X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fbasic_2%2Fstatic%2Fgcp_cr.ma;fp=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fbasic_2%2Fstatic%2Fgcp_cr.ma;h=09dd1d346e6ada868061291c8880a26f8d2c8647;hb=38571b4c3881f2b59b7a2cdd016c83b161d3d755;hp=0000000000000000000000000000000000000000;hpb=6bfdcdaf50cc3e5ca25079cd4006aeefac73c8c2;p=helm.git diff --git a/matita/matita/contribs/lambdadelta/basic_2/static/gcp_cr.ma b/matita/matita/contribs/lambdadelta/basic_2/static/gcp_cr.ma new file mode 100644 index 000000000..09dd1d346 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/basic_2/static/gcp_cr.ma @@ -0,0 +1,176 @@ +(**************************************************************************) +(* ___ *) +(* ||M|| *) +(* ||A|| A project by Andrea Asperti *) +(* ||T|| *) +(* ||I|| Developers: *) +(* ||T|| The HELM team. *) +(* ||A|| http://helm.cs.unibo.it *) +(* \ / *) +(* \ / This file is distributed under the terms of the *) +(* v GNU General Public License Version 2 *) +(* *) +(**************************************************************************) + +include "basic_2/notation/relations/ineint_5.ma". +include "basic_2/syntax/aarity.ma". +include "basic_2/relocation/lifts_simple.ma". +include "basic_2/relocation/lifts_lifts_vector.ma". +include "basic_2/relocation/drops_drops.ma". +include "basic_2/static/gcp.ma". + +(* GENERIC COMPUTATION PROPERTIES *******************************************) + +(* Note: this is Girard's CR1 *) +definition S1 ≝ λRP,C:candidate. + ∀G,L,T. C G L T → RP G L T. + +(* Note: this is Tait's iii, or Girard's CR4 *) +definition S2 ≝ λRR:relation4 genv lenv term term. λRS:relation term. λRP,C:candidate. + ∀G,L,Vs. all … (RP G L) Vs → + ∀T. 𝐒⦃T⦄ → NF … (RR G L) RS T → C G L (ⒶVs.T). + +(* Note: this generalizes Tait's ii *) +definition S3 ≝ λC:candidate. + ∀a,G,L,Vs,V,T,W. + C G L (ⒶVs.ⓓ{a}ⓝW.V.T) → C G L (ⒶVs.ⓐV.ⓛ{a}W.T). + +definition S4 ≝ λRP,C:candidate. + ∀G,L,Vs. all … (RP G L) Vs → ∀s. C G L (ⒶVs.⋆s). + +definition S5 ≝ λC:candidate. ∀I,G,L,K,Vs,V1,V2,i. + C G L (ⒶVs.V2) → ⬆*[⫯i] V1 ≡ V2 → + ⬇*[i] L ≡ K.ⓑ{I}V1 → C G L (ⒶVs.#i). + +definition S6 ≝ λRP,C:candidate. + ∀G,L,V1b,V2b. ⬆*[1] V1b ≡ V2b → + ∀a,V,T. C G (L.ⓓV) (ⒶV2b.T) → RP G L V → C G L (ⒶV1b.ⓓ{a}V.T). + +definition S7 ≝ λC:candidate. + ∀G,L,Vs,T,W. C G L (ⒶVs.T) → C G L (ⒶVs.W) → C G L (ⒶVs.ⓝW.T). + +(* requirements for the generic reducibility candidate *) +record gcr (RR:relation4 genv lenv term term) (RS:relation term) (RP,C:candidate) : Prop ≝ +{ s1: S1 RP C; + s2: S2 RR RS RP C; + s3: S3 C; + s4: S4 RP C; + s5: S5 C; + s6: S6 RP C; + s7: S7 C +}. + +(* the functional construction for candidates *) +definition cfun: candidate → candidate → candidate ≝ + λC1,C2,G,K,T. ∀f,L,W,U. + ⬇*[Ⓕ, f] L ≡ K → ⬆*[f] T ≡ U → C1 G L W → C2 G L (ⓐW.U). + +(* the reducibility candidate associated to an atomic arity *) +rec definition acr (RP:candidate) (A:aarity) on A: candidate ≝ +match A with +[ AAtom ⇒ RP +| APair B A ⇒ cfun (acr RP B) (acr RP A) +]. + +interpretation + "reducibility candidate of an atomic arity (abstract)" + 'InEInt RP G L T A = (acr RP A G L T). + +(* Basic properties *********************************************************) + +(* Note: this requires Ⓕ-slicing in cfun since b is unknown in d_liftable_1 *) +(* Note: this requires multiple relocation *) +(* Basic 1: includes: sc3_lift *) +(* Basic 2A1: includes: gcr_lift *) +(* Basic 2A1: note: gcr_lift should be acr_lift *) +(* Basic_1: was: sc3_lift1 *) +(* Basic 2A1: was: gcr_lifts *) +(* Basic 2A1: note: gcr_lifts should be acr_lifts *) +lemma acr_lifts: ∀RR,RS,RP. gcp RR RS RP → ∀A,G. d_liftable1 (acr RP A G). +#RR #RS #RP #H #A #G elim A -A +[ /2 width=7 by cp2/ +| #B #A #HB #HA #K #T #HKT #b #f #L #HLK #U #HTU #f0 #L0 #W #U0 #HL0 #HU0 #HW + lapply (drops_trans … HL0 … HLK ??) [3:|*: // ] -L #HL0K + lapply (lifts_trans … HTU … HU0 ??) [3:|*: // ] -U #HTU0 + /2 width=3 by/ (**) (* full auto fails *) +] +qed-. + +(* Basic_1: was: + sc3_sn3 sc3_abst sc3_appl sc3_abbr sc3_bind sc3_cast +*) +lemma acr_gcr: ∀RR,RS,RP. gcp RR RS RP → gcr RR RS RP RP → + ∀A. gcr RR RS RP (acr RP A). +#RR #RS #RP #H1RP #H2RP #A elim A -A // +#B #A #IHB #IHA @mk_gcr +[ #G #L #T #H + elim (cp1 … H1RP G L) #s #HK + lapply (s2 … IHB G L (◊) … HK) // #HB + lapply (H (𝐈𝐝) L (⋆s) T ? ? ?) -H + /3 width=6 by s1, cp3, drops_refl, lifts_refl/ +| #G #L #Vs #HVs #T #H1T #H2T #f #L0 #V0 #X #HL0 #H #HB + elim (lifts_inv_applv1 … H) -H #V0s #T0 #HV0s #HT0 #H destruct + lapply (s1 … IHB … HB) #HV0 + @(s2 … IHA … (V0@V0s)) /3 width=13 by cp0, gcp2_all, lifts_simple_dx, conj/ +| #p #G #L #Vs #U #T #W #HA #f #L0 #V0 #X #HL0 #H #HB + elim (lifts_inv_applv1 … H) -H #V0s #Y #HV0s #HY #H destruct + elim (lifts_inv_flat1 … HY) -HY #U0 #X #HU0 #HX #H destruct + elim (lifts_inv_bind1 … HX) -HX #W0 #T0 #HW0 #HT0 #H destruct + @(s3 … IHA … (V0@V0s)) /5 width=6 by lifts_applv, lifts_flat, lifts_bind/ +| #G #L #Vs #HVs #s #f #L0 #V0 #X #HL0 #H #HB + elim (lifts_inv_applv1 … H) -H #V0s #Y #HV0s #HY #H destruct + >(lifts_inv_sort1 … HY) -Y + lapply (s1 … IHB … HB) #HV0 + @(s4 … IHA … (V0@V0s)) /3 width=7 by gcp2_all, conj/ +| #I #G #L #K #Vs #V1 #V2 #i #HA #HV12 #HLK #f #L0 #V0 #X #HL0 #H #HB + elim (lifts_inv_applv1 … H) -H #V0s #Y #HV0s #HY #H destruct + elim (lifts_inv_lref1 … HY) -HY #j #Hf #H destruct + lapply (drops_trans … HL0 … HLK ??) [3: |*: // ] -HLK #H + elim (drops_split_trans … H) -H [ |*: /2 width=6 by after_uni_dx/ ] #Y #HLK0 #HY + lapply (drops_tls_at … Hf … HY) -HY #HY + elim (drops_inv_skip2 … HY) -HY #K0 #W1 #_ #HVW1 #H destruct + elim (lifts_total W1 (𝐔❴⫯j❵)) #W2 #HW12 + lapply (lifts_trans … HVW1 … HW12 ??) -HVW1 [3: |*: // ] #H + lapply (lifts_conf … HV12 … H f ?) -V1 [ /2 width=3 by after_uni_succ_sn/ ] #HVW2 + @(s5 … IHA … (V0@V0s) … HW12) /3 width=4 by drops_inv_gen, lifts_applv/ +| #G #L #V1s #V2s #HV12s #p #V #T #HA #HV #f #L0 #V10 #X #HL0 #H #HB + elim (lifts_inv_applv1 … H) -H #V10s #Y #HV10s #HY #H destruct + elim (lifts_inv_bind1 … HY) -HY #V0 #T0 #HV0 #HT0 #H destruct + elim (lifts_total V10 (𝐔❴1❵)) #V20 #HV120 + elim (liftsv_total (𝐔❴1❵) V10s) #V20s #HV120s + @(s6 … IHA … (V10@V10s) (V20@V20s)) /3 width=7 by cp2, liftsv_cons/ + @(HA … (↑f)) /2 width=2 by drops_skip/ + [ @lifts_applv // + lapply (liftsv_trans … HV10s … HV120s ??) -V10s [3: |*: // ] #H + elim (liftsv_split_trans … H (𝐔❴1❵) (↑f)) /2 width=1 by after_uni_one_sn/ #V10s #HV10s #HV120s + >(liftsv_mono … HV12s … HV10s) -V1s // + | @(acr_lifts … H1RP … HB … HV120) /3 width=2 by drops_refl, drops_drop/ + ] +| #G #L #Vs #T #W #HA #HW #f #L0 #V0 #X #HL0 #H #HB + elim (lifts_inv_applv1 … H) -H #V0s #Y #HV0s #HY #H destruct + elim (lifts_inv_flat1 … HY) -HY #W0 #T0 #HW0 #HT0 #H destruct + @(s7 … IHA … (V0@V0s)) /3 width=5 by lifts_applv/ +] +qed. + +lemma acr_abst: ∀RR,RS,RP. gcp RR RS RP → gcr RR RS RP RP → + ∀p,G,L,W,T,A,B. ⦃G, L, W⦄ ϵ[RP] 〚B〛 → ( + ∀b,f,L0,V0,W0,T0. ⬇*[b, f] L0 ≡ L → ⬆*[f] W ≡ W0 → ⬆*[↑f] T ≡ T0 → + ⦃G, L0, V0⦄ ϵ[RP] 〚B〛 → ⦃G, L0, W0⦄ ϵ[RP] 〚B〛 → ⦃G, L0.ⓓⓝW0.V0, T0⦄ ϵ[RP] 〚A〛 + ) → + ⦃G, L, ⓛ{p}W.T⦄ ϵ[RP] 〚②B.A〛. +#RR #RS #RP #H1RP #H2RP #p #G #L #W #T #A #B #HW #HA #f #L0 #V0 #X #HL0 #H #HB +lapply (acr_gcr … H1RP H2RP A) #HCA +lapply (acr_gcr … H1RP H2RP B) #HCB +elim (lifts_inv_bind1 … H) -H #W0 #T0 #HW0 #HT0 #H destruct +lapply (acr_lifts … H1RP … HW … HL0 … HW0) -HW #HW0 +lapply (s3 … HCA … p G L0 (◊)) #H @H -H +lapply (s6 … HCA G L0 (◊) (◊) ?) // #H @H -H +[ @(HA … HL0) // +| lapply (s1 … HCB) -HCB #HCB + lapply (s7 … H2RP G L0 (◊)) /3 width=1 by/ +] +qed. + +(* Basic_1: removed theorems 2: sc3_arity_gen sc3_repl *) +(* Basic_1: removed local theorems 1: sc3_sn3_abst *)