X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambda_delta%2FBasic_2%2Fcomputation%2Facp_aaa.ma;h=1cab5d4b8f2b2a04c143d648dc3e190375732165;hb=f21509c476b20e5446335c967b1e81f87ceb4f6c;hp=a47d224d3c0369107afada337c9fa547cc702c4d;hpb=7e6643f9ce7ae87e9241aeac5b6d828e9d47fb63;p=helm.git diff --git a/matita/matita/contribs/lambda_delta/Basic_2/computation/acp_aaa.ma b/matita/matita/contribs/lambda_delta/Basic_2/computation/acp_aaa.ma index a47d224d3..1cab5d4b8 100644 --- a/matita/matita/contribs/lambda_delta/Basic_2/computation/acp_aaa.ma +++ b/matita/matita/contribs/lambda_delta/Basic_2/computation/acp_aaa.ma @@ -12,67 +12,90 @@ (* *) (**************************************************************************) -include "Basic_2/static/aaa.ma". -include "Basic_2/computation/lsubc.ma". -(* -axiom lsubc_ldrops_trans: ∀RP,L1,L2. L1 [RP] ⊑ L2 → ∀K2,des. ⇓[des] L2 ≡ K2 → - ∃∃K1. ⇓[des] L1 ≡ K1 & K1 [RP] ⊑ K2. -*) -axiom ldrops_lsubc_trans: ∀RP,L1,K1,des. ⇓[des] L1 ≡ K1 → ∀K2. K1 [RP] ⊑ K2 → - ∃∃L2. L1 [RP] ⊑ L2 & ⇓[des] L2 ≡ K2. - -axiom lifts_trans: ∀T1,T,des1. ⇑[des1] T1 ≡ T → ∀T2:term. ∀des2. ⇑[des2] T ≡ T2 → - ⇑[des1 @ des2] T1 ≡ T2. - -axiom ldrops_trans: ∀L1,L,des1. ⇓[des1] L1 ≡ L → ∀L2,des2. ⇓[des2] L ≡ L2 → - ⇓[des2 @ des1] L1 ≡ L2. +include "Basic_2/unfold/lifts_lifts.ma". +include "Basic_2/unfold/ldrops_ldrops.ma". +include "Basic_2/static/aaa_lifts.ma". +include "Basic_2/static/aaa_aaa.ma". +include "Basic_2/computation/lsubc_ldrops.ma". (* ABSTRACT COMPUTATION PROPERTIES ******************************************) (* Main propertis ***********************************************************) -axiom aacr_aaa_csubc_lifts: ∀RR,RS,RP. +(* Basic_1: was: sc3_arity_csubc *) +theorem aacr_aaa_csubc_lifts: ∀RR,RS,RP. acp RR RS RP → acr RR RS RP (λL,T. RP L T) → - ∀L1,T,A. L1 ⊢ T ÷ A → ∀L0,des. ⇓[des] L0 ≡ L1 → - ∀T0. ⇑[des] T ≡ T0 → ∀L2. L2 [RP] ⊑ L0 → + ∀L1,T,A. L1 ⊢ T ÷ A → ∀L0,des. ⇩*[des] L0 ≡ L1 → + ∀T0. ⇧*[des] T ≡ T0 → ∀L2. L2 [RP] ⊑ L0 → ⦃L2, T0⦄ [RP] ϵ 〚A〛. -(* #RR #RS #RP #H1RP #H2RP #L1 #T #A #H elim H -L1 -T -A -[ (*#L #k #L2 #HL2 - lapply (aacr_acr … H1RP H2RP 𝕒) #HAtom - @(s2 … HAtom … ◊) // /2 width=2/ *) -| (* * #L #K #V #B #i #HLK #_ #IHB #L2 #HL2 - [ - | lapply (aacr_acr … H1RP H2RP B) #HB - @(s2 … HB … ◊) // -(* @(cp2 … H1RP) *) - ] *) -| (* #L #V #T #B #A #_ #_ #IHB #IHA #L2 #HL2 +[ #L #k #L0 #des #HL0 #X #H #L2 #HL20 + >(lifts_inv_sort1 … H) -H + lapply (aacr_acr … H1RP H2RP ⓪) #HAtom + @(s2 … HAtom … ◊) // /2 width=2/ +| #I #L1 #K1 #V1 #B #i #HLK1 #HKV1B #IHB #L0 #des #HL01 #X #H #L2 #HL20 + lapply (aacr_acr … H1RP H2RP B) #HB + elim (lifts_inv_lref1 … H) -H #i1 #Hi1 #H destruct + lapply (ldrop_fwd_ldrop2 … HLK1) #HK1b + elim (ldrops_ldrop_trans … HL01 … HLK1) #X #des1 #i0 #HL0 #H #Hi0 #Hdes1 + >(at_mono … Hi1 … Hi0) -i1 + elim (ldrops_inv_skip2 … Hdes1 … H) -des1 #K0 #V0 #des0 #Hdes0 #HK01 #HV10 #H destruct + elim (lsubc_ldrop_O1_trans … HL20 … HL0) -HL0 #X #HLK2 #H + elim (lsubc_inv_pair2 … H) -H * + [ #K2 #HK20 #H destruct + generalize in match HLK2; generalize in match I; -HLK2 -I * #HLK2 + [ elim (lift_total V0 0 (i0 +1)) #V #HV0 + elim (lifts_lift_trans … Hi0 … Hdes0 … HV10 … HV0) -HV10 #V2 #HV12 #HV2 + @(s4 … HB … ◊ … HV0 HLK2) /3 width=7/ (* uses IHB HL20 V2 HV0 *) + | @(s2 … HB … ◊) // /2 width=3/ + ] + | -HLK1 -IHB -HL01 -HL20 -HK1b -Hi0 -Hdes0 + #K2 #V2 #A2 #HKV2A #HKV0A #_ #H1 #H2 destruct + lapply (ldrop_fwd_ldrop2 … HLK2) #HLK2b + lapply (aaa_lifts … HK01 … HV10 HKV1B) -HKV1B -HK01 -HV10 #HKV0B + >(aaa_mono … HKV0A … HKV0B) in HKV2A; -HKV0A -HKV0B #HKV2B + elim (lift_total V2 0 (i0 +1)) #V #HV2 + @(s4 … HB … ◊ … HV2 HLK2) + @(s7 … HB … HKV2B) // + ] +| #L #V #T #B #A #_ #_ #IHB #IHA #L0 #des #HL0 #X #H #L2 #HL20 + elim (lifts_inv_bind1 … H) -H #V0 #T0 #HV0 #HT0 #H destruct lapply (aacr_acr … H1RP H2RP A) #HA lapply (aacr_acr … H1RP H2RP B) #HB lapply (s1 … HB) -HB #HB - @(s5 … HA … ◊ ◊) // /3 width=1/ *) -| #L #W #T #B #A #_ #_ #IHB #IHA #L0 #des #HL0 #X #H #L2 #HL02 + @(s5 … HA … ◊ ◊) // /3 width=5/ +| #L #W #T #B #A #HLWB #_ #IHB #IHA #L0 #des #HL0 #X #H #L2 #HL02 elim (lifts_inv_bind1 … H) -H #W0 #T0 #HW0 #HT0 #H destruct @(aacr_abst … H1RP H2RP) [ lapply (aacr_acr … H1RP H2RP B) #HB @(s1 … HB) /2 width=5/ - | #L3 #V3 #T3 #des3 #HL32 #HT03 #HB + | -IHB + #L3 #V3 #T3 #des3 #HL32 #HT03 #HB elim (lifts_total des3 W0) #W2 #HW02 - elim (ldrops_lsubc_trans … HL32 … HL02) -L2 #L2 #HL32 #HL20 - @(IHA (L2. 𝕓{Abst} W2) … (ss des @ ss des3)) - /2 width=3/ /3 width=5/ /4 width=6/ + elim (ldrops_lsubc_trans … H1RP H2RP … HL32 … HL02) -L2 #L2 #HL32 #HL20 + lapply (aaa_lifts … L2 W2 … (des @ des3) … HLWB) -HLWB /2 width=3/ #HLW2B + @(IHA (L2. ⓛW2) … (des + 1 @ des3 + 1)) -IHA + /2 width=3/ /3 width=5/ ] -| /3 width=1/ -| #L #V #T #A #_ #_ #IH1A #IH2A #L2 #HL2 +| #L #V #T #B #A #_ #_ #IHB #IHA #L0 #des #HL0 #X #H #L2 #HL20 + elim (lifts_inv_flat1 … H) -H #V0 #T0 #HV0 #HT0 #H destruct + /3 width=10/ +| #L #V #T #A #_ #_ #IH1A #IH2A #L0 #des #HL0 #X #H #L2 #HL20 + elim (lifts_inv_flat1 … H) -H #V0 #T0 #HV0 #HT0 #H destruct lapply (aacr_acr … H1RP H2RP A) #HA lapply (s1 … HA) #H - @(s6 … HA … ◊) /2 width=1/ /3 width=1/ + @(s6 … HA … ◊) /2 width=5/ /3 width=5/ ] -*) +qed. + +(* Basic_1: was: sc3_arity *) +lemma aacr_aaa: ∀RR,RS,RP. acp RR RS RP → acr RR RS RP (λL,T. RP L T) → + ∀L,T,A. L ⊢ T ÷ A → ⦃L, T⦄ [RP] ϵ 〚A〛. +/2 width=8/ qed. + lemma acp_aaa: ∀RR,RS,RP. acp RR RS RP → acr RR RS RP (λL,T. RP L T) → ∀L,T,A. L ⊢ T ÷ A → RP L T. #RR #RS #RP #H1RP #H2RP #L #T #A #HT lapply (aacr_acr … H1RP H2RP A) #HA -@(s1 … HA) /2 width=8/ +@(s1 … HA) /2 width=4/ qed.