lemma frees_atom_drops:
∀b,L,i. ⇩*[b,𝐔❨i❩] L ≘ ⋆ →
- â\88\80f. ð\9d\90\88â\9dªfâ\9d« â\86\92 L â\8a¢ ð\9d\90\85+â\9dª#iâ\9d« ≘ ⫯*[i]↑f.
+ â\88\80f. ð\9d\90\88â\9d¨fâ\9d© â\86\92 L â\8a¢ ð\9d\90\85+â\9d¨#iâ\9d© ≘ ⫯*[i]↑f.
#b #L elim L -L /2 width=1 by frees_atom/
#L #I #IH *
[ #H lapply (drops_fwd_isid … H ?) -H // #H destruct
qed.
lemma frees_pair_drops:
- â\88\80f,K,V. K â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ f →
- â\88\80i,I,L. â\87©[i] L â\89\98 K.â\93\91[I]V â\86\92 L â\8a¢ ð\9d\90\85+â\9dª#iâ\9d« ≘ ⫯*[i] ↑f.
+ â\88\80f,K,V. K â\8a¢ ð\9d\90\85+â\9d¨Vâ\9d© ≘ f →
+ â\88\80i,I,L. â\87©[i] L â\89\98 K.â\93\91[I]V â\86\92 L â\8a¢ ð\9d\90\85+â\9d¨#iâ\9d© ≘ ⫯*[i] ↑f.
#f #K #V #Hf #i elim i -i
[ #I #L #H lapply (drops_fwd_isid … H ?) -H /2 width=1 by frees_pair/
| #i #IH #I #L #H elim (drops_inv_succ … H) -H /3 width=2 by frees_lref/
qed.
lemma frees_unit_drops:
- â\88\80f. ð\9d\90\88â\9dªfâ\9d« → ∀I,K,i,L. ⇩[i] L ≘ K.ⓤ[I] →
- L â\8a¢ ð\9d\90\85+â\9dª#iâ\9d« ≘ ⫯*[i] ↑f.
+ â\88\80f. ð\9d\90\88â\9d¨fâ\9d© → ∀I,K,i,L. ⇩[i] L ≘ K.ⓤ[I] →
+ L â\8a¢ ð\9d\90\85+â\9d¨#iâ\9d© ≘ ⫯*[i] ↑f.
#f #Hf #I #K #i elim i -i
[ #L #H lapply (drops_fwd_isid … H ?) -H /2 width=1 by frees_unit/
| #i #IH #Y #H elim (drops_inv_succ … H) -H
qed.
lemma frees_lref_pushs:
- â\88\80f,K,j. K â\8a¢ ð\9d\90\85+â\9dª#jâ\9d« ≘ f →
- â\88\80i,L. â\87©[i] L â\89\98 K â\86\92 L â\8a¢ ð\9d\90\85+â\9dª#(i+j)â\9d« ≘ ⫯*[i] f.
+ â\88\80f,K,j. K â\8a¢ ð\9d\90\85+â\9d¨#jâ\9d© ≘ f →
+ â\88\80i,L. â\87©[i] L â\89\98 K â\86\92 L â\8a¢ ð\9d\90\85+â\9d¨#(i+j)â\9d© ≘ ⫯*[i] f.
#f #K #j #Hf #i elim i -i
[ #L #H lapply (drops_fwd_isid … H ?) -H //
| #i #IH #L #H elim (drops_inv_succ … H) -H
(* Advanced inversion lemmas ************************************************)
lemma frees_inv_lref_drops:
- â\88\80L,i,f. L â\8a¢ ð\9d\90\85+â\9dª#iâ\9d« ≘ f →
- â\88¨â\88¨ â\88\83â\88\83g. â\87©*[â\92»,ð\9d\90\94â\9d¨iâ\9d©] L â\89\98 â\8b\86 & ð\9d\90\88â\9dªgâ\9d« & f = ⫯*[i] ↑g
- | â\88\83â\88\83g,I,K,V. K â\8a¢ ð\9d\90\85+â\9dªVâ\9d« ≘ g & ⇩[i] L ≘ K.ⓑ[I]V & f = ⫯*[i] ↑g
- | â\88\83â\88\83g,I,K. â\87©[i] L â\89\98 K.â\93¤[I] & ð\9d\90\88â\9dªgâ\9d« & f = ⫯*[i] ↑g.
+ â\88\80L,i,f. L â\8a¢ ð\9d\90\85+â\9d¨#iâ\9d© ≘ f →
+ â\88¨â\88¨ â\88\83â\88\83g. â\87©*[â\92»,ð\9d\90\94â\9d¨iâ\9d©] L â\89\98 â\8b\86 & ð\9d\90\88â\9d¨gâ\9d© & f = ⫯*[i] ↑g
+ | â\88\83â\88\83g,I,K,V. K â\8a¢ ð\9d\90\85+â\9d¨Vâ\9d© ≘ g & ⇩[i] L ≘ K.ⓑ[I]V & f = ⫯*[i] ↑g
+ | â\88\83â\88\83g,I,K. â\87©[i] L â\89\98 K.â\93¤[I] & ð\9d\90\88â\9d¨gâ\9d© & f = ⫯*[i] ↑g.
#L elim L -L
[ #i #g | #L #I #IH * [ #g cases I -I [ #I | #I #V ] -IH | #i #g ] ] #H
[ elim (frees_inv_atom … H) -H #f #Hf #H destruct
(* Properties with generic slicing for local environments *******************)
lemma frees_lifts:
- â\88\80b,f1,K,T. K â\8a¢ ð\9d\90\85+â\9dªTâ\9d« ≘ f1 →
+ â\88\80b,f1,K,T. K â\8a¢ ð\9d\90\85+â\9d¨Tâ\9d© ≘ f1 →
∀f,L. ⇩*[b,f] L ≘ K → ∀U. ⇧*[f] T ≘ U →
- â\88\80f2. f ~â\8a\9a f1 â\89\98 f2 â\86\92 L â\8a¢ ð\9d\90\85+â\9dªUâ\9d« ≘ f2.
+ â\88\80f2. f ~â\8a\9a f1 â\89\98 f2 â\86\92 L â\8a¢ ð\9d\90\85+â\9d¨Uâ\9d© ≘ f2.
#b #f1 #K #T #H lapply (frees_fwd_isfin … H) elim H -f1 -K -T
[ #f1 #K #s #Hf1 #_ #f #L #HLK #U #H2 #f2 #H3
lapply (pr_coafter_isi_inv_dx … H3 … Hf1) -f1 #Hf2
lemma frees_lifts_SO:
∀b,L,K. ⇩*[b,𝐔❨1❩] L ≘ K → ∀T,U. ⇧[1] T ≘ U →
- â\88\80f. K â\8a¢ ð\9d\90\85+â\9dªTâ\9d« â\89\98 f â\86\92 L â\8a¢ ð\9d\90\85+â\9dªUâ\9d« ≘ ⫯f.
+ â\88\80f. K â\8a¢ ð\9d\90\85+â\9d¨Tâ\9d© â\89\98 f â\86\92 L â\8a¢ ð\9d\90\85+â\9d¨Uâ\9d© ≘ ⫯f.
#b #L #K #HLK #T #U #HTU #f #Hf
@(frees_lifts b … Hf … HTU) // (**) (* auto fails *)
qed.
(* Forward lemmas with generic slicing for local environments ***************)
lemma frees_fwd_coafter:
- â\88\80b,f2,L,U. L â\8a¢ ð\9d\90\85+â\9dªUâ\9d« ≘ f2 →
+ â\88\80b,f2,L,U. L â\8a¢ ð\9d\90\85+â\9d¨Uâ\9d© ≘ f2 →
∀f,K. ⇩*[b,f] L ≘ K → ∀T. ⇧*[f] T ≘ U →
- â\88\80f1. K â\8a¢ ð\9d\90\85+â\9dªTâ\9d« ≘ f1 → f ~⊚ f1 ≘ f2.
+ â\88\80f1. K â\8a¢ ð\9d\90\85+â\9d¨Tâ\9d© ≘ f1 → f ~⊚ f1 ≘ f2.
/4 width=11 by frees_lifts, frees_mono, pr_coafter_eq_repl_back/ qed-.
(* Inversion lemmas with generic slicing for local environments *************)
lemma frees_inv_lifts_ex:
- â\88\80b,f2,L,U. L â\8a¢ ð\9d\90\85+â\9dªUâ\9d« ≘ f2 →
+ â\88\80b,f2,L,U. L â\8a¢ ð\9d\90\85+â\9d¨Uâ\9d© ≘ f2 →
∀f,K. ⇩*[b,f] L ≘ K → ∀T. ⇧*[f] T ≘ U →
- â\88\83â\88\83f1. f ~â\8a\9a f1 â\89\98 f2 & K â\8a¢ ð\9d\90\85+â\9dªTâ\9d« ≘ f1.
+ â\88\83â\88\83f1. f ~â\8a\9a f1 â\89\98 f2 & K â\8a¢ ð\9d\90\85+â\9d¨Tâ\9d© ≘ f1.
#b #f2 #L #U #Hf2 #f #K #HLK #T elim (frees_total K T)
/3 width=9 by frees_fwd_coafter, ex2_intro/
qed-.
lemma frees_inv_lifts_SO:
- â\88\80b,f,L,U. L â\8a¢ ð\9d\90\85+â\9dªUâ\9d« ≘ f →
+ â\88\80b,f,L,U. L â\8a¢ ð\9d\90\85+â\9d¨Uâ\9d© ≘ f →
∀K. ⇩*[b,𝐔❨1❩] L ≘ K → ∀T. ⇧[1] T ≘ U →
- K â\8a¢ ð\9d\90\85+â\9dªTâ\9d« ≘ ⫰f.
+ K â\8a¢ ð\9d\90\85+â\9d¨Tâ\9d© ≘ ⫰f.
#b #f #L #U #H #K #HLK #T #HTU elim(frees_inv_lifts_ex … H … HLK … HTU) -b -L -U
#f1 #Hf #Hf1 elim (pr_coafter_inv_next_sn … Hf) -Hf
/3 width=5 by frees_eq_repl_back, pr_coafter_isi_inv_sn/
qed-.
lemma frees_inv_lifts:
- â\88\80b,f2,L,U. L â\8a¢ ð\9d\90\85+â\9dªUâ\9d« ≘ f2 →
+ â\88\80b,f2,L,U. L â\8a¢ ð\9d\90\85+â\9d¨Uâ\9d© ≘ f2 →
∀f,K. ⇩*[b,f] L ≘ K → ∀T. ⇧*[f] T ≘ U →
- â\88\80f1. f ~â\8a\9a f1 â\89\98 f2 â\86\92 K â\8a¢ ð\9d\90\85+â\9dªTâ\9d« ≘ f1.
+ â\88\80f1. f ~â\8a\9a f1 â\89\98 f2 â\86\92 K â\8a¢ ð\9d\90\85+â\9d¨Tâ\9d© ≘ f1.
#b #f2 #L #U #H #f #K #HLK #T #HTU #f1 #Hf2 elim (frees_inv_lifts_ex … H … HLK … HTU) -b -L -U
/3 width=7 by frees_eq_repl_back, pr_coafter_inj/
qed-.
(* Note: this is used by rex_conf and might be modified *)
lemma frees_inv_drops_next:
- â\88\80f1,L1,T1. L1 â\8a¢ ð\9d\90\85+â\9dªT1â\9d« ≘ f1 →
+ â\88\80f1,L1,T1. L1 â\8a¢ ð\9d\90\85+â\9d¨T1â\9d© ≘ f1 →
∀I2,L2,V2,i. ⇩[i] L1 ≘ L2.ⓑ[I2]V2 →
∀g1. ↑g1 = ⫰*[i] f1 →
- â\88\83â\88\83g2. L2 â\8a¢ ð\9d\90\85+â\9dªV2â\9d« ≘ g2 & g2 ⊆ g1.
+ â\88\83â\88\83g2. L2 â\8a¢ ð\9d\90\85+â\9d¨V2â\9d© ≘ g2 & g2 ⊆ g1.
#f1 #L1 #T1 #H elim H -f1 -L1 -T1
[ #f1 #L1 #s #Hf1 #I2 #L2 #V2 #j #_ #g1 #H1 -I2 -L1 -s
lapply (pr_isi_tls j … Hf1) -Hf1 <H1 -f1 #Hf1
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