(* Forward lemmas with strongly rt-normalizing terms ************************)
fact rsx_fwd_lref_pair_csx_aux (h) (G):
- â\88\80L. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â¦\83Lâ¦\84 →
- ∀I,K,V. L = K.ⓑ{I}V → ⦃G,K⦄ ⊢ ⬈*[h] 𝐒⦃V⦄.
+ â\88\80L. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â\9dªLâ\9d« →
+ ∀I,K,V. L = K.ⓑ[I]V → ❪G,K❫ ⊢ ⬈*[h] 𝐒❪V❫.
#h #G #L #H
@(rsx_ind … H) -L #L #_ #IH #I #K #V1 #H destruct
@csx_intro #V2 #HV12 #HnV12
@(IH … I) -IH [1,4: // | -HnV12 | -G #H ]
[ /2 width=1 by lpx_pair/
-| elim (rdeq_inv_zero_pair_sn … H) -H #Y #X #_ #H1 #H2 destruct -I
+| elim (reqx_inv_zero_pair_sn … H) -H #Y #X #_ #H1 #H2 destruct -I
/2 width=1 by/
]
qed-.
lemma rsx_fwd_lref_pair_csx (h) (G):
- â\88\80I,K,V. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â¦\83K.â\93\91{I}Vâ¦\84 â\86\92 â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84.
+ â\88\80I,K,V. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â\9dªK.â\93\91[I]Vâ\9d« â\86\92 â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d«.
/2 width=4 by rsx_fwd_lref_pair_csx_aux/ qed-.
lemma rsx_fwd_lref_pair_csx_drops (h) (G):
- â\88\80I,K,V,i,L. â¬\87*[i] L â\89\98 K.â\93\91{I}V â\86\92 G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â¦\83Lâ¦\84 â\86\92 â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84.
+ â\88\80I,K,V,i,L. â\87©*[i] L â\89\98 K.â\93\91[I]V â\86\92 G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â\9dªLâ\9d« â\86\92 â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d«.
#h #G #I #K #V #i elim i -i
[ #L #H >(drops_fwd_isid … H) -H
/2 width=2 by rsx_fwd_lref_pair_csx/
| #i #IH #L #H1 #H2
elim (drops_inv_bind2_isuni_next … H1) -H1 // #J #Y #HY #H destruct
- lapply (rsx_inv_lifts â\80¦ H2 â\80¦ (ð\9d\90\94â\9d´1â\9dµ) ?????) -H2
+ lapply (rsx_inv_lifts â\80¦ H2 â\80¦ (ð\9d\90\94â\9d¨1â\9d©) ?????) -H2
/3 width=6 by drops_refl, drops_drop/
]
qed-.
(* Inversion lemmas with strongly rt-normalizing terms **********************)
lemma rsx_inv_lref_pair (h) (G):
- â\88\80I,K,V. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â¦\83K.â\93\91{I}Vâ¦\84 →
- â\88§â\88§ â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84 & G â\8a¢ â¬\88*[h,V] ð\9d\90\92â¦\83Kâ¦\84.
+ â\88\80I,K,V. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â\9dªK.â\93\91[I]Vâ\9d« →
+ â\88§â\88§ â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d« & G â\8a¢ â¬\88*[h,V] ð\9d\90\92â\9dªKâ\9d«.
/3 width=2 by rsx_fwd_lref_pair_csx, rsx_fwd_pair, conj/ qed-.
lemma rsx_inv_lref_pair_drops (h) (G):
- â\88\80I,K,V,i,L. â¬\87*[i] L â\89\98 K.â\93\91{I}V â\86\92 G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â¦\83Lâ¦\84 →
- â\88§â\88§ â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84 & G â\8a¢ â¬\88*[h,V] ð\9d\90\92â¦\83Kâ¦\84.
+ â\88\80I,K,V,i,L. â\87©*[i] L â\89\98 K.â\93\91[I]V â\86\92 G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â\9dªLâ\9d« →
+ â\88§â\88§ â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d« & G â\8a¢ â¬\88*[h,V] ð\9d\90\92â\9dªKâ\9d«.
/3 width=5 by rsx_fwd_lref_pair_csx_drops, rsx_fwd_lref_pair_drops, conj/ qed-.
lemma rsx_inv_lref_drops (h) (G):
- â\88\80L,i. G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â¦\83Lâ¦\84 →
- â\88¨â\88¨ â¬\87*[â\92»,ð\9d\90\94â\9d´iâ\9dµ] L ≘ ⋆
- | â\88\83â\88\83I,K. â¬\87*[i] L â\89\98 K.â\93¤{I}
- | â\88\83â\88\83I,K,V. â¬\87*[i] L â\89\98 K.â\93\91{I}V & â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84 & G â\8a¢ â¬\88*[h,V] ð\9d\90\92â¦\83Kâ¦\84.
+ â\88\80L,i. G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â\9dªLâ\9d« →
+ â\88¨â\88¨ â\87©*[â\92»,ð\9d\90\94â\9d¨iâ\9d©] L ≘ ⋆
+ | â\88\83â\88\83I,K. â\87©*[i] L â\89\98 K.â\93¤[I]
+ | â\88\83â\88\83I,K,V. â\87©*[i] L â\89\98 K.â\93\91[I]V & â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d« & G â\8a¢ â¬\88*[h,V] ð\9d\90\92â\9dªKâ\9d«.
#h #G #L #i #H elim (drops_F_uni L i)
[ /2 width=1 by or3_intro0/
| * * /4 width=10 by rsx_fwd_lref_pair_csx_drops, rsx_fwd_lref_pair_drops, ex3_3_intro, ex1_2_intro, or3_intro2, or3_intro1/
(* Note: swapping the eliminations to avoid rsx_cpx_trans: no solution found *)
(* Basic_2A1: uses: lsx_lref_be_lpxs *)
lemma rsx_lref_pair_lpxs (h) (G):
- â\88\80K1,V. â¦\83G,K1â¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84 →
- â\88\80K2. G â\8a¢ â¬\88*[h,V] ð\9d\90\92â¦\83K2â¦\84 â\86\92 â¦\83G,K1â¦\84 ⊢ ⬈*[h] K2 →
- â\88\80I. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â¦\83K2.â\93\91{I}Vâ¦\84.
+ â\88\80K1,V. â\9dªG,K1â\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d« →
+ â\88\80K2. G â\8a¢ â¬\88*[h,V] ð\9d\90\92â\9dªK2â\9d« â\86\92 â\9dªG,K1â\9d« ⊢ ⬈*[h] K2 →
+ â\88\80I. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â\9dªK2.â\93\91[I]Vâ\9d«.
#h #G #K1 #V #H
@(csx_ind_cpxs … H) -V #V0 #_ #IHV0 #K2 #H
@(rsx_ind … H) -K2 #K0 #HK0 #IHK0 #HK10 #I
@rsx_intro #Y #HY #HnY
elim (lpx_inv_pair_sn … HY) -HY #K2 #V2 #HK02 #HV02 #H destruct
-elim (tdeq_dec V0 V2) #HnV02 destruct [ -IHV0 -HV02 -HK0 | -IHK0 -HnY ]
-[ /5 width=5 by rsx_rdeq_trans, lpxs_step_dx, rdeq_pair/
+elim (teqx_dec V0 V2) #HnV02 destruct [ -IHV0 -HV02 -HK0 | -IHK0 -HnY ]
+[ /5 width=5 by rsx_reqx_trans, lpxs_step_dx, reqx_pair/
| @(IHV0 … HnV02) -IHV0 -HnV02
[ /2 width=3 by lpxs_cpx_trans/
| /3 width=3 by rsx_lpx_trans, rsx_cpx_trans/
qed.
lemma rsx_lref_pair (h) (G):
- â\88\80K,V. â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84 â\86\92 G â\8a¢ â¬\88*[h,V] ð\9d\90\92â¦\83Kâ¦\84 â\86\92 â\88\80I. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â¦\83K.â\93\91{I}Vâ¦\84.
+ â\88\80K,V. â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d« â\86\92 G â\8a¢ â¬\88*[h,V] ð\9d\90\92â\9dªKâ\9d« â\86\92 â\88\80I. G â\8a¢ â¬\88*[h,#0] ð\9d\90\92â\9dªK.â\93\91[I]Vâ\9d«.
/2 width=3 by rsx_lref_pair_lpxs/ qed.
(* Basic_2A1: uses: lsx_lref_be *)
lemma rsx_lref_pair_drops (h) (G):
- â\88\80K,V. â¦\83G,Kâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Vâ¦\84 â\86\92 G â\8a¢ â¬\88*[h,V] ð\9d\90\92â¦\83Kâ¦\84 →
- â\88\80I,i,L. â¬\87*[i] L â\89\98 K.â\93\91{I}V â\86\92 G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â¦\83Lâ¦\84.
+ â\88\80K,V. â\9dªG,Kâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªVâ\9d« â\86\92 G â\8a¢ â¬\88*[h,V] ð\9d\90\92â\9dªKâ\9d« →
+ â\88\80I,i,L. â\87©*[i] L â\89\98 K.â\93\91[I]V â\86\92 G â\8a¢ â¬\88*[h,#i] ð\9d\90\92â\9dªLâ\9d«.
#h #G #K #V #HV #HK #I #i elim i -i
[ #L #H >(drops_fwd_isid … H) -H /2 width=1 by rsx_lref_pair/
| #i #IH #L #H
elim (drops_inv_bind2_isuni_next … H) -H // #J #Y #HY #H destruct
- @(rsx_lifts â\80¦ (ð\9d\90\94â\9d´1â\9dµ)) /3 width=6 by drops_refl, drops_drop/ (**) (* full auto fails *)
+ @(rsx_lifts â\80¦ (ð\9d\90\94â\9d¨1â\9d©)) /3 width=6 by drops_refl, drops_drop/ (**) (* full auto fails *)
]
qed.
(* Main properties with strongly rt-normalizing terms ***********************)
(* Basic_2A1: uses: csx_lsx *)
-theorem csx_rsx (h) (G): â\88\80L,T. â¦\83G,Lâ¦\84 â\8a¢ â¬\88*[h] ð\9d\90\92â¦\83Tâ¦\84 â\86\92 G â\8a¢ â¬\88*[h,T] ð\9d\90\92â¦\83Lâ¦\84.
+theorem csx_rsx (h) (G): â\88\80L,T. â\9dªG,Lâ\9d« â\8a¢ â¬\88*[h] ð\9d\90\92â\9dªTâ\9d« â\86\92 G â\8a¢ â¬\88*[h,T] ð\9d\90\92â\9dªLâ\9d«.
#h #G #L #T @(fqup_wf_ind_eq (Ⓣ) … G L T) -G -L -T
#Z #Y #X #IH #G #L * *
[ //