X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fstatic_2%2Fstatic%2Frex.ma;h=0eb1164eb652cf0b626e63d5b3dcd3ae95e6f2b7;hp=4d10fb256a881c0919a060669007c05da5d6dbc1;hb=647504aa72b84eb49be8177b88a9254174e84d4b;hpb=b2cdc4abd9ac87e39bc51b0d9c38daea179adbd5 diff --git a/matita/matita/contribs/lambdadelta/static_2/static/rex.ma b/matita/matita/contribs/lambdadelta/static_2/static/rex.ma index 4d10fb256..0eb1164eb 100644 --- a/matita/matita/contribs/lambdadelta/static_2/static/rex.ma +++ b/matita/matita/contribs/lambdadelta/static_2/static/rex.ma @@ -27,8 +27,9 @@ include "static_2/static/frees.ma". definition rex (R) (T): relation lenv ≝ λL1,L2. ∃∃f. L1 ⊢ 𝐅+❪T❫ ≘ f & L1 ⪤[cext2 R,cfull,f] L2. -interpretation "generic extension on referred entries (local environment)" - 'Relation R T L1 L2 = (rex R T L1 L2). +interpretation + "generic extension on referred entries (local environment)" + 'Relation R T L1 L2 = (rex R T L1 L2). definition R_confluent2_rex: relation4 (relation3 lenv term term) @@ -46,23 +47,29 @@ definition R_replace3_rex: ∀L1. L0 ⪤[RP1,T0] L1 → ∀L2. L0 ⪤[RP2,T0] L2 → ∀T. R2 L1 T1 T → R1 L2 T2 T. +definition R_transitive_rex: relation3 ? (relation3 ?? term) … ≝ + λR1,R2,R3. + ∀K1,K,V1. K1 ⪤[R1,V1] K → + ∀V. R1 K1 V1 V → ∀V2. R2 K V V2 → R3 K1 V1 V2. + +definition R_confluent1_rex: relation … ≝ + λR1,R2. + ∀K1,K2,V1. K1 ⪤[R2,V1] K2 → ∀V2. R1 K1 V1 V2 → R1 K2 V1 V2. + definition rex_confluent: relation … ≝ λR1,R2. ∀K1,K,V1. K1 ⪤[R1,V1] K → ∀V. R1 K1 V1 V → ∀K2. K ⪤[R2,V] K2 → K ⪤[R2,V1] K2. -definition rex_transitive: relation3 ? (relation3 ?? term) … ≝ - λR1,R2,R3. - ∀K1,K,V1. K1 ⪤[R1,V1] K → - ∀V. R1 K1 V1 V → ∀V2. R2 K V V2 → R3 K1 V1 V2. - (* Basic inversion lemmas ***************************************************) -lemma rex_inv_atom_sn (R): ∀Y2,T. ⋆ ⪤[R,T] Y2 → Y2 = ⋆. +lemma rex_inv_atom_sn (R): + ∀Y2,T. ⋆ ⪤[R,T] Y2 → Y2 = ⋆. #R #Y2 #T * /2 width=4 by sex_inv_atom1/ qed-. -lemma rex_inv_atom_dx (R): ∀Y1,T. Y1 ⪤[R,T] ⋆ → Y1 = ⋆. +lemma rex_inv_atom_dx (R): + ∀Y1,T. Y1 ⪤[R,T] ⋆ → Y1 = ⋆. #R #I #Y1 * /2 width=4 by sex_inv_atom2/ qed-. @@ -81,11 +88,9 @@ qed-. lemma rex_inv_zero (R): ∀Y1,Y2. Y1 ⪤[R,#0] Y2 → - ∨∨ Y1 = ⋆ ∧ Y2 = ⋆ - | ∃∃I,L1,L2,V1,V2. L1 ⪤[R,V1] L2 & R L1 V1 V2 & - Y1 = L1.ⓑ[I]V1 & Y2 = L2.ⓑ[I]V2 - | ∃∃f,I,L1,L2. 𝐈❪f❫ & L1 ⪤[cext2 R,cfull,f] L2 & - Y1 = L1.ⓤ[I] & Y2 = L2.ⓤ[I]. + ∨∨ ∧∧ Y1 = ⋆ & Y2 = ⋆ + | ∃∃I,L1,L2,V1,V2. L1 ⪤[R,V1] L2 & R L1 V1 V2 & Y1 = L1.ⓑ[I]V1 & Y2 = L2.ⓑ[I]V2 + | ∃∃f,I,L1,L2. 𝐈❪f❫ & L1 ⪤[cext2 R,cfull,f] L2 & Y1 = L1.ⓤ[I] & Y2 = L2.ⓤ[I]. #R * [ | #Y1 * #I1 [ | #X ] ] #Y2 * #f #H1 #H2 [ lapply (sex_inv_atom1 … H2) -H2 /3 width=1 by or3_intro0, conj/ | elim (frees_inv_unit … H1) -H1 #g #HX #H destruct @@ -246,7 +251,8 @@ elim (rex_inv_zero_pair_sn … H) -H #Y #X #HK12 #_ #H destruct // qed-. (* Basic_2A1: uses: llpx_sn_fwd_pair_sn llpx_sn_fwd_bind_sn llpx_sn_fwd_flat_sn *) -lemma rex_fwd_pair_sn (R): ∀I,L1,L2,V,T. L1 ⪤[R,②[I]V.T] L2 → L1 ⪤[R,V] L2. +lemma rex_fwd_pair_sn (R): + ∀I,L1,L2,V,T. L1 ⪤[R,②[I]V.T] L2 → L1 ⪤[R,V] L2. #R * [ #p ] #I #L1 #L2 #V #T * #f #Hf #HL [ elim (frees_inv_bind … Hf) | elim (frees_inv_flat … Hf) ] -Hf /4 width=6 by sle_sex_trans, sor_inv_sle_sn, ex2_intro/ @@ -260,7 +266,8 @@ lemma rex_fwd_bind_dx (R): qed-. (* Basic_2A1: uses: llpx_sn_fwd_flat_dx *) -lemma rex_fwd_flat_dx (R): ∀I,L1,L2,V,T. L1 ⪤[R,ⓕ[I]V.T] L2 → L1 ⪤[R,T] L2. +lemma rex_fwd_flat_dx (R): + ∀I,L1,L2,V,T. L1 ⪤[R,ⓕ[I]V.T] L2 → L1 ⪤[R,T] L2. #R #I #L1 #L2 #V #T #H elim (rex_inv_flat … H) -H // qed-. @@ -274,7 +281,8 @@ qed-. (* Basic properties *********************************************************) -lemma rex_atom (R): ∀I. ⋆ ⪤[R,⓪[I]] ⋆. +lemma rex_atom (R): + ∀I. ⋆ ⪤[R,⓪[I]] ⋆. #R * /3 width=3 by frees_sort, frees_atom, frees_gref, sex_atom, ex2_intro/ qed.