X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fbasic_2%2Frt_computation%2Frdsx.ma;h=45dd9f908f53790885b1875855e417c3df7cc253;hp=5b62dbae165abf621a7d683fc912990e32292c76;hb=4173283e148199871d787c53c0301891deb90713;hpb=a67fc50ccfda64377e2c94c18c3a0d9265f651db diff --git a/matita/matita/contribs/lambdadelta/basic_2/rt_computation/rdsx.ma b/matita/matita/contribs/lambdadelta/basic_2/rt_computation/rdsx.ma index 5b62dbae1..45dd9f908 100644 --- a/matita/matita/contribs/lambdadelta/basic_2/rt_computation/rdsx.ma +++ b/matita/matita/contribs/lambdadelta/basic_2/rt_computation/rdsx.ma @@ -12,80 +12,82 @@ (* *) (**************************************************************************) -include "basic_2/notation/relations/predtysnstrong_5.ma". +include "basic_2/notation/relations/predtysnstrong_4.ma". include "static_2/static/rdeq.ma". include "basic_2/rt_transition/lpx.ma". (* STRONGLY NORMALIZING REFERRED LOCAL ENV.S FOR UNBOUND RT-TRANSITION ******) -definition rdsx (h) (o) (G) (T): predicate lenv ≝ - SN … (lpx h G) (rdeq h o T). +definition rdsx (h) (G) (T): predicate lenv ≝ + SN … (lpx h G) (rdeq T). interpretation "strong normalization for unbound context-sensitive parallel rt-transition on referred entries (local environment)" - 'PRedTySNStrong h o T G L = (rdsx h o G T L). + 'PRedTySNStrong h T G L = (rdsx h G T L). (* Basic eliminators ********************************************************) (* Basic_2A1: uses: lsx_ind *) -lemma rdsx_ind (h) (o) (G) (T): +lemma rdsx_ind (h) (G) (T): ∀Q:predicate lenv. - (∀L1. G ⊢ ⬈*[h, o, T] 𝐒⦃L1⦄ → - (∀L2. ⦃G, L1⦄ ⊢ ⬈[h] L2 → (L1 ≛[h, o, T] L2 → ⊥) → Q L2) → + (∀L1. G ⊢ ⬈*[h, T] 𝐒⦃L1⦄ → + (∀L2. ⦃G, L1⦄ ⊢ ⬈[h] L2 → (L1 ≛[T] L2 → ⊥) → Q L2) → Q L1 ) → - ∀L. G ⊢ ⬈*[h, o, T] 𝐒⦃L⦄ → Q L. -#h #o #G #T #Q #H0 #L1 #H elim H -L1 + ∀L. G ⊢ ⬈*[h, T] 𝐒⦃L⦄ → Q L. +#h #G #T #Q #H0 #L1 #H elim H -L1 /5 width=1 by SN_intro/ qed-. (* Basic properties *********************************************************) (* Basic_2A1: uses: lsx_intro *) -lemma rdsx_intro (h) (o) (G) (T): +lemma rdsx_intro (h) (G) (T): ∀L1. - (∀L2. ⦃G, L1⦄ ⊢ ⬈[h] L2 → (L1 ≛[h, o, T] L2 → ⊥) → G ⊢ ⬈*[h, o, T] 𝐒⦃L2⦄) → - G ⊢ ⬈*[h, o, T] 𝐒⦃L1⦄. + (∀L2. ⦃G, L1⦄ ⊢ ⬈[h] L2 → (L1 ≛[T] L2 → ⊥) → G ⊢ ⬈*[h, T] 𝐒⦃L2⦄) → + G ⊢ ⬈*[h, T] 𝐒⦃L1⦄. /5 width=1 by SN_intro/ qed. (* Basic forward lemmas *****************************************************) (* Basic_2A1: uses: lsx_fwd_pair_sn lsx_fwd_bind_sn lsx_fwd_flat_sn *) -lemma rdsx_fwd_pair_sn (h) (o) (G): - ∀I,L,V,T. G ⊢ ⬈*[h, o, ②{I}V.T] 𝐒⦃L⦄ → - G ⊢ ⬈*[h, o, V] 𝐒⦃L⦄. -#h #o #G #I #L #V #T #H +lemma rdsx_fwd_pair_sn (h) (G): + ∀I,L,V,T. G ⊢ ⬈*[h, ②{I}V.T] 𝐒⦃L⦄ → + G ⊢ ⬈*[h, V] 𝐒⦃L⦄. +#h #G #I #L #V #T #H @(rdsx_ind … H) -L #L1 #_ #IHL1 @rdsx_intro #L2 #HL12 #HnL12 /4 width=3 by rdeq_fwd_pair_sn/ qed-. (* Basic_2A1: uses: lsx_fwd_flat_dx *) -lemma rdsx_fwd_flat_dx (h) (o) (G): - ∀I,L,V,T. G ⊢ ⬈*[h, o, ⓕ{I}V.T] 𝐒⦃L⦄ → - G ⊢ ⬈*[h, o, T] 𝐒⦃L⦄. -#h #o #G #I #L #V #T #H +lemma rdsx_fwd_flat_dx (h) (G): + ∀I,L,V,T. G ⊢ ⬈*[h, ⓕ{I}V.T] 𝐒⦃L⦄ → + G ⊢ ⬈*[h, T] 𝐒⦃L⦄. +#h #G #I #L #V #T #H @(rdsx_ind … H) -L #L1 #_ #IHL1 @rdsx_intro #L2 #HL12 #HnL12 /4 width=3 by rdeq_fwd_flat_dx/ qed-. -fact rdsx_fwd_pair_aux (h) (o) (G): ∀L. G ⊢ ⬈*[h, o, #0] 𝐒⦃L⦄ → - ∀I,K,V. L = K.ⓑ{I}V → G ⊢ ⬈*[h, o, V] 𝐒⦃K⦄. -#h #o #G #L #H +fact rdsx_fwd_pair_aux (h) (G): + ∀L. G ⊢ ⬈*[h, #0] 𝐒⦃L⦄ → + ∀I,K,V. L = K.ⓑ{I}V → G ⊢ ⬈*[h, V] 𝐒⦃K⦄. +#h #G #L #H @(rdsx_ind … H) -L #L1 #_ #IH #I #K1 #V #H destruct /5 width=5 by lpx_pair, rdsx_intro, rdeq_fwd_zero_pair/ qed-. -lemma rdsx_fwd_pair (h) (o) (G): - ∀I,K,V. G ⊢ ⬈*[h, o, #0] 𝐒⦃K.ⓑ{I}V⦄ → G ⊢ ⬈*[h, o, V] 𝐒⦃K⦄. +lemma rdsx_fwd_pair (h) (G): + ∀I,K,V. G ⊢ ⬈*[h, #0] 𝐒⦃K.ⓑ{I}V⦄ → G ⊢ ⬈*[h, V] 𝐒⦃K⦄. /2 width=4 by rdsx_fwd_pair_aux/ qed-. (* Basic inversion lemmas ***************************************************) (* Basic_2A1: uses: lsx_inv_flat *) -lemma rdsx_inv_flat (h) (o) (G): ∀I,L,V,T. G ⊢ ⬈*[h, o, ⓕ{I}V.T] 𝐒⦃L⦄ → - ∧∧ G ⊢ ⬈*[h, o, V] 𝐒⦃L⦄ & G ⊢ ⬈*[h, o, T] 𝐒⦃L⦄. +lemma rdsx_inv_flat (h) (G): + ∀I,L,V,T. G ⊢ ⬈*[h, ⓕ{I}V.T] 𝐒⦃L⦄ → + ∧∧ G ⊢ ⬈*[h, V] 𝐒⦃L⦄ & G ⊢ ⬈*[h, T] 𝐒⦃L⦄. /3 width=3 by rdsx_fwd_pair_sn, rdsx_fwd_flat_dx, conj/ qed-. (* Basic_2A1: removed theorems 9: