X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fbasic_2%2Frt_transition%2Fcpm.ma;h=ac451b66c580f81de831319b96bbc455013c211c;hp=30b04dc62ec806a05fc82213a5c9b48279b4ecda;hb=3c7b4071a9ac096b02334c1d47468776b948e2de;hpb=2f6f2b7c01d47d23f61dd48d767bcb37aecdcfea diff --git a/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpm.ma b/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpm.ma index 30b04dc62..ac451b66c 100644 --- a/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpm.ma +++ b/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpm.ma @@ -19,6 +19,7 @@ include "ground/xoa/ex_6_7.ma". include "ground/steps/rtc_max_shift.ma". include "ground/steps/rtc_isrt_plus.ma". include "ground/steps/rtc_isrt_max_shift.ma". +include "static_2/syntax/sh.ma". include "basic_2/notation/relations/pred_6.ma". include "basic_2/rt_transition/cpg.ma". @@ -26,90 +27,100 @@ include "basic_2/rt_transition/cpg.ma". (* Basic_2A1: includes: cpr *) definition cpm (h) (G) (L) (n): relation2 term term ≝ - λT1,T2. ∃∃c. 𝐑𝐓❪n,c❫ & ❪G,L❫ ⊢ T1 ⬈[eq_t,c,h] T2. + λT1,T2. ∃∃c. 𝐑𝐓❪n,c❫ & ❪G,L❫ ⊢ T1 ⬈[sh_is_next h,rtc_eq_t,c] T2. interpretation - "t-bound context-sensitive parallel rt-transition (term)" - 'PRed h n G L T1 T2 = (cpm h G L n T1 T2). + "t-bound context-sensitive parallel rt-transition (term)" + 'PRed h n G L T1 T2 = (cpm h G L n T1 T2). (* Basic properties *********************************************************) -lemma cpm_ess: ∀h,G,L,s. ❪G,L❫ ⊢ ⋆s ➡[h,1] ⋆(⫯[h]s). -/2 width=3 by cpg_ess, ex2_intro/ qed. +lemma cpm_ess (h) (G) (L): + ∀s. ❪G,L❫ ⊢ ⋆s ➡[h,1] ⋆(⫯[h]s). +/3 width=3 by cpg_ess, ex2_intro/ qed. -lemma cpm_delta: ∀h,n,G,K,V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → - ⇧[1] V2 ≘ W2 → ❪G,K.ⓓV1❫ ⊢ #0 ➡[h,n] W2. +lemma cpm_delta (h) (n) (G) (K): + ∀V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → + ⇧[1] V2 ≘ W2 → ❪G,K.ⓓV1❫ ⊢ #0 ➡[h,n] W2. #h #n #G #K #V1 #V2 #W2 * /3 width=5 by cpg_delta, ex2_intro/ qed. -lemma cpm_ell: ∀h,n,G,K,V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → - ⇧[1] V2 ≘ W2 → ❪G,K.ⓛV1❫ ⊢ #0 ➡[h,↑n] W2. +lemma cpm_ell (h) (n) (G) (K): + ∀V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → + ⇧[1] V2 ≘ W2 → ❪G,K.ⓛV1❫ ⊢ #0 ➡[h,↑n] W2. #h #n #G #K #V1 #V2 #W2 * /3 width=5 by cpg_ell, ex2_intro, isrt_succ/ qed. -lemma cpm_lref: ∀h,n,I,G,K,T,U,i. ❪G,K❫ ⊢ #i ➡[h,n] T → - ⇧[1] T ≘ U → ❪G,K.ⓘ[I]❫ ⊢ #↑i ➡[h,n] U. -#h #n #I #G #K #T #U #i * +lemma cpm_lref (h) (n) (G) (K): + ∀I,T,U,i. ❪G,K❫ ⊢ #i ➡[h,n] T → + ⇧[1] T ≘ U → ❪G,K.ⓘ[I]❫ ⊢ #↑i ➡[h,n] U. +#h #n #G #K #I #T #U #i * /3 width=5 by cpg_lref, ex2_intro/ qed. (* Basic_2A1: includes: cpr_bind *) -lemma cpm_bind: ∀h,n,p,I,G,L,V1,V2,T1,T2. - ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L.ⓑ[I]V1❫ ⊢ T1 ➡[h,n] T2 → - ❪G,L❫ ⊢ ⓑ[p,I]V1.T1 ➡[h,n] ⓑ[p,I]V2.T2. -#h #n #p #I #G #L #V1 #V2 #T1 #T2 * #cV #HcV #HV12 * +lemma cpm_bind (h) (n) (G) (L): + ∀p,I,V1,V2,T1,T2. + ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L.ⓑ[I]V1❫ ⊢ T1 ➡[h,n] T2 → + ❪G,L❫ ⊢ ⓑ[p,I]V1.T1 ➡[h,n] ⓑ[p,I]V2.T2. +#h #n #G #L #p #I #V1 #V2 #T1 #T2 * #cV #HcV #HV12 * /5 width=5 by cpg_bind, isrt_max_O1, isr_shift, ex2_intro/ qed. -lemma cpm_appl: ∀h,n,G,L,V1,V2,T1,T2. - ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → - ❪G,L❫ ⊢ ⓐV1.T1 ➡[h,n] ⓐV2.T2. +lemma cpm_appl (h) (n) (G) (L): + ∀V1,V2,T1,T2. + ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → + ❪G,L❫ ⊢ ⓐV1.T1 ➡[h,n] ⓐV2.T2. #h #n #G #L #V1 #V2 #T1 #T2 * #cV #HcV #HV12 * /5 width=5 by isrt_max_O1, isr_shift, cpg_appl, ex2_intro/ qed. -lemma cpm_cast: ∀h,n,G,L,U1,U2,T1,T2. - ❪G,L❫ ⊢ U1 ➡[h,n] U2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → - ❪G,L❫ ⊢ ⓝU1.T1 ➡[h,n] ⓝU2.T2. +lemma cpm_cast (h) (n) (G) (L): + ∀U1,U2,T1,T2. + ❪G,L❫ ⊢ U1 ➡[h,n] U2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → + ❪G,L❫ ⊢ ⓝU1.T1 ➡[h,n] ⓝU2.T2. #h #n #G #L #U1 #U2 #T1 #T2 * #cU #HcU #HU12 * /4 width=6 by cpg_cast, isrt_max_idem1, isrt_mono, ex2_intro/ qed. (* Basic_2A1: includes: cpr_zeta *) lemma cpm_zeta (h) (n) (G) (L): - ∀T1,T. ⇧[1] T ≘ T1 → ∀T2. ❪G,L❫ ⊢ T ➡[h,n] T2 → - ∀V. ❪G,L❫ ⊢ +ⓓV.T1 ➡[h,n] T2. + ∀T1,T. ⇧[1] T ≘ T1 → ∀T2. ❪G,L❫ ⊢ T ➡[h,n] T2 → + ∀V. ❪G,L❫ ⊢ +ⓓV.T1 ➡[h,n] T2. #h #n #G #L #T1 #T #HT1 #T2 * /3 width=5 by cpg_zeta, isrt_plus_O2, ex2_intro/ qed. (* Basic_2A1: includes: cpr_eps *) -lemma cpm_eps: ∀h,n,G,L,V,T1,T2. ❪G,L❫ ⊢ T1 ➡[h,n] T2 → ❪G,L❫ ⊢ ⓝV.T1 ➡[h,n] T2. +lemma cpm_eps (h) (n) (G) (L): + ∀V,T1,T2. ❪G,L❫ ⊢ T1 ➡[h,n] T2 → ❪G,L❫ ⊢ ⓝV.T1 ➡[h,n] T2. #h #n #G #L #V #T1 #T2 * /3 width=3 by cpg_eps, isrt_plus_O2, ex2_intro/ qed. -lemma cpm_ee: ∀h,n,G,L,V1,V2,T. ❪G,L❫ ⊢ V1 ➡[h,n] V2 → ❪G,L❫ ⊢ ⓝV1.T ➡[h,↑n] V2. +lemma cpm_ee (h) (n) (G) (L): + ∀V1,V2,T. ❪G,L❫ ⊢ V1 ➡[h,n] V2 → ❪G,L❫ ⊢ ⓝV1.T ➡[h,↑n] V2. #h #n #G #L #V1 #V2 #T * /3 width=3 by cpg_ee, isrt_succ, ex2_intro/ qed. (* Basic_2A1: includes: cpr_beta *) -lemma cpm_beta: ∀h,n,p,G,L,V1,V2,W1,W2,T1,T2. - ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → ❪G,L.ⓛW1❫ ⊢ T1 ➡[h,n] T2 → - ❪G,L❫ ⊢ ⓐV1.ⓛ[p]W1.T1 ➡[h,n] ⓓ[p]ⓝW2.V2.T2. -#h #n #p #G #L #V1 #V2 #W1 #W2 #T1 #T2 * #riV #rhV #HV12 * #riW #rhW #HW12 * +lemma cpm_beta (h) (n) (G) (L): + ∀p,V1,V2,W1,W2,T1,T2. + ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → ❪G,L.ⓛW1❫ ⊢ T1 ➡[h,n] T2 → + ❪G,L❫ ⊢ ⓐV1.ⓛ[p]W1.T1 ➡[h,n] ⓓ[p]ⓝW2.V2.T2. +#h #n #G #L #p #V1 #V2 #W1 #W2 #T1 #T2 * #riV #rhV #HV12 * #riW #rhW #HW12 * /6 width=7 by cpg_beta, isrt_plus_O2, isrt_max, isr_shift, ex2_intro/ qed. (* Basic_2A1: includes: cpr_theta *) -lemma cpm_theta: ∀h,n,p,G,L,V1,V,V2,W1,W2,T1,T2. - ❪G,L❫ ⊢ V1 ➡[h,0] V → ⇧[1] V ≘ V2 → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → - ❪G,L.ⓓW1❫ ⊢ T1 ➡[h,n] T2 → - ❪G,L❫ ⊢ ⓐV1.ⓓ[p]W1.T1 ➡[h,n] ⓓ[p]W2.ⓐV2.T2. -#h #n #p #G #L #V1 #V #V2 #W1 #W2 #T1 #T2 * #riV #rhV #HV1 #HV2 * #riW #rhW #HW12 * +lemma cpm_theta (h) (n) (G) (L): + ∀p,V1,V,V2,W1,W2,T1,T2. + ❪G,L❫ ⊢ V1 ➡[h,0] V → ⇧[1] V ≘ V2 → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → + ❪G,L.ⓓW1❫ ⊢ T1 ➡[h,n] T2 → ❪G,L❫ ⊢ ⓐV1.ⓓ[p]W1.T1 ➡[h,n] ⓓ[p]W2.ⓐV2.T2. +#h #n #G #L #p #V1 #V #V2 #W1 #W2 #T1 #T2 * #riV #rhV #HV1 #HV2 * #riW #rhW #HW12 * /6 width=9 by cpg_theta, isrt_plus_O2, isrt_max, isr_shift, ex2_intro/ qed. @@ -118,31 +129,29 @@ qed. (* Note: this is needed by cpms_ind_sn and cpms_ind_dx *) (* Basic_1: includes by definition: pr0_refl *) (* Basic_2A1: includes: cpr_atom *) -lemma cpr_refl: ∀h,G,L. reflexive … (cpm h G L 0). +lemma cpr_refl (h) (G) (L): reflexive … (cpm h G L 0). /3 width=3 by cpg_refl, ex2_intro/ qed. (* Advanced properties ******************************************************) -lemma cpm_sort (h) (G) (L): - ∀n. n ≤ 1 → ∀s. ❪G,L❫ ⊢ ⋆s ➡[h,n] ⋆((next h)^n s). -#h #G #L * // -#n #H #s <(le_n_O_to_eq n) /2 width=1 by le_S_S_to_le/ +lemma cpm_sort (h) (n) (G) (L): n ≤ 1 → + ∀s. ❪G,L❫ ⊢ ⋆s ➡[h,n] ⋆((next h)^n s). +#h * // +#n #G #L #H #s <(le_n_O_to_eq n) /2 width=1 by le_S_S_to_le/ qed. (* Basic inversion lemmas ***************************************************) -lemma cpm_inv_atom1: ∀h,n,J,G,L,T2. ❪G,L❫ ⊢ ⓪[J] ➡[h,n] T2 → - ∨∨ T2 = ⓪[J] ∧ n = 0 - | ∃∃s. T2 = ⋆(⫯[h]s) & J = Sort s & n = 1 - | ∃∃K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 & ⇧[1] V2 ≘ T2 & - L = K.ⓓV1 & J = LRef 0 - | ∃∃m,K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,m] V2 & ⇧[1] V2 ≘ T2 & - L = K.ⓛV1 & J = LRef 0 & n = ↑m - | ∃∃I,K,T,i. ❪G,K❫ ⊢ #i ➡[h,n] T & ⇧[1] T ≘ T2 & - L = K.ⓘ[I] & J = LRef (↑i). -#h #n #J #G #L #T2 * #c #Hc #H elim (cpg_inv_atom1 … H) -H * +lemma cpm_inv_atom1 (h) (n) (G) (L): + ∀J,T2. ❪G,L❫ ⊢ ⓪[J] ➡[h,n] T2 → + ∨∨ ∧∧ T2 = ⓪[J] & n = 0 + | ∃∃s. T2 = ⋆(⫯[h]s) & J = Sort s & n = 1 + | ∃∃K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 & ⇧[1] V2 ≘ T2 & L = K.ⓓV1 & J = LRef 0 + | ∃∃m,K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,m] V2 & ⇧[1] V2 ≘ T2 & L = K.ⓛV1 & J = LRef 0 & n = ↑m + | ∃∃I,K,T,i. ❪G,K❫ ⊢ #i ➡[h,n] T & ⇧[1] T ≘ T2 & L = K.ⓘ[I] & J = LRef (↑i). +#h #n #G #L #J #T2 * #c #Hc #H elim (cpg_inv_atom1 … H) -H * [ #H1 #H2 destruct /4 width=1 by isrt_inv_00, or5_intro0, conj/ -| #s #H1 #H2 #H3 destruct /4 width=3 by isrt_inv_01, or5_intro1, ex3_intro/ +| #s1 #s2 #H1 #H2 #H3 #H4 destruct /4 width=3 by isrt_inv_01, or5_intro1, ex3_intro/ | #cV #K #V1 #V2 #HV12 #HVT2 #H1 #H2 #H3 destruct /4 width=6 by or5_intro2, ex4_3_intro, ex2_intro/ | #cV #K #V1 #V2 #HV12 #HVT2 #H1 #H2 #H3 destruct @@ -153,20 +162,24 @@ lemma cpm_inv_atom1: ∀h,n,J,G,L,T2. ❪G,L❫ ⊢ ⓪[J] ➡[h,n] T2 → ] qed-. -lemma cpm_inv_sort1: ∀h,n,G,L,T2,s. ❪G,L❫ ⊢ ⋆s ➡[h,n] T2 → - ∧∧ T2 = ⋆(((next h)^n) s) & n ≤ 1. -#h #n #G #L #T2 #s * #c #Hc #H -elim (cpg_inv_sort1 … H) -H * #H1 #H2 destruct -[ lapply (isrt_inv_00 … Hc) | lapply (isrt_inv_01 … Hc) ] -Hc +lemma cpm_inv_sort1 (h) (n) (G) (L): + ∀T2,s1. ❪G,L❫ ⊢ ⋆s1 ➡[h,n] T2 → + ∧∧ T2 = ⋆(((next h)^n) s1) & n ≤ 1. +#h #n #G #L #T2 #s1 * #c #Hc #H +elim (cpg_inv_sort1 … H) -H * +[ #H1 #H2 destruct + lapply (isrt_inv_00 … Hc) +| #s2 #H1 #H2 #H3 destruct + lapply (isrt_inv_01 … Hc) +] -Hc #H destruct /2 width=1 by conj/ qed-. -lemma cpm_inv_zero1: ∀h,n,G,L,T2. ❪G,L❫ ⊢ #0 ➡[h,n] T2 → - ∨∨ T2 = #0 ∧ n = 0 - | ∃∃K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 & ⇧[1] V2 ≘ T2 & - L = K.ⓓV1 - | ∃∃m,K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,m] V2 & ⇧[1] V2 ≘ T2 & - L = K.ⓛV1 & n = ↑m. +lemma cpm_inv_zero1 (h) (n) (G) (L): + ∀T2. ❪G,L❫ ⊢ #0 ➡[h,n] T2 → + ∨∨ ∧∧ T2 = #0 & n = 0 + | ∃∃K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 & ⇧[1] V2 ≘ T2 & L = K.ⓓV1 + | ∃∃m,K,V1,V2. ❪G,K❫ ⊢ V1 ➡[h,m] V2 & ⇧[1] V2 ≘ T2 & L = K.ⓛV1 & n = ↑m. #h #n #G #L #T2 * #c #Hc #H elim (cpg_inv_zero1 … H) -H * [ #H1 #H2 destruct /4 width=1 by isrt_inv_00, or3_intro0, conj/ | #cV #K #V1 #V2 #HV12 #HVT2 #H1 #H2 destruct @@ -187,9 +200,10 @@ elim (cpm_inv_zero1 … H) -H * ] qed. -lemma cpm_inv_lref1: ∀h,n,G,L,T2,i. ❪G,L❫ ⊢ #↑i ➡[h,n] T2 → - ∨∨ T2 = #(↑i) ∧ n = 0 - | ∃∃I,K,T. ❪G,K❫ ⊢ #i ➡[h,n] T & ⇧[1] T ≘ T2 & L = K.ⓘ[I]. +lemma cpm_inv_lref1 (h) (n) (G) (L): + ∀T2,i. ❪G,L❫ ⊢ #↑i ➡[h,n] T2 → + ∨∨ ∧∧ T2 = #(↑i) & n = 0 + | ∃∃I,K,T. ❪G,K❫ ⊢ #i ➡[h,n] T & ⇧[1] T ≘ T2 & L = K.ⓘ[I]. #h #n #G #L #T2 #i * #c #Hc #H elim (cpg_inv_lref1 … H) -H * [ #H1 #H2 destruct /4 width=1 by isrt_inv_00, or_introl, conj/ | #I #K #V2 #HV2 #HVT2 #H destruct @@ -212,18 +226,18 @@ lemma cpm_inv_lref1_ctop (h) (n) (G): ] qed. -lemma cpm_inv_gref1: ∀h,n,G,L,T2,l. ❪G,L❫ ⊢ §l ➡[h,n] T2 → T2 = §l ∧ n = 0. +lemma cpm_inv_gref1 (h) (n) (G) (L): + ∀T2,l. ❪G,L❫ ⊢ §l ➡[h,n] T2 → ∧∧ T2 = §l & n = 0. #h #n #G #L #T2 #l * #c #Hc #H elim (cpg_inv_gref1 … H) -H #H1 #H2 destruct /3 width=1 by isrt_inv_00, conj/ qed-. (* Basic_2A1: includes: cpr_inv_bind1 *) -lemma cpm_inv_bind1: ∀h,n,p,I,G,L,V1,T1,U2. ❪G,L❫ ⊢ ⓑ[p,I]V1.T1 ➡[h,n] U2 → - ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓑ[I]V1❫ ⊢ T1 ➡[h,n] T2 & - U2 = ⓑ[p,I]V2.T2 - | ∃∃T. ⇧[1] T ≘ T1 & ❪G,L❫ ⊢ T ➡[h,n] U2 & - p = true & I = Abbr. -#h #n #p #I #G #L #V1 #T1 #U2 * #c #Hc #H elim (cpg_inv_bind1 … H) -H * +lemma cpm_inv_bind1 (h) (n) (G) (L): + ∀p,I,V1,T1,U2. ❪G,L❫ ⊢ ⓑ[p,I]V1.T1 ➡[h,n] U2 → + ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓑ[I]V1❫ ⊢ T1 ➡[h,n] T2 & U2 = ⓑ[p,I]V2.T2 + | ∃∃T. ⇧[1] T ≘ T1 & ❪G,L❫ ⊢ T ➡[h,n] U2 & p = true & I = Abbr. +#h #n #G #L #p #I #V1 #T1 #U2 * #c #Hc #H elim (cpg_inv_bind1 … H) -H * [ #cV #cT #V2 #T2 #HV12 #HT12 #H1 #H2 destruct elim (isrt_inv_max … Hc) -Hc #nV #nT #HcV #HcT #H destruct elim (isrt_inv_shift … HcV) -HcV #HcV #H destruct @@ -235,11 +249,11 @@ qed-. (* Basic_1: includes: pr0_gen_abbr pr2_gen_abbr *) (* Basic_2A1: includes: cpr_inv_abbr1 *) -lemma cpm_inv_abbr1: ∀h,n,p,G,L,V1,T1,U2. ❪G,L❫ ⊢ ⓓ[p]V1.T1 ➡[h,n] U2 → - ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓓV1❫ ⊢ T1 ➡[h,n] T2 & - U2 = ⓓ[p]V2.T2 - | ∃∃T. ⇧[1] T ≘ T1 & ❪G,L❫ ⊢ T ➡[h,n] U2 & p = true. -#h #n #p #G #L #V1 #T1 #U2 #H +lemma cpm_inv_abbr1 (h) (n) (G) (L): + ∀p,V1,T1,U2. ❪G,L❫ ⊢ ⓓ[p]V1.T1 ➡[h,n] U2 → + ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓓV1❫ ⊢ T1 ➡[h,n] T2 & U2 = ⓓ[p]V2.T2 + | ∃∃T. ⇧[1] T ≘ T1 & ❪G,L❫ ⊢ T ➡[h,n] U2 & p = true. +#h #n #G #L #p #V1 #T1 #U2 #H elim (cpm_inv_bind1 … H) -H [ /3 width=1 by or_introl/ | * /3 width=3 by ex3_intro, or_intror/ @@ -248,34 +262,31 @@ qed-. (* Basic_1: includes: pr0_gen_abst pr2_gen_abst *) (* Basic_2A1: includes: cpr_inv_abst1 *) -lemma cpm_inv_abst1: ∀h,n,p,G,L,V1,T1,U2. ❪G,L❫ ⊢ ⓛ[p]V1.T1 ➡[h,n] U2 → - ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓛV1❫ ⊢ T1 ➡[h,n] T2 & - U2 = ⓛ[p]V2.T2. -#h #n #p #G #L #V1 #T1 #U2 #H +lemma cpm_inv_abst1 (h) (n) (G) (L): + ∀p,V1,T1,U2. ❪G,L❫ ⊢ ⓛ[p]V1.T1 ➡[h,n] U2 → + ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓛV1❫ ⊢ T1 ➡[h,n] T2 & U2 = ⓛ[p]V2.T2. +#h #n #G #L #p #V1 #T1 #U2 #H elim (cpm_inv_bind1 … H) -H [ /3 width=1 by or_introl/ | * #T #_ #_ #_ #H destruct ] qed-. -lemma cpm_inv_abst_bi: ∀h,n,p1,p2,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ ⓛ[p1]V1.T1 ➡[h,n] ⓛ[p2]V2.T2 → - ∧∧ ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓛV1❫ ⊢ T1 ➡[h,n] T2 & p1 = p2. -#h #n #p1 #p2 #G #L #V1 #V2 #T1 #T2 #H +lemma cpm_inv_abst_bi (h) (n) (G) (L): + ∀p1,p2,V1,V2,T1,T2. ❪G,L❫ ⊢ ⓛ[p1]V1.T1 ➡[h,n] ⓛ[p2]V2.T2 → + ∧∧ ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L.ⓛV1❫ ⊢ T1 ➡[h,n] T2 & p1 = p2. +#h #n #G #L #p1 #p2 #V1 #V2 #T1 #T2 #H elim (cpm_inv_abst1 … H) -H #XV #XT #HV #HT #H destruct /2 width=1 by and3_intro/ qed-. (* Basic_1: includes: pr0_gen_appl pr2_gen_appl *) (* Basic_2A1: includes: cpr_inv_appl1 *) -lemma cpm_inv_appl1: ∀h,n,G,L,V1,U1,U2. ❪G,L❫ ⊢ ⓐ V1.U1 ➡[h,n] U2 → - ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L❫ ⊢ U1 ➡[h,n] T2 & - U2 = ⓐV2.T2 - | ∃∃p,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L❫ ⊢ W1 ➡[h,0] W2 & - ❪G,L.ⓛW1❫ ⊢ T1 ➡[h,n] T2 & - U1 = ⓛ[p]W1.T1 & U2 = ⓓ[p]ⓝW2.V2.T2 - | ∃∃p,V,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V & ⇧[1] V ≘ V2 & - ❪G,L❫ ⊢ W1 ➡[h,0] W2 & ❪G,L.ⓓW1❫ ⊢ T1 ➡[h,n] T2 & - U1 = ⓓ[p]W1.T1 & U2 = ⓓ[p]W2.ⓐV2.T2. +lemma cpm_inv_appl1 (h) (n) (G) (L): + ∀V1,U1,U2. ❪G,L❫ ⊢ ⓐ V1.U1 ➡[h,n] U2 → + ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L❫ ⊢ U1 ➡[h,n] T2 & U2 = ⓐV2.T2 + | ∃∃p,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 & ❪G,L❫ ⊢ W1 ➡[h,0] W2 & ❪G,L.ⓛW1❫ ⊢ T1 ➡[h,n] T2 & U1 = ⓛ[p]W1.T1 & U2 = ⓓ[p]ⓝW2.V2.T2 + | ∃∃p,V,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V & ⇧[1] V ≘ V2 & ❪G,L❫ ⊢ W1 ➡[h,0] W2 & ❪G,L.ⓓW1❫ ⊢ T1 ➡[h,n] T2 & U1 = ⓓ[p]W1.T1 & U2 = ⓓ[p]W2.ⓐV2.T2. #h #n #G #L #V1 #U1 #U2 * #c #Hc #H elim (cpg_inv_appl1 … H) -H * [ #cV #cT #V2 #T2 #HV12 #HT12 #H1 #H2 destruct elim (isrt_inv_max … Hc) -Hc #nV #nT #HcV #HcT #H destruct @@ -298,11 +309,11 @@ lemma cpm_inv_appl1: ∀h,n,G,L,V1,U1,U2. ❪G,L❫ ⊢ ⓐ V1.U1 ➡[h,n] U2 ] qed-. -lemma cpm_inv_cast1: ∀h,n,G,L,V1,U1,U2. ❪G,L❫ ⊢ ⓝV1.U1 ➡[h,n] U2 → - ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,n] V2 & ❪G,L❫ ⊢ U1 ➡[h,n] T2 & - U2 = ⓝV2.T2 - | ❪G,L❫ ⊢ U1 ➡[h,n] U2 - | ∃∃m. ❪G,L❫ ⊢ V1 ➡[h,m] U2 & n = ↑m. +lemma cpm_inv_cast1 (h) (n) (G) (L): + ∀V1,U1,U2. ❪G,L❫ ⊢ ⓝV1.U1 ➡[h,n] U2 → + ∨∨ ∃∃V2,T2. ❪G,L❫ ⊢ V1 ➡[h,n] V2 & ❪G,L❫ ⊢ U1 ➡[h,n] T2 & U2 = ⓝV2.T2 + | ❪G,L❫ ⊢ U1 ➡[h,n] U2 + | ∃∃m. ❪G,L❫ ⊢ V1 ➡[h,m] U2 & n = ↑m. #h #n #G #L #V1 #U1 #U2 * #c #Hc #H elim (cpg_inv_cast1 … H) -H * [ #cV #cT #V2 #T2 #HV12 #HT12 #HcVT #H1 #H2 destruct elim (isrt_inv_max … Hc) -Hc #nV #nT #HcV #HcT #H destruct @@ -320,49 +331,49 @@ qed-. (* Basic forward lemmas *****************************************************) (* Basic_2A1: includes: cpr_fwd_bind1_minus *) -lemma cpm_fwd_bind1_minus: ∀h,n,I,G,L,V1,T1,T. ❪G,L❫ ⊢ -ⓑ[I]V1.T1 ➡[h,n] T → ∀p. - ∃∃V2,T2. ❪G,L❫ ⊢ ⓑ[p,I]V1.T1 ➡[h,n] ⓑ[p,I]V2.T2 & - T = -ⓑ[I]V2.T2. -#h #n #I #G #L #V1 #T1 #T * #c #Hc #H #p elim (cpg_fwd_bind1_minus … H p) -H +lemma cpm_fwd_bind1_minus (h) (n) (G) (L): + ∀I,V1,T1,T. ❪G,L❫ ⊢ -ⓑ[I]V1.T1 ➡[h,n] T → ∀p. + ∃∃V2,T2. ❪G,L❫ ⊢ ⓑ[p,I]V1.T1 ➡[h,n] ⓑ[p,I]V2.T2 & T = -ⓑ[I]V2.T2. +#h #n #G #L #I #V1 #T1 #T * #c #Hc #H #p elim (cpg_fwd_bind1_minus … H p) -H /3 width=4 by ex2_2_intro, ex2_intro/ qed-. (* Basic eliminators ********************************************************) -lemma cpm_ind (h): ∀Q:relation5 nat genv lenv term term. - (∀I,G,L. Q 0 G L (⓪[I]) (⓪[I])) → - (∀G,L,s. Q 1 G L (⋆s) (⋆(⫯[h]s))) → - (∀n,G,K,V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → Q n G K V1 V2 → - ⇧[1] V2 ≘ W2 → Q n G (K.ⓓV1) (#0) W2 - ) → (∀n,G,K,V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → Q n G K V1 V2 → - ⇧[1] V2 ≘ W2 → Q (↑n) G (K.ⓛV1) (#0) W2 - ) → (∀n,I,G,K,T,U,i. ❪G,K❫ ⊢ #i ➡[h,n] T → Q n G K (#i) T → - ⇧[1] T ≘ U → Q n G (K.ⓘ[I]) (#↑i) (U) - ) → (∀n,p,I,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L.ⓑ[I]V1❫ ⊢ T1 ➡[h,n] T2 → - Q 0 G L V1 V2 → Q n G (L.ⓑ[I]V1) T1 T2 → Q n G L (ⓑ[p,I]V1.T1) (ⓑ[p,I]V2.T2) - ) → (∀n,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → - Q 0 G L V1 V2 → Q n G L T1 T2 → Q n G L (ⓐV1.T1) (ⓐV2.T2) - ) → (∀n,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,n] V2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → - Q n G L V1 V2 → Q n G L T1 T2 → Q n G L (ⓝV1.T1) (ⓝV2.T2) - ) → (∀n,G,L,V,T1,T,T2. ⇧[1] T ≘ T1 → ❪G,L❫ ⊢ T ➡[h,n] T2 → - Q n G L T T2 → Q n G L (+ⓓV.T1) T2 - ) → (∀n,G,L,V,T1,T2. ❪G,L❫ ⊢ T1 ➡[h,n] T2 → - Q n G L T1 T2 → Q n G L (ⓝV.T1) T2 - ) → (∀n,G,L,V1,V2,T. ❪G,L❫ ⊢ V1 ➡[h,n] V2 → - Q n G L V1 V2 → Q (↑n) G L (ⓝV1.T) V2 - ) → (∀n,p,G,L,V1,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → ❪G,L.ⓛW1❫ ⊢ T1 ➡[h,n] T2 → - Q 0 G L V1 V2 → Q 0 G L W1 W2 → Q n G (L.ⓛW1) T1 T2 → - Q n G L (ⓐV1.ⓛ[p]W1.T1) (ⓓ[p]ⓝW2.V2.T2) - ) → (∀n,p,G,L,V1,V,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → ❪G,L.ⓓW1❫ ⊢ T1 ➡[h,n] T2 → - Q 0 G L V1 V → Q 0 G L W1 W2 → Q n G (L.ⓓW1) T1 T2 → - ⇧[1] V ≘ V2 → Q n G L (ⓐV1.ⓓ[p]W1.T1) (ⓓ[p]W2.ⓐV2.T2) - ) → - ∀n,G,L,T1,T2. ❪G,L❫ ⊢ T1 ➡[h,n] T2 → Q n G L T1 T2. +lemma cpm_ind (h) (Q:relation5 …): + (∀I,G,L. Q 0 G L (⓪[I]) (⓪[I])) → + (∀G,L,s. Q 1 G L (⋆s) (⋆(⫯[h]s))) → + (∀n,G,K,V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → Q n G K V1 V2 → + ⇧[1] V2 ≘ W2 → Q n G (K.ⓓV1) (#0) W2 + ) → (∀n,G,K,V1,V2,W2. ❪G,K❫ ⊢ V1 ➡[h,n] V2 → Q n G K V1 V2 → + ⇧[1] V2 ≘ W2 → Q (↑n) G (K.ⓛV1) (#0) W2 + ) → (∀n,I,G,K,T,U,i. ❪G,K❫ ⊢ #i ➡[h,n] T → Q n G K (#i) T → + ⇧[1] T ≘ U → Q n G (K.ⓘ[I]) (#↑i) (U) + ) → (∀n,p,I,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L.ⓑ[I]V1❫ ⊢ T1 ➡[h,n] T2 → + Q 0 G L V1 V2 → Q n G (L.ⓑ[I]V1) T1 T2 → Q n G L (ⓑ[p,I]V1.T1) (ⓑ[p,I]V2.T2) + ) → (∀n,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → + Q 0 G L V1 V2 → Q n G L T1 T2 → Q n G L (ⓐV1.T1) (ⓐV2.T2) + ) → (∀n,G,L,V1,V2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,n] V2 → ❪G,L❫ ⊢ T1 ➡[h,n] T2 → + Q n G L V1 V2 → Q n G L T1 T2 → Q n G L (ⓝV1.T1) (ⓝV2.T2) + ) → (∀n,G,L,V,T1,T,T2. ⇧[1] T ≘ T1 → ❪G,L❫ ⊢ T ➡[h,n] T2 → + Q n G L T T2 → Q n G L (+ⓓV.T1) T2 + ) → (∀n,G,L,V,T1,T2. ❪G,L❫ ⊢ T1 ➡[h,n] T2 → + Q n G L T1 T2 → Q n G L (ⓝV.T1) T2 + ) → (∀n,G,L,V1,V2,T. ❪G,L❫ ⊢ V1 ➡[h,n] V2 → + Q n G L V1 V2 → Q (↑n) G L (ⓝV1.T) V2 + ) → (∀n,p,G,L,V1,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V2 → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → ❪G,L.ⓛW1❫ ⊢ T1 ➡[h,n] T2 → + Q 0 G L V1 V2 → Q 0 G L W1 W2 → Q n G (L.ⓛW1) T1 T2 → + Q n G L (ⓐV1.ⓛ[p]W1.T1) (ⓓ[p]ⓝW2.V2.T2) + ) → (∀n,p,G,L,V1,V,V2,W1,W2,T1,T2. ❪G,L❫ ⊢ V1 ➡[h,0] V → ❪G,L❫ ⊢ W1 ➡[h,0] W2 → ❪G,L.ⓓW1❫ ⊢ T1 ➡[h,n] T2 → + Q 0 G L V1 V → Q 0 G L W1 W2 → Q n G (L.ⓓW1) T1 T2 → + ⇧[1] V ≘ V2 → Q n G L (ⓐV1.ⓓ[p]W1.T1) (ⓓ[p]W2.ⓐV2.T2) + ) → + ∀n,G,L,T1,T2. ❪G,L❫ ⊢ T1 ➡[h,n] T2 → Q n G L T1 T2. #h #Q #IH1 #IH2 #IH3 #IH4 #IH5 #IH6 #IH7 #IH8 #IH9 #IH10 #IH11 #IH12 #IH13 #n #G #L #T1 #T2 * #c #HC #H generalize in match HC; -HC generalize in match n; -n elim H -c -G -L -T1 -T2 [ #I #G #L #n #H <(isrt_inv_00 … H) -H // -| #G #L #s #n #H <(isrt_inv_01 … H) -H // +| #G #L #s1 #s2 #HRs #n #H <(isrt_inv_01 … H) -H destruct // | /3 width=4 by ex2_intro/ | #c #G #L #V1 #V2 #W2 #HV12 #HVW2 #IH #x #H elim (isrt_inv_plus_SO_dx … H) -H // #n #Hc #H destruct