definition lsub_trans: ∀A,B. relation2 (A→relation B) (relation A) ≝ λA,B,R1,R2.
∀L2,T1,T2. R1 L2 T1 T2 → ∀L1. R2 L1 L2 → R1 L1 T1 T2.
-definition s_r_trans: ∀A,B. relation2 (A→relation B) (relation A) ≝ λA,B,R1,R2.
- ∀L2,T1,T2. R1 L2 T1 T2 → ∀L1. R2 L1 L2 → LTC … R1 L1 T1 T2.
+definition s_r_transitive: ∀A,B. relation2 (A→relation B) (B→relation A) ≝ λA,B,R1,R2.
+ ∀L2,T1,T2. R1 L2 T1 T2 → ∀L1. R2 T1 L1 L2 → LTC … R1 L1 T1 T2.
-definition s_rs_trans: ∀A,B. relation2 (A→relation B) (relation A) ≝ λA,B,R1,R2.
- ∀L2,T1,T2. LTC … R1 L2 T1 T2 → ∀L1. R2 L1 L2 → LTC … R1 L1 T1 T2.
+definition s_rs_transitive: ∀A,B. relation2 (A→relation B) (B→relation A) ≝ λA,B,R1,R2.
+ ∀L2,T1,T2. LTC … R1 L2 T1 T2 → ∀L1. R2 T1 L1 L2 → LTC … R1 L1 T1 T2.
+
+definition s_r_confluent1: ∀A,B. relation2 (A→relation B) (B→relation A) ≝ λA,B,R1,R2.
+ ∀L1,T1,T2. R1 L1 T1 T2 → ∀L2. R2 T1 L1 L2 → R2 T2 L1 L2.
lemma TC_strip1: ∀A,R1,R2. confluent2 A R1 R2 →
∀a0,a1. TC … R1 a0 a1 → ∀a2. R2 a0 a2 →
∃∃a. R2 a1 a & TC … R1 a2 a.
#A #R1 #R2 #HR12 #a0 #a1 #H elim H -a1
[ #a1 #Ha01 #a2 #Ha02
- elim (HR12 … Ha01 … Ha02) -HR12 -a0 /3 width=3/
+ elim (HR12 … Ha01 … Ha02) -HR12 -a0 /3 width=3 by inj, ex2_intro/
| #a #a1 #_ #Ha1 #IHa0 #a2 #Ha02
elim (IHa0 … Ha02) -a0 #a0 #Ha0 #Ha20
- elim (HR12 … Ha1 … Ha0) -HR12 -a /4 width=5/
+ elim (HR12 … Ha1 … Ha0) -HR12 -a /4 width=5 by step, ex2_intro/
]
qed.
∃∃a. TC … R2 a1 a & R1 a2 a.
#A #R1 #R2 #HR12 #a0 #a2 #H elim H -a2
[ #a2 #Ha02 #a1 #Ha01
- elim (HR12 … Ha01 … Ha02) -HR12 -a0 /3 width=3/
+ elim (HR12 … Ha01 … Ha02) -HR12 -a0 /3 width=3 by inj, ex2_intro/
| #a #a2 #_ #Ha2 #IHa0 #a1 #Ha01
elim (IHa0 … Ha01) -a0 #a0 #Ha10 #Ha0
- elim (HR12 … Ha0 … Ha2) -HR12 -a /4 width=3/
+ elim (HR12 … Ha0 … Ha2) -HR12 -a /4 width=3 by step, ex2_intro/
]
qed.
confluent2 A R1 R2 → confluent2 A (TC … R1) (TC … R2).
#A #R1 #R2 #HR12 #a0 #a1 #H elim H -a1
[ #a1 #Ha01 #a2 #Ha02
- elim (TC_strip2 … HR12 … Ha02 … Ha01) -HR12 -a0 /3 width=3/
+ elim (TC_strip2 … HR12 … Ha02 … Ha01) -HR12 -a0 /3 width=3 by inj, ex2_intro/
| #a #a1 #_ #Ha1 #IHa0 #a2 #Ha02
elim (IHa0 … Ha02) -a0 #a0 #Ha0 #Ha20
- elim (TC_strip2 … HR12 … Ha0 … Ha1) -HR12 -a /4 width=5/
+ elim (TC_strip2 … HR12 … Ha0 … Ha1) -HR12 -a /4 width=5 by step, ex2_intro/
]
qed.
∃∃a. R2 a1 a & TC … R1 a a2.
#A #R1 #R2 #HR12 #a1 #a0 #H elim H -a0
[ #a0 #Ha10 #a2 #Ha02
- elim (HR12 … Ha10 … Ha02) -HR12 -a0 /3 width=3/
+ elim (HR12 … Ha10 … Ha02) -HR12 -a0 /3 width=3 by inj, ex2_intro/
| #a #a0 #_ #Ha0 #IHa #a2 #Ha02
elim (HR12 … Ha0 … Ha02) -HR12 -a0 #a0 #Ha0 #Ha02
- elim (IHa … Ha0) -a /4 width=5/
+ elim (IHa … Ha0) -a /4 width=5 by step, ex2_intro/
]
qed.
∃∃a. TC … R2 a1 a & R1 a a2.
#A #R1 #R2 #HR12 #a0 #a2 #H elim H -a2
[ #a2 #Ha02 #a1 #Ha10
- elim (HR12 … Ha10 … Ha02) -HR12 -a0 /3 width=3/
+ elim (HR12 … Ha10 … Ha02) -HR12 -a0 /3 width=3 by inj, ex2_intro/
| #a #a2 #_ #Ha02 #IHa #a1 #Ha10
elim (IHa … Ha10) -a0 #a0 #Ha10 #Ha0
- elim (HR12 … Ha0 … Ha02) -HR12 -a /4 width=3/
+ elim (HR12 … Ha0 … Ha02) -HR12 -a /4 width=3 by step, ex2_intro/
]
qed.
transitive2 A R1 R2 → transitive2 A (TC … R1) (TC … R2).
#A #R1 #R2 #HR12 #a1 #a0 #H elim H -a0
[ #a0 #Ha10 #a2 #Ha02
- elim (TC_strap2 … HR12 … Ha02 … Ha10) -HR12 -a0 /3 width=3/
+ elim (TC_strap2 … HR12 … Ha02 … Ha10) -HR12 -a0 /3 width=3 by inj, ex2_intro/
| #a #a0 #_ #Ha0 #IHa #a2 #Ha02
elim (TC_strap2 … HR12 … Ha02 … Ha0) -HR12 -a0 #a0 #Ha0 #Ha02
- elim (IHa … Ha0) -a /4 width=5/
+ elim (IHa … Ha0) -a /4 width=5 by step, ex2_intro/
]
qed.
lemma NF_to_SN: ∀A,R,S,a. NF A R S a → SN A R S a.
#A #R #S #a1 #Ha1
@SN_intro #a2 #HRa12 #HSa12
-elim HSa12 -HSa12 /2 width=1/
+elim HSa12 -HSa12 /2 width=1 by/
qed.
lemma SN_to_NF: ∀A,R,S. NF_dec A R S →
∀a1. SN A R S a1 →
∃∃a2. star … R a1 a2 & NF A R S a2.
#A #R #S #HRS #a1 #H elim H -a1
-#a1 #_ #IHa1 elim (HRS a1) -HRS /2 width=3/
-* #a0 #Ha10 #Ha01 elim (IHa1 … Ha10 Ha01) -IHa1 -Ha01 /3 width=3/
+#a1 #_ #IHa1 elim (HRS a1) -HRS /2 width=3 by srefl, ex2_intro/
+* #a0 #Ha10 #Ha01 elim (IHa1 … Ha10 Ha01) -IHa1 -Ha01 /3 width=3 by star_compl, ex2_intro/
qed-.
definition NF_sn: ∀A. relation A → relation A → predicate A ≝
lemma NF_to_SN_sn: ∀A,R,S,a. NF_sn A R S a → SN_sn A R S a.
#A #R #S #a2 #Ha2
@SN_sn_intro #a1 #HRa12 #HSa12
-elim HSa12 -HSa12 /2 width=1/
+elim HSa12 -HSa12 /2 width=1 by/
qed.
lemma LTC_lsub_trans: ∀A,B,R,S. lsub_trans A B R S → lsub_trans A B (LTC … R) S.
-#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 [ /3 width=3/ ]
+#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 /3 width=3 by inj/
#T #T2 #_ #HT2 #IHT1 #L1 #HL12
-lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3/
+lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3 by step/
qed-.
-lemma s_r_trans_TC1: ∀A,B,R,S. s_r_trans A B R S → s_rs_trans A B R S.
-#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 [ /3 width=3/ ]
-#T #T2 #_ #HT2 #IHT1 #L1 #HL12
-lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3/
+lemma s_r_conf1_LTC1: ∀A,B,S,R. s_r_confluent1 A B S R → s_r_confluent1 A B (LTC … S) R.
+#A #B #S #R #HSR #L1 #T1 #T2 #H @(TC_ind_dx … T1 H) -T1 /3 width=3 by/
+qed-.
+
+lemma s_r_trans_LTC1: ∀A,B,S,R. s_r_confluent1 A B S R →
+ s_r_transitive A B S R → s_rs_transitive A B S R.
+#A #B #S #R #H1SR #H2SR #L2 #T1 #T2 #H @(TC_ind_dx … T1 H) -T1 /2 width=3 by/
+#T1 #T #HT1 #_ #IHT2 #L1 #HL12 lapply (H2SR … HT1 … HL12) -H2SR -HT1
+/4 width=5 by s_r_conf1_LTC1, trans_TC/
qed-.
-lemma s_r_trans_TC2: ∀A,B,R,S. s_rs_trans A B R S → s_r_trans A B R (TC … S).
-#A #B #R #S #HRS #L2 #T1 #T2 #HT12 #L1 #H @(TC_ind_dx … L1 H) -L1 /2 width=3/ /3 width=3/
+lemma s_r_trans_LTC2: ∀A,B,S,R. s_rs_transitive A B S R → s_r_transitive A B S (LTC … R).
+#A #B #S #R #HSR #L2 #T1 #T2 #HT12 #L1 #H @(TC_ind_dx … L1 H) -L1 /3 width=3 by inj/
qed-.
(* relations on unboxed pairs ***********************************************)
∃∃a,b. bi_TC … R a1 b1 a b & R a2 b2 a b.
#A #B #R #HR #a0 #a1 #b0 #b1 #H01 #a2 #b2 #H elim H -a2 -b2
[ #a2 #b2 #H02
- elim (HR … H01 … H02) -HR -a0 -b0 /3 width=4/
+ elim (HR … H01 … H02) -HR -a0 -b0 /3 width=4 by ex2_2_intro, bi_inj/
| #a2 #b2 #a3 #b3 #_ #H23 * #a #b #H1 #H2
- elim (HR … H23 … H2) -HR -a0 -b0 -a2 -b2 /3 width=4/
+ elim (HR … H23 … H2) -HR -a0 -b0 -a2 -b2 /3 width=4 by ex2_2_intro, bi_step/
]
qed.
bi_confluent A B (bi_TC … R).
#A #B #R #HR #a0 #a1 #b0 #b1 #H elim H -a1 -b1
[ #a1 #b1 #H01 #a2 #b2 #H02
- elim (bi_TC_strip … HR … H01 … H02) -a0 -b0 /3 width=4/
+ elim (bi_TC_strip … HR … H01 … H02) -a0 -b0 /3 width=4 by ex2_2_intro, bi_inj/
| #a1 #b1 #a3 #b3 #_ #H13 #IH #a2 #b2 #H02
elim (IH … H02) -a0 -b0 #a0 #b0 #H10 #H20
- elim (bi_TC_strip … HR … H13 … H10) -a1 -b1 /3 width=7/
+ elim (bi_TC_strip … HR … H13 … H10) -a1 -b1 /3 width=7 by ex2_2_intro, bi_step/
]
qed.
∀a1,a2,b1,b2. bi_TC … R a1 b1 a2 b2 →
R a1 b1 a2 b2 ∨
∃∃a,b. bi_TC … R a1 b1 a b & R a b a2 b2.
-#A #B #R #a1 #a2 #b1 #b2 * -a2 -b2 /2 width=1/ /3 width=4/
+#A #B #R #a1 #a2 #b1 #b2 * -a2 -b2 /2 width=1/ /3 width=4 by ex2_2_intro, or_intror/
qed-.
lemma bi_TC_decomp_l: ∀A,B. ∀R:bi_relation A B.
R a1 b1 a2 b2 ∨
∃∃a,b. R a1 b1 a b & bi_TC … R a b a2 b2.
#A #B #R #a1 #a2 #b1 #b2 #H @(bi_TC_ind_dx … a1 b1 H) -a1 -b1
-[ /2 width=1/
-| #a1 #a #b1 #b #Hab1 #Hab2 #_ /3 width=4/
+[ /2 width=1 by or_introl/
+| #a1 #a #b1 #b #Hab1 #Hab2 #_ /3 width=4 by ex2_2_intro, or_intror/ (**) (* auto fails without #_ *)
]
qed-.
∧∧ a1 = a2 & b1 = b2 & c1 = c2.
lemma tri_RC_reflexive: ∀A,B,C,R. tri_reflexive A B C (tri_RC … R).
-/3 width=1/ qed.
+/3 width=1 by and3_intro, or_intror/ qed.
definition tri_star: ∀A,B,C,R. tri_relation A B C ≝
λA,B,C,R. tri_RC A B C (tri_TC … R).
lemma tri_star_tri_reflexive: ∀A,B,C,R. tri_reflexive A B C (tri_star … R).
-/2 width=1/ qed.
+/2 width=1 by/ qed.
lemma tri_TC_to_tri_star: ∀A,B,C,R,a1,b1,c1,a2,b2,c2.
tri_TC A B C R a1 b1 c1 a2 b2 c2 →
tri_star A B C R a1 b1 c1 a2 b2 c2.
-/2 width=1/ qed.
+/2 width=1 by or_introl/ qed.
lemma tri_R_to_tri_star: ∀A,B,C,R,a1,b1,c1,a2,b2,c2.
R a1 b1 c1 a2 b2 c2 → tri_star A B C R a1 b1 c1 a2 b2 c2.
-/3 width=1/ qed.
+/3 width=1 by tri_TC_to_tri_star, tri_inj/ qed.
lemma tri_star_strap1: ∀A,B,C,R,a1,a,a2,b1,b,b2,c1,c,c2.
tri_star A B C R a1 b1 c1 a b c →
R a b c a2 b2 c2 → tri_star A B C R a1 b1 c1 a2 b2 c2.
#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 *
-[ /3 width=5/
-| * #H1 #H2 #H3 destruct /2 width=1/
+[ /3 width=5 by tri_TC_to_tri_star, tri_step/
+| * #H1 #H2 #H3 destruct /2 width=1 by tri_R_to_tri_star/
]
qed.
tri_star A B C R a b c a2 b2 c2 →
tri_star A B C R a1 b1 c1 a2 b2 c2.
#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 #H *
-[ /3 width=5/
-| * #H1 #H2 #H3 destruct /2 width=1/
+[ /3 width=5 by tri_TC_to_tri_star, tri_TC_strap/
+| * #H1 #H2 #H3 destruct /2 width=1 by tri_R_to_tri_star/
]
qed.
tri_TC A B C R a b c a2 b2 c2 →
tri_TC A B C R a1 b1 c1 a2 b2 c2.
#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 *
-[ /2 width=5/
-| * #H1 #H2 #H3 destruct /2 width=1/
+[ /2 width=5 by tri_TC_transitive/
+| * #H1 #H2 #H3 destruct /2 width=1 by/
]
qed.
tri_star A B C R a b c a2 b2 c2 →
tri_TC A B C R a1 b1 c1 a2 b2 c2.
#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 #H *
-[ /2 width=5/
-| * #H1 #H2 #H3 destruct /2 width=1/
+[ /2 width=5 by tri_TC_transitive/
+| * #H1 #H2 #H3 destruct /2 width=1 by/
]
qed.
lemma tri_tansitive_tri_star: ∀A,B,C,R. tri_transitive A B C (tri_star … R).
#A #B #C #R #a1 #a #b1 #b #c1 #c #H #a2 #b2 #c2 *
-[ /3 width=5/
-| * #H1 #H2 #H3 destruct /2 width=1/
+[ /3 width=5 by tri_star_to_tri_TC_to_tri_TC, tri_TC_to_tri_star/
+| * #H1 #H2 #H3 destruct /2 width=1 by/
]
qed.
(∀a,a2,b,b2,c,c2. tri_star … R a1 b1 c1 a b c → R a b c a2 b2 c2 → P a b c → P a2 b2 c2) →
∀a2,b2,c2. tri_star … R a1 b1 c1 a2 b2 c2 → P a2 b2 c2.
#A #B #C #R #a1 #b1 #c1 #P #H #IH #a2 #b2 #c2 *
-[ #H12 elim H12 -a2 -b2 -c2 /2 width=6/ -H /3 width=6/
+[ #H12 elim H12 -a2 -b2 -c2 /3 width=6 by tri_TC_to_tri_star/
| * #H1 #H2 #H3 destruct //
]
qed-.
(∀a1,a,b1,b,c1,c. R a1 b1 c1 a b c → tri_star … R a b c a2 b2 c2 → P a b c → P a1 b1 c1) →
∀a1,b1,c1. tri_star … R a1 b1 c1 a2 b2 c2 → P a1 b1 c1.
#A #B #C #R #a2 #b2 #c2 #P #H #IH #a1 #b1 #c1 *
-[ #H12 @(tri_TC_ind_dx … a1 b1 c1 H12) -a1 -b1 -c1 /2 width=6/ -H /3 width=6/
+[ #H12 @(tri_TC_ind_dx … a1 b1 c1 H12) -a1 -b1 -c1 /3 width=6 by tri_TC_to_tri_star/
| * #H1 #H2 #H3 destruct //
]
qed-.