1 (**************************************************************************)
4 (* ||A|| A project by Andrea Asperti *)
6 (* ||I|| Developers: *)
7 (* ||T|| The HELM team. *)
8 (* ||A|| http://helm.cs.unibo.it *)
10 (* \ / This file is distributed under the terms of the *)
11 (* v GNU General Public License Version 2 *)
13 (**************************************************************************)
15 include "ground_2/xoa/ex_1_2.ma".
16 include "ground_2/xoa/ex_3_4.ma".
17 include "ground_2/xoa/ex_4_4.ma".
18 include "ground_2/xoa/ex_4_5.ma".
19 include "ground_2/relocation/rtmap_id.ma".
20 include "static_2/notation/relations/relation_4.ma".
21 include "static_2/syntax/cext2.ma".
22 include "static_2/relocation/sex.ma".
23 include "static_2/static/frees.ma".
25 (* GENERIC EXTENSION ON REFERRED ENTRIES OF A CONTEXT-SENSITIVE REALTION ****)
27 definition rex (R) (T): relation lenv ≝
28 λL1,L2. ∃∃f. L1 ⊢ 𝐅+⦃T⦄ ≘ f & L1 ⪤[cext2 R,cfull,f] L2.
30 interpretation "generic extension on referred entries (local environment)"
31 'Relation R T L1 L2 = (rex R T L1 L2).
33 definition R_confluent2_rex: relation4 (relation3 lenv term term)
34 (relation3 lenv term term) … ≝
36 ∀L0,T0,T1. R1 L0 T0 T1 → ∀T2. R2 L0 T0 T2 →
37 ∀L1. L0 ⪤[RP1,T0] L1 → ∀L2. L0 ⪤[RP2,T0] L2 →
38 ∃∃T. R2 L1 T1 T & R1 L2 T2 T.
40 definition rex_confluent: relation … ≝
42 ∀K1,K,V1. K1 ⪤[R1,V1] K → ∀V. R1 K1 V1 V →
43 ∀K2. K ⪤[R2,V] K2 → K ⪤[R2,V1] K2.
45 definition rex_transitive: relation3 ? (relation3 ?? term) … ≝
47 ∀K1,K,V1. K1 ⪤[R1,V1] K →
48 ∀V. R1 K1 V1 V → ∀V2. R2 K V V2 → R3 K1 V1 V2.
50 (* Basic inversion lemmas ***************************************************)
52 lemma rex_inv_atom_sn (R): ∀Y2,T. ⋆ ⪤[R,T] Y2 → Y2 = ⋆.
53 #R #Y2 #T * /2 width=4 by sex_inv_atom1/
56 lemma rex_inv_atom_dx (R): ∀Y1,T. Y1 ⪤[R,T] ⋆ → Y1 = ⋆.
57 #R #I #Y1 * /2 width=4 by sex_inv_atom2/
60 lemma rex_inv_sort (R):
61 ∀Y1,Y2,s. Y1 ⪤[R,⋆s] Y2 →
63 | ∃∃I1,I2,L1,L2. L1 ⪤[R,⋆s] L2 & Y1 = L1.ⓘ{I1} & Y2 = L2.ⓘ{I2}.
64 #R * [ | #Y1 #I1 ] #Y2 #s * #f #H1 #H2
65 [ lapply (sex_inv_atom1 … H2) -H2 /3 width=1 by or_introl, conj/
66 | lapply (frees_inv_sort … H1) -H1 #Hf
67 elim (isid_inv_gen … Hf) -Hf #g #Hg #H destruct
68 elim (sex_inv_push1 … H2) -H2 #I2 #L2 #H12 #_ #H destruct
69 /5 width=7 by frees_sort, ex3_4_intro, ex2_intro, or_intror/
73 lemma rex_inv_zero (R):
74 ∀Y1,Y2. Y1 ⪤[R,#0] Y2 →
76 | ∃∃I,L1,L2,V1,V2. L1 ⪤[R,V1] L2 & R L1 V1 V2 &
77 Y1 = L1.ⓑ{I}V1 & Y2 = L2.ⓑ{I}V2
78 | ∃∃f,I,L1,L2. 𝐈⦃f⦄ & L1 ⪤[cext2 R,cfull,f] L2 &
79 Y1 = L1.ⓤ{I} & Y2 = L2.ⓤ{I}.
80 #R * [ | #Y1 * #I1 [ | #X ] ] #Y2 * #f #H1 #H2
81 [ lapply (sex_inv_atom1 … H2) -H2 /3 width=1 by or3_intro0, conj/
82 | elim (frees_inv_unit … H1) -H1 #g #HX #H destruct
83 elim (sex_inv_next1 … H2) -H2 #I2 #L2 #HL12 #H #H2 destruct
84 >(ext2_inv_unit_sn … H) -H /3 width=8 by or3_intro2, ex4_4_intro/
85 | elim (frees_inv_pair … H1) -H1 #g #Hg #H destruct
86 elim (sex_inv_next1 … H2) -H2 #Z2 #L2 #HL12 #H
87 elim (ext2_inv_pair_sn … H) -H
88 /4 width=9 by or3_intro1, ex4_5_intro, ex2_intro/
92 lemma rex_inv_lref (R):
93 ∀Y1,Y2,i. Y1 ⪤[R,#↑i] Y2 →
95 | ∃∃I1,I2,L1,L2. L1 ⪤[R,#i] L2 & Y1 = L1.ⓘ{I1} & Y2 = L2.ⓘ{I2}.
96 #R * [ | #Y1 #I1 ] #Y2 #i * #f #H1 #H2
97 [ lapply (sex_inv_atom1 … H2) -H2 /3 width=1 by or_introl, conj/
98 | elim (frees_inv_lref … H1) -H1 #g #Hg #H destruct
99 elim (sex_inv_push1 … H2) -H2
100 /4 width=7 by ex3_4_intro, ex2_intro, or_intror/
104 lemma rex_inv_gref (R):
105 ∀Y1,Y2,l. Y1 ⪤[R,§l] Y2 →
106 ∨∨ ∧∧ Y1 = ⋆ & Y2 = ⋆
107 | ∃∃I1,I2,L1,L2. L1 ⪤[R,§l] L2 & Y1 = L1.ⓘ{I1} & Y2 = L2.ⓘ{I2}.
108 #R * [ | #Y1 #I1 ] #Y2 #l * #f #H1 #H2
109 [ lapply (sex_inv_atom1 … H2) -H2 /3 width=1 by or_introl, conj/
110 | lapply (frees_inv_gref … H1) -H1 #Hf
111 elim (isid_inv_gen … Hf) -Hf #g #Hg #H destruct
112 elim (sex_inv_push1 … H2) -H2 #I2 #L2 #H12 #_ #H destruct
113 /5 width=7 by frees_gref, ex3_4_intro, ex2_intro, or_intror/
117 (* Basic_2A1: uses: llpx_sn_inv_bind llpx_sn_inv_bind_O *)
118 lemma rex_inv_bind (R):
119 ∀p,I,L1,L2,V1,V2,T. L1 ⪤[R,ⓑ{p,I}V1.T] L2 → R L1 V1 V2 →
120 ∧∧ L1 ⪤[R,V1] L2 & L1.ⓑ{I}V1 ⪤[R,T] L2.ⓑ{I}V2.
121 #R #p #I #L1 #L2 #V1 #V2 #T * #f #Hf #HL #HV elim (frees_inv_bind … Hf) -Hf
122 /6 width=6 by sle_sex_trans, sex_inv_tl, ext2_pair, sor_inv_sle_dx, sor_inv_sle_sn, ex2_intro, conj/
125 (* Basic_2A1: uses: llpx_sn_inv_flat *)
126 lemma rex_inv_flat (R):
127 ∀I,L1,L2,V,T. L1 ⪤[R,ⓕ{I}V.T] L2 →
128 ∧∧ L1 ⪤[R,V] L2 & L1 ⪤[R,T] L2.
129 #R #I #L1 #L2 #V #T * #f #Hf #HL elim (frees_inv_flat … Hf) -Hf
130 /5 width=6 by sle_sex_trans, sor_inv_sle_dx, sor_inv_sle_sn, ex2_intro, conj/
133 (* Advanced inversion lemmas ************************************************)
135 lemma rex_inv_sort_bind_sn (R):
136 ∀I1,K1,L2,s. K1.ⓘ{I1} ⪤[R,⋆s] L2 →
137 ∃∃I2,K2. K1 ⪤[R,⋆s] K2 & L2 = K2.ⓘ{I2}.
138 #R #I1 #K1 #L2 #s #H elim (rex_inv_sort … H) -H *
140 | #Z1 #I2 #Y1 #K2 #Hs #H1 #H2 destruct /2 width=4 by ex2_2_intro/
144 lemma rex_inv_sort_bind_dx (R):
145 ∀I2,K2,L1,s. L1 ⪤[R,⋆s] K2.ⓘ{I2} →
146 ∃∃I1,K1. K1 ⪤[R,⋆s] K2 & L1 = K1.ⓘ{I1}.
147 #R #I2 #K2 #L1 #s #H elim (rex_inv_sort … H) -H *
149 | #I1 #Z2 #K1 #Y2 #Hs #H1 #H2 destruct /2 width=4 by ex2_2_intro/
153 lemma rex_inv_zero_pair_sn (R):
154 ∀I,L2,K1,V1. K1.ⓑ{I}V1 ⪤[R,#0] L2 →
155 ∃∃K2,V2. K1 ⪤[R,V1] K2 & R K1 V1 V2 & L2 = K2.ⓑ{I}V2.
156 #R #I #L2 #K1 #V1 #H elim (rex_inv_zero … H) -H *
158 | #Z #Y1 #K2 #X1 #V2 #HK12 #HV12 #H1 #H2 destruct
159 /2 width=5 by ex3_2_intro/
160 | #f #Z #Y1 #Y2 #_ #_ #H destruct
164 lemma rex_inv_zero_pair_dx (R):
165 ∀I,L1,K2,V2. L1 ⪤[R,#0] K2.ⓑ{I}V2 →
166 ∃∃K1,V1. K1 ⪤[R,V1] K2 & R K1 V1 V2 & L1 = K1.ⓑ{I}V1.
167 #R #I #L1 #K2 #V2 #H elim (rex_inv_zero … H) -H *
169 | #Z #K1 #Y2 #V1 #X2 #HK12 #HV12 #H1 #H2 destruct
170 /2 width=5 by ex3_2_intro/
171 | #f #Z #Y1 #Y2 #_ #_ #_ #H destruct
175 lemma rex_inv_zero_unit_sn (R):
176 ∀I,K1,L2. K1.ⓤ{I} ⪤[R,#0] L2 →
177 ∃∃f,K2. 𝐈⦃f⦄ & K1 ⪤[cext2 R,cfull,f] K2 & L2 = K2.ⓤ{I}.
178 #R #I #K1 #L2 #H elim (rex_inv_zero … H) -H *
180 | #Z #Y1 #Y2 #X1 #X2 #_ #_ #H destruct
181 | #f #Z #Y1 #K2 #Hf #HK12 #H1 #H2 destruct /2 width=5 by ex3_2_intro/
185 lemma rex_inv_zero_unit_dx (R):
186 ∀I,L1,K2. L1 ⪤[R,#0] K2.ⓤ{I} →
187 ∃∃f,K1. 𝐈⦃f⦄ & K1 ⪤[cext2 R,cfull,f] K2 & L1 = K1.ⓤ{I}.
188 #R #I #L1 #K2 #H elim (rex_inv_zero … H) -H *
190 | #Z #Y1 #Y2 #X1 #X2 #_ #_ #_ #H destruct
191 | #f #Z #K1 #Y2 #Hf #HK12 #H1 #H2 destruct /2 width=5 by ex3_2_intro/
195 lemma rex_inv_lref_bind_sn (R):
196 ∀I1,K1,L2,i. K1.ⓘ{I1} ⪤[R,#↑i] L2 →
197 ∃∃I2,K2. K1 ⪤[R,#i] K2 & L2 = K2.ⓘ{I2}.
198 #R #I1 #K1 #L2 #i #H elim (rex_inv_lref … H) -H *
200 | #Z1 #I2 #Y1 #K2 #Hi #H1 #H2 destruct /2 width=4 by ex2_2_intro/
204 lemma rex_inv_lref_bind_dx (R):
205 ∀I2,K2,L1,i. L1 ⪤[R,#↑i] K2.ⓘ{I2} →
206 ∃∃I1,K1. K1 ⪤[R,#i] K2 & L1 = K1.ⓘ{I1}.
207 #R #I2 #K2 #L1 #i #H elim (rex_inv_lref … H) -H *
209 | #I1 #Z2 #K1 #Y2 #Hi #H1 #H2 destruct /2 width=4 by ex2_2_intro/
213 lemma rex_inv_gref_bind_sn (R):
214 ∀I1,K1,L2,l. K1.ⓘ{I1} ⪤[R,§l] L2 →
215 ∃∃I2,K2. K1 ⪤[R,§l] K2 & L2 = K2.ⓘ{I2}.
216 #R #I1 #K1 #L2 #l #H elim (rex_inv_gref … H) -H *
218 | #Z1 #I2 #Y1 #K2 #Hl #H1 #H2 destruct /2 width=4 by ex2_2_intro/
222 lemma rex_inv_gref_bind_dx (R):
223 ∀I2,K2,L1,l. L1 ⪤[R,§l] K2.ⓘ{I2} →
224 ∃∃I1,K1. K1 ⪤[R,§l] K2 & L1 = K1.ⓘ{I1}.
225 #R #I2 #K2 #L1 #l #H elim (rex_inv_gref … H) -H *
227 | #I1 #Z2 #K1 #Y2 #Hl #H1 #H2 destruct /2 width=4 by ex2_2_intro/
231 (* Basic forward lemmas *****************************************************)
233 lemma rex_fwd_zero_pair (R):
234 ∀I,K1,K2,V1,V2. K1.ⓑ{I}V1 ⪤[R,#0] K2.ⓑ{I}V2 → K1 ⪤[R,V1] K2.
235 #R #I #K1 #K2 #V1 #V2 #H
236 elim (rex_inv_zero_pair_sn … H) -H #Y #X #HK12 #_ #H destruct //
239 (* Basic_2A1: uses: llpx_sn_fwd_pair_sn llpx_sn_fwd_bind_sn llpx_sn_fwd_flat_sn *)
240 lemma rex_fwd_pair_sn (R): ∀I,L1,L2,V,T. L1 ⪤[R,②{I}V.T] L2 → L1 ⪤[R,V] L2.
241 #R * [ #p ] #I #L1 #L2 #V #T * #f #Hf #HL
242 [ elim (frees_inv_bind … Hf) | elim (frees_inv_flat … Hf) ] -Hf
243 /4 width=6 by sle_sex_trans, sor_inv_sle_sn, ex2_intro/
246 (* Basic_2A1: uses: llpx_sn_fwd_bind_dx llpx_sn_fwd_bind_O_dx *)
247 lemma rex_fwd_bind_dx (R):
248 ∀p,I,L1,L2,V1,V2,T. L1 ⪤[R,ⓑ{p,I}V1.T] L2 →
249 R L1 V1 V2 → L1.ⓑ{I}V1 ⪤[R,T] L2.ⓑ{I}V2.
250 #R #p #I #L1 #L2 #V1 #V2 #T #H #HV elim (rex_inv_bind … H HV) -H -HV //
253 (* Basic_2A1: uses: llpx_sn_fwd_flat_dx *)
254 lemma rex_fwd_flat_dx (R): ∀I,L1,L2,V,T. L1 ⪤[R,ⓕ{I}V.T] L2 → L1 ⪤[R,T] L2.
255 #R #I #L1 #L2 #V #T #H elim (rex_inv_flat … H) -H //
258 lemma rex_fwd_dx (R):
259 ∀I2,L1,K2,T. L1 ⪤[R,T] K2.ⓘ{I2} →
260 ∃∃I1,K1. L1 = K1.ⓘ{I1}.
261 #R #I2 #L1 #K2 #T * #f elim (pn_split f) * #g #Hg #_ #Hf destruct
262 [ elim (sex_inv_push2 … Hf) | elim (sex_inv_next2 … Hf) ] -Hf #I1 #K1 #_ #_ #H destruct
263 /2 width=3 by ex1_2_intro/
266 (* Basic properties *********************************************************)
268 lemma rex_atom (R): ∀I. ⋆ ⪤[R,⓪{I}] ⋆.
269 #R * /3 width=3 by frees_sort, frees_atom, frees_gref, sex_atom, ex2_intro/
273 ∀I1,I2,L1,L2,s. L1 ⪤[R,⋆s] L2 → L1.ⓘ{I1} ⪤[R,⋆s] L2.ⓘ{I2}.
274 #R #I1 #I2 #L1 #L2 #s * #f #Hf #H12
275 lapply (frees_inv_sort … Hf) -Hf
276 /4 width=3 by frees_sort, sex_push, isid_push, ex2_intro/
280 ∀I,L1,L2,V1,V2. L1 ⪤[R,V1] L2 →
281 R L1 V1 V2 → L1.ⓑ{I}V1 ⪤[R,#0] L2.ⓑ{I}V2.
282 #R #I1 #I2 #L1 #L2 #V1 *
283 /4 width=3 by ext2_pair, frees_pair, sex_next, ex2_intro/
287 ∀f,I,L1,L2. 𝐈⦃f⦄ → L1 ⪤[cext2 R,cfull,f] L2 →
288 L1.ⓤ{I} ⪤[R,#0] L2.ⓤ{I}.
289 /4 width=3 by frees_unit, sex_next, ext2_unit, ex2_intro/ qed.
292 ∀I1,I2,L1,L2,i. L1 ⪤[R,#i] L2 → L1.ⓘ{I1} ⪤[R,#↑i] L2.ⓘ{I2}.
293 #R #I1 #I2 #L1 #L2 #i * /3 width=3 by sex_push, frees_lref, ex2_intro/
297 ∀I1,I2,L1,L2,l. L1 ⪤[R,§l] L2 → L1.ⓘ{I1} ⪤[R,§l] L2.ⓘ{I2}.
298 #R #I1 #I2 #L1 #L2 #l * #f #Hf #H12
299 lapply (frees_inv_gref … Hf) -Hf
300 /4 width=3 by frees_gref, sex_push, isid_push, ex2_intro/
303 lemma rex_bind_repl_dx (R):
304 ∀I,I1,L1,L2,T. L1.ⓘ{I} ⪤[R,T] L2.ⓘ{I1} →
305 ∀I2. cext2 R L1 I I2 → L1.ⓘ{I} ⪤[R,T] L2.ⓘ{I2}.
306 #R #I #I1 #L1 #L2 #T * #f #Hf #HL12 #I2 #HR
307 /3 width=5 by sex_pair_repl, ex2_intro/
310 (* Basic_2A1: uses: llpx_sn_co *)
311 lemma rex_co (R1) (R2):
312 (∀L,T1,T2. R1 L T1 T2 → R2 L T1 T2) →
313 ∀L1,L2,T. L1 ⪤[R1,T] L2 → L1 ⪤[R2,T] L2.
314 #R1 #R2 #HR #L1 #L2 #T * /5 width=7 by sex_co, cext2_co, ex2_intro/
317 lemma rex_isid (R1) (R2):
319 (∀f. L1 ⊢ 𝐅+⦃T1⦄ ≘ f → 𝐈⦃f⦄) →
320 (∀f. 𝐈⦃f⦄ → L1 ⊢ 𝐅+⦃T2⦄ ≘ f) →
321 L1 ⪤[R1,T1] L2 → L1 ⪤[R2,T2] L2.
322 #R1 #R2 #L1 #L2 #T1 #T2 #H1 #H2 *
323 /4 width=7 by sex_co_isid, ex2_intro/
326 lemma rex_unit_sn (R1) (R2):
327 ∀I,K1,L2. K1.ⓤ{I} ⪤[R1,#0] L2 → K1.ⓤ{I} ⪤[R2,#0] L2.
328 #R1 #R2 #I #K1 #L2 #H
329 elim (rex_inv_zero_unit_sn … H) -H #f #K2 #Hf #HK12 #H destruct
330 /3 width=7 by rex_unit, sex_co_isid/
333 (* Basic_2A1: removed theorems 9:
334 llpx_sn_skip llpx_sn_lref llpx_sn_free
336 llpx_sn_Y llpx_sn_ge_up llpx_sn_ge
337 llpx_sn_fwd_drop_sn llpx_sn_fwd_drop_dx