8193 ?8193)) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Super 4015 with 6409 at 2,2,3
9550 Id : 6644, {_}: meet ?8193 ?8193 =<= join (meet ?8193 ?8193) (meet ?8194 (meet ?8193 ?8193)) [8194, 8193] by Demod 6508 with 5646 at 1,3
9551 Id : 7098, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7097 with 6644 at 2,2,1,2
9552 Id : 6520, {_}: meet ?8223 ?8223 =<= meet (meet ?8223 (meet ?8223 ?8223)) (meet ?8223 ?8223) [8223] by Super 4107 with 6409 at 2,1,3
9553 Id : 7099, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet (meet ?8706 ?8706) (meet ?8706 (meet ?8706 ?8706)) [8706] by Demod 7098 with 6520 at 2,2
9554 Id : 7100, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet (meet ?8706 ?8706) (meet ?8706 ?8706))) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7099 with 7068 at 3
9555 Id : 7101, {_}: join (meet (meet ?8706 (meet ?8706 ?8706)) (meet ?8706 ?8706)) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7100 with 5646 at 2,1,2
9556 Id : 7102, {_}: join (meet ?8706 ?8706) (meet ?8706 ?8706) =>= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7101 with 6520 at 1,2
9557 Id : 7103, {_}: meet ?8706 ?8706 =<= meet ?8706 (meet ?8706 ?8706) [8706] by Demod 7102 with 6409 at 2
9558 Id : 7221, {_}: join (meet ?8760 ?8760) (meet ?8760 (join ?8760 (meet ?8760 ?8760))) =>= ?8760 [8760] by Super 1490 with 7103 at 1,2
9559 Id : 4105, {_}: join (meet (meet ?5749 ?5749) (join ?5749 ?5749)) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Super 3603 with 4016 at 2,2,2
9560 Id : 8587, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet (join ?5749 ?5749) ?5749) =>= join ?5749 ?5749 [5749] by Demod 4105 with 8505 at 2,1,2
9561 Id : 8588, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= join ?5749 ?5749 [5749] by Demod 8587 with 8505 at 1,2,2
9562 Id : 8589, {_}: join (meet (meet ?5749 ?5749) ?5749) (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8588 with 8505 at 3
9563 Id : 4106, {_}: join ?5751 ?5751 =<= meet (meet (join (join ?5751 ?5751) ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Super 3994 with 4016 at 2,1,3
9564 Id : 4242, {_}: join ?5927 ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Super 4106 with 4017 at 1,1,3
9565 Id : 8576, {_}: ?5927 =<= meet (meet (join ?5927 ?5927) ?5927) (join ?5927 ?5927) [5927] by Demod 4242 with 8505 at 2
9566 Id : 8577, {_}: ?5927 =<= meet (meet ?5927 ?5927) (join ?5927 ?5927) [5927] by Demod 8576 with 8505 at 1,1,3
9567 Id : 8578, {_}: ?5927 =<= meet (meet ?5927 ?5927) ?5927 [5927] by Demod 8577 with 8505 at 2,3
9568 Id : 8604, {_}: join ?5749 (meet ?5749 ?5749) =>= ?5749 [5749] by Demod 8589 with 8578 at 1,2
9569 Id : 8605, {_}: join (meet ?8760 ?8760) (meet ?8760 ?8760) =>= ?8760 [8760] by Demod 7221 with 8604 at 2,2,2
9570 Id : 8606, {_}: meet ?8760 ?8760 =>= ?8760 [8760] by Demod 8605 with 8505 at 2
9571 Id : 8767, {_}: ?9653 =<= join (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653) (meet ?9653 (join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653)) [9655, 9654, 9653] by Demod 8662 with 8606 at 1,3
9572 Id : 8580, {_}: ?4574 =<= join (meet ?4574 ?4574) (meet ?4577 ?4574) [4577, 4574] by Demod 4015 with 8505 at 2,2,3
9573 Id : 8625, {_}: ?4574 =<= join ?4574 (meet ?4577 ?4574) [4577, 4574] by Demod 8580 with 8606 at 1,3
9574 Id : 8768, {_}: ?9653 =<= join (join (meet ?9653 ?9654) (meet ?9655 ?9653)) ?9653 [9655, 9654, 9653] by Demod 8767 with 8625 at 3
9575 Id : 8832, {_}: join (meet (join (meet ?9751 ?9752) (meet ?9753 ?9751)) ?9751) (meet (join (meet ?9751 ?9752) (meet ?9753 ?9751)) ?9751) =>= join (meet ?9751 ?9752) (meet ?9753 ?9751) [9753, 9752, 9751] by Super 1490 with 8768 at 2,2,2
9576 Id : 8936, {_}: meet (join (meet ?9970 ?9971) (meet ?9972 ?9970)) ?9970 =>= join (meet ?9970 ?9971) (meet ?9972 ?9970) [9972, 9971, 9970] by Demod 8832 with 8505 at 2
9577 Id : 8937, {_}: meet (join (meet ?9974 ?9975) ?9974) ?9974 =<= join (meet ?9974 ?9975) (meet ?9974 ?9974) [9975, 9974] by Super 8936 with 8606 at 2,1,2
9578 Id : 9159, {_}: meet (join (meet ?10167 ?10168) ?10167) ?10167 =>= join (meet ?10167 ?10168) ?10167 [10168, 10167] by Demod 8937 with 8606 at 2,3
9579 Id : 8581, {_}: ?5751 =<= meet (meet (join (join ?5751 ?5751) ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Demod 4106 with 8505 at 2
9580 Id : 8582, {_}: ?5751 =<= meet (meet (join ?5751 ?5752) ?5751) (join ?5751 ?5751) [5752, 5751] by Demod 8581 with 8505 at 1,1,1,3
9581 Id : 8583, {_}: ?5751 =<= meet (meet (join ?5751 ?5752) ?5751) ?5751 [5752, 5751] by Demod 8582 with 8505 at 2,3
9582 Id : 9170, {_}: meet (join ?10201 (meet (join ?10201 ?10202) ?10201)) (meet (join ?10201 ?10202) ?10201) =<= join (meet (meet (join ?10201 ?10202) ?10201) ?10201) (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Super 9159 with 8583 at 1,1,2
9583 Id : 9274, {_}: meet ?10201 (meet (join ?10201 ?10202) ?10201) =<= join (meet (meet (join ?10201 ?10202) ?10201) ?10201) (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Demod 9170 with 8625 at 1,2
9584 Id : 9275, {_}: meet ?10201 (meet (join ?10201 ?10202) ?10201) =<= join ?10201 (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Demod 9274 with 8583 at 1,3
9585 Id : 5123, {_}: meet (join ?7063 ?7064) (join ?7063 ?7063) =<= meet ?7063 (meet (join ?7063 ?7064) (join ?7063 ?7063)) [7064, 7063] by Super 5114 with 3994 at 1,3
9586 Id : 8567, {_}: meet (join ?7063 ?7064) ?7063 =<= meet ?7063 (meet (join ?7063 ?7064) (join ?7063 ?7063)) [7064, 7063] by Demod 5123 with 8505 at 2,2
9587 Id : 8568, {_}: meet (join ?7063 ?7064) ?7063 =<= meet ?7063 (meet (join ?7063 ?7064) ?7063) [7064, 7063] by Demod 8567 with 8505 at 2,2,3
9588 Id : 9276, {_}: meet (join ?10201 ?10202) ?10201 =<= join ?10201 (meet (join ?10201 ?10202) ?10201) [10202, 10201] by Demod 9275 with 8568 at 2
9589 Id : 9277, {_}: meet (join ?10201 ?10202) ?10201 =>= ?10201 [10202, 10201] by Demod 9276 with 8625 at 3
9590 Id : 11746, {_}: join ?13518 ?13519 =<= join (join ?13518 (meet ?13520 (join ?13518 ?13519))) (join ?13518 ?13519) [13520, 13519, 13518] by Super 8768 with 9277 at 1,1,3
9591 Id : 5213, {_}: meet (join ?7149 ?7150) (join ?7149 ?7149) =<= meet ?7149 (meet (join ?7149 ?7150) (join ?7149 ?7149)) [7150, 7149] by Super 5114 with 3994 at 1,3
9592 Id : 5218, {_}: meet (join (meet ?7166 ?7167) (meet ?7167 (join ?7166 ?7167))) (join (meet ?7166 ?7167) (meet ?7166 ?7167)) =>= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7167, 7166] by Super 5213 with 3603 at 1,2,3
9593 Id : 5280, {_}: meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167)) =<= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7166, 7167] by Demod 5218 with 3603 at 1,2
9594 Id : 8599, {_}: meet ?7167 (meet ?7166 ?7167) =<= meet (meet ?7166 ?7167) (meet ?7167 (join (meet ?7166 ?7167) (meet ?7166 ?7167))) [7166, 7167] by Demod 5280 with 8505 at 2,2
9595 Id : 8600, {_}: meet ?7167 (meet ?7166 ?7167) =<= meet (meet ?7166 ?7167) (meet ?7167 (meet ?7166 ?7167)) [7166, 7167] by Demod 8599 with 8505 at 2,2,3
9596 Id : 9092, {_}: meet (join (meet ?9974 ?9975) ?9974) ?9974 =>= join (meet ?9974 ?9975) ?9974 [9975, 9974] by Demod 8937 with 8606 at 2,3
9597 Id : 9140, {_}: ?10108 =<= join ?10108 (join (meet ?10108 ?10109) ?10108) [10109, 10108] by Super 8625 with 9092 at 2,3
9598 Id : 9413, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) (meet ?10366 ?10366)) (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Super 1599 with 9140 at 2,2,1,2
9599 Id : 9473, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9413 with 8606 at 2,1,2
9600 Id : 9474, {_}: join (meet (meet ?10366 (join (meet ?10366 ?10367) ?10366)) ?10366) ?10366 =>= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9473 with 4244 at 2,2
9601 Id : 9475, {_}: join ?10366 ?10366 =<= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9474 with 4244 at 1,2
9602 Id : 9476, {_}: ?10366 =<= meet ?10366 (join (meet ?10366 ?10367) ?10366) [10367, 10366] by Demod 9475 with 8505 at 2
9603 Id : 9701, {_}: meet (join (meet ?10626 ?10627) ?10626) (meet ?10626 (join (meet ?10626 ?10627) ?10626)) =<= meet (meet ?10626 (join (meet ?10626 ?10627) ?10626)) (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Super 8600 with 9476 at 2,2,3
9604 Id : 9740, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =<= meet (meet ?10626 (join (meet ?10626 ?10627) ?10626)) (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Demod 9701 with 9476 at 2,2
9605 Id : 9741, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =<= meet ?10626 (meet (join (meet ?10626 ?10627) ?10626) ?10626) [10627, 10626] by Demod 9740 with 9476 at 1,3
9606 Id : 9742, {_}: meet (join (meet ?10626 ?10627) ?10626) ?10626 =?= meet ?10626 (join (meet ?10626 ?10627) ?10626) [10627, 10626] by Demod 9741 with 9092 at 2,3
9607 Id : 9743, {_}: join (meet ?10626 ?10627) ?10626 =<= meet ?10626 (join (meet ?10626 ?10627) ?10626) [10627, 10626] by Demod 9742 with 9092 at 2
9608 Id : 9744, {_}: join (meet ?10626 ?10627) ?10626 =>= ?10626 [10627, 10626] by Demod 9743 with 9476 at 3
9609 Id : 9898, {_}: join (meet (meet ?10737 ?10738) ?10737) (meet (meet ?10737 ?10738) ?10737) =>= meet ?10737 ?10738 [10738, 10737] by Super 1490 with 9744 at 2,2,2
9610 Id : 9933, {_}: meet (meet ?10737 ?10738) ?10737 =>= meet ?10737 ?10738 [10738, 10737] by Demod 9898 with 8505 at 2
9611 Id : 10148, {_}: ?5934 =<= meet ?5934 (join ?5935 ?5934) [5935, 5934] by Demod 4244 with 9933 at 3
9612 Id : 10149, {_}: join (meet ?5256 ?5257) ?5257 =>= ?5257 [5257, 5256] by Demod 3603 with 10148 at 2,2
9613 Id : 11750, {_}: join (meet ?13533 ?13534) ?13534 =<= join (join (meet ?13533 ?13534) (meet ?13535 (join (meet ?13533 ?13534) ?13534))) ?13534 [13535, 13534, 13533] by Super 11746 with 10149 at 2,3
9614 Id : 11822, {_}: ?13534 =<= join (join (meet ?13533 ?13534) (meet ?13535 (join (meet ?13533 ?13534) ?13534))) ?13534 [13535, 13533, 13534] by Demod 11750 with 10149 at 2
9615 Id : 11823, {_}: ?13534 =<= join (join (meet ?13533 ?13534) (meet ?13535 ?13534)) ?13534 [13535, 13533, 13534] by Demod 11822 with 10149 at 2,2,1,3
9616 Id : 12050, {_}: b === b [] by Demod 1 with 11823 at 2
9617 Id : 1, {_}: join (join (meet a b) (meet c b)) b =>= b [] by prove_wal_axioms_6
9618 % SZS output end CNFRefutation for LAT097-1.p
9619 12265: solved LAT097-1.p in 17.953121 using nrkbo
9620 !! infer_left 80 0.0001 0.0000 0.0000
9621 !! infer_right 81 72.2501 23.6372 0.8920
9622 !! simplify_goal 81 0.0062 0.0004 0.0001
9623 !! keep_simplified 142 0.2180 0.0371 0.0015
9624 !! simplification_step 198 0.2170 0.0047 0.0011
9625 !! simplify 5499 64.3156 0.9905 0.0117
9626 !! orphan_murder 211 0.0060 0.0001 0.0000
9627 !! is_subsumed 4220 2.0304 0.4048 0.0005
9628 !! build_new_clause 3061 7.6666 0.4151 0.0025
9629 !! demodulate 5424 62.2700 0.9859 0.0115
9630 !! demod 454882 36.5840 0.4057 0.0001
9631 !! demod.apply_subst 17812 0.8382 0.4002 0.0000
9632 !! demod.retrieve_generalizations 454882 29.4107 0.4054 0.0001
9633 !! demod.unify 67063 1.6638 0.3003 0.0000
9634 !! build_clause 11967 27.8662 0.4095 0.0023
9635 !! compare_terms(nrkbo) 11969 12.3276 0.4051 0.0010
9636 !! compare_terms(nrkbo) 2 0.0001 0.0001 0.0000
9638 12290: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9639 12290: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9640 12290: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9641 12290: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9643 meet ?12 ?13 =<->= meet ?13 ?12
9644 [13, 12] by commutativity_of_meet ?12 ?13
9646 join ?15 ?16 =<->= join ?16 ?15
9647 [16, 15] by commutativity_of_join ?15 ?16
9649 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9650 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9652 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9653 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9654 12290: Id : 10, {_}:
9655 meet ?26 (join ?27 (meet ?26 ?28))
9659 (meet ?28 (join (meet ?26 (join ?27 ?28)) (meet ?27 ?28))))
9660 [28, 27, 26] by equation_H2 ?26 ?27 ?28
9663 meet a (join b (meet a c))
9665 meet a (join b (meet c (join b (meet a (join c (meet a b))))))
9667 % SZS status Timeout for LAT098-1.p
9669 12328: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9670 12328: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9671 12328: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9672 12328: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9674 meet ?12 ?13 =<->= meet ?13 ?12
9675 [13, 12] by commutativity_of_meet ?12 ?13
9677 join ?15 ?16 =<->= join ?16 ?15
9678 [16, 15] by commutativity_of_join ?15 ?16
9680 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9681 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9683 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9684 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9685 12328: Id : 10, {_}:
9686 meet ?26 (join ?27 (meet ?26 ?28))
9690 (meet ?28 (join ?27 (meet ?26 (join ?28 (meet ?26 ?27))))))
9691 [28, 27, 26] by equation_H3 ?26 ?27 ?28
9694 meet a (join b (meet a c))
9696 meet a (join b (meet c (join (meet a (join b c)) (meet b c))))
9698 % SZS status Timeout for LAT099-1.p
9700 12356: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9701 12356: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9702 12356: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9703 12356: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9705 meet ?12 ?13 =<->= meet ?13 ?12
9706 [13, 12] by commutativity_of_meet ?12 ?13
9708 join ?15 ?16 =<->= join ?16 ?15
9709 [16, 15] by commutativity_of_join ?15 ?16
9711 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9712 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9714 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9715 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9716 12356: Id : 10, {_}:
9717 meet ?26 (join ?27 (meet ?26 ?28))
9720 (join (meet ?26 (join ?27 (meet ?26 ?28)))
9721 (meet ?28 (join ?26 ?27)))
9722 [28, 27, 26] by equation_H6 ?26 ?27 ?28
9725 meet a (join b (meet a (join c d)))
9727 meet a (join b (meet (join a (meet b d)) (join c d)))
9729 % SZS status Timeout for LAT100-1.p
9731 12405: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9732 12405: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9733 12405: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9734 12405: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9736 meet ?12 ?13 =<->= meet ?13 ?12
9737 [13, 12] by commutativity_of_meet ?12 ?13
9739 join ?15 ?16 =<->= join ?16 ?15
9740 [16, 15] by commutativity_of_join ?15 ?16
9742 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9743 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9745 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9746 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9747 12405: Id : 10, {_}:
9748 meet ?26 (join ?27 (meet ?26 ?28))
9751 (join (meet ?26 (join ?27 (meet ?26 ?28)))
9752 (meet ?28 (join ?26 ?27)))
9753 [28, 27, 26] by equation_H6 ?26 ?27 ?28
9756 meet a (join b (meet a c))
9758 meet a (join b (meet c (join a (meet b c))))
9760 % SZS status Timeout for LAT101-1.p
9762 12435: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9763 12435: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9764 12435: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9765 12435: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9767 meet ?12 ?13 =<->= meet ?13 ?12
9768 [13, 12] by commutativity_of_meet ?12 ?13
9770 join ?15 ?16 =<->= join ?16 ?15
9771 [16, 15] by commutativity_of_join ?15 ?16
9773 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9774 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9776 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9777 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9778 12435: Id : 10, {_}:
9779 meet ?26 (join ?27 (meet ?26 ?28))
9783 (meet ?26 (join (meet ?26 ?27) (meet ?28 (join ?26 ?27)))))
9784 [28, 27, 26] by equation_H7 ?26 ?27 ?28
9787 meet a (join b (meet a (join c d)))
9789 meet a (join b (meet (join a (meet b d)) (join c d)))
9791 % SZS status Timeout for LAT102-1.p
9793 12476: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9794 12476: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9795 12476: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9796 12476: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9798 meet ?12 ?13 =<->= meet ?13 ?12
9799 [13, 12] by commutativity_of_meet ?12 ?13
9801 join ?15 ?16 =<->= join ?16 ?15
9802 [16, 15] by commutativity_of_join ?15 ?16
9804 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9805 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9807 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9808 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9809 12476: Id : 10, {_}:
9810 meet ?26 (join ?27 (meet ?26 ?28))
9812 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?27 ?28))))
9813 [28, 27, 26] by equation_H10 ?26 ?27 ?28
9816 meet a (join b (meet a c))
9818 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
9820 % SZS status Timeout for LAT103-1.p
9822 12507: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9823 12507: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9824 12507: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9825 12507: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9827 meet ?12 ?13 =<->= meet ?13 ?12
9828 [13, 12] by commutativity_of_meet ?12 ?13
9830 join ?15 ?16 =<->= join ?16 ?15
9831 [16, 15] by commutativity_of_join ?15 ?16
9833 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9834 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9836 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9837 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9838 12507: Id : 10, {_}:
9839 join (meet ?26 ?27) (meet ?26 ?28)
9842 (join (meet ?27 (join ?26 (meet ?27 ?28)))
9843 (meet ?28 (join ?26 ?27)))
9844 [28, 27, 26] by equation_H21 ?26 ?27 ?28
9847 meet a (join b (meet a c))
9849 meet a (join b (meet c (join b (meet a (join c (meet a b))))))
9851 % SZS status Timeout for LAT104-1.p
9853 12559: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9854 12559: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9855 12559: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9856 12559: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9858 meet ?12 ?13 =<->= meet ?13 ?12
9859 [13, 12] by commutativity_of_meet ?12 ?13
9861 join ?15 ?16 =<->= join ?16 ?15
9862 [16, 15] by commutativity_of_join ?15 ?16
9864 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9865 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9867 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9868 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9869 12559: Id : 10, {_}:
9870 join (meet ?26 ?27) (meet ?26 ?28)
9873 (join (meet ?27 (join ?26 (meet ?27 ?28)))
9874 (meet ?28 (join ?26 ?27)))
9875 [28, 27, 26] by equation_H21 ?26 ?27 ?28
9878 meet a (join b (meet a c))
9880 meet a (join b (meet c (join a (meet b c))))
9882 % SZS status Timeout for LAT105-1.p
9884 12592: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9885 12592: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9886 12592: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9887 12592: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9889 meet ?12 ?13 =<->= meet ?13 ?12
9890 [13, 12] by commutativity_of_meet ?12 ?13
9892 join ?15 ?16 =<->= join ?16 ?15
9893 [16, 15] by commutativity_of_join ?15 ?16
9895 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9896 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9898 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9899 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9900 12592: Id : 10, {_}:
9901 join (meet ?26 ?27) (meet ?26 ?28)
9904 (join (meet ?27 (join ?28 (meet ?26 ?27)))
9905 (meet ?28 (join ?26 ?27)))
9906 [28, 27, 26] by equation_H22 ?26 ?27 ?28
9909 meet a (join b (meet a c))
9911 meet a (join b (meet c (join b (meet a (join c (meet a b))))))
9913 % SZS status Timeout for LAT106-1.p
9915 12705: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9916 12705: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9917 12705: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9918 12705: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9920 meet ?12 ?13 =<->= meet ?13 ?12
9921 [13, 12] by commutativity_of_meet ?12 ?13
9923 join ?15 ?16 =<->= join ?16 ?15
9924 [16, 15] by commutativity_of_join ?15 ?16
9926 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9927 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9929 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9930 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9931 12705: Id : 10, {_}:
9932 join (meet ?26 ?27) (meet ?26 ?28)
9935 (join (meet ?27 (join ?28 (meet ?26 ?27)))
9936 (meet ?28 (join ?26 ?27)))
9937 [28, 27, 26] by equation_H22 ?26 ?27 ?28
9940 meet a (join (meet a b) (meet a c))
9942 meet a (join (meet b (join a (meet b c))) (meet c (join a b)))
9944 % SZS status Timeout for LAT107-1.p
9946 12739: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9947 12739: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9948 12739: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9949 12739: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9951 meet ?12 ?13 =<->= meet ?13 ?12
9952 [13, 12] by commutativity_of_meet ?12 ?13
9954 join ?15 ?16 =<->= join ?16 ?15
9955 [16, 15] by commutativity_of_join ?15 ?16
9957 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9958 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9960 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9961 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9962 12739: Id : 10, {_}:
9963 meet ?26 (join ?27 (meet ?26 (meet ?28 ?29)))
9965 meet ?26 (join ?27 (meet ?28 (meet ?29 (join ?27 (meet ?26 ?28)))))
9966 [29, 28, 27, 26] by equation_H31 ?26 ?27 ?28 ?29
9969 meet a (join b (meet c (join a d)))
9971 meet a (join b (meet c (join b (join d (meet a c)))))
9973 % SZS status Timeout for LAT108-1.p
9975 12781: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
9976 12781: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
9977 12781: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
9978 12781: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
9980 meet ?12 ?13 =<->= meet ?13 ?12
9981 [13, 12] by commutativity_of_meet ?12 ?13
9983 join ?15 ?16 =<->= join ?16 ?15
9984 [16, 15] by commutativity_of_join ?15 ?16
9986 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
9987 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
9989 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
9990 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
9991 12781: Id : 10, {_}:
9992 meet ?26 (join ?27 (join ?28 (meet ?26 ?29)))
9994 meet ?26 (join ?27 (join ?28 (meet ?29 (join ?26 (meet ?27 ?28)))))
9995 [29, 28, 27, 26] by equation_H37 ?26 ?27 ?28 ?29
9998 meet a (join b (meet c (join a d)))
10000 meet a (join b (meet c (join d (meet c (join a b)))))
10002 % SZS status Timeout for LAT109-1.p
10004 12822: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10005 12822: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10006 12822: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10007 12822: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10008 12822: Id : 6, {_}:
10009 meet ?12 ?13 =<->= meet ?13 ?12
10010 [13, 12] by commutativity_of_meet ?12 ?13
10011 12822: Id : 7, {_}:
10012 join ?15 ?16 =<->= join ?16 ?15
10013 [16, 15] by commutativity_of_join ?15 ?16
10014 12822: Id : 8, {_}:
10015 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10016 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10017 12822: Id : 9, {_}:
10018 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10019 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10020 12822: Id : 10, {_}:
10021 meet ?26 (join ?27 (join ?28 (meet ?26 ?29)))
10023 meet ?26 (join ?27 (join ?28 (meet ?29 (join ?26 (meet ?27 ?28)))))
10024 [29, 28, 27, 26] by equation_H37 ?26 ?27 ?28 ?29
10026 12822: Id : 1, {_}:
10027 meet a (join b (meet c (join a d)))
10029 meet a (join b (meet c (join b (join d (meet a c)))))
10031 % SZS status Timeout for LAT110-1.p
10033 12854: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10034 12854: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10035 12854: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10036 12854: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10037 12854: Id : 6, {_}:
10038 meet ?12 ?13 =<->= meet ?13 ?12
10039 [13, 12] by commutativity_of_meet ?12 ?13
10040 12854: Id : 7, {_}:
10041 join ?15 ?16 =<->= join ?16 ?15
10042 [16, 15] by commutativity_of_join ?15 ?16
10043 12854: Id : 8, {_}:
10044 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10045 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10046 12854: Id : 9, {_}:
10047 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10048 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10049 12854: Id : 10, {_}:
10050 meet ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
10052 meet ?26 (meet ?27 (join ?28 (meet ?29 (join ?26 (meet ?27 ?28)))))
10053 [29, 28, 27, 26] by equation_H45 ?26 ?27 ?28 ?29
10055 12854: Id : 1, {_}:
10056 meet a (join b (meet c (join a d)))
10058 meet a (join b (meet c (join d (meet c (join a b)))))
10060 % SZS status Timeout for LAT111-1.p
10062 12887: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10063 12887: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10064 12887: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10065 12887: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10066 12887: Id : 6, {_}:
10067 meet ?12 ?13 =<->= meet ?13 ?12
10068 [13, 12] by commutativity_of_meet ?12 ?13
10069 12887: Id : 7, {_}:
10070 join ?15 ?16 =<->= join ?16 ?15
10071 [16, 15] by commutativity_of_join ?15 ?16
10072 12887: Id : 8, {_}:
10073 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10074 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10075 12887: Id : 9, {_}:
10076 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10077 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10078 12887: Id : 10, {_}:
10079 meet ?26 (meet ?27 (join ?28 (meet ?27 ?29)))
10081 meet ?26 (meet ?27 (join ?28 (meet ?29 (join ?27 (meet ?26 ?28)))))
10082 [29, 28, 27, 26] by equation_H47 ?26 ?27 ?28 ?29
10084 12887: Id : 1, {_}:
10085 meet a (join b (meet c (join a d)))
10087 meet a (join b (meet c (join b (join d (meet a c)))))
10089 % SZS status Timeout for LAT112-1.p
10091 12920: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10092 12920: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10093 12920: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10094 12920: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10095 12920: Id : 6, {_}:
10096 meet ?12 ?13 =<->= meet ?13 ?12
10097 [13, 12] by commutativity_of_meet ?12 ?13
10098 12920: Id : 7, {_}:
10099 join ?15 ?16 =<->= join ?16 ?15
10100 [16, 15] by commutativity_of_join ?15 ?16
10101 12920: Id : 8, {_}:
10102 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10103 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10104 12920: Id : 9, {_}:
10105 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10106 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10107 12920: Id : 10, {_}:
10108 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
10110 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?28 (join ?27 ?29)))))
10111 [29, 28, 27, 26] by equation_H50 ?26 ?27 ?28 ?29
10113 12920: Id : 1, {_}:
10114 meet a (join b (meet c (join a d)))
10116 meet a (join b (meet c (join d (meet c (join a b)))))
10118 % SZS status Timeout for LAT113-1.p
10120 12957: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10121 12957: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10122 12957: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10123 12957: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10124 12957: Id : 6, {_}:
10125 meet ?12 ?13 =<->= meet ?13 ?12
10126 [13, 12] by commutativity_of_meet ?12 ?13
10127 12957: Id : 7, {_}:
10128 join ?15 ?16 =<->= join ?16 ?15
10129 [16, 15] by commutativity_of_join ?15 ?16
10130 12957: Id : 8, {_}:
10131 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10132 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10133 12957: Id : 9, {_}:
10134 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10135 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10136 12957: Id : 10, {_}:
10137 join ?26 (meet ?27 (join ?26 ?28))
10139 join ?26 (meet ?27 (join ?28 (meet ?26 (join ?28 ?27))))
10140 [28, 27, 26] by equation_H55 ?26 ?27 ?28
10142 12957: Id : 1, {_}:
10143 join (meet a b) (meet a (join b c))
10145 meet a (join b (meet (join a b) (join c (meet a b))))
10147 % SZS status Timeout for LAT114-1.p
10149 12996: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10150 12996: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10151 12996: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10152 12996: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10153 12996: Id : 6, {_}:
10154 meet ?12 ?13 =<->= meet ?13 ?12
10155 [13, 12] by commutativity_of_meet ?12 ?13
10156 12996: Id : 7, {_}:
10157 join ?15 ?16 =<->= join ?16 ?15
10158 [16, 15] by commutativity_of_join ?15 ?16
10159 12996: Id : 8, {_}:
10160 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10161 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10162 12996: Id : 9, {_}:
10163 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10164 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10165 12996: Id : 10, {_}:
10166 join ?26 (meet ?27 (join ?26 ?28))
10168 join ?26 (meet ?27 (join ?28 (meet ?26 (join ?28 ?27))))
10169 [28, 27, 26] by equation_H55 ?26 ?27 ?28
10171 12996: Id : 1, {_}:
10172 meet a (meet (join b c) (join b d))
10174 meet a (join b (meet (join b d) (join c (meet a b))))
10176 % SZS status Timeout for LAT115-1.p
10178 13029: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10179 13029: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10180 13029: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10181 13029: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10182 13029: Id : 6, {_}:
10183 meet ?12 ?13 =<->= meet ?13 ?12
10184 [13, 12] by commutativity_of_meet ?12 ?13
10185 13029: Id : 7, {_}:
10186 join ?15 ?16 =<->= join ?16 ?15
10187 [16, 15] by commutativity_of_join ?15 ?16
10188 13029: Id : 8, {_}:
10189 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10190 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10191 13029: Id : 9, {_}:
10192 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10193 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10194 13029: Id : 10, {_}:
10195 join ?26 (meet ?27 (join ?26 ?28))
10197 join ?26 (meet ?27 (join ?28 (meet ?26 (join ?28 ?27))))
10198 [28, 27, 26] by equation_H55 ?26 ?27 ?28
10200 13029: Id : 1, {_}:
10201 meet a (meet (join b c) (join b d))
10203 meet a (join b (meet (join b c) (join d (meet a b))))
10205 % SZS status Timeout for LAT116-1.p
10207 13061: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10208 13061: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10209 13061: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10210 13061: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10211 13061: Id : 6, {_}:
10212 meet ?12 ?13 =<->= meet ?13 ?12
10213 [13, 12] by commutativity_of_meet ?12 ?13
10214 13061: Id : 7, {_}:
10215 join ?15 ?16 =<->= join ?16 ?15
10216 [16, 15] by commutativity_of_join ?15 ?16
10217 13061: Id : 8, {_}:
10218 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10219 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10220 13061: Id : 9, {_}:
10221 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10222 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10223 13061: Id : 10, {_}:
10224 meet ?26 (join ?27 (meet ?28 ?29))
10226 meet ?26 (join ?27 (meet ?26 (join (meet ?26 ?27) (meet ?28 ?29))))
10227 [29, 28, 27, 26] by equation_H65 ?26 ?27 ?28 ?29
10229 13061: Id : 1, {_}:
10232 join (meet a (join c (meet a b))) (meet a (join b (meet a c)))
10234 % SZS status Timeout for LAT117-1.p
10236 13167: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10237 13167: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10238 13167: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10239 13167: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10240 13167: Id : 6, {_}:
10241 meet ?12 ?13 =<->= meet ?13 ?12
10242 [13, 12] by commutativity_of_meet ?12 ?13
10243 13167: Id : 7, {_}:
10244 join ?15 ?16 =<->= join ?16 ?15
10245 [16, 15] by commutativity_of_join ?15 ?16
10246 13167: Id : 8, {_}:
10247 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10248 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10249 13167: Id : 9, {_}:
10250 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10251 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10252 13167: Id : 10, {_}:
10253 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
10255 meet ?26 (join (meet ?26 (join ?27 (meet ?26 ?28))) (meet ?28 ?29))
10256 [29, 28, 27, 26] by equation_H79 ?26 ?27 ?28 ?29
10258 13167: Id : 1, {_}:
10261 join (meet a (join c (meet a b))) (meet a (join b (meet a c)))
10263 % SZS status Timeout for LAT118-1.p
10265 13199: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10266 13199: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10267 13199: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10268 13199: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10269 13199: Id : 6, {_}:
10270 meet ?12 ?13 =<->= meet ?13 ?12
10271 [13, 12] by commutativity_of_meet ?12 ?13
10272 13199: Id : 7, {_}:
10273 join ?15 ?16 =<->= join ?16 ?15
10274 [16, 15] by commutativity_of_join ?15 ?16
10275 13199: Id : 8, {_}:
10276 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10277 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10278 13199: Id : 9, {_}:
10279 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10280 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10281 13199: Id : 10, {_}:
10282 meet ?26 (join (meet ?27 (join ?26 ?28)) (meet ?28 (join ?26 ?27)))
10284 join (meet ?26 ?27) (meet ?26 ?28)
10285 [28, 27, 26] by equation_H82 ?26 ?27 ?28
10287 13199: Id : 1, {_}:
10288 meet a (join b (meet a c))
10290 meet a (join b (meet c (join b (meet a (join c (meet a b))))))
10292 % SZS status Timeout for LAT119-1.p
10294 13233: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10295 13233: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10296 13233: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10297 13233: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10298 13233: Id : 6, {_}:
10299 meet ?12 ?13 =<->= meet ?13 ?12
10300 [13, 12] by commutativity_of_meet ?12 ?13
10301 13233: Id : 7, {_}:
10302 join ?15 ?16 =<->= join ?16 ?15
10303 [16, 15] by commutativity_of_join ?15 ?16
10304 13233: Id : 8, {_}:
10305 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10306 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10307 13233: Id : 9, {_}:
10308 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10309 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10310 13233: Id : 10, {_}:
10311 join ?26 (meet ?27 (join ?26 ?28))
10313 join ?26 (meet ?27 (join ?28 (meet ?26 (join ?27 ?28))))
10314 [28, 27, 26] by equation_H10_dual ?26 ?27 ?28
10316 13233: Id : 1, {_}:
10319 meet a (join b (meet (join a b) (join c (meet a b))))
10321 % SZS status Timeout for LAT120-1.p
10323 13277: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10324 13277: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10325 13277: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10326 13277: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10327 13277: Id : 6, {_}:
10328 meet ?12 ?13 =<->= meet ?13 ?12
10329 [13, 12] by commutativity_of_meet ?12 ?13
10330 13277: Id : 7, {_}:
10331 join ?15 ?16 =<->= join ?16 ?15
10332 [16, 15] by commutativity_of_join ?15 ?16
10333 13277: Id : 8, {_}:
10334 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10335 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10336 13277: Id : 9, {_}:
10337 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10338 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10339 13277: Id : 10, {_}:
10340 meet (join ?26 ?27) (join ?26 ?28)
10343 (meet (join ?26 ?27)
10344 (meet (join ?26 ?28) (join ?27 (meet ?26 ?28))))
10345 [28, 27, 26] by equation_H18_dual ?26 ?27 ?28
10347 13277: Id : 1, {_}:
10348 join a (meet b (join a c))
10350 join a (meet b (join c (meet a (join c b))))
10352 % SZS status Timeout for LAT121-1.p
10354 13310: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10355 13310: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10356 13310: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10357 13310: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10358 13310: Id : 6, {_}:
10359 meet ?12 ?13 =<->= meet ?13 ?12
10360 [13, 12] by commutativity_of_meet ?12 ?13
10361 13310: Id : 7, {_}:
10362 join ?15 ?16 =<->= join ?16 ?15
10363 [16, 15] by commutativity_of_join ?15 ?16
10364 13310: Id : 8, {_}:
10365 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10366 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10367 13310: Id : 9, {_}:
10368 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10369 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10370 13310: Id : 10, {_}:
10371 meet (join ?26 ?27) (join ?26 ?28)
10374 (meet (join ?27 (meet ?26 (join ?27 ?28)))
10375 (join ?28 (meet ?26 ?27)))
10376 [28, 27, 26] by equation_H21_dual ?26 ?27 ?28
10378 13310: Id : 1, {_}:
10379 join a (meet b (join a c))
10381 join a (meet b (join c (meet a (join c b))))
10383 % SZS status Timeout for LAT122-1.p
10385 13351: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10386 13351: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10387 13351: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10388 13351: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10389 13351: Id : 6, {_}:
10390 meet ?12 ?13 =<->= meet ?13 ?12
10391 [13, 12] by commutativity_of_meet ?12 ?13
10392 13351: Id : 7, {_}:
10393 join ?15 ?16 =<->= join ?16 ?15
10394 [16, 15] by commutativity_of_join ?15 ?16
10395 13351: Id : 8, {_}:
10396 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10397 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10398 13351: Id : 9, {_}:
10399 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10400 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10401 13351: Id : 10, {_}:
10402 meet (join ?26 ?27) (join ?26 ?28)
10405 (meet (join ?27 (meet ?28 (join ?26 ?27)))
10406 (join ?28 (meet ?26 ?27)))
10407 [28, 27, 26] by equation_H22_dual ?26 ?27 ?28
10409 13351: Id : 1, {_}:
10410 join a (meet b (join a c))
10412 join a (meet b (join c (meet a (join c b))))
10414 % SZS status Timeout for LAT123-1.p
10416 13388: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10417 13388: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10418 13388: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10419 13388: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10420 13388: Id : 6, {_}:
10421 meet ?12 ?13 =<->= meet ?13 ?12
10422 [13, 12] by commutativity_of_meet ?12 ?13
10423 13388: Id : 7, {_}:
10424 join ?15 ?16 =<->= join ?16 ?15
10425 [16, 15] by commutativity_of_join ?15 ?16
10426 13388: Id : 8, {_}:
10427 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10428 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10429 13388: Id : 9, {_}:
10430 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10431 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10432 13388: Id : 10, {_}:
10433 join ?26 (meet ?27 (join ?26 (join ?28 ?29)))
10435 join ?26 (meet ?27 (join ?28 (meet (join ?26 ?29) (join ?27 ?29))))
10436 [29, 28, 27, 26] by equation_H32_dual ?26 ?27 ?28 ?29
10438 13388: Id : 1, {_}:
10441 join (meet a (join c (meet a b))) (meet a (join b (meet a c)))
10443 % SZS status Timeout for LAT124-1.p
10445 13453: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10446 13453: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10447 13453: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10448 13453: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10449 13453: Id : 6, {_}:
10450 meet ?12 ?13 =<->= meet ?13 ?12
10451 [13, 12] by commutativity_of_meet ?12 ?13
10452 13453: Id : 7, {_}:
10453 join ?15 ?16 =<->= join ?16 ?15
10454 [16, 15] by commutativity_of_join ?15 ?16
10455 13453: Id : 8, {_}:
10456 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10457 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10458 13453: Id : 9, {_}:
10459 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10460 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10461 13453: Id : 10, {_}:
10462 join ?26 (meet ?27 (join ?28 ?29))
10464 join ?26 (meet ?27 (join ?28 (meet ?27 (join ?29 (meet ?27 ?28)))))
10465 [29, 28, 27, 26] by equation_H34_dual ?26 ?27 ?28 ?29
10467 13453: Id : 1, {_}:
10470 join (meet a (join c (meet a b))) (meet a (join b (meet a c)))
10472 % SZS status Timeout for LAT125-1.p
10474 13486: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10475 13486: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10476 13486: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10477 13486: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10478 13486: Id : 6, {_}:
10479 meet ?12 ?13 =<->= meet ?13 ?12
10480 [13, 12] by commutativity_of_meet ?12 ?13
10481 13486: Id : 7, {_}:
10482 join ?15 ?16 =<->= join ?16 ?15
10483 [16, 15] by commutativity_of_join ?15 ?16
10484 13486: Id : 8, {_}:
10485 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10486 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10487 13486: Id : 9, {_}:
10488 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10489 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10490 13486: Id : 10, {_}:
10491 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
10493 join ?26 (meet ?27 (join ?28 (meet ?29 (join ?26 ?28))))
10494 [29, 28, 27, 26] by equation_H39_dual ?26 ?27 ?28 ?29
10496 13486: Id : 1, {_}:
10499 join (meet a (join c (meet a b))) (meet a (join b (meet a c)))
10501 % SZS status Timeout for LAT126-1.p
10503 13527: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10504 13527: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10505 13527: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10506 13527: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10507 13527: Id : 6, {_}:
10508 meet ?12 ?13 =<->= meet ?13 ?12
10509 [13, 12] by commutativity_of_meet ?12 ?13
10510 13527: Id : 7, {_}:
10511 join ?15 ?16 =<->= join ?16 ?15
10512 [16, 15] by commutativity_of_join ?15 ?16
10513 13527: Id : 8, {_}:
10514 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10515 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10516 13527: Id : 9, {_}:
10517 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10518 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10519 13527: Id : 10, {_}:
10520 meet ?26 (join ?27 (meet ?26 ?28))
10522 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?28 ?27))))
10523 [28, 27, 26] by equation_H55_dual ?26 ?27 ?28
10525 13527: Id : 1, {_}:
10526 meet a (join b (meet a c))
10528 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
10530 % SZS status Timeout for LAT127-1.p
10532 13561: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10533 13561: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10534 13561: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10535 13561: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10536 13561: Id : 6, {_}:
10537 meet ?12 ?13 =<->= meet ?13 ?12
10538 [13, 12] by commutativity_of_meet ?12 ?13
10539 13561: Id : 7, {_}:
10540 join ?15 ?16 =<->= join ?16 ?15
10541 [16, 15] by commutativity_of_join ?15 ?16
10542 13561: Id : 8, {_}:
10543 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10544 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10545 13561: Id : 9, {_}:
10546 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10547 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10548 13561: Id : 10, {_}:
10549 join ?26 (meet ?27 ?28)
10551 join ?26 (meet ?27 (join (meet ?26 ?27) (meet ?28 (join ?26 ?27))))
10552 [28, 27, 26] by equation_H58_dual ?26 ?27 ?28
10554 13561: Id : 1, {_}:
10555 meet a (join b (meet a c))
10557 meet a (join b (meet c (join b (meet a (join c (meet a b))))))
10559 % SZS status Timeout for LAT128-1.p
10561 13839: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10562 13839: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10563 13839: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10564 13839: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10565 13839: Id : 6, {_}:
10566 meet ?12 ?13 =<->= meet ?13 ?12
10567 [13, 12] by commutativity_of_meet ?12 ?13
10568 13839: Id : 7, {_}:
10569 join ?15 ?16 =<->= join ?16 ?15
10570 [16, 15] by commutativity_of_join ?15 ?16
10571 13839: Id : 8, {_}:
10572 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10573 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10574 13839: Id : 9, {_}:
10575 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10576 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10577 13839: Id : 10, {_}:
10578 join ?26 (meet ?27 ?28)
10580 join ?26 (meet ?27 (join (meet ?26 ?27) (meet ?28 (join ?26 ?27))))
10581 [28, 27, 26] by equation_H58_dual ?26 ?27 ?28
10583 13839: Id : 1, {_}:
10584 meet a (join b (meet a c))
10586 meet a (join b (meet c (join a (meet b c))))
10588 % SZS status Timeout for LAT129-1.p
10590 14653: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10591 14653: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10592 14653: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10593 14653: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10594 14653: Id : 6, {_}:
10595 meet ?12 ?13 =<->= meet ?13 ?12
10596 [13, 12] by commutativity_of_meet ?12 ?13
10597 14653: Id : 7, {_}:
10598 join ?15 ?16 =<->= join ?16 ?15
10599 [16, 15] by commutativity_of_join ?15 ?16
10600 14653: Id : 8, {_}:
10601 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10602 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10603 14653: Id : 9, {_}:
10604 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10605 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10606 14653: Id : 10, {_}:
10607 join ?26 (meet ?27 ?28)
10609 join ?26 (meet ?27 (join ?26 (meet ?28 (join ?26 ?27))))
10610 [28, 27, 26] by equation_H68_dual ?26 ?27 ?28
10612 14653: Id : 1, {_}:
10613 meet a (join b (meet c (join a d)))
10615 meet a (join b (meet c (join d (meet a c))))
10617 % SZS status Timeout for LAT130-1.p
10619 14677: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10620 14677: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10621 14677: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10622 14677: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10623 14677: Id : 6, {_}:
10624 meet ?12 ?13 =<->= meet ?13 ?12
10625 [13, 12] by commutativity_of_meet ?12 ?13
10626 14677: Id : 7, {_}:
10627 join ?15 ?16 =<->= join ?16 ?15
10628 [16, 15] by commutativity_of_join ?15 ?16
10629 14677: Id : 8, {_}:
10630 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10631 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10632 14677: Id : 9, {_}:
10633 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10634 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10635 14677: Id : 10, {_}:
10636 join ?26 (meet ?27 ?28)
10638 join ?26 (meet ?27 (join ?26 (meet ?28 (join ?26 ?27))))
10639 [28, 27, 26] by equation_H68_dual ?26 ?27 ?28
10641 14677: Id : 1, {_}:
10642 meet a (join b (meet c (join a d)))
10644 meet a (join b (meet c (join b (join d (meet a c)))))
10646 % SZS status Timeout for LAT131-1.p
10648 14702: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10649 14702: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10650 14702: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10651 14702: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10652 14702: Id : 6, {_}:
10653 meet ?12 ?13 =<->= meet ?13 ?12
10654 [13, 12] by commutativity_of_meet ?12 ?13
10655 14702: Id : 7, {_}:
10656 join ?15 ?16 =<->= join ?16 ?15
10657 [16, 15] by commutativity_of_join ?15 ?16
10658 14702: Id : 8, {_}:
10659 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10660 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10661 14702: Id : 9, {_}:
10662 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10663 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10664 14702: Id : 10, {_}:
10665 join ?26 (meet ?27 ?28)
10667 meet (join ?26 (meet ?28 (join ?26 ?27)))
10668 (join ?26 (meet ?27 (join ?26 ?28)))
10669 [28, 27, 26] by equation_H69_dual ?26 ?27 ?28
10671 14702: Id : 1, {_}:
10672 meet a (join b (meet c (join a d)))
10674 meet a (join b (meet c (join b (join d (meet a c)))))
10676 % SZS status Timeout for LAT132-1.p
10678 14726: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10679 14726: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10680 14726: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10681 14726: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10682 14726: Id : 6, {_}:
10683 meet ?12 ?13 =<->= meet ?13 ?12
10684 [13, 12] by commutativity_of_meet ?12 ?13
10685 14726: Id : 7, {_}:
10686 join ?15 ?16 =<->= join ?16 ?15
10687 [16, 15] by commutativity_of_join ?15 ?16
10688 14726: Id : 8, {_}:
10689 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10690 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10691 14726: Id : 9, {_}:
10692 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10693 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10694 14726: Id : 10, {_}:
10695 join ?26 (meet ?27 (join ?26 ?28))
10697 join ?26 (meet ?27 (join ?28 (meet ?26 (join ?28 ?27))))
10698 [28, 27, 26] by equation_H55 ?26 ?27 ?28
10700 14726: Id : 1, {_}:
10701 join a (meet b (join a c))
10703 join a (meet (join a (meet b (join a c))) (join c (meet a b)))
10704 [] by prove_H6_dual
10705 % SZS status Timeout for LAT133-1.p
10707 14755: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10708 14755: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10709 14755: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10710 14755: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10711 14755: Id : 6, {_}:
10712 meet ?12 ?13 =<->= meet ?13 ?12
10713 [13, 12] by commutativity_of_meet ?12 ?13
10714 14755: Id : 7, {_}:
10715 join ?15 ?16 =<->= join ?16 ?15
10716 [16, 15] by commutativity_of_join ?15 ?16
10717 14755: Id : 8, {_}:
10718 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10719 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10720 14755: Id : 9, {_}:
10721 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10722 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10723 14755: Id : 10, {_}:
10724 meet (join ?26 ?27) (join ?26 ?28)
10726 join ?26 (meet (join ?26 ?27) (join (meet ?26 ?27) ?28))
10727 [28, 27, 26] by equation_H61 ?26 ?27 ?28
10729 14755: Id : 1, {_}:
10730 meet (join a b) (join a c)
10732 join a (meet (join b (meet c (join a b))) (join c (meet a b)))
10733 [] by prove_H22_dual
10734 % SZS status Timeout for LAT134-1.p
10736 14780: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10737 14780: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10738 14780: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10739 14780: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10740 14780: Id : 6, {_}:
10741 meet ?12 ?13 =<->= meet ?13 ?12
10742 [13, 12] by commutativity_of_meet ?12 ?13
10743 14780: Id : 7, {_}:
10744 join ?15 ?16 =<->= join ?16 ?15
10745 [16, 15] by commutativity_of_join ?15 ?16
10746 14780: Id : 8, {_}:
10747 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10748 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10749 14780: Id : 9, {_}:
10750 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10751 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10752 14780: Id : 10, {_}:
10753 meet ?26 (join ?27 ?28)
10755 meet ?26 (join ?27 (meet ?26 (join ?28 (meet ?26 ?27))))
10756 [28, 27, 26] by equation_H68 ?26 ?27 ?28
10758 14780: Id : 1, {_}:
10759 join a (meet b (join c (meet a d)))
10761 join a (meet b (join c (meet d (join a c))))
10762 [] by prove_H39_dual
10763 % SZS status Timeout for LAT135-1.p
10765 14805: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10766 14805: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10767 14805: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10768 14805: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10769 14805: Id : 6, {_}:
10770 meet ?12 ?13 =<->= meet ?13 ?12
10771 [13, 12] by commutativity_of_meet ?12 ?13
10772 14805: Id : 7, {_}:
10773 join ?15 ?16 =<->= join ?16 ?15
10774 [16, 15] by commutativity_of_join ?15 ?16
10775 14805: Id : 8, {_}:
10776 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10777 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10778 14805: Id : 9, {_}:
10779 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10780 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10781 14805: Id : 10, {_}:
10782 meet ?26 (join ?27 ?28)
10784 join (meet ?26 (join ?28 (meet ?26 ?27)))
10785 (meet ?26 (join ?27 (meet ?26 ?28)))
10786 [28, 27, 26] by equation_H69 ?26 ?27 ?28
10788 14805: Id : 1, {_}:
10789 join a (meet b (join c (meet a d)))
10791 join a (meet b (join c (meet d (join a c))))
10792 [] by prove_H39_dual
10793 % SZS status Timeout for LAT136-1.p
10795 14829: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10796 14829: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10797 14829: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10798 14829: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10799 14829: Id : 6, {_}:
10800 meet ?12 ?13 =<->= meet ?13 ?12
10801 [13, 12] by commutativity_of_meet ?12 ?13
10802 14829: Id : 7, {_}:
10803 join ?15 ?16 =<->= join ?16 ?15
10804 [16, 15] by commutativity_of_join ?15 ?16
10805 14829: Id : 8, {_}:
10806 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10807 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10808 14829: Id : 9, {_}:
10809 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10810 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10811 14829: Id : 10, {_}:
10812 meet ?26 (join ?27 ?28)
10814 join (meet ?26 (join ?28 (meet ?26 ?27)))
10815 (meet ?26 (join ?27 (meet ?26 ?28)))
10816 [28, 27, 26] by equation_H69 ?26 ?27 ?28
10818 14829: Id : 1, {_}:
10819 join a (meet b (join c (meet a d)))
10821 join a (meet b (join c (meet d (join c (meet a b)))))
10822 [] by prove_H40_dual
10823 % SZS status Timeout for LAT137-1.p
10825 14856: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10826 14856: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10827 14856: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10828 14856: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10829 14856: Id : 6, {_}:
10830 meet ?12 ?13 =<->= meet ?13 ?12
10831 [13, 12] by commutativity_of_meet ?12 ?13
10832 14856: Id : 7, {_}:
10833 join ?15 ?16 =<->= join ?16 ?15
10834 [16, 15] by commutativity_of_join ?15 ?16
10835 14856: Id : 8, {_}:
10836 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10837 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10838 14856: Id : 9, {_}:
10839 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10840 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10841 14856: Id : 10, {_}:
10842 meet ?26 (join ?27 (meet ?26 ?28))
10846 (meet ?26 (join (meet ?26 ?27) (meet ?28 (join ?26 ?27)))))
10847 [28, 27, 26] by equation_H7 ?26 ?27 ?28
10849 14856: Id : 1, {_}:
10850 meet a (join b (meet a c))
10852 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
10854 % SZS status Timeout for LAT138-1.p
10856 14880: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10857 14880: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10858 14880: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10859 14880: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10860 14880: Id : 6, {_}:
10861 meet ?12 ?13 =<->= meet ?13 ?12
10862 [13, 12] by commutativity_of_meet ?12 ?13
10863 14880: Id : 7, {_}:
10864 join ?15 ?16 =<->= join ?16 ?15
10865 [16, 15] by commutativity_of_join ?15 ?16
10866 14880: Id : 8, {_}:
10867 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10868 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10869 14880: Id : 9, {_}:
10870 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10871 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10872 14880: Id : 10, {_}:
10873 meet ?26 (join ?27 (meet ?26 ?28))
10877 (meet ?28 (join ?26 (meet ?27 (join ?28 (meet ?26 ?27))))))
10878 [28, 27, 26] by equation_H11 ?26 ?27 ?28
10880 14880: Id : 1, {_}:
10881 meet a (join b (meet a c))
10883 meet a (join b (meet c (join a (meet b c))))
10885 % SZS status Timeout for LAT139-1.p
10887 14934: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10888 14934: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10889 14934: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10890 14934: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10891 14934: Id : 6, {_}:
10892 meet ?12 ?13 =<->= meet ?13 ?12
10893 [13, 12] by commutativity_of_meet ?12 ?13
10894 14934: Id : 7, {_}:
10895 join ?15 ?16 =<->= join ?16 ?15
10896 [16, 15] by commutativity_of_join ?15 ?16
10897 14934: Id : 8, {_}:
10898 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10899 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10900 14934: Id : 9, {_}:
10901 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10902 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10903 14934: Id : 10, {_}:
10904 join (meet ?26 ?27) (meet ?26 ?28)
10907 (join (meet ?27 (join ?26 (meet ?27 ?28)))
10908 (meet ?28 (join ?26 ?27)))
10909 [28, 27, 26] by equation_H21 ?26 ?27 ?28
10911 14934: Id : 1, {_}:
10912 meet a (join b (meet a c))
10914 meet a (join b (meet c (join (meet a (join b c)) (meet b c))))
10916 % SZS status Timeout for LAT140-1.p
10918 14961: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10919 14961: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10920 14961: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10921 14961: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10922 14961: Id : 6, {_}:
10923 meet ?12 ?13 =<->= meet ?13 ?12
10924 [13, 12] by commutativity_of_meet ?12 ?13
10925 14961: Id : 7, {_}:
10926 join ?15 ?16 =<->= join ?16 ?15
10927 [16, 15] by commutativity_of_join ?15 ?16
10928 14961: Id : 8, {_}:
10929 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10930 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10931 14961: Id : 9, {_}:
10932 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10933 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10934 14961: Id : 10, {_}:
10935 join (meet ?26 ?27) (meet ?26 ?28)
10938 (join (meet ?27 (join ?26 (meet ?27 ?28)))
10939 (meet ?28 (join ?26 ?27)))
10940 [28, 27, 26] by equation_H21 ?26 ?27 ?28
10942 14961: Id : 1, {_}:
10943 meet a (join b (meet a c))
10945 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
10947 % SZS status Timeout for LAT141-1.p
10949 14986: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10950 14986: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10951 14986: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10952 14986: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10953 14986: Id : 6, {_}:
10954 meet ?12 ?13 =<->= meet ?13 ?12
10955 [13, 12] by commutativity_of_meet ?12 ?13
10956 14986: Id : 7, {_}:
10957 join ?15 ?16 =<->= join ?16 ?15
10958 [16, 15] by commutativity_of_join ?15 ?16
10959 14986: Id : 8, {_}:
10960 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10961 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10962 14986: Id : 9, {_}:
10963 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10964 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10965 14986: Id : 10, {_}:
10966 join (meet ?26 ?27) (meet ?26 ?28)
10969 (join (meet ?27 (join ?28 (meet ?26 ?27)))
10970 (meet ?28 (join ?26 ?27)))
10971 [28, 27, 26] by equation_H22 ?26 ?27 ?28
10973 14986: Id : 1, {_}:
10974 meet a (join b (meet a c))
10976 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
10978 % SZS status Timeout for LAT142-1.p
10980 15010: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
10981 15010: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
10982 15010: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
10983 15010: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
10984 15010: Id : 6, {_}:
10985 meet ?12 ?13 =<->= meet ?13 ?12
10986 [13, 12] by commutativity_of_meet ?12 ?13
10987 15010: Id : 7, {_}:
10988 join ?15 ?16 =<->= join ?16 ?15
10989 [16, 15] by commutativity_of_join ?15 ?16
10990 15010: Id : 8, {_}:
10991 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
10992 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
10993 15010: Id : 9, {_}:
10994 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
10995 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
10996 15010: Id : 10, {_}:
10997 meet ?26 (join ?27 (meet ?26 (meet ?28 ?29)))
10999 meet ?26 (join ?27 (meet ?28 (join (meet ?26 ?29) (meet ?27 ?29))))
11000 [29, 28, 27, 26] by equation_H32 ?26 ?27 ?28 ?29
11002 15010: Id : 1, {_}:
11003 meet a (join b (meet a c))
11005 meet a (join b (meet c (join (meet a (join b c)) (meet b c))))
11007 % SZS status Timeout for LAT144-1.p
11009 15039: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11010 15039: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11011 15039: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11012 15039: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11013 15039: Id : 6, {_}:
11014 meet ?12 ?13 =<->= meet ?13 ?12
11015 [13, 12] by commutativity_of_meet ?12 ?13
11016 15039: Id : 7, {_}:
11017 join ?15 ?16 =<->= join ?16 ?15
11018 [16, 15] by commutativity_of_join ?15 ?16
11019 15039: Id : 8, {_}:
11020 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11021 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11022 15039: Id : 9, {_}:
11023 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11024 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11025 15039: Id : 10, {_}:
11026 meet ?26 (join ?27 (meet ?26 (meet ?28 ?29)))
11028 meet ?26 (join ?27 (meet ?28 (join (meet ?26 ?29) (meet ?27 ?29))))
11029 [29, 28, 27, 26] by equation_H32 ?26 ?27 ?28 ?29
11031 15039: Id : 1, {_}:
11032 meet a (join b (meet a c))
11034 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11036 % SZS status Timeout for LAT145-1.p
11038 15083: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11039 15083: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11040 15083: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11041 15083: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11042 15083: Id : 6, {_}:
11043 meet ?12 ?13 =<->= meet ?13 ?12
11044 [13, 12] by commutativity_of_meet ?12 ?13
11045 15083: Id : 7, {_}:
11046 join ?15 ?16 =<->= join ?16 ?15
11047 [16, 15] by commutativity_of_join ?15 ?16
11048 15083: Id : 8, {_}:
11049 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11050 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11051 15083: Id : 9, {_}:
11052 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11053 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11054 15083: Id : 10, {_}:
11055 meet ?26 (join ?27 (meet ?28 ?29))
11057 meet ?26 (join ?27 (meet ?28 (join ?27 (meet ?29 (join ?27 ?28)))))
11058 [29, 28, 27, 26] by equation_H34 ?26 ?27 ?28 ?29
11060 15083: Id : 1, {_}:
11061 meet a (join b (meet a (meet c d)))
11063 meet a (join b (meet c (meet d (join a (meet b d)))))
11065 % SZS status Timeout for LAT146-1.p
11067 15123: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11068 15123: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11069 15123: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11070 15123: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11071 15123: Id : 6, {_}:
11072 meet ?12 ?13 =<->= meet ?13 ?12
11073 [13, 12] by commutativity_of_meet ?12 ?13
11074 15123: Id : 7, {_}:
11075 join ?15 ?16 =<->= join ?16 ?15
11076 [16, 15] by commutativity_of_join ?15 ?16
11077 15123: Id : 8, {_}:
11078 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11079 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11080 15123: Id : 9, {_}:
11081 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11082 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11083 15123: Id : 10, {_}:
11084 meet ?26 (join ?27 (meet ?28 ?29))
11086 meet ?26 (join ?27 (meet ?28 (join ?27 (meet ?29 (join ?27 ?28)))))
11087 [29, 28, 27, 26] by equation_H34 ?26 ?27 ?28 ?29
11089 15123: Id : 1, {_}:
11090 meet a (meet b (join c (meet a d)))
11092 meet a (meet b (join c (meet d (join a (meet b c)))))
11094 % SZS status Timeout for LAT147-1.p
11096 15148: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11097 15148: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11098 15148: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11099 15148: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11100 15148: Id : 6, {_}:
11101 meet ?12 ?13 =<->= meet ?13 ?12
11102 [13, 12] by commutativity_of_meet ?12 ?13
11103 15148: Id : 7, {_}:
11104 join ?15 ?16 =<->= join ?16 ?15
11105 [16, 15] by commutativity_of_join ?15 ?16
11106 15148: Id : 8, {_}:
11107 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11108 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11109 15148: Id : 9, {_}:
11110 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11111 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11112 15148: Id : 10, {_}:
11113 meet ?26 (join ?27 (meet ?28 ?29))
11115 meet ?26 (join ?27 (meet ?28 (join ?27 (meet ?29 (join ?27 ?28)))))
11116 [29, 28, 27, 26] by equation_H34 ?26 ?27 ?28 ?29
11118 15148: Id : 1, {_}:
11119 meet a (join b (meet a c))
11121 meet a (join b (meet a (join (meet a b) (meet c (join a b)))))
11123 % SZS status Timeout for LAT148-1.p
11125 15185: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11126 15185: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11127 15185: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11128 15185: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11129 15185: Id : 6, {_}:
11130 meet ?12 ?13 =<->= meet ?13 ?12
11131 [13, 12] by commutativity_of_meet ?12 ?13
11132 15185: Id : 7, {_}:
11133 join ?15 ?16 =<->= join ?16 ?15
11134 [16, 15] by commutativity_of_join ?15 ?16
11135 15185: Id : 8, {_}:
11136 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11137 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11138 15185: Id : 9, {_}:
11139 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11140 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11141 15185: Id : 10, {_}:
11142 meet ?26 (join ?27 (join ?28 (meet ?26 ?29)))
11144 meet ?26 (join ?27 (join ?28 (meet ?29 (join ?26 (meet ?27 ?28)))))
11145 [29, 28, 27, 26] by equation_H37 ?26 ?27 ?28 ?29
11147 15185: Id : 1, {_}:
11148 meet a (join b (meet c (join b d)))
11150 meet a (join b (meet c (join d (meet a (join b d)))))
11152 % SZS status Timeout for LAT149-1.p
11154 15218: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11155 15218: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11156 15218: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11157 15218: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11158 15218: Id : 6, {_}:
11159 meet ?12 ?13 =<->= meet ?13 ?12
11160 [13, 12] by commutativity_of_meet ?12 ?13
11161 15218: Id : 7, {_}:
11162 join ?15 ?16 =<->= join ?16 ?15
11163 [16, 15] by commutativity_of_join ?15 ?16
11164 15218: Id : 8, {_}:
11165 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11166 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11167 15218: Id : 9, {_}:
11168 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11169 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11170 15218: Id : 10, {_}:
11171 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11173 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?28))))
11174 [29, 28, 27, 26] by equation_H39 ?26 ?27 ?28 ?29
11176 15218: Id : 1, {_}:
11177 meet a (join b (meet c (join a d)))
11179 meet a (join b (meet c (join d (meet c (join a b)))))
11181 % SZS status Timeout for LAT150-1.p
11183 15244: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11184 15244: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11185 15244: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11186 15244: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11187 15244: Id : 6, {_}:
11188 meet ?12 ?13 =<->= meet ?13 ?12
11189 [13, 12] by commutativity_of_meet ?12 ?13
11190 15244: Id : 7, {_}:
11191 join ?15 ?16 =<->= join ?16 ?15
11192 [16, 15] by commutativity_of_join ?15 ?16
11193 15244: Id : 8, {_}:
11194 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11195 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11196 15244: Id : 9, {_}:
11197 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11198 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11199 15244: Id : 10, {_}:
11200 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11202 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?28))))
11203 [29, 28, 27, 26] by equation_H39 ?26 ?27 ?28 ?29
11205 15244: Id : 1, {_}:
11206 meet a (join b (meet c (join a d)))
11208 meet a (join b (meet c (join b (join d (meet a c)))))
11210 % SZS status Timeout for LAT151-1.p
11212 15327: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11213 15327: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11214 15327: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11215 15327: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11216 15327: Id : 6, {_}:
11217 meet ?12 ?13 =<->= meet ?13 ?12
11218 [13, 12] by commutativity_of_meet ?12 ?13
11219 15327: Id : 7, {_}:
11220 join ?15 ?16 =<->= join ?16 ?15
11221 [16, 15] by commutativity_of_join ?15 ?16
11222 15327: Id : 8, {_}:
11223 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11224 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11225 15327: Id : 9, {_}:
11226 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11227 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11228 15327: Id : 10, {_}:
11229 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11231 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?28 (join ?26 ?27)))))
11232 [29, 28, 27, 26] by equation_H40 ?26 ?27 ?28 ?29
11234 15327: Id : 1, {_}:
11235 meet a (join b (meet a c))
11237 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11239 % SZS status Timeout for LAT152-1.p
11241 15364: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11242 15364: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11243 15364: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11244 15364: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11245 15364: Id : 6, {_}:
11246 meet ?12 ?13 =<->= meet ?13 ?12
11247 [13, 12] by commutativity_of_meet ?12 ?13
11248 15364: Id : 7, {_}:
11249 join ?15 ?16 =<->= join ?16 ?15
11250 [16, 15] by commutativity_of_join ?15 ?16
11251 15364: Id : 8, {_}:
11252 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11253 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11254 15364: Id : 9, {_}:
11255 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11256 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11257 15364: Id : 10, {_}:
11258 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11260 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?28 (join ?26 ?27)))))
11261 [29, 28, 27, 26] by equation_H40 ?26 ?27 ?28 ?29
11263 15364: Id : 1, {_}:
11264 meet a (join b (meet a c))
11266 meet a (join b (meet a (join (meet a b) (meet c (join a b)))))
11268 % SZS status Timeout for LAT153-1.p
11270 15388: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11271 15388: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11272 15388: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11273 15388: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11274 15388: Id : 6, {_}:
11275 meet ?12 ?13 =<->= meet ?13 ?12
11276 [13, 12] by commutativity_of_meet ?12 ?13
11277 15388: Id : 7, {_}:
11278 join ?15 ?16 =<->= join ?16 ?15
11279 [16, 15] by commutativity_of_join ?15 ?16
11280 15388: Id : 8, {_}:
11281 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11282 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11283 15388: Id : 9, {_}:
11284 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11285 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11286 15388: Id : 10, {_}:
11287 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11289 meet ?26 (join ?27 (meet ?28 (join ?27 (join ?29 (meet ?26 ?28)))))
11290 [29, 28, 27, 26] by equation_H42 ?26 ?27 ?28 ?29
11292 15388: Id : 1, {_}:
11293 meet a (join b (meet a c))
11295 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11297 % SZS status Timeout for LAT154-1.p
11299 15417: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11300 15417: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11301 15417: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11302 15417: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11303 15417: Id : 6, {_}:
11304 meet ?12 ?13 =<->= meet ?13 ?12
11305 [13, 12] by commutativity_of_meet ?12 ?13
11306 15417: Id : 7, {_}:
11307 join ?15 ?16 =<->= join ?16 ?15
11308 [16, 15] by commutativity_of_join ?15 ?16
11309 15417: Id : 8, {_}:
11310 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11311 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11312 15417: Id : 9, {_}:
11313 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11314 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11315 15417: Id : 10, {_}:
11316 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11318 meet ?26 (join ?27 (join (meet ?26 ?28) (meet ?28 (join ?27 ?29))))
11319 [29, 28, 27, 26] by equation_H49 ?26 ?27 ?28 ?29
11321 15417: Id : 1, {_}:
11322 meet a (join b (meet a c))
11324 meet a (join b (meet c (join (meet a (join b c)) (meet b c))))
11326 % SZS status Timeout for LAT155-1.p
11328 15441: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11329 15441: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11330 15441: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11331 15441: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11332 15441: Id : 6, {_}:
11333 meet ?12 ?13 =<->= meet ?13 ?12
11334 [13, 12] by commutativity_of_meet ?12 ?13
11335 15441: Id : 7, {_}:
11336 join ?15 ?16 =<->= join ?16 ?15
11337 [16, 15] by commutativity_of_join ?15 ?16
11338 15441: Id : 8, {_}:
11339 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11340 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11341 15441: Id : 9, {_}:
11342 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11343 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11344 15441: Id : 10, {_}:
11345 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11347 meet ?26 (join ?27 (join (meet ?26 ?28) (meet ?28 (join ?27 ?29))))
11348 [29, 28, 27, 26] by equation_H49 ?26 ?27 ?28 ?29
11350 15441: Id : 1, {_}:
11351 meet a (join b (meet a c))
11353 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11355 % SZS status Timeout for LAT156-1.p
11357 15466: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11358 15466: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11359 15466: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11360 15466: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11361 15466: Id : 6, {_}:
11362 meet ?12 ?13 =<->= meet ?13 ?12
11363 [13, 12] by commutativity_of_meet ?12 ?13
11364 15466: Id : 7, {_}:
11365 join ?15 ?16 =<->= join ?16 ?15
11366 [16, 15] by commutativity_of_join ?15 ?16
11367 15466: Id : 8, {_}:
11368 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11369 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11370 15466: Id : 9, {_}:
11371 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11372 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11373 15466: Id : 10, {_}:
11374 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11376 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?28 (join ?27 ?29)))))
11377 [29, 28, 27, 26] by equation_H50 ?26 ?27 ?28 ?29
11379 15466: Id : 1, {_}:
11380 meet a (join b (meet a c))
11382 meet a (join b (meet c (join (meet a (join b c)) (meet b c))))
11384 % SZS status Timeout for LAT157-1.p
11386 15493: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11387 15493: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11388 15493: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11389 15493: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11390 15493: Id : 6, {_}:
11391 meet ?12 ?13 =<->= meet ?13 ?12
11392 [13, 12] by commutativity_of_meet ?12 ?13
11393 15493: Id : 7, {_}:
11394 join ?15 ?16 =<->= join ?16 ?15
11395 [16, 15] by commutativity_of_join ?15 ?16
11396 15493: Id : 8, {_}:
11397 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11398 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11399 15493: Id : 9, {_}:
11400 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11401 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11402 15493: Id : 10, {_}:
11403 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11405 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?28 (join ?27 ?29)))))
11406 [29, 28, 27, 26] by equation_H50 ?26 ?27 ?28 ?29
11408 15493: Id : 1, {_}:
11409 meet a (join b (meet c (join a d)))
11411 meet a (join b (join (meet a c) (meet c (join b d))))
11413 % SZS status Timeout for LAT158-1.p
11415 15519: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11416 15519: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11417 15519: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11418 15519: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11419 15519: Id : 6, {_}:
11420 meet ?12 ?13 =<->= meet ?13 ?12
11421 [13, 12] by commutativity_of_meet ?12 ?13
11422 15519: Id : 7, {_}:
11423 join ?15 ?16 =<->= join ?16 ?15
11424 [16, 15] by commutativity_of_join ?15 ?16
11425 15519: Id : 8, {_}:
11426 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11427 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11428 15519: Id : 9, {_}:
11429 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11430 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11431 15519: Id : 10, {_}:
11432 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11434 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?28 (join ?27 ?29)))))
11435 [29, 28, 27, 26] by equation_H50 ?26 ?27 ?28 ?29
11437 15519: Id : 1, {_}:
11438 meet a (join b (meet a c))
11440 meet a (join b (meet a (join (meet a b) (meet c (join a b)))))
11442 % SZS status Timeout for LAT159-1.p
11444 15543: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11445 15543: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11446 15543: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11447 15543: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11448 15543: Id : 6, {_}:
11449 meet ?12 ?13 =<->= meet ?13 ?12
11450 [13, 12] by commutativity_of_meet ?12 ?13
11451 15543: Id : 7, {_}:
11452 join ?15 ?16 =<->= join ?16 ?15
11453 [16, 15] by commutativity_of_join ?15 ?16
11454 15543: Id : 8, {_}:
11455 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11456 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11457 15543: Id : 9, {_}:
11458 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11459 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11460 15543: Id : 10, {_}:
11461 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
11463 meet ?26 (join ?27 (join (meet ?28 ?29) (meet ?28 (join ?26 ?27))))
11464 [29, 28, 27, 26] by equation_H52 ?26 ?27 ?28 ?29
11466 15543: Id : 1, {_}:
11467 meet a (join b (meet c (join a d)))
11469 meet a (join b (join (meet a c) (meet c d)))
11471 % SZS status Timeout for LAT160-1.p
11473 15578: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11474 15578: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11475 15578: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11476 15578: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11477 15578: Id : 6, {_}:
11478 meet ?12 ?13 =<->= meet ?13 ?12
11479 [13, 12] by commutativity_of_meet ?12 ?13
11480 15578: Id : 7, {_}:
11481 join ?15 ?16 =<->= join ?16 ?15
11482 [16, 15] by commutativity_of_join ?15 ?16
11483 15578: Id : 8, {_}:
11484 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11485 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11486 15578: Id : 9, {_}:
11487 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11488 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11489 15578: Id : 10, {_}:
11490 meet ?26 (join ?27 ?28)
11492 meet ?26 (join ?27 (meet (join ?26 ?27) (join ?28 (meet ?26 ?27))))
11493 [28, 27, 26] by equation_H58 ?26 ?27 ?28
11495 15578: Id : 1, {_}:
11496 meet a (meet (join b c) (join b d))
11498 meet a (join b (meet (join b d) (join c (meet a b))))
11500 % SZS status Timeout for LAT161-1.p
11502 15602: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11503 15602: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11504 15602: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11505 15602: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11506 15602: Id : 6, {_}:
11507 meet ?12 ?13 =<->= meet ?13 ?12
11508 [13, 12] by commutativity_of_meet ?12 ?13
11509 15602: Id : 7, {_}:
11510 join ?15 ?16 =<->= join ?16 ?15
11511 [16, 15] by commutativity_of_join ?15 ?16
11512 15602: Id : 8, {_}:
11513 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11514 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11515 15602: Id : 9, {_}:
11516 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11517 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11518 15602: Id : 10, {_}:
11519 meet ?26 (join ?27 ?28)
11521 meet ?26 (join ?27 (meet ?26 (join ?28 (meet ?26 ?27))))
11522 [28, 27, 26] by equation_H68 ?26 ?27 ?28
11524 15602: Id : 1, {_}:
11525 meet a (meet b (join c d))
11527 meet a (meet b (join c (meet a (join d (meet b c)))))
11529 % SZS status Timeout for LAT162-1.p
11531 15627: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11532 15627: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11533 15627: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11534 15627: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11535 15627: Id : 6, {_}:
11536 meet ?12 ?13 =<->= meet ?13 ?12
11537 [13, 12] by commutativity_of_meet ?12 ?13
11538 15627: Id : 7, {_}:
11539 join ?15 ?16 =<->= join ?16 ?15
11540 [16, 15] by commutativity_of_join ?15 ?16
11541 15627: Id : 8, {_}:
11542 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11543 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11544 15627: Id : 9, {_}:
11545 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11546 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11547 15627: Id : 10, {_}:
11548 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
11550 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?27))))
11551 [29, 28, 27, 26] by equation_H76 ?26 ?27 ?28 ?29
11553 15627: Id : 1, {_}:
11554 meet a (join b (meet a (meet c d)))
11556 meet a (join b (meet c (join (meet a d) (meet b d))))
11558 % SZS status Timeout for LAT163-1.p
11560 15721: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11561 15721: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11562 15721: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11563 15721: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11564 15721: Id : 6, {_}:
11565 meet ?12 ?13 =<->= meet ?13 ?12
11566 [13, 12] by commutativity_of_meet ?12 ?13
11567 15721: Id : 7, {_}:
11568 join ?15 ?16 =<->= join ?16 ?15
11569 [16, 15] by commutativity_of_join ?15 ?16
11570 15721: Id : 8, {_}:
11571 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11572 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11573 15721: Id : 9, {_}:
11574 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11575 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11576 15721: Id : 10, {_}:
11577 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
11579 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?27))))
11580 [29, 28, 27, 26] by equation_H76 ?26 ?27 ?28 ?29
11582 15721: Id : 1, {_}:
11583 meet a (join b (meet a c))
11585 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11587 % SZS status Timeout for LAT164-1.p
11589 15750: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11590 15750: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11591 15750: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11592 15750: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11593 15750: Id : 6, {_}:
11594 meet ?12 ?13 =<->= meet ?13 ?12
11595 [13, 12] by commutativity_of_meet ?12 ?13
11596 15750: Id : 7, {_}:
11597 join ?15 ?16 =<->= join ?16 ?15
11598 [16, 15] by commutativity_of_join ?15 ?16
11599 15750: Id : 8, {_}:
11600 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11601 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11602 15750: Id : 9, {_}:
11603 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11604 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11605 15750: Id : 10, {_}:
11606 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
11608 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?27))))
11609 [29, 28, 27, 26] by equation_H76 ?26 ?27 ?28 ?29
11611 15750: Id : 1, {_}:
11612 meet a (join b (meet c (join b d)))
11614 meet a (join b (meet c (join d (meet a (meet b c)))))
11616 % SZS status Timeout for LAT165-1.p
11618 15797: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11619 15797: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11620 15797: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11621 15797: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11622 15797: Id : 6, {_}:
11623 meet ?12 ?13 =<->= meet ?13 ?12
11624 [13, 12] by commutativity_of_meet ?12 ?13
11625 15797: Id : 7, {_}:
11626 join ?15 ?16 =<->= join ?16 ?15
11627 [16, 15] by commutativity_of_join ?15 ?16
11628 15797: Id : 8, {_}:
11629 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11630 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11631 15797: Id : 9, {_}:
11632 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11633 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11634 15797: Id : 10, {_}:
11635 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
11637 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 (meet ?27 ?28)))))
11638 [29, 28, 27, 26] by equation_H77 ?26 ?27 ?28 ?29
11640 15797: Id : 1, {_}:
11641 meet a (join b (meet c (join b d)))
11643 meet a (join b (meet c (join d (meet b (join a d)))))
11645 % SZS status Timeout for LAT166-1.p
11647 15822: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11648 15822: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11649 15822: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11650 15822: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11651 15822: Id : 6, {_}:
11652 meet ?12 ?13 =<->= meet ?13 ?12
11653 [13, 12] by commutativity_of_meet ?12 ?13
11654 15822: Id : 7, {_}:
11655 join ?15 ?16 =<->= join ?16 ?15
11656 [16, 15] by commutativity_of_join ?15 ?16
11657 15822: Id : 8, {_}:
11658 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11659 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11660 15822: Id : 9, {_}:
11661 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11662 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11663 15822: Id : 10, {_}:
11664 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
11666 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?27 (join ?26 ?29)))))
11667 [29, 28, 27, 26] by equation_H78 ?26 ?27 ?28 ?29
11669 15822: Id : 1, {_}:
11670 meet a (join b (meet c (join b d)))
11672 meet a (join b (meet c (join d (meet a (meet b c)))))
11674 % SZS status Timeout for LAT167-1.p
11676 15846: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11677 15846: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11678 15846: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11679 15846: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11680 15846: Id : 6, {_}:
11681 meet ?12 ?13 =<->= meet ?13 ?12
11682 [13, 12] by commutativity_of_meet ?12 ?13
11683 15846: Id : 7, {_}:
11684 join ?15 ?16 =<->= join ?16 ?15
11685 [16, 15] by commutativity_of_join ?15 ?16
11686 15846: Id : 8, {_}:
11687 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11688 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11689 15846: Id : 9, {_}:
11690 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11691 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11692 15846: Id : 10, {_}:
11693 meet (join ?26 ?27) (join ?26 ?28)
11696 (meet (join ?26 ?27)
11697 (meet (join ?26 ?28) (join ?27 (meet ?26 ?28))))
11698 [28, 27, 26] by equation_H18_dual ?26 ?27 ?28
11700 15846: Id : 1, {_}:
11703 meet a (join b (meet (join a b) (join c (meet a b))))
11705 % SZS status Timeout for LAT168-1.p
11707 15879: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11708 15879: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11709 15879: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11710 15879: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11711 15879: Id : 6, {_}:
11712 meet ?12 ?13 =<->= meet ?13 ?12
11713 [13, 12] by commutativity_of_meet ?12 ?13
11714 15879: Id : 7, {_}:
11715 join ?15 ?16 =<->= join ?16 ?15
11716 [16, 15] by commutativity_of_join ?15 ?16
11717 15879: Id : 8, {_}:
11718 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11719 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11720 15879: Id : 9, {_}:
11721 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11722 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11723 15879: Id : 10, {_}:
11724 meet (join ?26 ?27) (join ?26 ?28)
11727 (meet (join ?27 (meet ?26 (join ?27 ?28)))
11728 (join ?28 (meet ?26 ?27)))
11729 [28, 27, 26] by equation_H21_dual ?26 ?27 ?28
11731 15879: Id : 1, {_}:
11734 meet a (join b (meet (join a b) (join c (meet a b))))
11736 % SZS status Timeout for LAT169-1.p
11738 15905: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11739 15905: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11740 15905: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11741 15905: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11742 15905: Id : 6, {_}:
11743 meet ?12 ?13 =<->= meet ?13 ?12
11744 [13, 12] by commutativity_of_meet ?12 ?13
11745 15905: Id : 7, {_}:
11746 join ?15 ?16 =<->= join ?16 ?15
11747 [16, 15] by commutativity_of_join ?15 ?16
11748 15905: Id : 8, {_}:
11749 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11750 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11751 15905: Id : 9, {_}:
11752 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11753 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11754 15905: Id : 10, {_}:
11755 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
11757 join ?26 (meet ?27 (meet (join ?26 ?28) (join ?28 (meet ?27 ?29))))
11758 [29, 28, 27, 26] by equation_H49_dual ?26 ?27 ?28 ?29
11760 15905: Id : 1, {_}:
11763 meet a (join b (meet (join a b) (join c (meet a b))))
11765 % SZS status Timeout for LAT170-1.p
11767 15935: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11768 15935: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11769 15935: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11770 15935: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11771 15935: Id : 6, {_}:
11772 meet ?12 ?13 =<->= meet ?13 ?12
11773 [13, 12] by commutativity_of_meet ?12 ?13
11774 15935: Id : 7, {_}:
11775 join ?15 ?16 =<->= join ?16 ?15
11776 [16, 15] by commutativity_of_join ?15 ?16
11777 15935: Id : 8, {_}:
11778 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11779 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11780 15935: Id : 9, {_}:
11781 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11782 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11783 15935: Id : 10, {_}:
11784 join (meet ?26 ?27) (meet ?26 ?28)
11786 meet ?26 (join (meet ?26 ?27) (meet (join ?26 ?27) ?28))
11787 [28, 27, 26] by equation_H61_dual ?26 ?27 ?28
11789 15935: Id : 1, {_}:
11790 meet a (join b (meet a c))
11792 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11794 % SZS status Timeout for LAT171-1.p
11796 15959: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11797 15959: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11798 15959: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11799 15959: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11800 15959: Id : 6, {_}:
11801 meet ?12 ?13 =<->= meet ?13 ?12
11802 [13, 12] by commutativity_of_meet ?12 ?13
11803 15959: Id : 7, {_}:
11804 join ?15 ?16 =<->= join ?16 ?15
11805 [16, 15] by commutativity_of_join ?15 ?16
11806 15959: Id : 8, {_}:
11807 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11808 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11809 15959: Id : 9, {_}:
11810 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11811 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11812 15959: Id : 10, {_}:
11813 join ?26 (meet ?27 (join ?28 (meet ?27 ?29)))
11815 join ?26 (meet ?27 (join ?28 (meet ?29 (join ?26 ?27))))
11816 [29, 28, 27, 26] by equation_H76_dual ?26 ?27 ?28 ?29
11818 15959: Id : 1, {_}:
11819 meet a (join b (meet a (meet c d)))
11821 meet a (join b (meet c (join (meet a d) (meet b d))))
11823 % SZS status Timeout for LAT172-1.p
11825 15984: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11826 15984: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11827 15984: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11828 15984: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11829 15984: Id : 6, {_}:
11830 meet ?12 ?13 =<->= meet ?13 ?12
11831 [13, 12] by commutativity_of_meet ?12 ?13
11832 15984: Id : 7, {_}:
11833 join ?15 ?16 =<->= join ?16 ?15
11834 [16, 15] by commutativity_of_join ?15 ?16
11835 15984: Id : 8, {_}:
11836 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11837 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11838 15984: Id : 9, {_}:
11839 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11840 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11841 15984: Id : 10, {_}:
11842 join ?26 (meet ?27 (join ?28 (meet ?27 ?29)))
11844 join ?26 (meet ?27 (join ?28 (meet ?29 (join ?26 ?27))))
11845 [29, 28, 27, 26] by equation_H76_dual ?26 ?27 ?28 ?29
11847 15984: Id : 1, {_}:
11848 meet a (join b (meet c (join a d)))
11850 meet a (join b (meet c (join d (meet c (join a b)))))
11852 % SZS status Timeout for LAT173-1.p
11854 16003: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11855 16003: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11856 16003: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11857 16003: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11858 16003: Id : 6, {_}:
11859 meet ?12 ?13 =<->= meet ?13 ?12
11860 [13, 12] by commutativity_of_meet ?12 ?13
11861 16003: Id : 7, {_}:
11862 join ?15 ?16 =<->= join ?16 ?15
11863 [16, 15] by commutativity_of_join ?15 ?16
11864 16003: Id : 8, {_}:
11865 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11866 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11867 16003: Id : 9, {_}:
11868 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11869 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11870 16003: Id : 10, {_}:
11871 join ?26 (meet ?27 (join ?28 (meet ?27 ?29)))
11873 join ?26 (meet ?27 (join ?28 (meet ?29 (join ?26 ?27))))
11874 [29, 28, 27, 26] by equation_H76_dual ?26 ?27 ?28 ?29
11876 16003: Id : 1, {_}:
11877 meet a (join b (meet a c))
11879 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11881 % SZS status Timeout for LAT174-1.p
11883 16126: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11884 16126: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11885 16126: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11886 16126: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11887 16126: Id : 6, {_}:
11888 meet ?12 ?13 =<->= meet ?13 ?12
11889 [13, 12] by commutativity_of_meet ?12 ?13
11890 16126: Id : 7, {_}:
11891 join ?15 ?16 =<->= join ?16 ?15
11892 [16, 15] by commutativity_of_join ?15 ?16
11893 16126: Id : 8, {_}:
11894 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11895 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11896 16126: Id : 9, {_}:
11897 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11898 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11899 16126: Id : 10, {_}:
11900 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
11902 join ?26 (meet (join ?26 (meet ?27 (join ?26 ?28))) (join ?28 ?29))
11903 [29, 28, 27, 26] by equation_H79_dual ?26 ?27 ?28 ?29
11905 16126: Id : 1, {_}:
11906 meet a (join b (meet a (meet c d)))
11908 meet a (join b (meet c (join (meet a d) (meet b d))))
11910 % SZS status Timeout for LAT175-1.p
11912 16145: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11913 16145: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11914 16145: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11915 16145: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11916 16145: Id : 6, {_}:
11917 meet ?12 ?13 =<->= meet ?13 ?12
11918 [13, 12] by commutativity_of_meet ?12 ?13
11919 16145: Id : 7, {_}:
11920 join ?15 ?16 =<->= join ?16 ?15
11921 [16, 15] by commutativity_of_join ?15 ?16
11922 16145: Id : 8, {_}:
11923 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11924 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11925 16145: Id : 9, {_}:
11926 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11927 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11928 16145: Id : 10, {_}:
11929 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
11931 join ?26 (meet (join ?26 (meet ?27 (join ?26 ?28))) (join ?28 ?29))
11932 [29, 28, 27, 26] by equation_H79_dual ?26 ?27 ?28 ?29
11934 16145: Id : 1, {_}:
11935 meet a (join b (meet c (join a d)))
11937 meet a (join b (meet c (join b (join d (meet a c)))))
11939 % SZS status Timeout for LAT176-1.p
11941 16180: Id : 2, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
11942 16180: Id : 3, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
11943 16180: Id : 4, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
11944 16180: Id : 5, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
11945 16180: Id : 6, {_}:
11946 meet ?12 ?13 =<->= meet ?13 ?12
11947 [13, 12] by commutativity_of_meet ?12 ?13
11948 16180: Id : 7, {_}:
11949 join ?15 ?16 =<->= join ?16 ?15
11950 [16, 15] by commutativity_of_join ?15 ?16
11951 16180: Id : 8, {_}:
11952 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
11953 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
11954 16180: Id : 9, {_}:
11955 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
11956 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
11957 16180: Id : 10, {_}:
11958 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
11960 join ?26 (meet (join ?26 (meet ?27 (join ?26 ?28))) (join ?28 ?29))
11961 [29, 28, 27, 26] by equation_H79_dual ?26 ?27 ?28 ?29
11963 16180: Id : 1, {_}:
11964 meet a (join b (meet a c))
11966 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
11968 % SZS status Timeout for LAT177-1.p
11970 16203: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
11971 16203: Id : 3, {_}:
11972 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
11975 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
11976 16203: Id : 4, {_}:
11977 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
11978 [9, 8] by wajsberg_3 ?8 ?9
11979 16203: Id : 5, {_}:
11980 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
11981 [12, 11] by wajsberg_4 ?11 ?12
11983 16203: Id : 1, {_}:
11984 implies (implies (implies a b) (implies b a)) (implies b a) =>= truth
11985 [] by prove_wajsberg_mv_4
11986 % SZS status Timeout for LCL109-2.p
11988 16234: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
11989 16234: Id : 3, {_}:
11990 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
11993 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
11994 16234: Id : 4, {_}:
11995 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
11996 [9, 8] by wajsberg_3 ?8 ?9
11997 16234: Id : 5, {_}:
11998 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
11999 [12, 11] by wajsberg_4 ?11 ?12
12000 16234: Id : 6, {_}: implies x y =<= implies y z [] by lemma_antecedent
12002 16234: Id : 1, {_}: implies x z =>= truth [] by prove_wajsberg_lemma
12003 % SZS status Timeout for LCL136-1.p
12005 16253: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
12006 16253: Id : 3, {_}:
12007 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
12010 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
12011 16253: Id : 4, {_}:
12012 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
12013 [9, 8] by wajsberg_3 ?8 ?9
12014 16253: Id : 5, {_}:
12015 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
12016 [12, 11] by wajsberg_4 ?11 ?12
12018 16253: Id : 1, {_}:
12019 implies (implies (implies x y) y)
12020 (implies (implies y z) (implies x z))
12023 [] by prove_wajsberg_lemma
12024 % SZS status Timeout for LCL137-1.p
12026 16293: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
12027 16293: Id : 3, {_}:
12028 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
12031 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
12032 16293: Id : 4, {_}:
12033 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
12034 [9, 8] by wajsberg_3 ?8 ?9
12035 16293: Id : 5, {_}:
12036 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
12037 [12, 11] by wajsberg_4 ?11 ?12
12039 16293: Id : 1, {_}:
12040 implies x (implies y z) =<= implies y (implies x z)
12041 [] by prove_wajsberg_lemma
12042 % SZS status Timeout for LCL138-1.p
12044 16312: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
12045 16312: Id : 3, {_}:
12046 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
12049 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
12050 16312: Id : 4, {_}:
12051 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
12052 [9, 8] by wajsberg_3 ?8 ?9
12053 16312: Id : 5, {_}:
12054 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
12055 [12, 11] by wajsberg_4 ?11 ?12
12056 16312: Id : 6, {_}:
12057 or ?14 ?15 =<= implies (not ?14) ?15
12058 [15, 14] by or_definition ?14 ?15
12059 16312: Id : 7, {_}:
12060 or (or ?17 ?18) ?19 =?= or ?17 (or ?18 ?19)
12061 [19, 18, 17] by or_associativity ?17 ?18 ?19
12062 16312: Id : 8, {_}: or ?21 ?22 =<->= or ?22 ?21 [22, 21] by or_commutativity ?21 ?22
12063 16312: Id : 9, {_}:
12064 and ?24 ?25 =<= not (or (not ?24) (not ?25))
12065 [25, 24] by and_definition ?24 ?25
12066 16312: Id : 10, {_}:
12067 and (and ?27 ?28) ?29 =?= and ?27 (and ?28 ?29)
12068 [29, 28, 27] by and_associativity ?27 ?28 ?29
12069 16312: Id : 11, {_}:
12070 and ?31 ?32 =<->= and ?32 ?31
12071 [32, 31] by and_commutativity ?31 ?32
12072 16312: Id : 12, {_}:
12073 xor ?34 ?35 =<= or (and ?34 (not ?35)) (and (not ?34) ?35)
12074 [35, 34] by xor_definition ?34 ?35
12075 16312: Id : 13, {_}:
12076 xor ?37 ?38 =<->= xor ?38 ?37
12077 [38, 37] by xor_commutativity ?37 ?38
12078 16312: Id : 14, {_}:
12079 and_star ?40 ?41 =<= not (or (not ?40) (not ?41))
12080 [41, 40] by and_star_definition ?40 ?41
12081 16312: Id : 15, {_}:
12082 and_star (and_star ?43 ?44) ?45 =?= and_star ?43 (and_star ?44 ?45)
12083 [45, 44, 43] by and_star_associativity ?43 ?44 ?45
12084 16312: Id : 16, {_}:
12085 and_star ?47 ?48 =<->= and_star ?48 ?47
12086 [48, 47] by and_star_commutativity ?47 ?48
12087 16312: Id : 17, {_}: not truth =>= falsehood [] by false_definition
12089 16312: Id : 1, {_}:
12090 xor x (xor truth y) =<= xor (xor x truth) y
12091 [] by prove_alternative_wajsberg_axiom
12094 Found proof, 16.705149s
12095 % SZS status Unsatisfiable for LCL159-1.p
12096 % SZS output start CNFRefutation for LCL159-1.p
12097 Id : 11, {_}: and ?31 ?32 =?= and ?32 ?31 [32, 31] by and_commutativity ?31 ?32
12098 Id : 7, {_}: or (or ?17 ?18) ?19 =>= or ?17 (or ?18 ?19) [19, 18, 17] by or_associativity ?17 ?18 ?19
12099 Id : 13, {_}: xor ?37 ?38 =?= xor ?38 ?37 [38, 37] by xor_commutativity ?37 ?38
12100 Id : 4, {_}: implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8 [9, 8] by wajsberg_3 ?8 ?9
12101 Id : 3, {_}: implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6)) =>= truth [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
12102 Id : 12, {_}: xor ?34 ?35 =<= or (and ?34 (not ?35)) (and (not ?34) ?35) [35, 34] by xor_definition ?34 ?35
12103 Id : 10, {_}: and (and ?27 ?28) ?29 =>= and ?27 (and ?28 ?29) [29, 28, 27] by and_associativity ?27 ?28 ?29
12104 Id : 14, {_}: and_star ?40 ?41 =<= not (or (not ?40) (not ?41)) [41, 40] by and_star_definition ?40 ?41
12105 Id : 9, {_}: and ?24 ?25 =<= not (or (not ?24) (not ?25)) [25, 24] by and_definition ?24 ?25
12106 Id : 20, {_}: implies (implies ?55 ?56) (implies (implies ?56 ?57) (implies ?55 ?57)) =>= truth [57, 56, 55] by wajsberg_2 ?55 ?56 ?57
12107 Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
12108 Id : 17, {_}: not truth =>= falsehood [] by false_definition
12109 Id : 5, {_}: implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth [12, 11] by wajsberg_4 ?11 ?12
12110 Id : 6, {_}: or ?14 ?15 =<= implies (not ?14) ?15 [15, 14] by or_definition ?14 ?15
12111 Id : 8, {_}: or ?21 ?22 =?= or ?22 ?21 [22, 21] by or_commutativity ?21 ?22
12112 Id : 63, {_}: implies (or ?11 (not ?12)) (implies ?12 ?11) =>= truth [12, 11] by Demod 5 with 6 at 1,2
12113 Id : 163, {_}: implies (or ?405 falsehood) (implies truth ?405) =>= truth [405] by Super 63 with 17 at 2,1,2
12114 Id : 391, {_}: implies (or ?832 falsehood) ?832 =>= truth [832] by Demod 163 with 2 at 2,2
12115 Id : 1010, {_}: implies (or falsehood ?1592) ?1592 =>= truth [1592] by Super 391 with 8 at 1,2
12116 Id : 417, {_}: implies (implies ?886 truth) (implies ?887 (implies ?886 ?887)) =>= truth [887, 886] by Super 20 with 2 at 1,2,2
12117 Id : 418, {_}: implies (implies truth truth) (implies ?889 ?889) =>= truth [889] by Super 417 with 2 at 2,2,2
12118 Id : 454, {_}: implies truth (implies ?889 ?889) =>= truth [889] by Demod 418 with 2 at 1,2
12119 Id : 455, {_}: implies ?889 ?889 =>= truth [889] by Demod 454 with 2 at 2
12120 Id : 481, {_}: or ?972 (not ?972) =>= truth [972] by Super 6 with 455 at 3
12121 Id : 1014, {_}: implies truth (not falsehood) =>= truth [] by Super 1010 with 481 at 1,2
12122 Id : 1034, {_}: not falsehood =>= truth [] by Demod 1014 with 2 at 2
12123 Id : 1041, {_}: or falsehood ?1609 =<= implies truth ?1609 [1609] by Super 6 with 1034 at 1,3
12124 Id : 1061, {_}: or falsehood ?1609 =>= ?1609 [1609] by Demod 1041 with 2 at 3
12125 Id : 1104, {_}: or ?1626 falsehood =>= ?1626 [1626] by Super 8 with 1061 at 3
12126 Id : 144, {_}: and_star ?40 ?41 =<= and ?40 ?41 [41, 40] by Demod 14 with 9 at 3
12127 Id : 147, {_}: and_star ?24 ?25 =<= not (or (not ?24) (not ?25)) [25, 24] by Demod 9 with 144 at 2
12128 Id : 159, {_}: and_star truth ?397 =<= not (or falsehood (not ?397)) [397] by Super 147 with 17 at 1,1,3
12129 Id : 286, {_}: and_star truth ?700 =<= not (or falsehood (not ?700)) [700] by Super 147 with 17 at 1,1,3
12130 Id : 287, {_}: and_star truth truth =<= not (or falsehood falsehood) [] by Super 286 with 17 at 2,1,3
12131 Id : 305, {_}: and_star truth (or falsehood falsehood) =<= not (or falsehood (and_star truth truth)) [] by Super 159 with 287 at 2,1,3
12132 Id : 331, {_}: and_star (or falsehood (and_star truth truth)) ?746 =<= not (or (and_star truth (or falsehood falsehood)) (not ?746)) [746] by Super 147 with 305 at 1,1,3
12133 Id : 10185, {_}: and_star (and_star truth truth) ?746 =<= not (or (and_star truth (or falsehood falsehood)) (not ?746)) [746] by Demod 331 with 1061 at 1,2
12134 Id : 1075, {_}: and_star truth ?397 =>= not (not ?397) [397] by Demod 159 with 1061 at 1,3
12135 Id : 10186, {_}: and_star (and_star truth truth) ?746 =<= not (or (not (not (or falsehood falsehood))) (not ?746)) [746] by Demod 10185 with 1075 at 1,1,3
12136 Id : 148, {_}: and_star (and ?27 ?28) ?29 =<= and ?27 (and ?28 ?29) [29, 28, 27] by Demod 10 with 144 at 2
12137 Id : 149, {_}: and_star (and ?27 ?28) ?29 =>= and_star ?27 (and ?28 ?29) [29, 28, 27] by Demod 148 with 144 at 3
12138 Id : 150, {_}: and_star (and_star ?27 ?28) ?29 =>= and_star ?27 (and ?28 ?29) [29, 28, 27] by Demod 149 with 144 at 1,2
12139 Id : 151, {_}: and_star (and_star ?27 ?28) ?29 =>= and_star ?27 (and_star ?28 ?29) [29, 28, 27] by Demod 150 with 144 at 2,3
12140 Id : 10187, {_}: and_star truth (and_star truth ?746) =<= not (or (not (not (or falsehood falsehood))) (not ?746)) [746] by Demod 10186 with 151 at 2
12141 Id : 10188, {_}: and_star truth (and_star truth ?746) =<= and_star (not (or falsehood falsehood)) ?746 [746] by Demod 10187 with 147 at 3
12142 Id : 10189, {_}: not (not (and_star truth ?746)) =<= and_star (not (or falsehood falsehood)) ?746 [746] by Demod 10188 with 1075 at 2
12143 Id : 10190, {_}: not (not (and_star truth ?746)) =>= and_star (not falsehood) ?746 [746] by Demod 10189 with 1061 at 1,1,3
12144 Id : 10191, {_}: not (not (not (not ?746))) =>= and_star (not falsehood) ?746 [746] by Demod 10190 with 1075 at 1,1,2
12145 Id : 10192, {_}: not (not (not (not ?746))) =>= and_star truth ?746 [746] by Demod 10191 with 1034 at 1,3
12146 Id : 152, {_}: xor ?34 ?35 =<= or (and_star ?34 (not ?35)) (and (not ?34) ?35) [35, 34] by Demod 12 with 144 at 1,3
12147 Id : 153, {_}: xor ?34 ?35 =<= or (and_star ?34 (not ?35)) (and_star (not ?34) ?35) [35, 34] by Demod 152 with 144 at 2,3
12148 Id : 160, {_}: xor truth ?399 =<= or (and_star truth (not ?399)) (and_star falsehood ?399) [399] by Super 153 with 17 at 1,2,3
12149 Id : 167, {_}: xor truth ?399 =<= or (and_star falsehood ?399) (and_star truth (not ?399)) [399] by Demod 160 with 8 at 3
12150 Id : 1045, {_}: and_star falsehood ?1617 =<= not (or truth (not ?1617)) [1617] by Super 147 with 1034 at 1,1,3
12151 Id : 21, {_}: implies (implies truth ?59) (implies (implies ?59 ?60) ?60) =>= truth [60, 59] by Super 20 with 2 at 2,2,2
12152 Id : 29, {_}: implies ?59 (implies (implies ?59 ?60) ?60) =>= truth [60, 59] by Demod 21 with 2 at 1,2
12153 Id : 5358, {_}: implies (implies ?6263 (implies ?6264 ?6265)) (implies (implies (implies ?6265 ?6264) ?6264) (implies ?6263 ?6265)) =>= truth [6265, 6264, 6263] by Super 3 with 4 at 1,2,2
12154 Id : 22, {_}: implies (implies (implies ?62 ?63) ?64) (implies (implies ?64 (implies (implies ?63 ?65) (implies ?62 ?65))) truth) =>= truth [65, 64, 63, 62] by Super 20 with 3 at 2,2,2
12155 Id : 5414, {_}: implies (implies (implies ?6480 (implies (implies ?6480 ?6481) (implies truth ?6481))) (implies ?6480 truth)) truth =>= truth [6481, 6480] by Super 5358 with 22 at 2,2
12156 Id : 5545, {_}: implies (implies (implies ?6480 (implies (implies ?6480 ?6481) ?6481)) (implies ?6480 truth)) truth =>= truth [6481, 6480] by Demod 5414 with 2 at 2,2,1,1,2
12157 Id : 5546, {_}: implies (implies truth (implies ?6480 truth)) truth =>= truth [6480] by Demod 5545 with 29 at 1,1,2
12158 Id : 5547, {_}: implies (implies ?6480 truth) truth =>= truth [6480] by Demod 5546 with 2 at 1,2
12159 Id : 5611, {_}: implies ?6690 truth =>= truth [6690] by Super 29 with 5547 at 2,2
12160 Id : 5787, {_}: or ?6863 truth =>= truth [6863] by Super 6 with 5611 at 3
12161 Id : 6071, {_}: or truth ?6962 =>= truth [6962] by Super 8 with 5787 at 3
12162 Id : 6122, {_}: and_star falsehood ?1617 =>= not truth [1617] by Demod 1045 with 6071 at 1,3
12163 Id : 6137, {_}: and_star falsehood ?1617 =>= falsehood [1617] by Demod 6122 with 17 at 3
12164 Id : 7646, {_}: xor truth ?399 =<= or falsehood (and_star truth (not ?399)) [399] by Demod 167 with 6137 at 1,3
12165 Id : 7647, {_}: xor truth ?399 =<= or falsehood (not (not (not ?399))) [399] by Demod 7646 with 1075 at 2,3
12166 Id : 7648, {_}: xor truth ?399 =<= not (not (not ?399)) [399] by Demod 7647 with 1061 at 3
12167 Id : 10193, {_}: xor truth (not ?746) =>= and_star truth ?746 [746] by Demod 10192 with 7648 at 2
12168 Id : 10194, {_}: xor truth (not ?746) =>= not (not ?746) [746] by Demod 10193 with 1075 at 3
12169 Id : 7670, {_}: xor truth ?8495 =<= not (not (not ?8495)) [8495] by Demod 7647 with 1061 at 3
12170 Id : 7675, {_}: xor truth (not ?8504) =>= not (xor truth ?8504) [8504] by Super 7670 with 7648 at 1,3
12171 Id : 10195, {_}: not (xor truth ?746) =>= not (not ?746) [746] by Demod 10194 with 7675 at 2
12172 Id : 10223, {_}: or (xor truth ?10508) ?10509 =<= implies (not (not ?10508)) ?10509 [10509, 10508] by Super 6 with 10195 at 1,3
12173 Id : 10284, {_}: or (xor truth ?10508) ?10509 =>= or (not ?10508) ?10509 [10509, 10508] by Demod 10223 with 6 at 3
12174 Id : 11300, {_}: or (not ?11608) falsehood =>= xor truth ?11608 [11608] by Super 1104 with 10284 at 2
12175 Id : 11338, {_}: or falsehood (not ?11608) =>= xor truth ?11608 [11608] by Demod 11300 with 8 at 2
12176 Id : 11339, {_}: not ?11608 =<= xor truth ?11608 [11608] by Demod 11338 with 1061 at 2
12177 Id : 11422, {_}: xor ?11699 truth =>= not ?11699 [11699] by Super 13 with 11339 at 3
12178 Id : 4084, {_}: or truth ?5211 =<= or ?5212 (or (not ?5212) ?5211) [5212, 5211] by Super 7 with 481 at 1,2
12179 Id : 4101, {_}: or truth (not (not ?5256)) =>= or ?5256 truth [5256] by Super 4084 with 481 at 2,3
12180 Id : 4174, {_}: and_star falsehood (not ?5293) =>= not (or ?5293 truth) [5293] by Super 1045 with 4101 at 1,3
12181 Id : 4263, {_}: xor falsehood ?5358 =<= or (not (or ?5358 truth)) (and_star (not falsehood) ?5358) [5358] by Super 153 with 4174 at 1,3
12182 Id : 4304, {_}: xor falsehood ?5358 =<= or (not (or ?5358 truth)) (and_star truth ?5358) [5358] by Demod 4263 with 1034 at 1,2,3
12183 Id : 4305, {_}: xor falsehood ?5358 =<= or (and_star truth ?5358) (not (or ?5358 truth)) [5358] by Demod 4304 with 8 at 3
12184 Id : 4306, {_}: xor falsehood ?5358 =<= or (not (not ?5358)) (not (or ?5358 truth)) [5358] by Demod 4305 with 1075 at 1,3
12185 Id : 539, {_}: and_star ?1028 (not ?1028) =>= not truth [1028] by Super 147 with 481 at 1,3
12186 Id : 548, {_}: and_star ?1028 (not ?1028) =>= falsehood [1028] by Demod 539 with 17 at 3
12187 Id : 671, {_}: and_star falsehood ?1186 =<= and_star ?1187 (and_star (not ?1187) ?1186) [1187, 1186] by Super 151 with 548 at 1,2
12188 Id : 6282, {_}: falsehood =<= and_star ?7032 (and_star (not ?7032) ?7033) [7033, 7032] by Demod 671 with 6137 at 2
12189 Id : 6288, {_}: falsehood =<= and_star ?7049 falsehood [7049] by Super 6282 with 548 at 2,3
12190 Id : 6336, {_}: xor ?7080 falsehood =<= or (and_star ?7080 (not falsehood)) falsehood [7080] by Super 153 with 6288 at 2,3
12191 Id : 6352, {_}: xor ?7080 falsehood =<= or falsehood (and_star ?7080 (not falsehood)) [7080] by Demod 6336 with 8 at 3
12192 Id : 6353, {_}: xor ?7080 falsehood =<= and_star ?7080 (not falsehood) [7080] by Demod 6352 with 1061 at 3
12193 Id : 6354, {_}: xor ?7080 falsehood =<= and_star ?7080 truth [7080] by Demod 6353 with 1034 at 2,3
12194 Id : 1173, {_}: and_star falsehood ?1703 =<= not (or truth (not ?1703)) [1703] by Super 147 with 1034 at 1,1,3
12195 Id : 1175, {_}: and_star falsehood falsehood =<= not (or truth truth) [] by Super 1173 with 1034 at 2,1,3
12196 Id : 1213, {_}: and_star ?1736 (or truth truth) =<= not (or (not ?1736) (and_star falsehood falsehood)) [1736] by Super 147 with 1175 at 2,1,3
12197 Id : 1170, {_}: or (or truth (not ?1695)) ?1696 =>= implies (and_star falsehood ?1695) ?1696 [1696, 1695] by Super 6 with 1045 at 1,3
12198 Id : 2157, {_}: or truth (or (not ?2757) ?2758) =>= implies (and_star falsehood ?2757) ?2758 [2758, 2757] by Demod 1170 with 7 at 2
12199 Id : 1106, {_}: implies (not ?1630) (implies ?1630 falsehood) =>= truth [1630] by Super 63 with 1061 at 1,2
12200 Id : 1120, {_}: or ?1630 (implies ?1630 falsehood) =>= truth [1630] by Demod 1106 with 6 at 2
12201 Id : 2171, {_}: or truth truth =<= implies (and_star falsehood ?2794) (implies (not ?2794) falsehood) [2794] by Super 2157 with 1120 at 2,2
12202 Id : 2199, {_}: or truth truth =<= implies (and_star falsehood ?2794) (or ?2794 falsehood) [2794] by Demod 2171 with 6 at 2,3
12203 Id : 2547, {_}: or truth truth =<= implies (and_star falsehood ?3522) ?3522 [3522] by Demod 2199 with 1104 at 2,3
12204 Id : 145, {_}: and_star ?31 ?32 =<= and ?32 ?31 [32, 31] by Demod 11 with 144 at 2
12205 Id : 146, {_}: and_star ?31 ?32 =?= and_star ?32 ?31 [32, 31] by Demod 145 with 144 at 3
12206 Id : 2550, {_}: or truth truth =<= implies (and_star ?3528 falsehood) ?3528 [3528] by Super 2547 with 146 at 1,3
12207 Id : 5781, {_}: or truth truth =>= truth [] by Super 2550 with 5611 at 3
12208 Id : 5924, {_}: and_star ?1736 truth =<= not (or (not ?1736) (and_star falsehood falsehood)) [1736] by Demod 1213 with 5781 at 2,2
12209 Id : 5927, {_}: and_star falsehood falsehood =>= not truth [] by Demod 1175 with 5781 at 1,3
12210 Id : 5947, {_}: and_star falsehood falsehood =>= falsehood [] by Demod 5927 with 17 at 3
12211 Id : 5977, {_}: and_star ?1736 truth =<= not (or (not ?1736) falsehood) [1736] by Demod 5924 with 5947 at 2,1,3
12212 Id : 5978, {_}: and_star ?1736 truth =<= not (or falsehood (not ?1736)) [1736] by Demod 5977 with 8 at 1,3
12213 Id : 5979, {_}: and_star ?1736 truth =>= not (not ?1736) [1736] by Demod 5978 with 1061 at 1,3
12214 Id : 6355, {_}: xor ?7080 falsehood =>= not (not ?7080) [7080] by Demod 6354 with 5979 at 3
12215 Id : 6377, {_}: xor falsehood ?7104 =>= not (not ?7104) [7104] by Super 13 with 6355 at 3
12216 Id : 12029, {_}: not (not ?5358) =<= or (not (not ?5358)) (not (or ?5358 truth)) [5358] by Demod 4306 with 6377 at 2
12217 Id : 7656, {_}: or (not (not ?8448)) ?8449 =<= implies (xor truth ?8448) ?8449 [8449, 8448] by Super 6 with 7648 at 1,3
12218 Id : 11396, {_}: or (not (not ?8448)) ?8449 =>= implies (not ?8448) ?8449 [8449, 8448] by Demod 7656 with 11339 at 1,3
12219 Id : 11408, {_}: or (not (not ?8448)) ?8449 =>= or ?8448 ?8449 [8449, 8448] by Demod 11396 with 6 at 3
12220 Id : 12030, {_}: not (not ?5358) =<= or ?5358 (not (or ?5358 truth)) [5358] by Demod 12029 with 11408 at 3
12221 Id : 12031, {_}: not (not ?5358) =<= or ?5358 (not truth) [5358] by Demod 12030 with 5787 at 1,2,3
12222 Id : 12032, {_}: not (not ?5358) =<= or ?5358 falsehood [5358] by Demod 12031 with 17 at 2,3
12223 Id : 12033, {_}: not (not ?5358) =>= ?5358 [5358] by Demod 12032 with 1104 at 3
12224 Id : 12055, {_}: and_star ?12043 (not ?12044) =<= not (or (not ?12043) ?12044) [12044, 12043] by Super 147 with 12033 at 2,1,3
12225 Id : 12059, {_}: or (not ?12055) ?12056 =>= implies ?12055 ?12056 [12056, 12055] by Super 6 with 12033 at 1,3
12226 Id : 12741, {_}: and_star ?12043 (not ?12044) =>= not (implies ?12043 ?12044) [12044, 12043] by Demod 12055 with 12059 at 1,3
12227 Id : 12745, {_}: xor ?34 ?35 =<= or (not (implies ?34 ?35)) (and_star (not ?34) ?35) [35, 34] by Demod 153 with 12741 at 1,3
12228 Id : 12747, {_}: xor ?34 ?35 =<= implies (implies ?34 ?35) (and_star (not ?34) ?35) [35, 34] by Demod 12745 with 12059 at 3
12229 Id : 12752, {_}: xor ?12558 (not ?12559) =<= implies (implies ?12558 (not ?12559)) (not (implies (not ?12558) ?12559)) [12559, 12558] by Super 12747 with 12741 at 2,3
12230 Id : 97, {_}: or (or (not ?264) (not ?265)) ?266 =>= implies (and ?264 ?265) ?266 [266, 265, 264] by Super 6 with 9 at 1,3
12231 Id : 104, {_}: or (not ?264) (or (not ?265) ?266) =>= implies (and ?264 ?265) ?266 [266, 265, 264] by Demod 97 with 7 at 2
12232 Id : 6981, {_}: or (not ?264) (or (not ?265) ?266) =>= implies (and_star ?264 ?265) ?266 [266, 265, 264] by Demod 104 with 144 at 1,3
12233 Id : 12087, {_}: implies ?264 (or (not ?265) ?266) =>= implies (and_star ?264 ?265) ?266 [266, 265, 264] by Demod 6981 with 12059 at 2
12234 Id : 12088, {_}: implies ?264 (implies ?265 ?266) =<= implies (and_star ?264 ?265) ?266 [266, 265, 264] by Demod 12087 with 12059 at 2,2
12235 Id : 12112, {_}: implies ?12110 falsehood =>= not ?12110 [12110] by Super 1104 with 12059 at 2
12236 Id : 12209, {_}: implies ?12281 (implies ?12282 falsehood) =>= not (and_star ?12281 ?12282) [12282, 12281] by Super 12088 with 12112 at 3
12237 Id : 12221, {_}: implies ?12281 (not ?12282) =>= not (and_star ?12281 ?12282) [12282, 12281] by Demod 12209 with 12112 at 2,2
12238 Id : 12792, {_}: xor ?12558 (not ?12559) =<= not (and_star (implies ?12558 (not ?12559)) (implies (not ?12558) ?12559)) [12559, 12558] by Demod 12752 with 12221 at 3
12239 Id : 12793, {_}: xor ?12558 (not ?12559) =<= not (and_star (not (and_star ?12558 ?12559)) (implies (not ?12558) ?12559)) [12559, 12558] by Demod 12792 with 12221 at 1,1,3
12240 Id : 12794, {_}: xor ?12558 (not ?12559) =<= not (and_star (not (and_star ?12558 ?12559)) (or ?12558 ?12559)) [12559, 12558] by Demod 12793 with 6 at 2,1,3
12241 Id : 12795, {_}: xor ?12558 (not ?12559) =<= not (and_star (or ?12558 ?12559) (not (and_star ?12558 ?12559))) [12559, 12558] by Demod 12794 with 146 at 1,3
12242 Id : 12796, {_}: xor ?12558 (not ?12559) =<= not (not (implies (or ?12558 ?12559) (and_star ?12558 ?12559))) [12559, 12558] by Demod 12795 with 12741 at 1,3
12243 Id : 16650, {_}: xor ?16203 (not ?16204) =<= implies (or ?16203 ?16204) (and_star ?16203 ?16204) [16204, 16203] by Demod 12796 with 12033 at 3
12244 Id : 16661, {_}: xor ?16234 (not ?16235) =<= implies (or ?16235 ?16234) (and_star ?16234 ?16235) [16235, 16234] by Super 16650 with 8 at 1,3
12245 Id : 16651, {_}: xor ?16206 (not ?16207) =<= implies (or ?16206 ?16207) (and_star ?16207 ?16206) [16207, 16206] by Super 16650 with 146 at 2,3
12246 Id : 21575, {_}: xor ?16234 (not ?16235) =?= xor ?16235 (not ?16234) [16235, 16234] by Demod 16661 with 16651 at 3
12247 Id : 21684, {_}: xor x (not y) =?= xor x (not y) [] by Demod 21683 with 21575 at 3
12248 Id : 21683, {_}: xor x (not y) =<= xor y (not x) [] by Demod 21682 with 11422 at 2,3
12249 Id : 21682, {_}: xor x (not y) =<= xor y (xor x truth) [] by Demod 21681 with 13 at 3
12250 Id : 21681, {_}: xor x (not y) =<= xor (xor x truth) y [] by Demod 1 with 11339 at 2,2
12251 Id : 1, {_}: xor x (xor truth y) =<= xor (xor x truth) y [] by prove_alternative_wajsberg_axiom
12252 % SZS output end CNFRefutation for LCL159-1.p
12253 16313: solved LCL159-1.p in 5.528345 using kbo
12254 !! infer_left 373 0.0004 0.0000 0.0000
12255 !! infer_right 193 12.4988 0.5129 0.0648
12256 !! simplify_goal 373 0.0950 0.0030 0.0003
12257 !! keep_simplified 710 3.6336 0.2353 0.0051
12258 !! simplification_step 907 3.6296 0.2054 0.0040
12259 !! simplify 24005 13.7595 0.2089 0.0006
12260 !! orphan_murder 776 0.0295 0.0003 0.0000
12261 !! is_subsumed 23142 0.9116 0.2081 0.0000
12262 !! build_new_clause 10329 0.8452 0.2005 0.0001
12263 !! demodulate 24244 12.6602 0.2089 0.0005
12264 !! demod 166343 11.7371 0.2082 0.0001
12265 !! demod.apply_subst 275656 1.8072 0.2006 0.0000
12266 !! demod.compare_terms 125185 4.2366 0.2081 0.0000
12267 !! demod.retrieve_generalizations 166343 2.0120 0.2002 0.0000
12268 !! demod.unify 208187 0.8599 0.2001 0.0000
12269 !! build_clause 24751 1.1632 0.2005 0.0000
12270 !! compare_terms(kbo) 153428 3.4514 0.2081 0.0000
12271 !! compare_terms(nrkbo) 17 0.0002 0.0000 0.0000
12273 16331: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
12274 16331: Id : 3, {_}:
12275 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
12278 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
12279 16331: Id : 4, {_}:
12280 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
12281 [9, 8] by wajsberg_3 ?8 ?9
12282 16331: Id : 5, {_}:
12283 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
12284 [12, 11] by wajsberg_4 ?11 ?12
12285 16331: Id : 6, {_}:
12286 or ?14 ?15 =<= implies (not ?14) ?15
12287 [15, 14] by or_definition ?14 ?15
12288 16331: Id : 7, {_}:
12289 or (or ?17 ?18) ?19 =?= or ?17 (or ?18 ?19)
12290 [19, 18, 17] by or_associativity ?17 ?18 ?19
12291 16331: Id : 8, {_}: or ?21 ?22 =<->= or ?22 ?21 [22, 21] by or_commutativity ?21 ?22
12292 16331: Id : 9, {_}:
12293 and ?24 ?25 =<= not (or (not ?24) (not ?25))
12294 [25, 24] by and_definition ?24 ?25
12295 16331: Id : 10, {_}:
12296 and (and ?27 ?28) ?29 =?= and ?27 (and ?28 ?29)
12297 [29, 28, 27] by and_associativity ?27 ?28 ?29
12298 16331: Id : 11, {_}:
12299 and ?31 ?32 =<->= and ?32 ?31
12300 [32, 31] by and_commutativity ?31 ?32
12301 16331: Id : 12, {_}:
12302 xor ?34 ?35 =<= or (and ?34 (not ?35)) (and (not ?34) ?35)
12303 [35, 34] by xor_definition ?34 ?35
12304 16331: Id : 13, {_}:
12305 xor ?37 ?38 =<->= xor ?38 ?37
12306 [38, 37] by xor_commutativity ?37 ?38
12307 16331: Id : 14, {_}:
12308 and_star ?40 ?41 =<= not (or (not ?40) (not ?41))
12309 [41, 40] by and_star_definition ?40 ?41
12310 16331: Id : 15, {_}:
12311 and_star (and_star ?43 ?44) ?45 =?= and_star ?43 (and_star ?44 ?45)
12312 [45, 44, 43] by and_star_associativity ?43 ?44 ?45
12313 16331: Id : 16, {_}:
12314 and_star ?47 ?48 =<->= and_star ?48 ?47
12315 [48, 47] by and_star_commutativity ?47 ?48
12316 16331: Id : 17, {_}: not truth =>= falsehood [] by false_definition
12318 16331: Id : 1, {_}:
12319 and_star (xor (and_star (xor truth x) y) truth) y
12321 and_star (xor (and_star (xor truth y) x) truth) x
12322 [] by prove_alternative_wajsberg_axiom
12323 % SZS status Timeout for LCL160-1.p
12325 16350: Id : 2, {_}: implies truth ?2 =>= ?2 [2] by wajsberg_1 ?2
12326 16350: Id : 3, {_}:
12327 implies (implies ?4 ?5) (implies (implies ?5 ?6) (implies ?4 ?6))
12330 [6, 5, 4] by wajsberg_2 ?4 ?5 ?6
12331 16350: Id : 4, {_}:
12332 implies (implies ?8 ?9) ?9 =?= implies (implies ?9 ?8) ?8
12333 [9, 8] by wajsberg_3 ?8 ?9
12334 16350: Id : 5, {_}:
12335 implies (implies (not ?11) (not ?12)) (implies ?12 ?11) =>= truth
12336 [12, 11] by wajsberg_4 ?11 ?12
12337 16350: Id : 6, {_}:
12338 or ?14 ?15 =<= implies (not ?14) ?15
12339 [15, 14] by or_definition ?14 ?15
12340 16350: Id : 7, {_}:
12341 or (or ?17 ?18) ?19 =?= or ?17 (or ?18 ?19)
12342 [19, 18, 17] by or_associativity ?17 ?18 ?19
12343 16350: Id : 8, {_}: or ?21 ?22 =<->= or ?22 ?21 [22, 21] by or_commutativity ?21 ?22
12344 16350: Id : 9, {_}:
12345 and ?24 ?25 =<= not (or (not ?24) (not ?25))
12346 [25, 24] by and_definition ?24 ?25
12347 16350: Id : 10, {_}:
12348 and (and ?27 ?28) ?29 =?= and ?27 (and ?28 ?29)
12349 [29, 28, 27] by and_associativity ?27 ?28 ?29
12350 16350: Id : 11, {_}:
12351 and ?31 ?32 =<->= and ?32 ?31
12352 [32, 31] by and_commutativity ?31 ?32
12354 16350: Id : 1, {_}:
12355 not (or (and x (or x x)) (and x x))
12357 and (not x) (or (or (not x) (not x)) (and (not x) (not x)))
12358 [] by prove_wajsberg_theorem
12359 % SZS status Timeout for LCL165-1.p
12361 16389: Id : 2, {_}: add ?2 additive_identity =>= ?2 [2] by right_identity ?2
12362 16389: Id : 3, {_}:
12363 add ?4 (additive_inverse ?4) =>= additive_identity
12364 [4] by right_additive_inverse ?4
12365 16389: Id : 4, {_}:
12366 multiply ?6 (add ?7 ?8) =<= add (multiply ?6 ?7) (multiply ?6 ?8)
12367 [8, 7, 6] by distribute1 ?6 ?7 ?8
12368 16389: Id : 5, {_}:
12369 multiply (add ?10 ?11) ?12
12371 add (multiply ?10 ?12) (multiply ?11 ?12)
12372 [12, 11, 10] by distribute2 ?10 ?11 ?12
12373 16389: Id : 6, {_}:
12374 add (add ?14 ?15) ?16 =?= add ?14 (add ?15 ?16)
12375 [16, 15, 14] by associative_addition ?14 ?15 ?16
12376 16389: Id : 7, {_}:
12377 add ?18 ?19 =<->= add ?19 ?18
12378 [19, 18] by commutative_addition ?18 ?19
12379 16389: Id : 8, {_}:
12380 multiply (multiply ?21 ?22) ?23 =?= multiply ?21 (multiply ?22 ?23)
12381 [23, 22, 21] by associative_multiplication ?21 ?22 ?23
12382 16389: Id : 9, {_}: multiply ?25 (multiply ?25 ?25) =>= ?25 [25] by x_cubed_is_x ?25
12384 16389: Id : 1, {_}: multiply a b =<= multiply b a [] by prove_commutativity
12385 % SZS status Timeout for RNG009-5.p
12387 16412: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12388 16412: Id : 3, {_}:
12389 add ?4 additive_identity =>= ?4
12390 [4] by right_additive_identity ?4
12391 16412: Id : 4, {_}:
12392 add (additive_inverse ?6) ?6 =>= additive_identity
12393 [6] by left_additive_inverse ?6
12394 16412: Id : 5, {_}:
12395 add ?8 (additive_inverse ?8) =>= additive_identity
12396 [8] by right_additive_inverse ?8
12397 16412: Id : 6, {_}:
12398 add ?10 (add ?11 ?12) =?= add (add ?10 ?11) ?12
12399 [12, 11, 10] by associativity_for_addition ?10 ?11 ?12
12400 16412: Id : 7, {_}:
12401 add ?14 ?15 =<->= add ?15 ?14
12402 [15, 14] by commutativity_for_addition ?14 ?15
12403 16412: Id : 8, {_}:
12404 multiply ?17 (multiply ?18 ?19) =?= multiply (multiply ?17 ?18) ?19
12405 [19, 18, 17] by associativity_for_multiplication ?17 ?18 ?19
12406 16412: Id : 9, {_}:
12407 multiply ?21 (add ?22 ?23)
12409 add (multiply ?21 ?22) (multiply ?21 ?23)
12410 [23, 22, 21] by distribute1 ?21 ?22 ?23
12411 16412: Id : 10, {_}:
12412 multiply (add ?25 ?26) ?27
12414 add (multiply ?25 ?27) (multiply ?26 ?27)
12415 [27, 26, 25] by distribute2 ?25 ?26 ?27
12416 16412: Id : 11, {_}: multiply ?29 (multiply ?29 ?29) =>= ?29 [29] by x_cubed_is_x ?29
12417 16412: Id : 12, {_}: multiply a b =>= c [] by a_times_b_is_c
12419 16412: Id : 1, {_}: multiply b a =>= c [] by prove_commutativity
12420 % SZS status Timeout for RNG009-7.p
12422 17441: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutative_addition ?2 ?3
12423 17441: Id : 3, {_}:
12424 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
12425 [7, 6, 5] by associative_addition ?5 ?6 ?7
12426 17441: Id : 4, {_}: add ?9 additive_identity =>= ?9 [9] by right_identity ?9
12427 17441: Id : 5, {_}: add additive_identity ?11 =>= ?11 [11] by left_identity ?11
12428 17441: Id : 6, {_}:
12429 add ?13 (additive_inverse ?13) =>= additive_identity
12430 [13] by right_additive_inverse ?13
12431 17441: Id : 7, {_}:
12432 add (additive_inverse ?15) ?15 =>= additive_identity
12433 [15] by left_additive_inverse ?15
12434 17441: Id : 8, {_}:
12435 additive_inverse additive_identity =>= additive_identity
12436 [] by additive_inverse_identity
12437 17441: Id : 9, {_}:
12438 add ?18 (add (additive_inverse ?18) ?19) =>= ?19
12439 [19, 18] by property_of_inverse_and_add ?18 ?19
12440 17441: Id : 10, {_}:
12441 additive_inverse (add ?21 ?22)
12443 add (additive_inverse ?21) (additive_inverse ?22)
12444 [22, 21] by distribute_additive_inverse ?21 ?22
12445 17441: Id : 11, {_}:
12446 additive_inverse (additive_inverse ?24) =>= ?24
12447 [24] by additive_inverse_additive_inverse ?24
12448 17441: Id : 12, {_}:
12449 multiply ?26 additive_identity =>= additive_identity
12450 [26] by multiply_additive_id1 ?26
12451 17441: Id : 13, {_}:
12452 multiply additive_identity ?28 =>= additive_identity
12453 [28] by multiply_additive_id2 ?28
12454 17441: Id : 14, {_}:
12455 multiply (additive_inverse ?30) (additive_inverse ?31)
12458 [31, 30] by product_of_inverse ?30 ?31
12459 17441: Id : 15, {_}:
12460 multiply ?33 (additive_inverse ?34)
12462 additive_inverse (multiply ?33 ?34)
12463 [34, 33] by multiply_additive_inverse1 ?33 ?34
12464 17441: Id : 16, {_}:
12465 multiply (additive_inverse ?36) ?37
12467 additive_inverse (multiply ?36 ?37)
12468 [37, 36] by multiply_additive_inverse2 ?36 ?37
12469 17441: Id : 17, {_}:
12470 multiply ?39 (add ?40 ?41)
12472 add (multiply ?39 ?40) (multiply ?39 ?41)
12473 [41, 40, 39] by distribute1 ?39 ?40 ?41
12474 17441: Id : 18, {_}:
12475 multiply (add ?43 ?44) ?45
12477 add (multiply ?43 ?45) (multiply ?44 ?45)
12478 [45, 44, 43] by distribute2 ?43 ?44 ?45
12479 17441: Id : 19, {_}:
12480 multiply (multiply ?47 ?48) ?48 =?= multiply ?47 (multiply ?48 ?48)
12481 [48, 47] by right_alternative ?47 ?48
12482 17441: Id : 20, {_}:
12483 associator ?50 ?51 ?52
12485 add (multiply (multiply ?50 ?51) ?52)
12486 (additive_inverse (multiply ?50 (multiply ?51 ?52)))
12487 [52, 51, 50] by associator ?50 ?51 ?52
12488 17441: Id : 21, {_}:
12491 add (multiply ?55 ?54) (additive_inverse (multiply ?54 ?55))
12492 [55, 54] by commutator ?54 ?55
12493 17441: Id : 22, {_}:
12494 multiply (multiply (associator ?57 ?57 ?58) ?57)
12495 (associator ?57 ?57 ?58)
12498 [58, 57] by middle_associator ?57 ?58
12499 17441: Id : 23, {_}:
12500 multiply (multiply ?60 ?60) ?61 =?= multiply ?60 (multiply ?60 ?61)
12501 [61, 60] by left_alternative ?60 ?61
12502 17441: Id : 24, {_}:
12506 (add (associator (multiply ?63 ?64) ?65 ?66)
12507 (additive_inverse (multiply ?64 (associator ?63 ?65 ?66))))
12508 (additive_inverse (multiply (associator ?64 ?65 ?66) ?63))
12509 [66, 65, 64, 63] by defines_s ?63 ?64 ?65 ?66
12510 17441: Id : 25, {_}:
12511 multiply ?68 (multiply ?69 (multiply ?70 ?69))
12513 multiply (multiply (multiply ?68 ?69) ?70) ?69
12514 [70, 69, 68] by right_moufang ?68 ?69 ?70
12515 17441: Id : 26, {_}:
12516 multiply (multiply ?72 (multiply ?73 ?72)) ?74
12518 multiply ?72 (multiply ?73 (multiply ?72 ?74))
12519 [74, 73, 72] by left_moufang ?72 ?73 ?74
12520 17441: Id : 27, {_}:
12521 multiply (multiply ?76 ?77) (multiply ?78 ?76)
12523 multiply (multiply ?76 (multiply ?77 ?78)) ?76
12524 [78, 77, 76] by middle_moufang ?76 ?77 ?78
12526 17441: Id : 1, {_}:
12527 s a b c d =<= additive_inverse (s b a c d)
12528 [] by prove_skew_symmetry
12529 % SZS status Timeout for RNG010-5.p
12531 17460: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12532 17460: Id : 3, {_}:
12533 add ?4 additive_identity =>= ?4
12534 [4] by right_additive_identity ?4
12535 17460: Id : 4, {_}:
12536 multiply additive_identity ?6 =>= additive_identity
12537 [6] by left_multiplicative_zero ?6
12538 17460: Id : 5, {_}:
12539 multiply ?8 additive_identity =>= additive_identity
12540 [8] by right_multiplicative_zero ?8
12541 17460: Id : 6, {_}:
12542 add (additive_inverse ?10) ?10 =>= additive_identity
12543 [10] by left_additive_inverse ?10
12544 17460: Id : 7, {_}:
12545 add ?12 (additive_inverse ?12) =>= additive_identity
12546 [12] by right_additive_inverse ?12
12547 17460: Id : 8, {_}:
12548 additive_inverse (additive_inverse ?14) =>= ?14
12549 [14] by additive_inverse_additive_inverse ?14
12550 17460: Id : 9, {_}:
12551 multiply ?16 (add ?17 ?18)
12553 add (multiply ?16 ?17) (multiply ?16 ?18)
12554 [18, 17, 16] by distribute1 ?16 ?17 ?18
12555 17460: Id : 10, {_}:
12556 multiply (add ?20 ?21) ?22
12558 add (multiply ?20 ?22) (multiply ?21 ?22)
12559 [22, 21, 20] by distribute2 ?20 ?21 ?22
12560 17460: Id : 11, {_}:
12561 add ?24 ?25 =<->= add ?25 ?24
12562 [25, 24] by commutativity_for_addition ?24 ?25
12563 17460: Id : 12, {_}:
12564 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
12565 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
12566 17460: Id : 13, {_}:
12567 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
12568 [32, 31] by right_alternative ?31 ?32
12569 17460: Id : 14, {_}:
12570 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
12571 [35, 34] by left_alternative ?34 ?35
12572 17460: Id : 15, {_}:
12573 associator ?37 ?38 ?39
12575 add (multiply (multiply ?37 ?38) ?39)
12576 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
12577 [39, 38, 37] by associator ?37 ?38 ?39
12578 17460: Id : 16, {_}:
12581 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
12582 [42, 41] by commutator ?41 ?42
12583 17460: Id : 17, {_}:
12587 (add (associator (multiply ?44 ?45) ?46 ?47)
12588 (additive_inverse (multiply ?45 (associator ?44 ?46 ?47))))
12589 (additive_inverse (multiply (associator ?45 ?46 ?47) ?44))
12590 [47, 46, 45, 44] by defines_s ?44 ?45 ?46 ?47
12591 17460: Id : 18, {_}:
12592 multiply ?49 (multiply ?50 (multiply ?51 ?50))
12594 multiply (multiply (multiply ?49 ?50) ?51) ?50
12595 [51, 50, 49] by right_moufang ?49 ?50 ?51
12596 17460: Id : 19, {_}:
12597 multiply (multiply ?53 (multiply ?54 ?53)) ?55
12599 multiply ?53 (multiply ?54 (multiply ?53 ?55))
12600 [55, 54, 53] by left_moufang ?53 ?54 ?55
12601 17460: Id : 20, {_}:
12602 multiply (multiply ?57 ?58) (multiply ?59 ?57)
12604 multiply (multiply ?57 (multiply ?58 ?59)) ?57
12605 [59, 58, 57] by middle_moufang ?57 ?58 ?59
12607 17460: Id : 1, {_}:
12608 s a b c d =<= additive_inverse (s b a c d)
12609 [] by prove_skew_symmetry
12610 % SZS status Timeout for RNG010-6.p
12612 17502: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12613 17502: Id : 3, {_}:
12614 add ?4 additive_identity =>= ?4
12615 [4] by right_additive_identity ?4
12616 17502: Id : 4, {_}:
12617 multiply additive_identity ?6 =>= additive_identity
12618 [6] by left_multiplicative_zero ?6
12619 17502: Id : 5, {_}:
12620 multiply ?8 additive_identity =>= additive_identity
12621 [8] by right_multiplicative_zero ?8
12622 17502: Id : 6, {_}:
12623 add (additive_inverse ?10) ?10 =>= additive_identity
12624 [10] by left_additive_inverse ?10
12625 17502: Id : 7, {_}:
12626 add ?12 (additive_inverse ?12) =>= additive_identity
12627 [12] by right_additive_inverse ?12
12628 17502: Id : 8, {_}:
12629 additive_inverse (additive_inverse ?14) =>= ?14
12630 [14] by additive_inverse_additive_inverse ?14
12631 17502: Id : 9, {_}:
12632 multiply ?16 (add ?17 ?18)
12634 add (multiply ?16 ?17) (multiply ?16 ?18)
12635 [18, 17, 16] by distribute1 ?16 ?17 ?18
12636 17502: Id : 10, {_}:
12637 multiply (add ?20 ?21) ?22
12639 add (multiply ?20 ?22) (multiply ?21 ?22)
12640 [22, 21, 20] by distribute2 ?20 ?21 ?22
12641 17502: Id : 11, {_}:
12642 add ?24 ?25 =<->= add ?25 ?24
12643 [25, 24] by commutativity_for_addition ?24 ?25
12644 17502: Id : 12, {_}:
12645 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
12646 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
12647 17502: Id : 13, {_}:
12648 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
12649 [32, 31] by right_alternative ?31 ?32
12650 17502: Id : 14, {_}:
12651 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
12652 [35, 34] by left_alternative ?34 ?35
12653 17502: Id : 15, {_}:
12654 associator ?37 ?38 ?39
12656 add (multiply (multiply ?37 ?38) ?39)
12657 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
12658 [39, 38, 37] by associator ?37 ?38 ?39
12659 17502: Id : 16, {_}:
12662 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
12663 [42, 41] by commutator ?41 ?42
12664 17502: Id : 17, {_}:
12665 multiply (additive_inverse ?44) (additive_inverse ?45)
12668 [45, 44] by product_of_inverses ?44 ?45
12669 17502: Id : 18, {_}:
12670 multiply (additive_inverse ?47) ?48
12672 additive_inverse (multiply ?47 ?48)
12673 [48, 47] by inverse_product1 ?47 ?48
12674 17502: Id : 19, {_}:
12675 multiply ?50 (additive_inverse ?51)
12677 additive_inverse (multiply ?50 ?51)
12678 [51, 50] by inverse_product2 ?50 ?51
12679 17502: Id : 20, {_}:
12680 multiply ?53 (add ?54 (additive_inverse ?55))
12682 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
12683 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
12684 17502: Id : 21, {_}:
12685 multiply (add ?57 (additive_inverse ?58)) ?59
12687 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
12688 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
12689 17502: Id : 22, {_}:
12690 multiply (additive_inverse ?61) (add ?62 ?63)
12692 add (additive_inverse (multiply ?61 ?62))
12693 (additive_inverse (multiply ?61 ?63))
12694 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
12695 17502: Id : 23, {_}:
12696 multiply (add ?65 ?66) (additive_inverse ?67)
12698 add (additive_inverse (multiply ?65 ?67))
12699 (additive_inverse (multiply ?66 ?67))
12700 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
12701 17502: Id : 24, {_}:
12705 (add (associator (multiply ?69 ?70) ?71 ?72)
12706 (additive_inverse (multiply ?70 (associator ?69 ?71 ?72))))
12707 (additive_inverse (multiply (associator ?70 ?71 ?72) ?69))
12708 [72, 71, 70, 69] by defines_s ?69 ?70 ?71 ?72
12709 17502: Id : 25, {_}:
12710 multiply ?74 (multiply ?75 (multiply ?76 ?75))
12712 multiply (multiply (multiply ?74 ?75) ?76) ?75
12713 [76, 75, 74] by right_moufang ?74 ?75 ?76
12714 17502: Id : 26, {_}:
12715 multiply (multiply ?78 (multiply ?79 ?78)) ?80
12717 multiply ?78 (multiply ?79 (multiply ?78 ?80))
12718 [80, 79, 78] by left_moufang ?78 ?79 ?80
12719 17502: Id : 27, {_}:
12720 multiply (multiply ?82 ?83) (multiply ?84 ?82)
12722 multiply (multiply ?82 (multiply ?83 ?84)) ?82
12723 [84, 83, 82] by middle_moufang ?82 ?83 ?84
12725 17502: Id : 1, {_}:
12726 s a b c d =<= additive_inverse (s b a c d)
12727 [] by prove_skew_symmetry
12728 % SZS status Timeout for RNG010-7.p
12730 17522: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12731 17522: Id : 3, {_}:
12732 add ?4 additive_identity =>= ?4
12733 [4] by right_additive_identity ?4
12734 17522: Id : 4, {_}:
12735 multiply additive_identity ?6 =>= additive_identity
12736 [6] by left_multiplicative_zero ?6
12737 17522: Id : 5, {_}:
12738 multiply ?8 additive_identity =>= additive_identity
12739 [8] by right_multiplicative_zero ?8
12740 17522: Id : 6, {_}:
12741 add (additive_inverse ?10) ?10 =>= additive_identity
12742 [10] by left_additive_inverse ?10
12743 17522: Id : 7, {_}:
12744 add ?12 (additive_inverse ?12) =>= additive_identity
12745 [12] by right_additive_inverse ?12
12746 17522: Id : 8, {_}:
12747 additive_inverse (additive_inverse ?14) =>= ?14
12748 [14] by additive_inverse_additive_inverse ?14
12749 17522: Id : 9, {_}:
12750 multiply ?16 (add ?17 ?18)
12752 add (multiply ?16 ?17) (multiply ?16 ?18)
12753 [18, 17, 16] by distribute1 ?16 ?17 ?18
12754 17522: Id : 10, {_}:
12755 multiply (add ?20 ?21) ?22
12757 add (multiply ?20 ?22) (multiply ?21 ?22)
12758 [22, 21, 20] by distribute2 ?20 ?21 ?22
12759 17522: Id : 11, {_}:
12760 add ?24 ?25 =<->= add ?25 ?24
12761 [25, 24] by commutativity_for_addition ?24 ?25
12762 17522: Id : 12, {_}:
12763 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
12764 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
12765 17522: Id : 13, {_}:
12766 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
12767 [32, 31] by right_alternative ?31 ?32
12768 17522: Id : 14, {_}:
12769 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
12770 [35, 34] by left_alternative ?34 ?35
12771 17522: Id : 15, {_}:
12772 associator ?37 ?38 ?39
12774 add (multiply (multiply ?37 ?38) ?39)
12775 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
12776 [39, 38, 37] by associator ?37 ?38 ?39
12777 17522: Id : 16, {_}:
12780 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
12781 [42, 41] by commutator ?41 ?42
12783 17522: Id : 1, {_}:
12784 associator x y (add u v)
12786 add (associator x y u) (associator x y v)
12787 [] by prove_linearised_form1
12788 % SZS status Timeout for RNG019-6.p
12790 17554: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12791 17554: Id : 3, {_}:
12792 add ?4 additive_identity =>= ?4
12793 [4] by right_additive_identity ?4
12794 17554: Id : 4, {_}:
12795 multiply additive_identity ?6 =>= additive_identity
12796 [6] by left_multiplicative_zero ?6
12797 17554: Id : 5, {_}:
12798 multiply ?8 additive_identity =>= additive_identity
12799 [8] by right_multiplicative_zero ?8
12800 17554: Id : 6, {_}:
12801 add (additive_inverse ?10) ?10 =>= additive_identity
12802 [10] by left_additive_inverse ?10
12803 17554: Id : 7, {_}:
12804 add ?12 (additive_inverse ?12) =>= additive_identity
12805 [12] by right_additive_inverse ?12
12806 17554: Id : 8, {_}:
12807 additive_inverse (additive_inverse ?14) =>= ?14
12808 [14] by additive_inverse_additive_inverse ?14
12809 17554: Id : 9, {_}:
12810 multiply ?16 (add ?17 ?18)
12812 add (multiply ?16 ?17) (multiply ?16 ?18)
12813 [18, 17, 16] by distribute1 ?16 ?17 ?18
12814 17554: Id : 10, {_}:
12815 multiply (add ?20 ?21) ?22
12817 add (multiply ?20 ?22) (multiply ?21 ?22)
12818 [22, 21, 20] by distribute2 ?20 ?21 ?22
12819 17554: Id : 11, {_}:
12820 add ?24 ?25 =<->= add ?25 ?24
12821 [25, 24] by commutativity_for_addition ?24 ?25
12822 17554: Id : 12, {_}:
12823 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
12824 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
12825 17554: Id : 13, {_}:
12826 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
12827 [32, 31] by right_alternative ?31 ?32
12828 17554: Id : 14, {_}:
12829 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
12830 [35, 34] by left_alternative ?34 ?35
12831 17554: Id : 15, {_}:
12832 associator ?37 ?38 ?39
12834 add (multiply (multiply ?37 ?38) ?39)
12835 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
12836 [39, 38, 37] by associator ?37 ?38 ?39
12837 17554: Id : 16, {_}:
12840 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
12841 [42, 41] by commutator ?41 ?42
12842 17554: Id : 17, {_}:
12843 multiply (additive_inverse ?44) (additive_inverse ?45)
12846 [45, 44] by product_of_inverses ?44 ?45
12847 17554: Id : 18, {_}:
12848 multiply (additive_inverse ?47) ?48
12850 additive_inverse (multiply ?47 ?48)
12851 [48, 47] by inverse_product1 ?47 ?48
12852 17554: Id : 19, {_}:
12853 multiply ?50 (additive_inverse ?51)
12855 additive_inverse (multiply ?50 ?51)
12856 [51, 50] by inverse_product2 ?50 ?51
12857 17554: Id : 20, {_}:
12858 multiply ?53 (add ?54 (additive_inverse ?55))
12860 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
12861 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
12862 17554: Id : 21, {_}:
12863 multiply (add ?57 (additive_inverse ?58)) ?59
12865 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
12866 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
12867 17554: Id : 22, {_}:
12868 multiply (additive_inverse ?61) (add ?62 ?63)
12870 add (additive_inverse (multiply ?61 ?62))
12871 (additive_inverse (multiply ?61 ?63))
12872 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
12873 17554: Id : 23, {_}:
12874 multiply (add ?65 ?66) (additive_inverse ?67)
12876 add (additive_inverse (multiply ?65 ?67))
12877 (additive_inverse (multiply ?66 ?67))
12878 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
12880 17554: Id : 1, {_}:
12881 associator x y (add u v)
12883 add (associator x y u) (associator x y v)
12884 [] by prove_linearised_form1
12885 % SZS status Timeout for RNG019-7.p
12887 17590: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12888 17590: Id : 3, {_}:
12889 add ?4 additive_identity =>= ?4
12890 [4] by right_additive_identity ?4
12891 17590: Id : 4, {_}:
12892 multiply additive_identity ?6 =>= additive_identity
12893 [6] by left_multiplicative_zero ?6
12894 17590: Id : 5, {_}:
12895 multiply ?8 additive_identity =>= additive_identity
12896 [8] by right_multiplicative_zero ?8
12897 17590: Id : 6, {_}:
12898 add (additive_inverse ?10) ?10 =>= additive_identity
12899 [10] by left_additive_inverse ?10
12900 17590: Id : 7, {_}:
12901 add ?12 (additive_inverse ?12) =>= additive_identity
12902 [12] by right_additive_inverse ?12
12903 17590: Id : 8, {_}:
12904 additive_inverse (additive_inverse ?14) =>= ?14
12905 [14] by additive_inverse_additive_inverse ?14
12906 17590: Id : 9, {_}:
12907 multiply ?16 (add ?17 ?18)
12909 add (multiply ?16 ?17) (multiply ?16 ?18)
12910 [18, 17, 16] by distribute1 ?16 ?17 ?18
12911 17590: Id : 10, {_}:
12912 multiply (add ?20 ?21) ?22
12914 add (multiply ?20 ?22) (multiply ?21 ?22)
12915 [22, 21, 20] by distribute2 ?20 ?21 ?22
12916 17590: Id : 11, {_}:
12917 add ?24 ?25 =<->= add ?25 ?24
12918 [25, 24] by commutativity_for_addition ?24 ?25
12919 17590: Id : 12, {_}:
12920 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
12921 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
12922 17590: Id : 13, {_}:
12923 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
12924 [32, 31] by right_alternative ?31 ?32
12925 17590: Id : 14, {_}:
12926 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
12927 [35, 34] by left_alternative ?34 ?35
12928 17590: Id : 15, {_}:
12929 associator ?37 ?38 ?39
12931 add (multiply (multiply ?37 ?38) ?39)
12932 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
12933 [39, 38, 37] by associator ?37 ?38 ?39
12934 17590: Id : 16, {_}:
12937 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
12938 [42, 41] by commutator ?41 ?42
12940 17590: Id : 1, {_}:
12941 associator x (add u v) y
12943 add (associator x u y) (associator x v y)
12944 [] by prove_linearised_form2
12945 % SZS status Timeout for RNG020-6.p
12947 17621: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
12948 17621: Id : 3, {_}:
12949 add ?4 additive_identity =>= ?4
12950 [4] by right_additive_identity ?4
12951 17621: Id : 4, {_}:
12952 multiply additive_identity ?6 =>= additive_identity
12953 [6] by left_multiplicative_zero ?6
12954 17621: Id : 5, {_}:
12955 multiply ?8 additive_identity =>= additive_identity
12956 [8] by right_multiplicative_zero ?8
12957 17621: Id : 6, {_}:
12958 add (additive_inverse ?10) ?10 =>= additive_identity
12959 [10] by left_additive_inverse ?10
12960 17621: Id : 7, {_}:
12961 add ?12 (additive_inverse ?12) =>= additive_identity
12962 [12] by right_additive_inverse ?12
12963 17621: Id : 8, {_}:
12964 additive_inverse (additive_inverse ?14) =>= ?14
12965 [14] by additive_inverse_additive_inverse ?14
12966 17621: Id : 9, {_}:
12967 multiply ?16 (add ?17 ?18)
12969 add (multiply ?16 ?17) (multiply ?16 ?18)
12970 [18, 17, 16] by distribute1 ?16 ?17 ?18
12971 17621: Id : 10, {_}:
12972 multiply (add ?20 ?21) ?22
12974 add (multiply ?20 ?22) (multiply ?21 ?22)
12975 [22, 21, 20] by distribute2 ?20 ?21 ?22
12976 17621: Id : 11, {_}:
12977 add ?24 ?25 =<->= add ?25 ?24
12978 [25, 24] by commutativity_for_addition ?24 ?25
12979 17621: Id : 12, {_}:
12980 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
12981 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
12982 17621: Id : 13, {_}:
12983 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
12984 [32, 31] by right_alternative ?31 ?32
12985 17621: Id : 14, {_}:
12986 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
12987 [35, 34] by left_alternative ?34 ?35
12988 17621: Id : 15, {_}:
12989 associator ?37 ?38 ?39
12991 add (multiply (multiply ?37 ?38) ?39)
12992 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
12993 [39, 38, 37] by associator ?37 ?38 ?39
12994 17621: Id : 16, {_}:
12997 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
12998 [42, 41] by commutator ?41 ?42
12999 17621: Id : 17, {_}:
13000 multiply (additive_inverse ?44) (additive_inverse ?45)
13003 [45, 44] by product_of_inverses ?44 ?45
13004 17621: Id : 18, {_}:
13005 multiply (additive_inverse ?47) ?48
13007 additive_inverse (multiply ?47 ?48)
13008 [48, 47] by inverse_product1 ?47 ?48
13009 17621: Id : 19, {_}:
13010 multiply ?50 (additive_inverse ?51)
13012 additive_inverse (multiply ?50 ?51)
13013 [51, 50] by inverse_product2 ?50 ?51
13014 17621: Id : 20, {_}:
13015 multiply ?53 (add ?54 (additive_inverse ?55))
13017 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
13018 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
13019 17621: Id : 21, {_}:
13020 multiply (add ?57 (additive_inverse ?58)) ?59
13022 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
13023 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
13024 17621: Id : 22, {_}:
13025 multiply (additive_inverse ?61) (add ?62 ?63)
13027 add (additive_inverse (multiply ?61 ?62))
13028 (additive_inverse (multiply ?61 ?63))
13029 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
13030 17621: Id : 23, {_}:
13031 multiply (add ?65 ?66) (additive_inverse ?67)
13033 add (additive_inverse (multiply ?65 ?67))
13034 (additive_inverse (multiply ?66 ?67))
13035 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
13037 17621: Id : 1, {_}:
13038 associator x (add u v) y
13040 add (associator x u y) (associator x v y)
13041 [] by prove_linearised_form2
13042 % SZS status Timeout for RNG020-7.p
13044 17640: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13045 17640: Id : 3, {_}:
13046 add ?4 additive_identity =>= ?4
13047 [4] by right_additive_identity ?4
13048 17640: Id : 4, {_}:
13049 multiply additive_identity ?6 =>= additive_identity
13050 [6] by left_multiplicative_zero ?6
13051 17640: Id : 5, {_}:
13052 multiply ?8 additive_identity =>= additive_identity
13053 [8] by right_multiplicative_zero ?8
13054 17640: Id : 6, {_}:
13055 add (additive_inverse ?10) ?10 =>= additive_identity
13056 [10] by left_additive_inverse ?10
13057 17640: Id : 7, {_}:
13058 add ?12 (additive_inverse ?12) =>= additive_identity
13059 [12] by right_additive_inverse ?12
13060 17640: Id : 8, {_}:
13061 additive_inverse (additive_inverse ?14) =>= ?14
13062 [14] by additive_inverse_additive_inverse ?14
13063 17640: Id : 9, {_}:
13064 multiply ?16 (add ?17 ?18)
13066 add (multiply ?16 ?17) (multiply ?16 ?18)
13067 [18, 17, 16] by distribute1 ?16 ?17 ?18
13068 17640: Id : 10, {_}:
13069 multiply (add ?20 ?21) ?22
13071 add (multiply ?20 ?22) (multiply ?21 ?22)
13072 [22, 21, 20] by distribute2 ?20 ?21 ?22
13073 17640: Id : 11, {_}:
13074 add ?24 ?25 =<->= add ?25 ?24
13075 [25, 24] by commutativity_for_addition ?24 ?25
13076 17640: Id : 12, {_}:
13077 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13078 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13079 17640: Id : 13, {_}:
13080 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13081 [32, 31] by right_alternative ?31 ?32
13082 17640: Id : 14, {_}:
13083 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13084 [35, 34] by left_alternative ?34 ?35
13085 17640: Id : 15, {_}:
13086 associator ?37 ?38 ?39
13088 add (multiply (multiply ?37 ?38) ?39)
13089 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13090 [39, 38, 37] by associator ?37 ?38 ?39
13091 17640: Id : 16, {_}:
13094 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13095 [42, 41] by commutator ?41 ?42
13097 17640: Id : 1, {_}:
13098 associator (add u v) x y
13100 add (associator u x y) (associator v x y)
13101 [] by prove_linearised_form3
13102 % SZS status Timeout for RNG021-6.p
13104 17670: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13105 17670: Id : 3, {_}:
13106 add ?4 additive_identity =>= ?4
13107 [4] by right_additive_identity ?4
13108 17670: Id : 4, {_}:
13109 multiply additive_identity ?6 =>= additive_identity
13110 [6] by left_multiplicative_zero ?6
13111 17670: Id : 5, {_}:
13112 multiply ?8 additive_identity =>= additive_identity
13113 [8] by right_multiplicative_zero ?8
13114 17670: Id : 6, {_}:
13115 add (additive_inverse ?10) ?10 =>= additive_identity
13116 [10] by left_additive_inverse ?10
13117 17670: Id : 7, {_}:
13118 add ?12 (additive_inverse ?12) =>= additive_identity
13119 [12] by right_additive_inverse ?12
13120 17670: Id : 8, {_}:
13121 additive_inverse (additive_inverse ?14) =>= ?14
13122 [14] by additive_inverse_additive_inverse ?14
13123 17670: Id : 9, {_}:
13124 multiply ?16 (add ?17 ?18)
13126 add (multiply ?16 ?17) (multiply ?16 ?18)
13127 [18, 17, 16] by distribute1 ?16 ?17 ?18
13128 17670: Id : 10, {_}:
13129 multiply (add ?20 ?21) ?22
13131 add (multiply ?20 ?22) (multiply ?21 ?22)
13132 [22, 21, 20] by distribute2 ?20 ?21 ?22
13133 17670: Id : 11, {_}:
13134 add ?24 ?25 =<->= add ?25 ?24
13135 [25, 24] by commutativity_for_addition ?24 ?25
13136 17670: Id : 12, {_}:
13137 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13138 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13139 17670: Id : 13, {_}:
13140 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13141 [32, 31] by right_alternative ?31 ?32
13142 17670: Id : 14, {_}:
13143 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13144 [35, 34] by left_alternative ?34 ?35
13145 17670: Id : 15, {_}:
13146 associator ?37 ?38 ?39
13148 add (multiply (multiply ?37 ?38) ?39)
13149 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13150 [39, 38, 37] by associator ?37 ?38 ?39
13151 17670: Id : 16, {_}:
13154 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13155 [42, 41] by commutator ?41 ?42
13156 17670: Id : 17, {_}:
13157 multiply (additive_inverse ?44) (additive_inverse ?45)
13160 [45, 44] by product_of_inverses ?44 ?45
13161 17670: Id : 18, {_}:
13162 multiply (additive_inverse ?47) ?48
13164 additive_inverse (multiply ?47 ?48)
13165 [48, 47] by inverse_product1 ?47 ?48
13166 17670: Id : 19, {_}:
13167 multiply ?50 (additive_inverse ?51)
13169 additive_inverse (multiply ?50 ?51)
13170 [51, 50] by inverse_product2 ?50 ?51
13171 17670: Id : 20, {_}:
13172 multiply ?53 (add ?54 (additive_inverse ?55))
13174 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
13175 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
13176 17670: Id : 21, {_}:
13177 multiply (add ?57 (additive_inverse ?58)) ?59
13179 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
13180 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
13181 17670: Id : 22, {_}:
13182 multiply (additive_inverse ?61) (add ?62 ?63)
13184 add (additive_inverse (multiply ?61 ?62))
13185 (additive_inverse (multiply ?61 ?63))
13186 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
13187 17670: Id : 23, {_}:
13188 multiply (add ?65 ?66) (additive_inverse ?67)
13190 add (additive_inverse (multiply ?65 ?67))
13191 (additive_inverse (multiply ?66 ?67))
13192 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
13194 17670: Id : 1, {_}:
13195 associator (add u v) x y
13197 add (associator u x y) (associator v x y)
13198 [] by prove_linearised_form3
13199 % SZS status Timeout for RNG021-7.p
13201 17693: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13202 17693: Id : 3, {_}:
13203 add ?4 additive_identity =>= ?4
13204 [4] by right_additive_identity ?4
13205 17693: Id : 4, {_}:
13206 multiply additive_identity ?6 =>= additive_identity
13207 [6] by left_multiplicative_zero ?6
13208 17693: Id : 5, {_}:
13209 multiply ?8 additive_identity =>= additive_identity
13210 [8] by right_multiplicative_zero ?8
13211 17693: Id : 6, {_}:
13212 add (additive_inverse ?10) ?10 =>= additive_identity
13213 [10] by left_additive_inverse ?10
13214 17693: Id : 7, {_}:
13215 add ?12 (additive_inverse ?12) =>= additive_identity
13216 [12] by right_additive_inverse ?12
13217 17693: Id : 8, {_}:
13218 additive_inverse (additive_inverse ?14) =>= ?14
13219 [14] by additive_inverse_additive_inverse ?14
13220 17693: Id : 9, {_}:
13221 multiply ?16 (add ?17 ?18)
13223 add (multiply ?16 ?17) (multiply ?16 ?18)
13224 [18, 17, 16] by distribute1 ?16 ?17 ?18
13225 17693: Id : 10, {_}:
13226 multiply (add ?20 ?21) ?22
13228 add (multiply ?20 ?22) (multiply ?21 ?22)
13229 [22, 21, 20] by distribute2 ?20 ?21 ?22
13230 17693: Id : 11, {_}:
13231 add ?24 ?25 =<->= add ?25 ?24
13232 [25, 24] by commutativity_for_addition ?24 ?25
13233 17693: Id : 12, {_}:
13234 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13235 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13236 17693: Id : 13, {_}:
13237 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13238 [32, 31] by right_alternative ?31 ?32
13239 17693: Id : 14, {_}:
13240 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13241 [35, 34] by left_alternative ?34 ?35
13242 17693: Id : 15, {_}:
13243 associator ?37 ?38 ?39
13245 add (multiply (multiply ?37 ?38) ?39)
13246 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13247 [39, 38, 37] by associator ?37 ?38 ?39
13248 17693: Id : 16, {_}:
13251 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13252 [42, 41] by commutator ?41 ?42
13254 17693: Id : 1, {_}:
13255 add (associator x y z) (associator x z y) =>= additive_identity
13256 [] by prove_equation
13257 % SZS status Timeout for RNG025-4.p
13259 17723: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13260 17723: Id : 3, {_}:
13261 add ?4 additive_identity =>= ?4
13262 [4] by right_additive_identity ?4
13263 17723: Id : 4, {_}:
13264 multiply additive_identity ?6 =>= additive_identity
13265 [6] by left_multiplicative_zero ?6
13266 17723: Id : 5, {_}:
13267 multiply ?8 additive_identity =>= additive_identity
13268 [8] by right_multiplicative_zero ?8
13269 17723: Id : 6, {_}:
13270 add (additive_inverse ?10) ?10 =>= additive_identity
13271 [10] by left_additive_inverse ?10
13272 17723: Id : 7, {_}:
13273 add ?12 (additive_inverse ?12) =>= additive_identity
13274 [12] by right_additive_inverse ?12
13275 17723: Id : 8, {_}:
13276 additive_inverse (additive_inverse ?14) =>= ?14
13277 [14] by additive_inverse_additive_inverse ?14
13278 17723: Id : 9, {_}:
13279 multiply ?16 (add ?17 ?18)
13281 add (multiply ?16 ?17) (multiply ?16 ?18)
13282 [18, 17, 16] by distribute1 ?16 ?17 ?18
13283 17723: Id : 10, {_}:
13284 multiply (add ?20 ?21) ?22
13286 add (multiply ?20 ?22) (multiply ?21 ?22)
13287 [22, 21, 20] by distribute2 ?20 ?21 ?22
13288 17723: Id : 11, {_}:
13289 add ?24 ?25 =<->= add ?25 ?24
13290 [25, 24] by commutativity_for_addition ?24 ?25
13291 17723: Id : 12, {_}:
13292 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13293 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13294 17723: Id : 13, {_}:
13295 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13296 [32, 31] by right_alternative ?31 ?32
13297 17723: Id : 14, {_}:
13298 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13299 [35, 34] by left_alternative ?34 ?35
13300 17723: Id : 15, {_}:
13301 associator ?37 ?38 ?39
13303 add (multiply (multiply ?37 ?38) ?39)
13304 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13305 [39, 38, 37] by associator ?37 ?38 ?39
13306 17723: Id : 16, {_}:
13309 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13310 [42, 41] by commutator ?41 ?42
13311 17723: Id : 17, {_}:
13312 multiply (additive_inverse ?44) (additive_inverse ?45)
13315 [45, 44] by product_of_inverses ?44 ?45
13316 17723: Id : 18, {_}:
13317 multiply (additive_inverse ?47) ?48
13319 additive_inverse (multiply ?47 ?48)
13320 [48, 47] by inverse_product1 ?47 ?48
13321 17723: Id : 19, {_}:
13322 multiply ?50 (additive_inverse ?51)
13324 additive_inverse (multiply ?50 ?51)
13325 [51, 50] by inverse_product2 ?50 ?51
13326 17723: Id : 20, {_}:
13327 multiply ?53 (add ?54 (additive_inverse ?55))
13329 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
13330 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
13331 17723: Id : 21, {_}:
13332 multiply (add ?57 (additive_inverse ?58)) ?59
13334 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
13335 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
13336 17723: Id : 22, {_}:
13337 multiply (additive_inverse ?61) (add ?62 ?63)
13339 add (additive_inverse (multiply ?61 ?62))
13340 (additive_inverse (multiply ?61 ?63))
13341 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
13342 17723: Id : 23, {_}:
13343 multiply (add ?65 ?66) (additive_inverse ?67)
13345 add (additive_inverse (multiply ?65 ?67))
13346 (additive_inverse (multiply ?66 ?67))
13347 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
13349 17723: Id : 1, {_}:
13350 add (associator x y z) (associator x z y) =>= additive_identity
13351 [] by prove_equation
13352 % SZS status Timeout for RNG025-5.p
13354 17787: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13355 17787: Id : 3, {_}:
13356 add ?4 additive_identity =>= ?4
13357 [4] by right_additive_identity ?4
13358 17787: Id : 4, {_}:
13359 multiply additive_identity ?6 =>= additive_identity
13360 [6] by left_multiplicative_zero ?6
13361 17787: Id : 5, {_}:
13362 multiply ?8 additive_identity =>= additive_identity
13363 [8] by right_multiplicative_zero ?8
13364 17787: Id : 6, {_}:
13365 add (additive_inverse ?10) ?10 =>= additive_identity
13366 [10] by left_additive_inverse ?10
13367 17787: Id : 7, {_}:
13368 add ?12 (additive_inverse ?12) =>= additive_identity
13369 [12] by right_additive_inverse ?12
13370 17787: Id : 8, {_}:
13371 additive_inverse (additive_inverse ?14) =>= ?14
13372 [14] by additive_inverse_additive_inverse ?14
13373 17787: Id : 9, {_}:
13374 multiply ?16 (add ?17 ?18)
13376 add (multiply ?16 ?17) (multiply ?16 ?18)
13377 [18, 17, 16] by distribute1 ?16 ?17 ?18
13378 17787: Id : 10, {_}:
13379 multiply (add ?20 ?21) ?22
13381 add (multiply ?20 ?22) (multiply ?21 ?22)
13382 [22, 21, 20] by distribute2 ?20 ?21 ?22
13383 17787: Id : 11, {_}:
13384 add ?24 ?25 =<->= add ?25 ?24
13385 [25, 24] by commutativity_for_addition ?24 ?25
13386 17787: Id : 12, {_}:
13387 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13388 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13389 17787: Id : 13, {_}:
13390 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13391 [32, 31] by right_alternative ?31 ?32
13392 17787: Id : 14, {_}:
13393 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13394 [35, 34] by left_alternative ?34 ?35
13395 17787: Id : 15, {_}:
13396 associator ?37 ?38 ?39
13398 add (multiply (multiply ?37 ?38) ?39)
13399 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13400 [39, 38, 37] by associator ?37 ?38 ?39
13401 17787: Id : 16, {_}:
13404 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13405 [42, 41] by commutator ?41 ?42
13407 17787: Id : 1, {_}: associator x y x =>= additive_identity [] by prove_flexible_law
13408 % SZS status Timeout for RNG025-6.p
13410 17817: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13411 17817: Id : 3, {_}:
13412 add ?4 additive_identity =>= ?4
13413 [4] by right_additive_identity ?4
13414 17817: Id : 4, {_}:
13415 multiply additive_identity ?6 =>= additive_identity
13416 [6] by left_multiplicative_zero ?6
13417 17817: Id : 5, {_}:
13418 multiply ?8 additive_identity =>= additive_identity
13419 [8] by right_multiplicative_zero ?8
13420 17817: Id : 6, {_}:
13421 add (additive_inverse ?10) ?10 =>= additive_identity
13422 [10] by left_additive_inverse ?10
13423 17817: Id : 7, {_}:
13424 add ?12 (additive_inverse ?12) =>= additive_identity
13425 [12] by right_additive_inverse ?12
13426 17817: Id : 8, {_}:
13427 additive_inverse (additive_inverse ?14) =>= ?14
13428 [14] by additive_inverse_additive_inverse ?14
13429 17817: Id : 9, {_}:
13430 multiply ?16 (add ?17 ?18)
13432 add (multiply ?16 ?17) (multiply ?16 ?18)
13433 [18, 17, 16] by distribute1 ?16 ?17 ?18
13434 17817: Id : 10, {_}:
13435 multiply (add ?20 ?21) ?22
13437 add (multiply ?20 ?22) (multiply ?21 ?22)
13438 [22, 21, 20] by distribute2 ?20 ?21 ?22
13439 17817: Id : 11, {_}:
13440 add ?24 ?25 =<->= add ?25 ?24
13441 [25, 24] by commutativity_for_addition ?24 ?25
13442 17817: Id : 12, {_}:
13443 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13444 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13445 17817: Id : 13, {_}:
13446 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13447 [32, 31] by right_alternative ?31 ?32
13448 17817: Id : 14, {_}:
13449 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13450 [35, 34] by left_alternative ?34 ?35
13451 17817: Id : 15, {_}:
13452 associator ?37 ?38 ?39
13454 add (multiply (multiply ?37 ?38) ?39)
13455 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13456 [39, 38, 37] by associator ?37 ?38 ?39
13457 17817: Id : 16, {_}:
13460 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13461 [42, 41] by commutator ?41 ?42
13462 17817: Id : 17, {_}:
13463 multiply (additive_inverse ?44) (additive_inverse ?45)
13466 [45, 44] by product_of_inverses ?44 ?45
13467 17817: Id : 18, {_}:
13468 multiply (additive_inverse ?47) ?48
13470 additive_inverse (multiply ?47 ?48)
13471 [48, 47] by inverse_product1 ?47 ?48
13472 17817: Id : 19, {_}:
13473 multiply ?50 (additive_inverse ?51)
13475 additive_inverse (multiply ?50 ?51)
13476 [51, 50] by inverse_product2 ?50 ?51
13477 17817: Id : 20, {_}:
13478 multiply ?53 (add ?54 (additive_inverse ?55))
13480 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
13481 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
13482 17817: Id : 21, {_}:
13483 multiply (add ?57 (additive_inverse ?58)) ?59
13485 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
13486 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
13487 17817: Id : 22, {_}:
13488 multiply (additive_inverse ?61) (add ?62 ?63)
13490 add (additive_inverse (multiply ?61 ?62))
13491 (additive_inverse (multiply ?61 ?63))
13492 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
13493 17817: Id : 23, {_}:
13494 multiply (add ?65 ?66) (additive_inverse ?67)
13496 add (additive_inverse (multiply ?65 ?67))
13497 (additive_inverse (multiply ?66 ?67))
13498 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
13500 17817: Id : 1, {_}: associator x y x =>= additive_identity [] by prove_flexible_law
13501 % SZS status Timeout for RNG025-7.p
13503 17837: Id : 2, {_}:
13504 add ?2 ?3 =<->= add ?3 ?2
13505 [3, 2] by commutativity_for_addition ?2 ?3
13506 17837: Id : 3, {_}:
13507 add ?5 (add ?6 ?7) =?= add (add ?5 ?6) ?7
13508 [7, 6, 5] by associativity_for_addition ?5 ?6 ?7
13509 17837: Id : 4, {_}: add additive_identity ?9 =>= ?9 [9] by left_additive_identity ?9
13510 17837: Id : 5, {_}:
13511 add ?11 additive_identity =>= ?11
13512 [11] by right_additive_identity ?11
13513 17837: Id : 6, {_}:
13514 multiply additive_identity ?13 =>= additive_identity
13515 [13] by left_multiplicative_zero ?13
13516 17837: Id : 7, {_}:
13517 multiply ?15 additive_identity =>= additive_identity
13518 [15] by right_multiplicative_zero ?15
13519 17837: Id : 8, {_}:
13520 add (additive_inverse ?17) ?17 =>= additive_identity
13521 [17] by left_additive_inverse ?17
13522 17837: Id : 9, {_}:
13523 add ?19 (additive_inverse ?19) =>= additive_identity
13524 [19] by right_additive_inverse ?19
13525 17837: Id : 10, {_}:
13526 multiply ?21 (add ?22 ?23)
13528 add (multiply ?21 ?22) (multiply ?21 ?23)
13529 [23, 22, 21] by distribute1 ?21 ?22 ?23
13530 17837: Id : 11, {_}:
13531 multiply (add ?25 ?26) ?27
13533 add (multiply ?25 ?27) (multiply ?26 ?27)
13534 [27, 26, 25] by distribute2 ?25 ?26 ?27
13535 17837: Id : 12, {_}:
13536 additive_inverse (additive_inverse ?29) =>= ?29
13537 [29] by additive_inverse_additive_inverse ?29
13538 17837: Id : 13, {_}:
13539 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13540 [32, 31] by right_alternative ?31 ?32
13541 17837: Id : 14, {_}:
13542 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13543 [35, 34] by left_alternative ?34 ?35
13544 17837: Id : 15, {_}:
13545 associator ?37 ?38 (add ?39 ?40)
13547 add (associator ?37 ?38 ?39) (associator ?37 ?38 ?40)
13548 [40, 39, 38, 37] by linearised_associator1 ?37 ?38 ?39 ?40
13549 17837: Id : 16, {_}:
13550 associator ?42 (add ?43 ?44) ?45
13552 add (associator ?42 ?43 ?45) (associator ?42 ?44 ?45)
13553 [45, 44, 43, 42] by linearised_associator2 ?42 ?43 ?44 ?45
13554 17837: Id : 17, {_}:
13555 associator (add ?47 ?48) ?49 ?50
13557 add (associator ?47 ?49 ?50) (associator ?48 ?49 ?50)
13558 [50, 49, 48, 47] by linearised_associator3 ?47 ?48 ?49 ?50
13559 17837: Id : 18, {_}:
13562 add (multiply ?53 ?52) (additive_inverse (multiply ?52 ?53))
13563 [53, 52] by commutator ?52 ?53
13565 17837: Id : 1, {_}:
13566 add (associator a b c) (associator a c b) =>= additive_identity
13567 [] by prove_flexible_law
13568 % SZS status Timeout for RNG025-8.p
13570 17867: Id : 2, {_}:
13571 multiply (additive_inverse ?2) (additive_inverse ?3)
13574 [3, 2] by product_of_inverses ?2 ?3
13575 17867: Id : 3, {_}:
13576 multiply (additive_inverse ?5) ?6
13578 additive_inverse (multiply ?5 ?6)
13579 [6, 5] by inverse_product1 ?5 ?6
13580 17867: Id : 4, {_}:
13581 multiply ?8 (additive_inverse ?9)
13583 additive_inverse (multiply ?8 ?9)
13584 [9, 8] by inverse_product2 ?8 ?9
13585 17867: Id : 5, {_}:
13586 multiply ?11 (add ?12 (additive_inverse ?13))
13588 add (multiply ?11 ?12) (additive_inverse (multiply ?11 ?13))
13589 [13, 12, 11] by distributivity_of_difference1 ?11 ?12 ?13
13590 17867: Id : 6, {_}:
13591 multiply (add ?15 (additive_inverse ?16)) ?17
13593 add (multiply ?15 ?17) (additive_inverse (multiply ?16 ?17))
13594 [17, 16, 15] by distributivity_of_difference2 ?15 ?16 ?17
13595 17867: Id : 7, {_}:
13596 multiply (additive_inverse ?19) (add ?20 ?21)
13598 add (additive_inverse (multiply ?19 ?20))
13599 (additive_inverse (multiply ?19 ?21))
13600 [21, 20, 19] by distributivity_of_difference3 ?19 ?20 ?21
13601 17867: Id : 8, {_}:
13602 multiply (add ?23 ?24) (additive_inverse ?25)
13604 add (additive_inverse (multiply ?23 ?25))
13605 (additive_inverse (multiply ?24 ?25))
13606 [25, 24, 23] by distributivity_of_difference4 ?23 ?24 ?25
13607 17867: Id : 9, {_}:
13608 add ?27 ?28 =<->= add ?28 ?27
13609 [28, 27] by commutativity_for_addition ?27 ?28
13610 17867: Id : 10, {_}:
13611 add ?30 (add ?31 ?32) =?= add (add ?30 ?31) ?32
13612 [32, 31, 30] by associativity_for_addition ?30 ?31 ?32
13613 17867: Id : 11, {_}:
13614 add additive_identity ?34 =>= ?34
13615 [34] by left_additive_identity ?34
13616 17867: Id : 12, {_}:
13617 add ?36 additive_identity =>= ?36
13618 [36] by right_additive_identity ?36
13619 17867: Id : 13, {_}:
13620 multiply additive_identity ?38 =>= additive_identity
13621 [38] by left_multiplicative_zero ?38
13622 17867: Id : 14, {_}:
13623 multiply ?40 additive_identity =>= additive_identity
13624 [40] by right_multiplicative_zero ?40
13625 17867: Id : 15, {_}:
13626 add (additive_inverse ?42) ?42 =>= additive_identity
13627 [42] by left_additive_inverse ?42
13628 17867: Id : 16, {_}:
13629 add ?44 (additive_inverse ?44) =>= additive_identity
13630 [44] by right_additive_inverse ?44
13631 17867: Id : 17, {_}:
13632 multiply ?46 (add ?47 ?48)
13634 add (multiply ?46 ?47) (multiply ?46 ?48)
13635 [48, 47, 46] by distribute1 ?46 ?47 ?48
13636 17867: Id : 18, {_}:
13637 multiply (add ?50 ?51) ?52
13639 add (multiply ?50 ?52) (multiply ?51 ?52)
13640 [52, 51, 50] by distribute2 ?50 ?51 ?52
13641 17867: Id : 19, {_}:
13642 additive_inverse (additive_inverse ?54) =>= ?54
13643 [54] by additive_inverse_additive_inverse ?54
13644 17867: Id : 20, {_}:
13645 multiply (multiply ?56 ?57) ?57 =?= multiply ?56 (multiply ?57 ?57)
13646 [57, 56] by right_alternative ?56 ?57
13647 17867: Id : 21, {_}:
13648 multiply (multiply ?59 ?59) ?60 =?= multiply ?59 (multiply ?59 ?60)
13649 [60, 59] by left_alternative ?59 ?60
13650 17867: Id : 22, {_}:
13651 associator ?62 ?63 (add ?64 ?65)
13653 add (associator ?62 ?63 ?64) (associator ?62 ?63 ?65)
13654 [65, 64, 63, 62] by linearised_associator1 ?62 ?63 ?64 ?65
13655 17867: Id : 23, {_}:
13656 associator ?67 (add ?68 ?69) ?70
13658 add (associator ?67 ?68 ?70) (associator ?67 ?69 ?70)
13659 [70, 69, 68, 67] by linearised_associator2 ?67 ?68 ?69 ?70
13660 17867: Id : 24, {_}:
13661 associator (add ?72 ?73) ?74 ?75
13663 add (associator ?72 ?74 ?75) (associator ?73 ?74 ?75)
13664 [75, 74, 73, 72] by linearised_associator3 ?72 ?73 ?74 ?75
13665 17867: Id : 25, {_}:
13668 add (multiply ?78 ?77) (additive_inverse (multiply ?77 ?78))
13669 [78, 77] by commutator ?77 ?78
13671 17867: Id : 1, {_}:
13672 add (associator a b c) (associator a c b) =>= additive_identity
13673 [] by prove_flexible_law
13674 % SZS status Timeout for RNG025-9.p
13676 17887: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13677 17887: Id : 3, {_}:
13678 add ?4 additive_identity =>= ?4
13679 [4] by right_additive_identity ?4
13680 17887: Id : 4, {_}:
13681 multiply additive_identity ?6 =>= additive_identity
13682 [6] by left_multiplicative_zero ?6
13683 17887: Id : 5, {_}:
13684 multiply ?8 additive_identity =>= additive_identity
13685 [8] by right_multiplicative_zero ?8
13686 17887: Id : 6, {_}:
13687 add (additive_inverse ?10) ?10 =>= additive_identity
13688 [10] by left_additive_inverse ?10
13689 17887: Id : 7, {_}:
13690 add ?12 (additive_inverse ?12) =>= additive_identity
13691 [12] by right_additive_inverse ?12
13692 17887: Id : 8, {_}:
13693 additive_inverse (additive_inverse ?14) =>= ?14
13694 [14] by additive_inverse_additive_inverse ?14
13695 17887: Id : 9, {_}:
13696 multiply ?16 (add ?17 ?18)
13698 add (multiply ?16 ?17) (multiply ?16 ?18)
13699 [18, 17, 16] by distribute1 ?16 ?17 ?18
13700 17887: Id : 10, {_}:
13701 multiply (add ?20 ?21) ?22
13703 add (multiply ?20 ?22) (multiply ?21 ?22)
13704 [22, 21, 20] by distribute2 ?20 ?21 ?22
13705 17887: Id : 11, {_}:
13706 add ?24 ?25 =<->= add ?25 ?24
13707 [25, 24] by commutativity_for_addition ?24 ?25
13708 17887: Id : 12, {_}:
13709 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13710 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13711 17887: Id : 13, {_}:
13712 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13713 [32, 31] by right_alternative ?31 ?32
13714 17887: Id : 14, {_}:
13715 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13716 [35, 34] by left_alternative ?34 ?35
13717 17887: Id : 15, {_}:
13718 associator ?37 ?38 ?39
13720 add (multiply (multiply ?37 ?38) ?39)
13721 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13722 [39, 38, 37] by associator ?37 ?38 ?39
13723 17887: Id : 16, {_}:
13726 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13727 [42, 41] by commutator ?41 ?42
13729 17887: Id : 1, {_}:
13731 (add (associator (multiply a b) c d)
13732 (associator a b (multiply c d)))
13735 (add (associator a (multiply b c) d)
13736 (multiply a (associator b c d)))
13737 (multiply (associator a b c) d)))
13740 [] by prove_teichmuller_identity
13741 % SZS status Timeout for RNG026-6.p
13743 17917: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13744 17917: Id : 3, {_}:
13745 add ?4 additive_identity =>= ?4
13746 [4] by right_additive_identity ?4
13747 17917: Id : 4, {_}:
13748 multiply additive_identity ?6 =>= additive_identity
13749 [6] by left_multiplicative_zero ?6
13750 17917: Id : 5, {_}:
13751 multiply ?8 additive_identity =>= additive_identity
13752 [8] by right_multiplicative_zero ?8
13753 17917: Id : 6, {_}:
13754 add (additive_inverse ?10) ?10 =>= additive_identity
13755 [10] by left_additive_inverse ?10
13756 17917: Id : 7, {_}:
13757 add ?12 (additive_inverse ?12) =>= additive_identity
13758 [12] by right_additive_inverse ?12
13759 17917: Id : 8, {_}:
13760 additive_inverse (additive_inverse ?14) =>= ?14
13761 [14] by additive_inverse_additive_inverse ?14
13762 17917: Id : 9, {_}:
13763 multiply ?16 (add ?17 ?18)
13765 add (multiply ?16 ?17) (multiply ?16 ?18)
13766 [18, 17, 16] by distribute1 ?16 ?17 ?18
13767 17917: Id : 10, {_}:
13768 multiply (add ?20 ?21) ?22
13770 add (multiply ?20 ?22) (multiply ?21 ?22)
13771 [22, 21, 20] by distribute2 ?20 ?21 ?22
13772 17917: Id : 11, {_}:
13773 add ?24 ?25 =<->= add ?25 ?24
13774 [25, 24] by commutativity_for_addition ?24 ?25
13775 17917: Id : 12, {_}:
13776 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13777 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13778 17917: Id : 13, {_}:
13779 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13780 [32, 31] by right_alternative ?31 ?32
13781 17917: Id : 14, {_}:
13782 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13783 [35, 34] by left_alternative ?34 ?35
13784 17917: Id : 15, {_}:
13785 associator ?37 ?38 ?39
13787 add (multiply (multiply ?37 ?38) ?39)
13788 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13789 [39, 38, 37] by associator ?37 ?38 ?39
13790 17917: Id : 16, {_}:
13793 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13794 [42, 41] by commutator ?41 ?42
13795 17917: Id : 17, {_}:
13796 multiply (additive_inverse ?44) (additive_inverse ?45)
13799 [45, 44] by product_of_inverses ?44 ?45
13800 17917: Id : 18, {_}:
13801 multiply (additive_inverse ?47) ?48
13803 additive_inverse (multiply ?47 ?48)
13804 [48, 47] by inverse_product1 ?47 ?48
13805 17917: Id : 19, {_}:
13806 multiply ?50 (additive_inverse ?51)
13808 additive_inverse (multiply ?50 ?51)
13809 [51, 50] by inverse_product2 ?50 ?51
13810 17917: Id : 20, {_}:
13811 multiply ?53 (add ?54 (additive_inverse ?55))
13813 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
13814 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
13815 17917: Id : 21, {_}:
13816 multiply (add ?57 (additive_inverse ?58)) ?59
13818 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
13819 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
13820 17917: Id : 22, {_}:
13821 multiply (additive_inverse ?61) (add ?62 ?63)
13823 add (additive_inverse (multiply ?61 ?62))
13824 (additive_inverse (multiply ?61 ?63))
13825 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
13826 17917: Id : 23, {_}:
13827 multiply (add ?65 ?66) (additive_inverse ?67)
13829 add (additive_inverse (multiply ?65 ?67))
13830 (additive_inverse (multiply ?66 ?67))
13831 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
13833 17917: Id : 1, {_}:
13835 (add (associator (multiply a b) c d)
13836 (associator a b (multiply c d)))
13839 (add (associator a (multiply b c) d)
13840 (multiply a (associator b c d)))
13841 (multiply (associator a b c) d)))
13844 [] by prove_teichmuller_identity
13845 % SZS status Timeout for RNG026-7.p
13847 17937: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13848 17937: Id : 3, {_}:
13849 add ?4 additive_identity =>= ?4
13850 [4] by right_additive_identity ?4
13851 17937: Id : 4, {_}:
13852 multiply additive_identity ?6 =>= additive_identity
13853 [6] by left_multiplicative_zero ?6
13854 17937: Id : 5, {_}:
13855 multiply ?8 additive_identity =>= additive_identity
13856 [8] by right_multiplicative_zero ?8
13857 17937: Id : 6, {_}:
13858 add (additive_inverse ?10) ?10 =>= additive_identity
13859 [10] by left_additive_inverse ?10
13860 17937: Id : 7, {_}:
13861 add ?12 (additive_inverse ?12) =>= additive_identity
13862 [12] by right_additive_inverse ?12
13863 17937: Id : 8, {_}:
13864 additive_inverse (additive_inverse ?14) =>= ?14
13865 [14] by additive_inverse_additive_inverse ?14
13866 17937: Id : 9, {_}:
13867 multiply ?16 (add ?17 ?18)
13869 add (multiply ?16 ?17) (multiply ?16 ?18)
13870 [18, 17, 16] by distribute1 ?16 ?17 ?18
13871 17937: Id : 10, {_}:
13872 multiply (add ?20 ?21) ?22
13874 add (multiply ?20 ?22) (multiply ?21 ?22)
13875 [22, 21, 20] by distribute2 ?20 ?21 ?22
13876 17937: Id : 11, {_}:
13877 add ?24 ?25 =<->= add ?25 ?24
13878 [25, 24] by commutativity_for_addition ?24 ?25
13879 17937: Id : 12, {_}:
13880 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13881 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13882 17937: Id : 13, {_}:
13883 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13884 [32, 31] by right_alternative ?31 ?32
13885 17937: Id : 14, {_}:
13886 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13887 [35, 34] by left_alternative ?34 ?35
13888 17937: Id : 15, {_}:
13889 associator ?37 ?38 ?39
13891 add (multiply (multiply ?37 ?38) ?39)
13892 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13893 [39, 38, 37] by associator ?37 ?38 ?39
13894 17937: Id : 16, {_}:
13897 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13898 [42, 41] by commutator ?41 ?42
13900 17937: Id : 1, {_}:
13901 multiply cz (multiply cx (multiply cy cx))
13903 multiply (multiply (multiply cz cx) cy) cx
13904 [] by prove_right_moufang
13905 % SZS status Timeout for RNG027-5.p
13907 17967: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
13908 17967: Id : 3, {_}:
13909 add ?4 additive_identity =>= ?4
13910 [4] by right_additive_identity ?4
13911 17967: Id : 4, {_}:
13912 multiply additive_identity ?6 =>= additive_identity
13913 [6] by left_multiplicative_zero ?6
13914 17967: Id : 5, {_}:
13915 multiply ?8 additive_identity =>= additive_identity
13916 [8] by right_multiplicative_zero ?8
13917 17967: Id : 6, {_}:
13918 add (additive_inverse ?10) ?10 =>= additive_identity
13919 [10] by left_additive_inverse ?10
13920 17967: Id : 7, {_}:
13921 add ?12 (additive_inverse ?12) =>= additive_identity
13922 [12] by right_additive_inverse ?12
13923 17967: Id : 8, {_}:
13924 additive_inverse (additive_inverse ?14) =>= ?14
13925 [14] by additive_inverse_additive_inverse ?14
13926 17967: Id : 9, {_}:
13927 multiply ?16 (add ?17 ?18)
13929 add (multiply ?16 ?17) (multiply ?16 ?18)
13930 [18, 17, 16] by distribute1 ?16 ?17 ?18
13931 17967: Id : 10, {_}:
13932 multiply (add ?20 ?21) ?22
13934 add (multiply ?20 ?22) (multiply ?21 ?22)
13935 [22, 21, 20] by distribute2 ?20 ?21 ?22
13936 17967: Id : 11, {_}:
13937 add ?24 ?25 =<->= add ?25 ?24
13938 [25, 24] by commutativity_for_addition ?24 ?25
13939 17967: Id : 12, {_}:
13940 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
13941 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
13942 17967: Id : 13, {_}:
13943 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
13944 [32, 31] by right_alternative ?31 ?32
13945 17967: Id : 14, {_}:
13946 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
13947 [35, 34] by left_alternative ?34 ?35
13948 17967: Id : 15, {_}:
13949 associator ?37 ?38 ?39
13951 add (multiply (multiply ?37 ?38) ?39)
13952 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
13953 [39, 38, 37] by associator ?37 ?38 ?39
13954 17967: Id : 16, {_}:
13957 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
13958 [42, 41] by commutator ?41 ?42
13959 17967: Id : 17, {_}:
13960 multiply (additive_inverse ?44) (additive_inverse ?45)
13963 [45, 44] by product_of_inverses ?44 ?45
13964 17967: Id : 18, {_}:
13965 multiply (additive_inverse ?47) ?48
13967 additive_inverse (multiply ?47 ?48)
13968 [48, 47] by inverse_product1 ?47 ?48
13969 17967: Id : 19, {_}:
13970 multiply ?50 (additive_inverse ?51)
13972 additive_inverse (multiply ?50 ?51)
13973 [51, 50] by inverse_product2 ?50 ?51
13974 17967: Id : 20, {_}:
13975 multiply ?53 (add ?54 (additive_inverse ?55))
13977 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
13978 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
13979 17967: Id : 21, {_}:
13980 multiply (add ?57 (additive_inverse ?58)) ?59
13982 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
13983 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
13984 17967: Id : 22, {_}:
13985 multiply (additive_inverse ?61) (add ?62 ?63)
13987 add (additive_inverse (multiply ?61 ?62))
13988 (additive_inverse (multiply ?61 ?63))
13989 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
13990 17967: Id : 23, {_}:
13991 multiply (add ?65 ?66) (additive_inverse ?67)
13993 add (additive_inverse (multiply ?65 ?67))
13994 (additive_inverse (multiply ?66 ?67))
13995 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
13997 17967: Id : 1, {_}:
13998 multiply cz (multiply cx (multiply cy cx))
14000 multiply (multiply (multiply cz cx) cy) cx
14001 [] by prove_right_moufang
14002 % SZS status Timeout for RNG027-7.p
14004 17991: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14005 17991: Id : 3, {_}:
14006 add ?4 additive_identity =>= ?4
14007 [4] by right_additive_identity ?4
14008 17991: Id : 4, {_}:
14009 multiply additive_identity ?6 =>= additive_identity
14010 [6] by left_multiplicative_zero ?6
14011 17991: Id : 5, {_}:
14012 multiply ?8 additive_identity =>= additive_identity
14013 [8] by right_multiplicative_zero ?8
14014 17991: Id : 6, {_}:
14015 add (additive_inverse ?10) ?10 =>= additive_identity
14016 [10] by left_additive_inverse ?10
14017 17991: Id : 7, {_}:
14018 add ?12 (additive_inverse ?12) =>= additive_identity
14019 [12] by right_additive_inverse ?12
14020 17991: Id : 8, {_}:
14021 additive_inverse (additive_inverse ?14) =>= ?14
14022 [14] by additive_inverse_additive_inverse ?14
14023 17991: Id : 9, {_}:
14024 multiply ?16 (add ?17 ?18)
14026 add (multiply ?16 ?17) (multiply ?16 ?18)
14027 [18, 17, 16] by distribute1 ?16 ?17 ?18
14028 17991: Id : 10, {_}:
14029 multiply (add ?20 ?21) ?22
14031 add (multiply ?20 ?22) (multiply ?21 ?22)
14032 [22, 21, 20] by distribute2 ?20 ?21 ?22
14033 17991: Id : 11, {_}:
14034 add ?24 ?25 =<->= add ?25 ?24
14035 [25, 24] by commutativity_for_addition ?24 ?25
14036 17991: Id : 12, {_}:
14037 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14038 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14039 17991: Id : 13, {_}:
14040 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14041 [32, 31] by right_alternative ?31 ?32
14042 17991: Id : 14, {_}:
14043 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14044 [35, 34] by left_alternative ?34 ?35
14045 17991: Id : 15, {_}:
14046 associator ?37 ?38 ?39
14048 add (multiply (multiply ?37 ?38) ?39)
14049 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14050 [39, 38, 37] by associator ?37 ?38 ?39
14051 17991: Id : 16, {_}:
14054 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14055 [42, 41] by commutator ?41 ?42
14057 17991: Id : 1, {_}:
14058 associator x (multiply x y) z =>= multiply (associator x y z) x
14059 [] by prove_right_moufang
14060 % SZS status Timeout for RNG027-8.p
14062 18041: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14063 18041: Id : 3, {_}:
14064 add ?4 additive_identity =>= ?4
14065 [4] by right_additive_identity ?4
14066 18041: Id : 4, {_}:
14067 multiply additive_identity ?6 =>= additive_identity
14068 [6] by left_multiplicative_zero ?6
14069 18041: Id : 5, {_}:
14070 multiply ?8 additive_identity =>= additive_identity
14071 [8] by right_multiplicative_zero ?8
14072 18041: Id : 6, {_}:
14073 add (additive_inverse ?10) ?10 =>= additive_identity
14074 [10] by left_additive_inverse ?10
14075 18041: Id : 7, {_}:
14076 add ?12 (additive_inverse ?12) =>= additive_identity
14077 [12] by right_additive_inverse ?12
14078 18041: Id : 8, {_}:
14079 additive_inverse (additive_inverse ?14) =>= ?14
14080 [14] by additive_inverse_additive_inverse ?14
14081 18041: Id : 9, {_}:
14082 multiply ?16 (add ?17 ?18)
14084 add (multiply ?16 ?17) (multiply ?16 ?18)
14085 [18, 17, 16] by distribute1 ?16 ?17 ?18
14086 18041: Id : 10, {_}:
14087 multiply (add ?20 ?21) ?22
14089 add (multiply ?20 ?22) (multiply ?21 ?22)
14090 [22, 21, 20] by distribute2 ?20 ?21 ?22
14091 18041: Id : 11, {_}:
14092 add ?24 ?25 =<->= add ?25 ?24
14093 [25, 24] by commutativity_for_addition ?24 ?25
14094 18041: Id : 12, {_}:
14095 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14096 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14097 18041: Id : 13, {_}:
14098 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14099 [32, 31] by right_alternative ?31 ?32
14100 18041: Id : 14, {_}:
14101 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14102 [35, 34] by left_alternative ?34 ?35
14103 18041: Id : 15, {_}:
14104 associator ?37 ?38 ?39
14106 add (multiply (multiply ?37 ?38) ?39)
14107 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14108 [39, 38, 37] by associator ?37 ?38 ?39
14109 18041: Id : 16, {_}:
14112 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14113 [42, 41] by commutator ?41 ?42
14114 18041: Id : 17, {_}:
14115 multiply (additive_inverse ?44) (additive_inverse ?45)
14118 [45, 44] by product_of_inverses ?44 ?45
14119 18041: Id : 18, {_}:
14120 multiply (additive_inverse ?47) ?48
14122 additive_inverse (multiply ?47 ?48)
14123 [48, 47] by inverse_product1 ?47 ?48
14124 18041: Id : 19, {_}:
14125 multiply ?50 (additive_inverse ?51)
14127 additive_inverse (multiply ?50 ?51)
14128 [51, 50] by inverse_product2 ?50 ?51
14129 18041: Id : 20, {_}:
14130 multiply ?53 (add ?54 (additive_inverse ?55))
14132 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
14133 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
14134 18041: Id : 21, {_}:
14135 multiply (add ?57 (additive_inverse ?58)) ?59
14137 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
14138 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
14139 18041: Id : 22, {_}:
14140 multiply (additive_inverse ?61) (add ?62 ?63)
14142 add (additive_inverse (multiply ?61 ?62))
14143 (additive_inverse (multiply ?61 ?63))
14144 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
14145 18041: Id : 23, {_}:
14146 multiply (add ?65 ?66) (additive_inverse ?67)
14148 add (additive_inverse (multiply ?65 ?67))
14149 (additive_inverse (multiply ?66 ?67))
14150 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
14152 18041: Id : 1, {_}:
14153 associator x (multiply x y) z =>= multiply (associator x y z) x
14154 [] by prove_right_moufang
14155 % SZS status Timeout for RNG027-9.p
14157 18060: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14158 18060: Id : 3, {_}:
14159 add ?4 additive_identity =>= ?4
14160 [4] by right_additive_identity ?4
14161 18060: Id : 4, {_}:
14162 multiply additive_identity ?6 =>= additive_identity
14163 [6] by left_multiplicative_zero ?6
14164 18060: Id : 5, {_}:
14165 multiply ?8 additive_identity =>= additive_identity
14166 [8] by right_multiplicative_zero ?8
14167 18060: Id : 6, {_}:
14168 add (additive_inverse ?10) ?10 =>= additive_identity
14169 [10] by left_additive_inverse ?10
14170 18060: Id : 7, {_}:
14171 add ?12 (additive_inverse ?12) =>= additive_identity
14172 [12] by right_additive_inverse ?12
14173 18060: Id : 8, {_}:
14174 additive_inverse (additive_inverse ?14) =>= ?14
14175 [14] by additive_inverse_additive_inverse ?14
14176 18060: Id : 9, {_}:
14177 multiply ?16 (add ?17 ?18)
14179 add (multiply ?16 ?17) (multiply ?16 ?18)
14180 [18, 17, 16] by distribute1 ?16 ?17 ?18
14181 18060: Id : 10, {_}:
14182 multiply (add ?20 ?21) ?22
14184 add (multiply ?20 ?22) (multiply ?21 ?22)
14185 [22, 21, 20] by distribute2 ?20 ?21 ?22
14186 18060: Id : 11, {_}:
14187 add ?24 ?25 =<->= add ?25 ?24
14188 [25, 24] by commutativity_for_addition ?24 ?25
14189 18060: Id : 12, {_}:
14190 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14191 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14192 18060: Id : 13, {_}:
14193 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14194 [32, 31] by right_alternative ?31 ?32
14195 18060: Id : 14, {_}:
14196 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14197 [35, 34] by left_alternative ?34 ?35
14198 18060: Id : 15, {_}:
14199 associator ?37 ?38 ?39
14201 add (multiply (multiply ?37 ?38) ?39)
14202 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14203 [39, 38, 37] by associator ?37 ?38 ?39
14204 18060: Id : 16, {_}:
14207 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14208 [42, 41] by commutator ?41 ?42
14210 18060: Id : 1, {_}:
14211 multiply (multiply cx (multiply cy cx)) cz
14213 multiply cx (multiply cy (multiply cx cz))
14214 [] by prove_left_moufang
14215 % SZS status Timeout for RNG028-5.p
14217 18173: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14218 18173: Id : 3, {_}:
14219 add ?4 additive_identity =>= ?4
14220 [4] by right_additive_identity ?4
14221 18173: Id : 4, {_}:
14222 multiply additive_identity ?6 =>= additive_identity
14223 [6] by left_multiplicative_zero ?6
14224 18173: Id : 5, {_}:
14225 multiply ?8 additive_identity =>= additive_identity
14226 [8] by right_multiplicative_zero ?8
14227 18173: Id : 6, {_}:
14228 add (additive_inverse ?10) ?10 =>= additive_identity
14229 [10] by left_additive_inverse ?10
14230 18173: Id : 7, {_}:
14231 add ?12 (additive_inverse ?12) =>= additive_identity
14232 [12] by right_additive_inverse ?12
14233 18173: Id : 8, {_}:
14234 additive_inverse (additive_inverse ?14) =>= ?14
14235 [14] by additive_inverse_additive_inverse ?14
14236 18173: Id : 9, {_}:
14237 multiply ?16 (add ?17 ?18)
14239 add (multiply ?16 ?17) (multiply ?16 ?18)
14240 [18, 17, 16] by distribute1 ?16 ?17 ?18
14241 18173: Id : 10, {_}:
14242 multiply (add ?20 ?21) ?22
14244 add (multiply ?20 ?22) (multiply ?21 ?22)
14245 [22, 21, 20] by distribute2 ?20 ?21 ?22
14246 18173: Id : 11, {_}:
14247 add ?24 ?25 =<->= add ?25 ?24
14248 [25, 24] by commutativity_for_addition ?24 ?25
14249 18173: Id : 12, {_}:
14250 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14251 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14252 18173: Id : 13, {_}:
14253 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14254 [32, 31] by right_alternative ?31 ?32
14255 18173: Id : 14, {_}:
14256 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14257 [35, 34] by left_alternative ?34 ?35
14258 18173: Id : 15, {_}:
14259 associator ?37 ?38 ?39
14261 add (multiply (multiply ?37 ?38) ?39)
14262 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14263 [39, 38, 37] by associator ?37 ?38 ?39
14264 18173: Id : 16, {_}:
14267 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14268 [42, 41] by commutator ?41 ?42
14269 18173: Id : 17, {_}:
14270 multiply (additive_inverse ?44) (additive_inverse ?45)
14273 [45, 44] by product_of_inverses ?44 ?45
14274 18173: Id : 18, {_}:
14275 multiply (additive_inverse ?47) ?48
14277 additive_inverse (multiply ?47 ?48)
14278 [48, 47] by inverse_product1 ?47 ?48
14279 18173: Id : 19, {_}:
14280 multiply ?50 (additive_inverse ?51)
14282 additive_inverse (multiply ?50 ?51)
14283 [51, 50] by inverse_product2 ?50 ?51
14284 18173: Id : 20, {_}:
14285 multiply ?53 (add ?54 (additive_inverse ?55))
14287 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
14288 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
14289 18173: Id : 21, {_}:
14290 multiply (add ?57 (additive_inverse ?58)) ?59
14292 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
14293 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
14294 18173: Id : 22, {_}:
14295 multiply (additive_inverse ?61) (add ?62 ?63)
14297 add (additive_inverse (multiply ?61 ?62))
14298 (additive_inverse (multiply ?61 ?63))
14299 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
14300 18173: Id : 23, {_}:
14301 multiply (add ?65 ?66) (additive_inverse ?67)
14303 add (additive_inverse (multiply ?65 ?67))
14304 (additive_inverse (multiply ?66 ?67))
14305 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
14307 18173: Id : 1, {_}:
14308 multiply (multiply cx (multiply cy cx)) cz
14310 multiply cx (multiply cy (multiply cx cz))
14311 [] by prove_left_moufang
14312 % SZS status Timeout for RNG028-7.p
14314 18198: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14315 18198: Id : 3, {_}:
14316 add ?4 additive_identity =>= ?4
14317 [4] by right_additive_identity ?4
14318 18198: Id : 4, {_}:
14319 multiply additive_identity ?6 =>= additive_identity
14320 [6] by left_multiplicative_zero ?6
14321 18198: Id : 5, {_}:
14322 multiply ?8 additive_identity =>= additive_identity
14323 [8] by right_multiplicative_zero ?8
14324 18198: Id : 6, {_}:
14325 add (additive_inverse ?10) ?10 =>= additive_identity
14326 [10] by left_additive_inverse ?10
14327 18198: Id : 7, {_}:
14328 add ?12 (additive_inverse ?12) =>= additive_identity
14329 [12] by right_additive_inverse ?12
14330 18198: Id : 8, {_}:
14331 additive_inverse (additive_inverse ?14) =>= ?14
14332 [14] by additive_inverse_additive_inverse ?14
14333 18198: Id : 9, {_}:
14334 multiply ?16 (add ?17 ?18)
14336 add (multiply ?16 ?17) (multiply ?16 ?18)
14337 [18, 17, 16] by distribute1 ?16 ?17 ?18
14338 18198: Id : 10, {_}:
14339 multiply (add ?20 ?21) ?22
14341 add (multiply ?20 ?22) (multiply ?21 ?22)
14342 [22, 21, 20] by distribute2 ?20 ?21 ?22
14343 18198: Id : 11, {_}:
14344 add ?24 ?25 =<->= add ?25 ?24
14345 [25, 24] by commutativity_for_addition ?24 ?25
14346 18198: Id : 12, {_}:
14347 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14348 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14349 18198: Id : 13, {_}:
14350 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14351 [32, 31] by right_alternative ?31 ?32
14352 18198: Id : 14, {_}:
14353 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14354 [35, 34] by left_alternative ?34 ?35
14355 18198: Id : 15, {_}:
14356 associator ?37 ?38 ?39
14358 add (multiply (multiply ?37 ?38) ?39)
14359 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14360 [39, 38, 37] by associator ?37 ?38 ?39
14361 18198: Id : 16, {_}:
14364 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14365 [42, 41] by commutator ?41 ?42
14367 18198: Id : 1, {_}:
14368 associator x (multiply y x) z =>= multiply x (associator x y z)
14369 [] by prove_left_moufang
14370 % SZS status Timeout for RNG028-8.p
14372 18228: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14373 18228: Id : 3, {_}:
14374 add ?4 additive_identity =>= ?4
14375 [4] by right_additive_identity ?4
14376 18228: Id : 4, {_}:
14377 multiply additive_identity ?6 =>= additive_identity
14378 [6] by left_multiplicative_zero ?6
14379 18228: Id : 5, {_}:
14380 multiply ?8 additive_identity =>= additive_identity
14381 [8] by right_multiplicative_zero ?8
14382 18228: Id : 6, {_}:
14383 add (additive_inverse ?10) ?10 =>= additive_identity
14384 [10] by left_additive_inverse ?10
14385 18228: Id : 7, {_}:
14386 add ?12 (additive_inverse ?12) =>= additive_identity
14387 [12] by right_additive_inverse ?12
14388 18228: Id : 8, {_}:
14389 additive_inverse (additive_inverse ?14) =>= ?14
14390 [14] by additive_inverse_additive_inverse ?14
14391 18228: Id : 9, {_}:
14392 multiply ?16 (add ?17 ?18)
14394 add (multiply ?16 ?17) (multiply ?16 ?18)
14395 [18, 17, 16] by distribute1 ?16 ?17 ?18
14396 18228: Id : 10, {_}:
14397 multiply (add ?20 ?21) ?22
14399 add (multiply ?20 ?22) (multiply ?21 ?22)
14400 [22, 21, 20] by distribute2 ?20 ?21 ?22
14401 18228: Id : 11, {_}:
14402 add ?24 ?25 =<->= add ?25 ?24
14403 [25, 24] by commutativity_for_addition ?24 ?25
14404 18228: Id : 12, {_}:
14405 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14406 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14407 18228: Id : 13, {_}:
14408 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14409 [32, 31] by right_alternative ?31 ?32
14410 18228: Id : 14, {_}:
14411 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14412 [35, 34] by left_alternative ?34 ?35
14413 18228: Id : 15, {_}:
14414 associator ?37 ?38 ?39
14416 add (multiply (multiply ?37 ?38) ?39)
14417 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14418 [39, 38, 37] by associator ?37 ?38 ?39
14419 18228: Id : 16, {_}:
14422 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14423 [42, 41] by commutator ?41 ?42
14424 18228: Id : 17, {_}:
14425 multiply (additive_inverse ?44) (additive_inverse ?45)
14428 [45, 44] by product_of_inverses ?44 ?45
14429 18228: Id : 18, {_}:
14430 multiply (additive_inverse ?47) ?48
14432 additive_inverse (multiply ?47 ?48)
14433 [48, 47] by inverse_product1 ?47 ?48
14434 18228: Id : 19, {_}:
14435 multiply ?50 (additive_inverse ?51)
14437 additive_inverse (multiply ?50 ?51)
14438 [51, 50] by inverse_product2 ?50 ?51
14439 18228: Id : 20, {_}:
14440 multiply ?53 (add ?54 (additive_inverse ?55))
14442 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
14443 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
14444 18228: Id : 21, {_}:
14445 multiply (add ?57 (additive_inverse ?58)) ?59
14447 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
14448 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
14449 18228: Id : 22, {_}:
14450 multiply (additive_inverse ?61) (add ?62 ?63)
14452 add (additive_inverse (multiply ?61 ?62))
14453 (additive_inverse (multiply ?61 ?63))
14454 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
14455 18228: Id : 23, {_}:
14456 multiply (add ?65 ?66) (additive_inverse ?67)
14458 add (additive_inverse (multiply ?65 ?67))
14459 (additive_inverse (multiply ?66 ?67))
14460 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
14462 18228: Id : 1, {_}:
14463 associator x (multiply y x) z =>= multiply x (associator x y z)
14464 [] by prove_left_moufang
14465 % SZS status Timeout for RNG028-9.p
14467 18253: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14468 18253: Id : 3, {_}:
14469 add ?4 additive_identity =>= ?4
14470 [4] by right_additive_identity ?4
14471 18253: Id : 4, {_}:
14472 multiply additive_identity ?6 =>= additive_identity
14473 [6] by left_multiplicative_zero ?6
14474 18253: Id : 5, {_}:
14475 multiply ?8 additive_identity =>= additive_identity
14476 [8] by right_multiplicative_zero ?8
14477 18253: Id : 6, {_}:
14478 add (additive_inverse ?10) ?10 =>= additive_identity
14479 [10] by left_additive_inverse ?10
14480 18253: Id : 7, {_}:
14481 add ?12 (additive_inverse ?12) =>= additive_identity
14482 [12] by right_additive_inverse ?12
14483 18253: Id : 8, {_}:
14484 additive_inverse (additive_inverse ?14) =>= ?14
14485 [14] by additive_inverse_additive_inverse ?14
14486 18253: Id : 9, {_}:
14487 multiply ?16 (add ?17 ?18)
14489 add (multiply ?16 ?17) (multiply ?16 ?18)
14490 [18, 17, 16] by distribute1 ?16 ?17 ?18
14491 18253: Id : 10, {_}:
14492 multiply (add ?20 ?21) ?22
14494 add (multiply ?20 ?22) (multiply ?21 ?22)
14495 [22, 21, 20] by distribute2 ?20 ?21 ?22
14496 18253: Id : 11, {_}:
14497 add ?24 ?25 =<->= add ?25 ?24
14498 [25, 24] by commutativity_for_addition ?24 ?25
14499 18253: Id : 12, {_}:
14500 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14501 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14502 18253: Id : 13, {_}:
14503 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14504 [32, 31] by right_alternative ?31 ?32
14505 18253: Id : 14, {_}:
14506 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14507 [35, 34] by left_alternative ?34 ?35
14508 18253: Id : 15, {_}:
14509 associator ?37 ?38 ?39
14511 add (multiply (multiply ?37 ?38) ?39)
14512 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14513 [39, 38, 37] by associator ?37 ?38 ?39
14514 18253: Id : 16, {_}:
14517 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14518 [42, 41] by commutator ?41 ?42
14520 18253: Id : 1, {_}:
14521 multiply (multiply cx cy) (multiply cz cx)
14523 multiply cx (multiply (multiply cy cz) cx)
14524 [] by prove_middle_law
14525 % SZS status Timeout for RNG029-5.p
14527 18283: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14528 18283: Id : 3, {_}:
14529 add ?4 additive_identity =>= ?4
14530 [4] by right_additive_identity ?4
14531 18283: Id : 4, {_}:
14532 multiply additive_identity ?6 =>= additive_identity
14533 [6] by left_multiplicative_zero ?6
14534 18283: Id : 5, {_}:
14535 multiply ?8 additive_identity =>= additive_identity
14536 [8] by right_multiplicative_zero ?8
14537 18283: Id : 6, {_}:
14538 add (additive_inverse ?10) ?10 =>= additive_identity
14539 [10] by left_additive_inverse ?10
14540 18283: Id : 7, {_}:
14541 add ?12 (additive_inverse ?12) =>= additive_identity
14542 [12] by right_additive_inverse ?12
14543 18283: Id : 8, {_}:
14544 additive_inverse (additive_inverse ?14) =>= ?14
14545 [14] by additive_inverse_additive_inverse ?14
14546 18283: Id : 9, {_}:
14547 multiply ?16 (add ?17 ?18)
14549 add (multiply ?16 ?17) (multiply ?16 ?18)
14550 [18, 17, 16] by distribute1 ?16 ?17 ?18
14551 18283: Id : 10, {_}:
14552 multiply (add ?20 ?21) ?22
14554 add (multiply ?20 ?22) (multiply ?21 ?22)
14555 [22, 21, 20] by distribute2 ?20 ?21 ?22
14556 18283: Id : 11, {_}:
14557 add ?24 ?25 =<->= add ?25 ?24
14558 [25, 24] by commutativity_for_addition ?24 ?25
14559 18283: Id : 12, {_}:
14560 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14561 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14562 18283: Id : 13, {_}:
14563 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14564 [32, 31] by right_alternative ?31 ?32
14565 18283: Id : 14, {_}:
14566 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14567 [35, 34] by left_alternative ?34 ?35
14568 18283: Id : 15, {_}:
14569 associator ?37 ?38 ?39
14571 add (multiply (multiply ?37 ?38) ?39)
14572 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14573 [39, 38, 37] by associator ?37 ?38 ?39
14574 18283: Id : 16, {_}:
14577 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14578 [42, 41] by commutator ?41 ?42
14580 18283: Id : 1, {_}:
14581 multiply (multiply x y) (multiply z x)
14583 multiply (multiply x (multiply y z)) x
14584 [] by prove_middle_moufang
14585 % SZS status Timeout for RNG029-6.p
14587 18309: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
14588 18309: Id : 3, {_}:
14589 add ?4 additive_identity =>= ?4
14590 [4] by right_additive_identity ?4
14591 18309: Id : 4, {_}:
14592 multiply additive_identity ?6 =>= additive_identity
14593 [6] by left_multiplicative_zero ?6
14594 18309: Id : 5, {_}:
14595 multiply ?8 additive_identity =>= additive_identity
14596 [8] by right_multiplicative_zero ?8
14597 18309: Id : 6, {_}:
14598 add (additive_inverse ?10) ?10 =>= additive_identity
14599 [10] by left_additive_inverse ?10
14600 18309: Id : 7, {_}:
14601 add ?12 (additive_inverse ?12) =>= additive_identity
14602 [12] by right_additive_inverse ?12
14603 18309: Id : 8, {_}:
14604 additive_inverse (additive_inverse ?14) =>= ?14
14605 [14] by additive_inverse_additive_inverse ?14
14606 18309: Id : 9, {_}:
14607 multiply ?16 (add ?17 ?18)
14609 add (multiply ?16 ?17) (multiply ?16 ?18)
14610 [18, 17, 16] by distribute1 ?16 ?17 ?18
14611 18309: Id : 10, {_}:
14612 multiply (add ?20 ?21) ?22
14614 add (multiply ?20 ?22) (multiply ?21 ?22)
14615 [22, 21, 20] by distribute2 ?20 ?21 ?22
14616 18309: Id : 11, {_}:
14617 add ?24 ?25 =<->= add ?25 ?24
14618 [25, 24] by commutativity_for_addition ?24 ?25
14619 18309: Id : 12, {_}:
14620 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
14621 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
14622 18309: Id : 13, {_}:
14623 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14624 [32, 31] by right_alternative ?31 ?32
14625 18309: Id : 14, {_}:
14626 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
14627 [35, 34] by left_alternative ?34 ?35
14628 18309: Id : 15, {_}:
14629 associator ?37 ?38 ?39
14631 add (multiply (multiply ?37 ?38) ?39)
14632 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
14633 [39, 38, 37] by associator ?37 ?38 ?39
14634 18309: Id : 16, {_}:
14637 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
14638 [42, 41] by commutator ?41 ?42
14639 18309: Id : 17, {_}:
14640 multiply (additive_inverse ?44) (additive_inverse ?45)
14643 [45, 44] by product_of_inverses ?44 ?45
14644 18309: Id : 18, {_}:
14645 multiply (additive_inverse ?47) ?48
14647 additive_inverse (multiply ?47 ?48)
14648 [48, 47] by inverse_product1 ?47 ?48
14649 18309: Id : 19, {_}:
14650 multiply ?50 (additive_inverse ?51)
14652 additive_inverse (multiply ?50 ?51)
14653 [51, 50] by inverse_product2 ?50 ?51
14654 18309: Id : 20, {_}:
14655 multiply ?53 (add ?54 (additive_inverse ?55))
14657 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
14658 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
14659 18309: Id : 21, {_}:
14660 multiply (add ?57 (additive_inverse ?58)) ?59
14662 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
14663 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
14664 18309: Id : 22, {_}:
14665 multiply (additive_inverse ?61) (add ?62 ?63)
14667 add (additive_inverse (multiply ?61 ?62))
14668 (additive_inverse (multiply ?61 ?63))
14669 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
14670 18309: Id : 23, {_}:
14671 multiply (add ?65 ?66) (additive_inverse ?67)
14673 add (additive_inverse (multiply ?65 ?67))
14674 (additive_inverse (multiply ?66 ?67))
14675 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
14677 18309: Id : 1, {_}:
14678 multiply (multiply x y) (multiply z x)
14680 multiply (multiply x (multiply y z)) x
14681 [] by prove_middle_moufang
14682 % SZS status Timeout for RNG029-7.p
14684 18342: Id : 2, {_}:
14685 add ?2 ?3 =<->= add ?3 ?2
14686 [3, 2] by commutativity_for_addition ?2 ?3
14687 18342: Id : 3, {_}:
14688 add ?5 (add ?6 ?7) =?= add (add ?5 ?6) ?7
14689 [7, 6, 5] by associativity_for_addition ?5 ?6 ?7
14690 18342: Id : 4, {_}: add additive_identity ?9 =>= ?9 [9] by left_additive_identity ?9
14691 18342: Id : 5, {_}:
14692 add ?11 additive_identity =>= ?11
14693 [11] by right_additive_identity ?11
14694 18342: Id : 6, {_}:
14695 multiply additive_identity ?13 =>= additive_identity
14696 [13] by left_multiplicative_zero ?13
14697 18342: Id : 7, {_}:
14698 multiply ?15 additive_identity =>= additive_identity
14699 [15] by right_multiplicative_zero ?15
14700 18342: Id : 8, {_}:
14701 add (additive_inverse ?17) ?17 =>= additive_identity
14702 [17] by left_additive_inverse ?17
14703 18342: Id : 9, {_}:
14704 add ?19 (additive_inverse ?19) =>= additive_identity
14705 [19] by right_additive_inverse ?19
14706 18342: Id : 10, {_}:
14707 multiply ?21 (add ?22 ?23)
14709 add (multiply ?21 ?22) (multiply ?21 ?23)
14710 [23, 22, 21] by distribute1 ?21 ?22 ?23
14711 18342: Id : 11, {_}:
14712 multiply (add ?25 ?26) ?27
14714 add (multiply ?25 ?27) (multiply ?26 ?27)
14715 [27, 26, 25] by distribute2 ?25 ?26 ?27
14716 18342: Id : 12, {_}:
14717 additive_inverse (additive_inverse ?29) =>= ?29
14718 [29] by additive_inverse_additive_inverse ?29
14719 18342: Id : 13, {_}:
14720 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14721 [32, 31] by right_alternative ?31 ?32
14722 18342: Id : 14, {_}:
14723 associator ?34 ?35 ?36
14725 add (multiply (multiply ?34 ?35) ?36)
14726 (additive_inverse (multiply ?34 (multiply ?35 ?36)))
14727 [36, 35, 34] by associator ?34 ?35 ?36
14728 18342: Id : 15, {_}:
14731 add (multiply ?39 ?38) (additive_inverse (multiply ?38 ?39))
14732 [39, 38] by commutator ?38 ?39
14734 18342: Id : 1, {_}:
14736 (multiply (associator x x y)
14737 (multiply (associator x x y) (associator x x y)))
14738 (multiply (associator x x y)
14739 (multiply (associator x x y) (associator x x y)))
14742 [] by prove_conjecture_1
14743 % SZS status Timeout for RNG030-6.p
14745 18375: Id : 2, {_}:
14746 multiply (additive_inverse ?2) (additive_inverse ?3)
14749 [3, 2] by product_of_inverses ?2 ?3
14750 18375: Id : 3, {_}:
14751 multiply (additive_inverse ?5) ?6
14753 additive_inverse (multiply ?5 ?6)
14754 [6, 5] by inverse_product1 ?5 ?6
14755 18375: Id : 4, {_}:
14756 multiply ?8 (additive_inverse ?9)
14758 additive_inverse (multiply ?8 ?9)
14759 [9, 8] by inverse_product2 ?8 ?9
14760 18375: Id : 5, {_}:
14761 multiply ?11 (add ?12 (additive_inverse ?13))
14763 add (multiply ?11 ?12) (additive_inverse (multiply ?11 ?13))
14764 [13, 12, 11] by distributivity_of_difference1 ?11 ?12 ?13
14765 18375: Id : 6, {_}:
14766 multiply (add ?15 (additive_inverse ?16)) ?17
14768 add (multiply ?15 ?17) (additive_inverse (multiply ?16 ?17))
14769 [17, 16, 15] by distributivity_of_difference2 ?15 ?16 ?17
14770 18375: Id : 7, {_}:
14771 multiply (additive_inverse ?19) (add ?20 ?21)
14773 add (additive_inverse (multiply ?19 ?20))
14774 (additive_inverse (multiply ?19 ?21))
14775 [21, 20, 19] by distributivity_of_difference3 ?19 ?20 ?21
14776 18375: Id : 8, {_}:
14777 multiply (add ?23 ?24) (additive_inverse ?25)
14779 add (additive_inverse (multiply ?23 ?25))
14780 (additive_inverse (multiply ?24 ?25))
14781 [25, 24, 23] by distributivity_of_difference4 ?23 ?24 ?25
14782 18375: Id : 9, {_}:
14783 add ?27 ?28 =<->= add ?28 ?27
14784 [28, 27] by commutativity_for_addition ?27 ?28
14785 18375: Id : 10, {_}:
14786 add ?30 (add ?31 ?32) =?= add (add ?30 ?31) ?32
14787 [32, 31, 30] by associativity_for_addition ?30 ?31 ?32
14788 18375: Id : 11, {_}:
14789 add additive_identity ?34 =>= ?34
14790 [34] by left_additive_identity ?34
14791 18375: Id : 12, {_}:
14792 add ?36 additive_identity =>= ?36
14793 [36] by right_additive_identity ?36
14794 18375: Id : 13, {_}:
14795 multiply additive_identity ?38 =>= additive_identity
14796 [38] by left_multiplicative_zero ?38
14797 18375: Id : 14, {_}:
14798 multiply ?40 additive_identity =>= additive_identity
14799 [40] by right_multiplicative_zero ?40
14800 18375: Id : 15, {_}:
14801 add (additive_inverse ?42) ?42 =>= additive_identity
14802 [42] by left_additive_inverse ?42
14803 18375: Id : 16, {_}:
14804 add ?44 (additive_inverse ?44) =>= additive_identity
14805 [44] by right_additive_inverse ?44
14806 18375: Id : 17, {_}:
14807 multiply ?46 (add ?47 ?48)
14809 add (multiply ?46 ?47) (multiply ?46 ?48)
14810 [48, 47, 46] by distribute1 ?46 ?47 ?48
14811 18375: Id : 18, {_}:
14812 multiply (add ?50 ?51) ?52
14814 add (multiply ?50 ?52) (multiply ?51 ?52)
14815 [52, 51, 50] by distribute2 ?50 ?51 ?52
14816 18375: Id : 19, {_}:
14817 additive_inverse (additive_inverse ?54) =>= ?54
14818 [54] by additive_inverse_additive_inverse ?54
14819 18375: Id : 20, {_}:
14820 multiply (multiply ?56 ?57) ?57 =?= multiply ?56 (multiply ?57 ?57)
14821 [57, 56] by right_alternative ?56 ?57
14822 18375: Id : 21, {_}:
14823 associator ?59 ?60 ?61
14825 add (multiply (multiply ?59 ?60) ?61)
14826 (additive_inverse (multiply ?59 (multiply ?60 ?61)))
14827 [61, 60, 59] by associator ?59 ?60 ?61
14828 18375: Id : 22, {_}:
14831 add (multiply ?64 ?63) (additive_inverse (multiply ?63 ?64))
14832 [64, 63] by commutator ?63 ?64
14834 18375: Id : 1, {_}:
14836 (multiply (associator x x y)
14837 (multiply (associator x x y) (associator x x y)))
14838 (multiply (associator x x y)
14839 (multiply (associator x x y) (associator x x y)))
14842 [] by prove_conjecture_1
14843 % SZS status Timeout for RNG030-7.p
14845 18405: Id : 2, {_}:
14846 add ?2 ?3 =<->= add ?3 ?2
14847 [3, 2] by commutativity_for_addition ?2 ?3
14848 18405: Id : 3, {_}:
14849 add ?5 (add ?6 ?7) =?= add (add ?5 ?6) ?7
14850 [7, 6, 5] by associativity_for_addition ?5 ?6 ?7
14851 18405: Id : 4, {_}: add additive_identity ?9 =>= ?9 [9] by left_additive_identity ?9
14852 18405: Id : 5, {_}:
14853 add ?11 additive_identity =>= ?11
14854 [11] by right_additive_identity ?11
14855 18405: Id : 6, {_}:
14856 multiply additive_identity ?13 =>= additive_identity
14857 [13] by left_multiplicative_zero ?13
14858 18405: Id : 7, {_}:
14859 multiply ?15 additive_identity =>= additive_identity
14860 [15] by right_multiplicative_zero ?15
14861 18405: Id : 8, {_}:
14862 add (additive_inverse ?17) ?17 =>= additive_identity
14863 [17] by left_additive_inverse ?17
14864 18405: Id : 9, {_}:
14865 add ?19 (additive_inverse ?19) =>= additive_identity
14866 [19] by right_additive_inverse ?19
14867 18405: Id : 10, {_}:
14868 multiply ?21 (add ?22 ?23)
14870 add (multiply ?21 ?22) (multiply ?21 ?23)
14871 [23, 22, 21] by distribute1 ?21 ?22 ?23
14872 18405: Id : 11, {_}:
14873 multiply (add ?25 ?26) ?27
14875 add (multiply ?25 ?27) (multiply ?26 ?27)
14876 [27, 26, 25] by distribute2 ?25 ?26 ?27
14877 18405: Id : 12, {_}:
14878 additive_inverse (additive_inverse ?29) =>= ?29
14879 [29] by additive_inverse_additive_inverse ?29
14880 18405: Id : 13, {_}:
14881 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
14882 [32, 31] by right_alternative ?31 ?32
14883 18405: Id : 14, {_}:
14884 associator ?34 ?35 ?36
14886 add (multiply (multiply ?34 ?35) ?36)
14887 (additive_inverse (multiply ?34 (multiply ?35 ?36)))
14888 [36, 35, 34] by associator ?34 ?35 ?36
14889 18405: Id : 15, {_}:
14892 add (multiply ?39 ?38) (additive_inverse (multiply ?38 ?39))
14893 [39, 38] by commutator ?38 ?39
14895 18405: Id : 1, {_}:
14897 (multiply (multiply (associator x x y) (associator x x y)) x)
14898 (multiply (associator x x y) (associator x x y))
14901 [] by prove_conjecture_2
14902 % SZS status Timeout for RNG031-6.p
14904 18433: Id : 2, {_}:
14905 multiply (additive_inverse ?2) (additive_inverse ?3)
14908 [3, 2] by product_of_inverses ?2 ?3
14909 18433: Id : 3, {_}:
14910 multiply (additive_inverse ?5) ?6
14912 additive_inverse (multiply ?5 ?6)
14913 [6, 5] by inverse_product1 ?5 ?6
14914 18433: Id : 4, {_}:
14915 multiply ?8 (additive_inverse ?9)
14917 additive_inverse (multiply ?8 ?9)
14918 [9, 8] by inverse_product2 ?8 ?9
14919 18433: Id : 5, {_}:
14920 multiply ?11 (add ?12 (additive_inverse ?13))
14922 add (multiply ?11 ?12) (additive_inverse (multiply ?11 ?13))
14923 [13, 12, 11] by distributivity_of_difference1 ?11 ?12 ?13
14924 18433: Id : 6, {_}:
14925 multiply (add ?15 (additive_inverse ?16)) ?17
14927 add (multiply ?15 ?17) (additive_inverse (multiply ?16 ?17))
14928 [17, 16, 15] by distributivity_of_difference2 ?15 ?16 ?17
14929 18433: Id : 7, {_}:
14930 multiply (additive_inverse ?19) (add ?20 ?21)
14932 add (additive_inverse (multiply ?19 ?20))
14933 (additive_inverse (multiply ?19 ?21))
14934 [21, 20, 19] by distributivity_of_difference3 ?19 ?20 ?21
14935 18433: Id : 8, {_}:
14936 multiply (add ?23 ?24) (additive_inverse ?25)
14938 add (additive_inverse (multiply ?23 ?25))
14939 (additive_inverse (multiply ?24 ?25))
14940 [25, 24, 23] by distributivity_of_difference4 ?23 ?24 ?25
14941 18433: Id : 9, {_}:
14942 add ?27 ?28 =<->= add ?28 ?27
14943 [28, 27] by commutativity_for_addition ?27 ?28
14944 18433: Id : 10, {_}:
14945 add ?30 (add ?31 ?32) =?= add (add ?30 ?31) ?32
14946 [32, 31, 30] by associativity_for_addition ?30 ?31 ?32
14947 18433: Id : 11, {_}:
14948 add additive_identity ?34 =>= ?34
14949 [34] by left_additive_identity ?34
14950 18433: Id : 12, {_}:
14951 add ?36 additive_identity =>= ?36
14952 [36] by right_additive_identity ?36
14953 18433: Id : 13, {_}:
14954 multiply additive_identity ?38 =>= additive_identity
14955 [38] by left_multiplicative_zero ?38
14956 18433: Id : 14, {_}:
14957 multiply ?40 additive_identity =>= additive_identity
14958 [40] by right_multiplicative_zero ?40
14959 18433: Id : 15, {_}:
14960 add (additive_inverse ?42) ?42 =>= additive_identity
14961 [42] by left_additive_inverse ?42
14962 18433: Id : 16, {_}:
14963 add ?44 (additive_inverse ?44) =>= additive_identity
14964 [44] by right_additive_inverse ?44
14965 18433: Id : 17, {_}:
14966 multiply ?46 (add ?47 ?48)
14968 add (multiply ?46 ?47) (multiply ?46 ?48)
14969 [48, 47, 46] by distribute1 ?46 ?47 ?48
14970 18433: Id : 18, {_}:
14971 multiply (add ?50 ?51) ?52
14973 add (multiply ?50 ?52) (multiply ?51 ?52)
14974 [52, 51, 50] by distribute2 ?50 ?51 ?52
14975 18433: Id : 19, {_}:
14976 additive_inverse (additive_inverse ?54) =>= ?54
14977 [54] by additive_inverse_additive_inverse ?54
14978 18433: Id : 20, {_}:
14979 multiply (multiply ?56 ?57) ?57 =?= multiply ?56 (multiply ?57 ?57)
14980 [57, 56] by right_alternative ?56 ?57
14981 18433: Id : 21, {_}:
14982 associator ?59 ?60 ?61
14984 add (multiply (multiply ?59 ?60) ?61)
14985 (additive_inverse (multiply ?59 (multiply ?60 ?61)))
14986 [61, 60, 59] by associator ?59 ?60 ?61
14987 18433: Id : 22, {_}:
14990 add (multiply ?64 ?63) (additive_inverse (multiply ?63 ?64))
14991 [64, 63] by commutator ?63 ?64
14993 18433: Id : 1, {_}:
14995 (multiply (multiply (associator x x y) (associator x x y)) x)
14996 (multiply (associator x x y) (associator x x y))
14999 [] by prove_conjecture_2
15000 % SZS status Timeout for RNG031-7.p
15002 18463: Id : 2, {_}:
15003 add ?2 ?3 =<->= add ?3 ?2
15004 [3, 2] by commutativity_for_addition ?2 ?3
15005 18463: Id : 3, {_}:
15006 add ?5 (add ?6 ?7) =?= add (add ?5 ?6) ?7
15007 [7, 6, 5] by associativity_for_addition ?5 ?6 ?7
15008 18463: Id : 4, {_}: add additive_identity ?9 =>= ?9 [9] by left_additive_identity ?9
15009 18463: Id : 5, {_}:
15010 add ?11 additive_identity =>= ?11
15011 [11] by right_additive_identity ?11
15012 18463: Id : 6, {_}:
15013 multiply additive_identity ?13 =>= additive_identity
15014 [13] by left_multiplicative_zero ?13
15015 18463: Id : 7, {_}:
15016 multiply ?15 additive_identity =>= additive_identity
15017 [15] by right_multiplicative_zero ?15
15018 18463: Id : 8, {_}:
15019 add (additive_inverse ?17) ?17 =>= additive_identity
15020 [17] by left_additive_inverse ?17
15021 18463: Id : 9, {_}:
15022 add ?19 (additive_inverse ?19) =>= additive_identity
15023 [19] by right_additive_inverse ?19
15024 18463: Id : 10, {_}:
15025 multiply ?21 (add ?22 ?23)
15027 add (multiply ?21 ?22) (multiply ?21 ?23)
15028 [23, 22, 21] by distribute1 ?21 ?22 ?23
15029 18463: Id : 11, {_}:
15030 multiply (add ?25 ?26) ?27
15032 add (multiply ?25 ?27) (multiply ?26 ?27)
15033 [27, 26, 25] by distribute2 ?25 ?26 ?27
15034 18463: Id : 12, {_}:
15035 additive_inverse (additive_inverse ?29) =>= ?29
15036 [29] by additive_inverse_additive_inverse ?29
15037 18463: Id : 13, {_}:
15038 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
15039 [32, 31] by right_alternative ?31 ?32
15040 18463: Id : 14, {_}:
15041 associator ?34 ?35 ?36
15043 add (multiply (multiply ?34 ?35) ?36)
15044 (additive_inverse (multiply ?34 (multiply ?35 ?36)))
15045 [36, 35, 34] by associator ?34 ?35 ?36
15046 18463: Id : 15, {_}:
15049 add (multiply ?39 ?38) (additive_inverse (multiply ?38 ?39))
15050 [39, 38] by commutator ?38 ?39
15052 18463: Id : 1, {_}:
15058 (multiply (associator x x y)
15059 (multiply (associator x x y) (associator x x y)))
15060 (multiply (associator x x y)
15061 (multiply (associator x x y) (associator x x y))))
15062 (multiply (associator x x y)
15063 (multiply (associator x x y) (associator x x y))))
15064 (multiply (associator x x y)
15065 (multiply (associator x x y) (associator x x y))))
15066 (multiply (associator x x y)
15067 (multiply (associator x x y) (associator x x y))))
15068 (multiply (associator x x y)
15069 (multiply (associator x x y) (associator x x y)))
15072 [] by prove_conjecture_3
15073 % SZS status Timeout for RNG032-6.p
15075 18542: Id : 2, {_}:
15076 multiply (additive_inverse ?2) (additive_inverse ?3)
15079 [3, 2] by product_of_inverses ?2 ?3
15080 18542: Id : 3, {_}:
15081 multiply (additive_inverse ?5) ?6
15083 additive_inverse (multiply ?5 ?6)
15084 [6, 5] by inverse_product1 ?5 ?6
15085 18542: Id : 4, {_}:
15086 multiply ?8 (additive_inverse ?9)
15088 additive_inverse (multiply ?8 ?9)
15089 [9, 8] by inverse_product2 ?8 ?9
15090 18542: Id : 5, {_}:
15091 multiply ?11 (add ?12 (additive_inverse ?13))
15093 add (multiply ?11 ?12) (additive_inverse (multiply ?11 ?13))
15094 [13, 12, 11] by distributivity_of_difference1 ?11 ?12 ?13
15095 18542: Id : 6, {_}:
15096 multiply (add ?15 (additive_inverse ?16)) ?17
15098 add (multiply ?15 ?17) (additive_inverse (multiply ?16 ?17))
15099 [17, 16, 15] by distributivity_of_difference2 ?15 ?16 ?17
15100 18542: Id : 7, {_}:
15101 multiply (additive_inverse ?19) (add ?20 ?21)
15103 add (additive_inverse (multiply ?19 ?20))
15104 (additive_inverse (multiply ?19 ?21))
15105 [21, 20, 19] by distributivity_of_difference3 ?19 ?20 ?21
15106 18542: Id : 8, {_}:
15107 multiply (add ?23 ?24) (additive_inverse ?25)
15109 add (additive_inverse (multiply ?23 ?25))
15110 (additive_inverse (multiply ?24 ?25))
15111 [25, 24, 23] by distributivity_of_difference4 ?23 ?24 ?25
15112 18542: Id : 9, {_}:
15113 add ?27 ?28 =<->= add ?28 ?27
15114 [28, 27] by commutativity_for_addition ?27 ?28
15115 18542: Id : 10, {_}:
15116 add ?30 (add ?31 ?32) =?= add (add ?30 ?31) ?32
15117 [32, 31, 30] by associativity_for_addition ?30 ?31 ?32
15118 18542: Id : 11, {_}:
15119 add additive_identity ?34 =>= ?34
15120 [34] by left_additive_identity ?34
15121 18542: Id : 12, {_}:
15122 add ?36 additive_identity =>= ?36
15123 [36] by right_additive_identity ?36
15124 18542: Id : 13, {_}:
15125 multiply additive_identity ?38 =>= additive_identity
15126 [38] by left_multiplicative_zero ?38
15127 18542: Id : 14, {_}:
15128 multiply ?40 additive_identity =>= additive_identity
15129 [40] by right_multiplicative_zero ?40
15130 18542: Id : 15, {_}:
15131 add (additive_inverse ?42) ?42 =>= additive_identity
15132 [42] by left_additive_inverse ?42
15133 18542: Id : 16, {_}:
15134 add ?44 (additive_inverse ?44) =>= additive_identity
15135 [44] by right_additive_inverse ?44
15136 18542: Id : 17, {_}:
15137 multiply ?46 (add ?47 ?48)
15139 add (multiply ?46 ?47) (multiply ?46 ?48)
15140 [48, 47, 46] by distribute1 ?46 ?47 ?48
15141 18542: Id : 18, {_}:
15142 multiply (add ?50 ?51) ?52
15144 add (multiply ?50 ?52) (multiply ?51 ?52)
15145 [52, 51, 50] by distribute2 ?50 ?51 ?52
15146 18542: Id : 19, {_}:
15147 additive_inverse (additive_inverse ?54) =>= ?54
15148 [54] by additive_inverse_additive_inverse ?54
15149 18542: Id : 20, {_}:
15150 multiply (multiply ?56 ?57) ?57 =?= multiply ?56 (multiply ?57 ?57)
15151 [57, 56] by right_alternative ?56 ?57
15152 18542: Id : 21, {_}:
15153 associator ?59 ?60 ?61
15155 add (multiply (multiply ?59 ?60) ?61)
15156 (additive_inverse (multiply ?59 (multiply ?60 ?61)))
15157 [61, 60, 59] by associator ?59 ?60 ?61
15158 18542: Id : 22, {_}:
15161 add (multiply ?64 ?63) (additive_inverse (multiply ?63 ?64))
15162 [64, 63] by commutator ?63 ?64
15164 18542: Id : 1, {_}:
15170 (multiply (associator x x y)
15171 (multiply (associator x x y) (associator x x y)))
15172 (multiply (associator x x y)
15173 (multiply (associator x x y) (associator x x y))))
15174 (multiply (associator x x y)
15175 (multiply (associator x x y) (associator x x y))))
15176 (multiply (associator x x y)
15177 (multiply (associator x x y) (associator x x y))))
15178 (multiply (associator x x y)
15179 (multiply (associator x x y) (associator x x y))))
15180 (multiply (associator x x y)
15181 (multiply (associator x x y) (associator x x y)))
15184 [] by prove_conjecture_3
15185 % SZS status Timeout for RNG032-7.p
15187 18572: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
15188 18572: Id : 3, {_}:
15189 add ?4 additive_identity =>= ?4
15190 [4] by right_additive_identity ?4
15191 18572: Id : 4, {_}:
15192 multiply additive_identity ?6 =>= additive_identity
15193 [6] by left_multiplicative_zero ?6
15194 18572: Id : 5, {_}:
15195 multiply ?8 additive_identity =>= additive_identity
15196 [8] by right_multiplicative_zero ?8
15197 18572: Id : 6, {_}:
15198 add (additive_inverse ?10) ?10 =>= additive_identity
15199 [10] by left_additive_inverse ?10
15200 18572: Id : 7, {_}:
15201 add ?12 (additive_inverse ?12) =>= additive_identity
15202 [12] by right_additive_inverse ?12
15203 18572: Id : 8, {_}:
15204 additive_inverse (additive_inverse ?14) =>= ?14
15205 [14] by additive_inverse_additive_inverse ?14
15206 18572: Id : 9, {_}:
15207 multiply ?16 (add ?17 ?18)
15209 add (multiply ?16 ?17) (multiply ?16 ?18)
15210 [18, 17, 16] by distribute1 ?16 ?17 ?18
15211 18572: Id : 10, {_}:
15212 multiply (add ?20 ?21) ?22
15214 add (multiply ?20 ?22) (multiply ?21 ?22)
15215 [22, 21, 20] by distribute2 ?20 ?21 ?22
15216 18572: Id : 11, {_}:
15217 add ?24 ?25 =<->= add ?25 ?24
15218 [25, 24] by commutativity_for_addition ?24 ?25
15219 18572: Id : 12, {_}:
15220 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
15221 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
15222 18572: Id : 13, {_}:
15223 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
15224 [32, 31] by right_alternative ?31 ?32
15225 18572: Id : 14, {_}:
15226 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
15227 [35, 34] by left_alternative ?34 ?35
15228 18572: Id : 15, {_}:
15229 associator ?37 ?38 ?39
15231 add (multiply (multiply ?37 ?38) ?39)
15232 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
15233 [39, 38, 37] by associator ?37 ?38 ?39
15234 18572: Id : 16, {_}:
15237 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
15238 [42, 41] by commutator ?41 ?42
15240 18572: Id : 1, {_}:
15241 add (associator (multiply x y) z w) (associator x y (commutator z w))
15243 add (multiply x (associator y z w)) (multiply (associator x z w) y)
15244 [] by prove_challenge
15245 % SZS status Timeout for RNG033-6.p
15247 18592: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
15248 18592: Id : 3, {_}:
15249 add ?4 additive_identity =>= ?4
15250 [4] by right_additive_identity ?4
15251 18592: Id : 4, {_}:
15252 multiply additive_identity ?6 =>= additive_identity
15253 [6] by left_multiplicative_zero ?6
15254 18592: Id : 5, {_}:
15255 multiply ?8 additive_identity =>= additive_identity
15256 [8] by right_multiplicative_zero ?8
15257 18592: Id : 6, {_}:
15258 add (additive_inverse ?10) ?10 =>= additive_identity
15259 [10] by left_additive_inverse ?10
15260 18592: Id : 7, {_}:
15261 add ?12 (additive_inverse ?12) =>= additive_identity
15262 [12] by right_additive_inverse ?12
15263 18592: Id : 8, {_}:
15264 additive_inverse (additive_inverse ?14) =>= ?14
15265 [14] by additive_inverse_additive_inverse ?14
15266 18592: Id : 9, {_}:
15267 multiply ?16 (add ?17 ?18)
15269 add (multiply ?16 ?17) (multiply ?16 ?18)
15270 [18, 17, 16] by distribute1 ?16 ?17 ?18
15271 18592: Id : 10, {_}:
15272 multiply (add ?20 ?21) ?22
15274 add (multiply ?20 ?22) (multiply ?21 ?22)
15275 [22, 21, 20] by distribute2 ?20 ?21 ?22
15276 18592: Id : 11, {_}:
15277 add ?24 ?25 =<->= add ?25 ?24
15278 [25, 24] by commutativity_for_addition ?24 ?25
15279 18592: Id : 12, {_}:
15280 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
15281 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
15282 18592: Id : 13, {_}:
15283 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
15284 [32, 31] by right_alternative ?31 ?32
15285 18592: Id : 14, {_}:
15286 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
15287 [35, 34] by left_alternative ?34 ?35
15288 18592: Id : 15, {_}:
15289 associator ?37 ?38 ?39
15291 add (multiply (multiply ?37 ?38) ?39)
15292 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
15293 [39, 38, 37] by associator ?37 ?38 ?39
15294 18592: Id : 16, {_}:
15297 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
15298 [42, 41] by commutator ?41 ?42
15299 18592: Id : 17, {_}:
15300 multiply (additive_inverse ?44) (additive_inverse ?45)
15303 [45, 44] by product_of_inverses ?44 ?45
15304 18592: Id : 18, {_}:
15305 multiply (additive_inverse ?47) ?48
15307 additive_inverse (multiply ?47 ?48)
15308 [48, 47] by inverse_product1 ?47 ?48
15309 18592: Id : 19, {_}:
15310 multiply ?50 (additive_inverse ?51)
15312 additive_inverse (multiply ?50 ?51)
15313 [51, 50] by inverse_product2 ?50 ?51
15314 18592: Id : 20, {_}:
15315 multiply ?53 (add ?54 (additive_inverse ?55))
15317 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
15318 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
15319 18592: Id : 21, {_}:
15320 multiply (add ?57 (additive_inverse ?58)) ?59
15322 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
15323 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
15324 18592: Id : 22, {_}:
15325 multiply (additive_inverse ?61) (add ?62 ?63)
15327 add (additive_inverse (multiply ?61 ?62))
15328 (additive_inverse (multiply ?61 ?63))
15329 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
15330 18592: Id : 23, {_}:
15331 multiply (add ?65 ?66) (additive_inverse ?67)
15333 add (additive_inverse (multiply ?65 ?67))
15334 (additive_inverse (multiply ?66 ?67))
15335 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
15337 18592: Id : 1, {_}:
15338 add (associator (multiply x y) z w) (associator x y (commutator z w))
15340 add (multiply x (associator y z w)) (multiply (associator x z w) y)
15341 [] by prove_challenge
15342 % SZS status Timeout for RNG033-7.p
15344 18634: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
15345 18634: Id : 3, {_}:
15346 add ?4 additive_identity =>= ?4
15347 [4] by right_additive_identity ?4
15348 18634: Id : 4, {_}:
15349 multiply additive_identity ?6 =>= additive_identity
15350 [6] by left_multiplicative_zero ?6
15351 18634: Id : 5, {_}:
15352 multiply ?8 additive_identity =>= additive_identity
15353 [8] by right_multiplicative_zero ?8
15354 18634: Id : 6, {_}:
15355 add (additive_inverse ?10) ?10 =>= additive_identity
15356 [10] by left_additive_inverse ?10
15357 18634: Id : 7, {_}:
15358 add ?12 (additive_inverse ?12) =>= additive_identity
15359 [12] by right_additive_inverse ?12
15360 18634: Id : 8, {_}:
15361 additive_inverse (additive_inverse ?14) =>= ?14
15362 [14] by additive_inverse_additive_inverse ?14
15363 18634: Id : 9, {_}:
15364 multiply ?16 (add ?17 ?18)
15366 add (multiply ?16 ?17) (multiply ?16 ?18)
15367 [18, 17, 16] by distribute1 ?16 ?17 ?18
15368 18634: Id : 10, {_}:
15369 multiply (add ?20 ?21) ?22
15371 add (multiply ?20 ?22) (multiply ?21 ?22)
15372 [22, 21, 20] by distribute2 ?20 ?21 ?22
15373 18634: Id : 11, {_}:
15374 add ?24 ?25 =<->= add ?25 ?24
15375 [25, 24] by commutativity_for_addition ?24 ?25
15376 18634: Id : 12, {_}:
15377 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
15378 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
15379 18634: Id : 13, {_}:
15380 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
15381 [32, 31] by right_alternative ?31 ?32
15382 18634: Id : 14, {_}:
15383 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
15384 [35, 34] by left_alternative ?34 ?35
15385 18634: Id : 15, {_}:
15386 associator ?37 ?38 ?39
15388 add (multiply (multiply ?37 ?38) ?39)
15389 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
15390 [39, 38, 37] by associator ?37 ?38 ?39
15391 18634: Id : 16, {_}:
15394 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
15395 [42, 41] by commutator ?41 ?42
15396 18634: Id : 17, {_}:
15397 multiply ?44 (multiply ?45 (multiply ?46 ?45))
15399 multiply (multiply (multiply ?44 ?45) ?46) ?45
15400 [46, 45, 44] by right_moufang ?44 ?45 ?46
15402 18634: Id : 1, {_}:
15403 add (associator (multiply x y) z w) (associator x y (commutator z w))
15405 add (multiply x (associator y z w)) (multiply (associator x z w) y)
15406 [] by prove_challenge
15407 % SZS status Timeout for RNG033-8.p
15409 18653: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
15410 18653: Id : 3, {_}:
15411 add ?4 additive_identity =>= ?4
15412 [4] by right_additive_identity ?4
15413 18653: Id : 4, {_}:
15414 multiply additive_identity ?6 =>= additive_identity
15415 [6] by left_multiplicative_zero ?6
15416 18653: Id : 5, {_}:
15417 multiply ?8 additive_identity =>= additive_identity
15418 [8] by right_multiplicative_zero ?8
15419 18653: Id : 6, {_}:
15420 add (additive_inverse ?10) ?10 =>= additive_identity
15421 [10] by left_additive_inverse ?10
15422 18653: Id : 7, {_}:
15423 add ?12 (additive_inverse ?12) =>= additive_identity
15424 [12] by right_additive_inverse ?12
15425 18653: Id : 8, {_}:
15426 additive_inverse (additive_inverse ?14) =>= ?14
15427 [14] by additive_inverse_additive_inverse ?14
15428 18653: Id : 9, {_}:
15429 multiply ?16 (add ?17 ?18)
15431 add (multiply ?16 ?17) (multiply ?16 ?18)
15432 [18, 17, 16] by distribute1 ?16 ?17 ?18
15433 18653: Id : 10, {_}:
15434 multiply (add ?20 ?21) ?22
15436 add (multiply ?20 ?22) (multiply ?21 ?22)
15437 [22, 21, 20] by distribute2 ?20 ?21 ?22
15438 18653: Id : 11, {_}:
15439 add ?24 ?25 =<->= add ?25 ?24
15440 [25, 24] by commutativity_for_addition ?24 ?25
15441 18653: Id : 12, {_}:
15442 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
15443 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
15444 18653: Id : 13, {_}:
15445 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
15446 [32, 31] by right_alternative ?31 ?32
15447 18653: Id : 14, {_}:
15448 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
15449 [35, 34] by left_alternative ?34 ?35
15450 18653: Id : 15, {_}:
15451 associator ?37 ?38 ?39
15453 add (multiply (multiply ?37 ?38) ?39)
15454 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
15455 [39, 38, 37] by associator ?37 ?38 ?39
15456 18653: Id : 16, {_}:
15459 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
15460 [42, 41] by commutator ?41 ?42
15461 18653: Id : 17, {_}:
15462 multiply (additive_inverse ?44) (additive_inverse ?45)
15465 [45, 44] by product_of_inverses ?44 ?45
15466 18653: Id : 18, {_}:
15467 multiply (additive_inverse ?47) ?48
15469 additive_inverse (multiply ?47 ?48)
15470 [48, 47] by inverse_product1 ?47 ?48
15471 18653: Id : 19, {_}:
15472 multiply ?50 (additive_inverse ?51)
15474 additive_inverse (multiply ?50 ?51)
15475 [51, 50] by inverse_product2 ?50 ?51
15476 18653: Id : 20, {_}:
15477 multiply ?53 (add ?54 (additive_inverse ?55))
15479 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
15480 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
15481 18653: Id : 21, {_}:
15482 multiply (add ?57 (additive_inverse ?58)) ?59
15484 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
15485 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
15486 18653: Id : 22, {_}:
15487 multiply (additive_inverse ?61) (add ?62 ?63)
15489 add (additive_inverse (multiply ?61 ?62))
15490 (additive_inverse (multiply ?61 ?63))
15491 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
15492 18653: Id : 23, {_}:
15493 multiply (add ?65 ?66) (additive_inverse ?67)
15495 add (additive_inverse (multiply ?65 ?67))
15496 (additive_inverse (multiply ?66 ?67))
15497 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
15498 18653: Id : 24, {_}:
15499 multiply ?69 (multiply ?70 (multiply ?71 ?70))
15501 multiply (multiply (multiply ?69 ?70) ?71) ?70
15502 [71, 70, 69] by right_moufang ?69 ?70 ?71
15504 18653: Id : 1, {_}:
15505 add (associator (multiply x y) z w) (associator x y (commutator z w))
15507 add (multiply x (associator y z w)) (multiply (associator x z w) y)
15508 [] by prove_challenge
15509 % SZS status Timeout for RNG033-9.p
15511 18692: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
15512 18692: Id : 3, {_}:
15513 add ?4 additive_identity =>= ?4
15514 [4] by right_additive_identity ?4
15515 18692: Id : 4, {_}:
15516 add (additive_inverse ?6) ?6 =>= additive_identity
15517 [6] by left_additive_inverse ?6
15518 18692: Id : 5, {_}:
15519 add ?8 (additive_inverse ?8) =>= additive_identity
15520 [8] by right_additive_inverse ?8
15521 18692: Id : 6, {_}:
15522 add ?10 (add ?11 ?12) =?= add (add ?10 ?11) ?12
15523 [12, 11, 10] by associativity_for_addition ?10 ?11 ?12
15524 18692: Id : 7, {_}:
15525 add ?14 ?15 =<->= add ?15 ?14
15526 [15, 14] by commutativity_for_addition ?14 ?15
15527 18692: Id : 8, {_}:
15528 multiply ?17 (multiply ?18 ?19) =?= multiply (multiply ?17 ?18) ?19
15529 [19, 18, 17] by associativity_for_multiplication ?17 ?18 ?19
15530 18692: Id : 9, {_}:
15531 multiply ?21 (add ?22 ?23)
15533 add (multiply ?21 ?22) (multiply ?21 ?23)
15534 [23, 22, 21] by distribute1 ?21 ?22 ?23
15535 18692: Id : 10, {_}:
15536 multiply (add ?25 ?26) ?27
15538 add (multiply ?25 ?27) (multiply ?26 ?27)
15539 [27, 26, 25] by distribute2 ?25 ?26 ?27
15540 18692: Id : 11, {_}:
15541 multiply ?29 (multiply ?29 (multiply ?29 ?29)) =>= ?29
15542 [29] by x_fourthed_is_x ?29
15543 18692: Id : 12, {_}: multiply a b =>= c [] by a_times_b_is_c
15545 18692: Id : 1, {_}: multiply b a =>= c [] by prove_commutativity
15546 % SZS status Timeout for RNG035-7.p
15548 18715: Id : 2, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
15549 18715: Id : 3, {_}:
15550 add ?4 additive_identity =>= ?4
15551 [4] by right_additive_identity ?4
15552 18715: Id : 4, {_}:
15553 add (additive_inverse ?6) ?6 =>= additive_identity
15554 [6] by left_additive_inverse ?6
15555 18715: Id : 5, {_}:
15556 add ?8 (additive_inverse ?8) =>= additive_identity
15557 [8] by right_additive_inverse ?8
15558 18715: Id : 6, {_}:
15559 add ?10 (add ?11 ?12) =?= add (add ?10 ?11) ?12
15560 [12, 11, 10] by associativity_for_addition ?10 ?11 ?12
15561 18715: Id : 7, {_}:
15562 add ?14 ?15 =<->= add ?15 ?14
15563 [15, 14] by commutativity_for_addition ?14 ?15
15564 18715: Id : 8, {_}:
15565 multiply ?17 (multiply ?18 ?19) =?= multiply (multiply ?17 ?18) ?19
15566 [19, 18, 17] by associativity_for_multiplication ?17 ?18 ?19
15567 18715: Id : 9, {_}:
15568 multiply ?21 (add ?22 ?23)
15570 add (multiply ?21 ?22) (multiply ?21 ?23)
15571 [23, 22, 21] by distribute1 ?21 ?22 ?23
15572 18715: Id : 10, {_}:
15573 multiply (add ?25 ?26) ?27
15575 add (multiply ?25 ?27) (multiply ?26 ?27)
15576 [27, 26, 25] by distribute2 ?25 ?26 ?27
15577 18715: Id : 11, {_}:
15578 multiply ?29 (multiply ?29 (multiply ?29 (multiply ?29 ?29))) =>= ?29
15579 [29] by x_fifthed_is_x ?29
15580 18715: Id : 12, {_}: multiply a b =>= c [] by a_times_b_is_c
15582 18715: Id : 1, {_}: multiply b a =>= c [] by prove_commutativity
15583 % SZS status Timeout for RNG036-7.p
15585 18765: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15586 18765: Id : 3, {_}:
15587 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15588 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15589 18765: Id : 4, {_}:
15590 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15593 [10, 9] by robbins_axiom ?9 ?10
15595 18765: Id : 1, {_}:
15596 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15599 [] by prove_huntingtons_axiom
15600 % SZS status Timeout for ROB001-1.p
15602 18785: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15603 18785: Id : 3, {_}:
15604 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15605 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15606 18785: Id : 4, {_}:
15607 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15610 [10, 9] by robbins_axiom ?9 ?10
15611 18785: Id : 5, {_}: add c c =>= c [] by idempotence
15613 18785: Id : 1, {_}:
15614 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15617 [] by prove_huntingtons_axiom
15618 % SZS status Timeout for ROB005-1.p
15620 18815: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15621 18815: Id : 3, {_}:
15622 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15623 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15624 18815: Id : 4, {_}:
15625 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15628 [10, 9] by robbins_axiom ?9 ?10
15629 18815: Id : 5, {_}: add c d =>= d [] by absorbtion
15631 18815: Id : 1, {_}:
15632 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15635 [] by prove_huntingtons_axiom
15636 % SZS status Timeout for ROB006-1.p
15638 18835: Id : 2, {_}: add ?3 ?4 =<->= add ?4 ?3 [4, 3] by commutativity_of_add ?3 ?4
15639 18835: Id : 3, {_}:
15640 add (add ?6 ?7) ?8 =?= add ?6 (add ?7 ?8)
15641 [8, 7, 6] by associativity_of_add ?6 ?7 ?8
15642 18835: Id : 4, {_}:
15643 negate (add (negate (add ?10 ?11)) (negate (add ?10 (negate ?11))))
15646 [11, 10] by robbins_axiom ?10 ?11
15647 18835: Id : 5, {_}: add c d =>= d [] by absorbtion
15649 18835: Id : 1, {_}: add ?1 ?1 =>= ?1 [1] by prove_idempotence ?1
15650 % SZS status Timeout for ROB006-2.p
15652 19013: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15653 19013: Id : 3, {_}:
15654 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15655 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15656 19013: Id : 4, {_}:
15657 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15660 [10, 9] by robbins_axiom ?9 ?10
15661 19013: Id : 5, {_}: negate (add a b) =>= negate b [] by condition
15663 19013: Id : 1, {_}:
15664 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15667 [] by prove_huntingtons_axiom
15668 % SZS status Timeout for ROB007-1.p
15670 19034: Id : 2, {_}: add ?3 ?4 =<->= add ?4 ?3 [4, 3] by commutativity_of_add ?3 ?4
15671 19034: Id : 3, {_}:
15672 add (add ?6 ?7) ?8 =?= add ?6 (add ?7 ?8)
15673 [8, 7, 6] by associativity_of_add ?6 ?7 ?8
15674 19034: Id : 4, {_}:
15675 negate (add (negate (add ?10 ?11)) (negate (add ?10 (negate ?11))))
15678 [11, 10] by robbins_axiom ?10 ?11
15679 19034: Id : 5, {_}: negate (add a b) =>= negate b [] by condition
15681 19034: Id : 1, {_}: add ?1 ?1 =>= ?1 [1] by prove_idempotence ?1
15682 % SZS status Timeout for ROB007-2.p
15684 19076: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15685 19076: Id : 3, {_}:
15686 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15687 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15688 19076: Id : 4, {_}:
15689 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15692 [10, 9] by robbins_axiom ?9 ?10
15693 19076: Id : 5, {_}: negate (add a (negate b)) =>= b [] by condition1
15695 19076: Id : 1, {_}:
15696 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15699 [] by prove_huntingtons_axiom
15700 % SZS status Timeout for ROB020-1.p
15702 19097: Id : 2, {_}: add ?3 ?4 =<->= add ?4 ?3 [4, 3] by commutativity_of_add ?3 ?4
15703 19097: Id : 3, {_}:
15704 add (add ?6 ?7) ?8 =?= add ?6 (add ?7 ?8)
15705 [8, 7, 6] by associativity_of_add ?6 ?7 ?8
15706 19097: Id : 4, {_}:
15707 negate (add (negate (add ?10 ?11)) (negate (add ?10 (negate ?11))))
15710 [11, 10] by robbins_axiom ?10 ?11
15711 19097: Id : 5, {_}: negate (add a (negate b)) =>= b [] by condition1
15713 19097: Id : 1, {_}: add ?1 ?1 =>= ?1 [1] by prove_idempotence ?1
15714 % SZS status Timeout for ROB020-2.p
15716 19127: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15717 19127: Id : 3, {_}:
15718 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15719 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15720 19127: Id : 4, {_}:
15721 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15724 [10, 9] by robbins_axiom ?9 ?10
15725 19127: Id : 5, {_}:
15726 negate (add (negate (add a (add a b))) (negate (add a (negate b))))
15729 [] by the_condition
15731 19127: Id : 1, {_}:
15732 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15735 [] by prove_huntingtons_axiom
15736 % SZS status Timeout for ROB024-1.p
15738 19150: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15739 19150: Id : 3, {_}:
15740 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15741 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15742 19150: Id : 4, {_}:
15743 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15746 [10, 9] by robbins_axiom ?9 ?10
15747 19150: Id : 5, {_}: add c d =>= c [] by identity_constant
15749 19150: Id : 1, {_}:
15750 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15753 [] by prove_huntingtons_axiom
15754 % SZS status Timeout for ROB026-1.p
15756 19181: Id : 2, {_}: add ?2 ?3 =<->= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
15757 19181: Id : 3, {_}:
15758 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
15759 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
15760 19181: Id : 4, {_}:
15761 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
15764 [10, 9] by robbins_axiom ?9 ?10
15765 19181: Id : 5, {_}: negate (negate c) =>= c [] by double_negation
15767 19181: Id : 1, {_}:
15768 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
15771 [] by prove_huntingtons_axiom
15772 % SZS status Timeout for ROB027-1.p
15774 19200: Id : 2, {_}: add ?4 ?5 =<->= add ?5 ?4 [5, 4] by commutativity_of_add ?4 ?5
15775 19200: Id : 3, {_}:
15776 add (add ?7 ?8) ?9 =?= add ?7 (add ?8 ?9)
15777 [9, 8, 7] by associativity_of_add ?7 ?8 ?9
15778 19200: Id : 4, {_}:
15779 negate (add (negate (add ?11 ?12)) (negate (add ?11 (negate ?12))))
15782 [12, 11] by robbins_axiom ?11 ?12
15784 19200: Id : 1, {_}:
15785 negate (add ?1 ?2) =>= negate ?2
15786 [2, 1] by prove_absorption_within_negation ?1 ?2
15787 % SZS status Timeout for ROB031-1.p
15789 19230: Id : 2, {_}: add ?4 ?5 =<->= add ?5 ?4 [5, 4] by commutativity_of_add ?4 ?5
15790 19230: Id : 3, {_}:
15791 add (add ?7 ?8) ?9 =?= add ?7 (add ?8 ?9)
15792 [9, 8, 7] by associativity_of_add ?7 ?8 ?9
15793 19230: Id : 4, {_}:
15794 negate (add (negate (add ?11 ?12)) (negate (add ?11 (negate ?12))))
15797 [12, 11] by robbins_axiom ?11 ?12
15799 19230: Id : 1, {_}: add ?1 ?2 =>= ?2 [2, 1] by prove_absorbtion ?1 ?2
15800 % SZS status Timeout for ROB032-1.p
15802 19250: Id : 2, {_}: f (g1 ?3) =>= ?3 [3] by clause1 ?3
15803 19250: Id : 3, {_}: f (g2 ?5) =>= ?5 [5] by clause2 ?5
15805 19250: Id : 1, {_}: g1 ?1 =<= g2 ?1 [1] by clause3 ?1
15806 !! infer_left 2 0.0000 0.0000 0.0000
15807 !! infer_right 2 0.0001 0.0001 0.0001
15808 !! simplify_goal 2 0.0000 0.0000 0.0000
15809 !! keep_simplified 2 0.0001 0.0001 0.0000
15810 !! simplification_step 2 0.0001 0.0000 0.0000
15811 !! simplify 5 0.0001 0.0000 0.0000
15812 !! orphan_murder 2 0.0000 0.0000 0.0000
15813 !! deep_eq 2 0.0000 0.0000 0.0000
15814 !! is_subsumed 3 0.0000 0.0000 0.0000
15815 !! build_new_clause 2 0.0000 0.0000 0.0000
15816 !! demodulate 5 0.0001 0.0000 0.0000
15817 !! demod 10 0.0000 0.0000 0.0000
15818 !! demod.retrieve_generalizations 10 0.0000 0.0000 0.0000
15819 !! build_clause 2 0.0000 0.0000 0.0000
15820 !! compare_terms(nrkbo) 5 0.0000 0.0000 0.0000
15821 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
15822 !! infer_left 2 0.0000 0.0000 0.0000
15823 !! infer_right 2 0.0001 0.0001 0.0001
15824 !! simplify_goal 2 0.0001 0.0000 0.0000
15825 !! keep_simplified 2 0.0001 0.0001 0.0001
15826 !! simplification_step 2 0.0001 0.0001 0.0000
15827 !! simplify 5 0.0001 0.0000 0.0000
15828 !! orphan_murder 2 0.0000 0.0000 0.0000
15829 !! deep_eq 2 0.0000 0.0000 0.0000
15830 !! is_subsumed 3 0.0000 0.0000 0.0000
15831 !! build_new_clause 2 0.0000 0.0000 0.0000
15832 !! demodulate 5 0.0001 0.0000 0.0000
15833 !! demod 10 0.0000 0.0000 0.0000
15834 !! demod.retrieve_generalizations 10 0.0000 0.0000 0.0000
15835 !! build_clause 2 0.0000 0.0000 0.0000
15836 !! compare_terms(kbo) 5 0.0000 0.0000 0.0000
15837 !! compare_terms(nrkbo) 3 0.0000 0.0000 0.0000
15838 !! infer_left 2 0.0000 0.0000 0.0000
15839 !! infer_right 2 0.0001 0.0001 0.0001
15840 !! simplify_goal 2 0.0001 0.0000 0.0000
15841 !! keep_simplified 2 0.0001 0.0001 0.0001
15842 !! simplification_step 2 0.0001 0.0001 0.0001
15843 !! simplify 5 0.0001 0.0000 0.0000
15844 !! orphan_murder 2 0.0000 0.0000 0.0000
15845 !! deep_eq 2 0.0000 0.0000 0.0000
15846 !! is_subsumed 3 0.0000 0.0000 0.0000
15847 !! build_new_clause 2 0.0000 0.0000 0.0000
15848 !! demodulate 5 0.0001 0.0000 0.0000
15849 !! demod 10 0.0000 0.0000 0.0000
15850 !! demod.retrieve_generalizations 10 0.0000 0.0000 0.0000
15851 !! build_clause 2 0.0000 0.0000 0.0000
15852 !! compare_terms(lpo) 5 0.0000 0.0000 0.0000
15853 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
15854 !! infer_left 1 0.0000 0.0000 0.0000
15855 !! infer_right 2 0.0001 0.0001 0.0001
15856 !! simplify_goal 1 0.0000 0.0000 0.0000
15857 !! keep_simplified 2 0.0001 0.0001 0.0001
15858 !! simplification_step 2 0.0001 0.0001 0.0000
15859 !! simplify 5 0.0001 0.0000 0.0000
15860 !! orphan_murder 2 0.0000 0.0000 0.0000
15861 !! deep_eq 1 0.0000 0.0000 0.0000
15862 !! is_subsumed 3 0.0000 0.0000 0.0000
15863 !! build_new_clause 2 0.0000 0.0000 0.0000
15864 !! demodulate 4 0.0001 0.0000 0.0000
15865 !! demod 8 0.0000 0.0000 0.0000
15866 !! demod.retrieve_generalizations 8 0.0000 0.0000 0.0000
15867 !! build_clause 2 0.0000 0.0000 0.0000
15868 !! compare_terms(nrkbo) 5 0.0000 0.0000 0.0000
15869 !! compare_terms(nrkbo) 3 0.0001 0.0000 0.0000
15870 % SZS status Timeout for SYN305-1.p