(* *)
(**************************************************************************)
-include "basic_2/notation/relations/lsubeqx_6.ma".
+include "basic_2/notation/relations/lsubeqx_5.ma".
include "basic_2/rt_computation/rdsx.ma".
(* CLEAR OF STRONGLY NORMALIZING ENTRIES FOR UNBOUND RT-TRANSITION **********)
(* Note: this should be an instance of a more general sex *)
(* Basic_2A1: uses: lcosx *)
-inductive lsubsx (h) (o) (G): rtmap → relation lenv ≝
-| lsubsx_atom: ∀f. lsubsx h o G f (⋆) (⋆)
-| lsubsx_push: ∀f,I,K1,K2. lsubsx h o G f K1 K2 →
- lsubsx h o G (⫯f) (K1.ⓘ{I}) (K2.ⓘ{I})
-| lsubsx_unit: ∀f,I,K1,K2. lsubsx h o G f K1 K2 →
- lsubsx h o G (↑f) (K1.ⓤ{I}) (K2.ⓧ)
-| lsubsx_pair: ∀f,I,K1,K2,V. G ⊢ ⬈*[h, o, V] 𝐒⦃K2⦄ →
- lsubsx h o G f K1 K2 → lsubsx h o G (↑f) (K1.ⓑ{I}V) (K2.ⓧ)
+inductive lsubsx (h) (G): rtmap → relation lenv ≝
+| lsubsx_atom: ∀f. lsubsx h G f (⋆) (⋆)
+| lsubsx_push: ∀f,I,K1,K2. lsubsx h G f K1 K2 →
+ lsubsx h G (⫯f) (K1.ⓘ{I}) (K2.ⓘ{I})
+| lsubsx_unit: ∀f,I,K1,K2. lsubsx h G f K1 K2 →
+ lsubsx h G (↑f) (K1.ⓤ{I}) (K2.ⓧ)
+| lsubsx_pair: ∀f,I,K1,K2,V. G ⊢ ⬈*[h, V] 𝐒⦃K2⦄ →
+ lsubsx h G f K1 K2 → lsubsx h G (↑f) (K1.ⓑ{I}V) (K2.ⓧ)
.
interpretation
"local environment refinement (clear)"
- 'LSubEqX h o f G L1 L2 = (lsubsx h o G f L1 L2).
+ 'LSubEqX h f G L1 L2 = (lsubsx h G f L1 L2).
(* Basic inversion lemmas ***************************************************)
-fact lsubsx_inv_atom_sn_aux: ∀h,o,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, o, g] L2 →
+fact lsubsx_inv_atom_sn_aux: ∀h,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, g] L2 →
L1 = ⋆ → L2 = ⋆.
-#h #o #g #G #L1 #L2 * -g -L1 -L2 //
+#h #g #G #L1 #L2 * -g -L1 -L2 //
[ #f #I #K1 #K2 #_ #H destruct
| #f #I #K1 #K2 #_ #H destruct
| #f #I #K1 #K2 #V #_ #_ #H destruct
]
qed-.
-lemma lsubsx_inv_atom_sn: ∀h,o,g,G,L2. G ⊢ ⋆ ⊆ⓧ[h, o, g] L2 → L2 = ⋆.
+lemma lsubsx_inv_atom_sn: ∀h,g,G,L2. G ⊢ ⋆ ⊆ⓧ[h, g] L2 → L2 = ⋆.
/2 width=7 by lsubsx_inv_atom_sn_aux/ qed-.
-fact lsubsx_inv_push_sn_aux: ∀h,o,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, o, g] L2 →
+fact lsubsx_inv_push_sn_aux: ∀h,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, g] L2 →
∀f,I,K1. g = ⫯f → L1 = K1.ⓘ{I} →
- ∃∃K2. G ⊢ K1 ⊆ⓧ[h, o, f] K2 & L2 = K2.ⓘ{I}.
-#h #o #g #G #L1 #L2 * -g -L1 -L2
+ ∃∃K2. G ⊢ K1 ⊆ⓧ[h, f] K2 & L2 = K2.ⓘ{I}.
+#h #g #G #L1 #L2 * -g -L1 -L2
[ #f #g #J #L1 #_ #H destruct
| #f #I #K1 #K2 #HK12 #g #J #L1 #H1 #H2 destruct
<(injective_push … H1) -g /2 width=3 by ex2_intro/
]
qed-.
-lemma lsubsx_inv_push_sn: ∀h,o,f,I,G,K1,L2. G ⊢ K1.ⓘ{I} ⊆ⓧ[h, o, ⫯f] L2 →
- ∃∃K2. G ⊢ K1 ⊆ⓧ[h, o, f] K2 & L2 = K2.ⓘ{I}.
+lemma lsubsx_inv_push_sn: ∀h,f,I,G,K1,L2. G ⊢ K1.ⓘ{I} ⊆ⓧ[h, ⫯f] L2 →
+ ∃∃K2. G ⊢ K1 ⊆ⓧ[h, f] K2 & L2 = K2.ⓘ{I}.
/2 width=5 by lsubsx_inv_push_sn_aux/ qed-.
-fact lsubsx_inv_unit_sn_aux: ∀h,o,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, o, g] L2 →
+fact lsubsx_inv_unit_sn_aux: ∀h,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, g] L2 →
∀f,I,K1. g = ↑f → L1 = K1.ⓤ{I} →
- ∃∃K2. G ⊢ K1 ⊆ⓧ[h, o, f] K2 & L2 = K2.ⓧ.
-#h #o #g #G #L1 #L2 * -g -L1 -L2
+ ∃∃K2. G ⊢ K1 ⊆ⓧ[h, f] K2 & L2 = K2.ⓧ.
+#h #g #G #L1 #L2 * -g -L1 -L2
[ #f #g #J #L1 #_ #H destruct
| #f #I #K1 #K2 #_ #g #J #L1 #H
elim (discr_push_next … H)
]
qed-.
-lemma lsubsx_inv_unit_sn: ∀h,o,f,I,G,K1,L2. G ⊢ K1.ⓤ{I} ⊆ⓧ[h, o, ↑f] L2 →
- ∃∃K2. G ⊢ K1 ⊆ⓧ[h, o, f] K2 & L2 = K2.ⓧ.
+lemma lsubsx_inv_unit_sn: ∀h,f,I,G,K1,L2. G ⊢ K1.ⓤ{I} ⊆ⓧ[h, ↑f] L2 →
+ ∃∃K2. G ⊢ K1 ⊆ⓧ[h, f] K2 & L2 = K2.ⓧ.
/2 width=6 by lsubsx_inv_unit_sn_aux/ qed-.
-fact lsubsx_inv_pair_sn_aux: ∀h,o,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, o, g] L2 →
+fact lsubsx_inv_pair_sn_aux: ∀h,g,G,L1,L2. G ⊢ L1 ⊆ⓧ[h, g] L2 →
∀f,I,K1,V. g = ↑f → L1 = K1.ⓑ{I}V →
- ∃∃K2. G ⊢ ⬈*[h, o, V] 𝐒⦃K2⦄ &
- G ⊢ K1 ⊆ⓧ[h, o, f] K2 & L2 = K2.ⓧ.
-#h #o #g #G #L1 #L2 * -g -L1 -L2
+ ∃∃K2. G ⊢ ⬈*[h, V] 𝐒⦃K2⦄ &
+ G ⊢ K1 ⊆ⓧ[h, f] K2 & L2 = K2.ⓧ.
+#h #g #G #L1 #L2 * -g -L1 -L2
[ #f #g #J #L1 #W #_ #H destruct
| #f #I #K1 #K2 #_ #g #J #L1 #W #H
elim (discr_push_next … H)
qed-.
(* Basic_2A1: uses: lcosx_inv_pair *)
-lemma lsubsx_inv_pair_sn: ∀h,o,f,I,G,K1,L2,V. G ⊢ K1.ⓑ{I}V ⊆ⓧ[h, o, ↑f] L2 →
- ∃∃K2. G ⊢ ⬈*[h, o, V] 𝐒⦃K2⦄ &
- G ⊢ K1 ⊆ⓧ[h, o, f] K2 & L2 = K2.ⓧ.
+lemma lsubsx_inv_pair_sn: ∀h,f,I,G,K1,L2,V. G ⊢ K1.ⓑ{I}V ⊆ⓧ[h, ↑f] L2 →
+ ∃∃K2. G ⊢ ⬈*[h, V] 𝐒⦃K2⦄ &
+ G ⊢ K1 ⊆ⓧ[h, f] K2 & L2 = K2.ⓧ.
/2 width=6 by lsubsx_inv_pair_sn_aux/ qed-.
(* Advanced inversion lemmas ************************************************)
-lemma lsubsx_inv_pair_sn_gen: ∀h,o,g,I,G,K1,L2,V. G ⊢ K1.ⓑ{I}V ⊆ⓧ[h, o, g] L2 →
- ∨∨ ∃∃f,K2. G ⊢ K1 ⊆ⓧ[h, o, f] K2 & g = ⫯f & L2 = K2.ⓑ{I}V
- | ∃∃f,K2. G ⊢ ⬈*[h, o, V] 𝐒⦃K2⦄ &
- G ⊢ K1 ⊆ⓧ[h, o, f] K2 & g = ↑f & L2 = K2.ⓧ.
-#h #o #g #I #G #K1 #L2 #V #H
+lemma lsubsx_inv_pair_sn_gen: ∀h,g,I,G,K1,L2,V. G ⊢ K1.ⓑ{I}V ⊆ⓧ[h, g] L2 →
+ ∨∨ ∃∃f,K2. G ⊢ K1 ⊆ⓧ[h, f] K2 & g = ⫯f & L2 = K2.ⓑ{I}V
+ | ∃∃f,K2. G ⊢ ⬈*[h, V] 𝐒⦃K2⦄ &
+ G ⊢ K1 ⊆ⓧ[h, f] K2 & g = ↑f & L2 = K2.ⓧ.
+#h #g #I #G #K1 #L2 #V #H
elim (pn_split g) * #f #Hf destruct
[ elim (lsubsx_inv_push_sn … H) -H /3 width=5 by ex3_2_intro, or_introl/
| elim (lsubsx_inv_pair_sn … H) -H /3 width=6 by ex4_2_intro, or_intror/
(* Advanced forward lemmas **************************************************)
-lemma lsubsx_fwd_bind_sn: ∀h,o,g,I1,G,K1,L2. G ⊢ K1.ⓘ{I1} ⊆ⓧ[h, o, g] L2 →
- ∃∃I2,K2. G ⊢ K1 ⊆ⓧ[h, o, ⫱g] K2 & L2 = K2.ⓘ{I2}.
-#h #o #g #I1 #G #K1 #L2
+lemma lsubsx_fwd_bind_sn: ∀h,g,I1,G,K1,L2. G ⊢ K1.ⓘ{I1} ⊆ⓧ[h, g] L2 →
+ ∃∃I2,K2. G ⊢ K1 ⊆ⓧ[h, ⫱g] K2 & L2 = K2.ⓘ{I2}.
+#h #g #I1 #G #K1 #L2
elim (pn_split g) * #f #Hf destruct
[ #H elim (lsubsx_inv_push_sn … H) -H
| cases I1 -I1 #I1
(* Basic properties *********************************************************)
-lemma lsubsx_eq_repl_back: ∀h,o,G,L1,L2. eq_repl_back … (λf. G ⊢ L1 ⊆ⓧ[h, o, f] L2).
-#h #o #G #L1 #L2 #f1 #H elim H -L1 -L2 -f1 //
+lemma lsubsx_eq_repl_back: ∀h,G,L1,L2. eq_repl_back … (λf. G ⊢ L1 ⊆ⓧ[h, f] L2).
+#h #G #L1 #L2 #f1 #H elim H -L1 -L2 -f1 //
[ #f #I #L1 #L2 #_ #IH #x #H
elim (eq_inv_px … H) -H /3 width=3 by lsubsx_push/
| #f #I #L1 #L2 #_ #IH #x #H
]
qed-.
-lemma lsubsx_eq_repl_fwd: ∀h,o,G,L1,L2. eq_repl_fwd … (λf. G ⊢ L1 ⊆ⓧ[h, o, f] L2).
-#h #o #G #L1 #L2 @eq_repl_sym /2 width=3 by lsubsx_eq_repl_back/
+lemma lsubsx_eq_repl_fwd: ∀h,G,L1,L2. eq_repl_fwd … (λf. G ⊢ L1 ⊆ⓧ[h, f] L2).
+#h #G #L1 #L2 @eq_repl_sym /2 width=3 by lsubsx_eq_repl_back/
qed-.
(* Advanced properties ******************************************************)
(* Basic_2A1: uses: lcosx_O *)
-lemma lsubsx_refl: ∀h,o,f,G. 𝐈⦃f⦄ → reflexive … (lsubsx h o G f).
-#h #o #f #G #Hf #L elim L -L
+lemma lsubsx_refl: ∀h,f,G. 𝐈⦃f⦄ → reflexive … (lsubsx h G f).
+#h #f #G #Hf #L elim L -L
/3 width=3 by lsubsx_eq_repl_back, lsubsx_push, eq_push_inv_isid/
qed.