X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fbasic_2%2Frelocation%2Flifts_lifts.ma;h=9d7fc61bfee120789fca2059f3d13885132e1c00;hp=b0e32002ce5738d92ef709814daacf5bfaecf195;hb=222044da28742b24584549ba86b1805a87def070;hpb=7593c0f74b944fb100493fb24b665ce3b8d1d252 diff --git a/matita/matita/contribs/lambdadelta/basic_2/relocation/lifts_lifts.ma b/matita/matita/contribs/lambdadelta/basic_2/relocation/lifts_lifts.ma index b0e32002c..9d7fc61bf 100644 --- a/matita/matita/contribs/lambdadelta/basic_2/relocation/lifts_lifts.ma +++ b/matita/matita/contribs/lambdadelta/basic_2/relocation/lifts_lifts.ma @@ -14,88 +14,117 @@ include "basic_2/relocation/lifts.ma". -(* GENERIC RELOCATION *******************************************************) +(* GENERIC RELOCATION FOR TERMS *********************************************) (* Main properties **********************************************************) -(* Basic_2A1: includes: lift_inj *) -theorem lifts_inj: ∀t,T1,U. ⬆*[t] T1 ≡ U → ∀T2. ⬆*[t] T2 ≡ U → T1 = T2. -#t #T1 #U #H elim H -t -T1 -U -[ /2 width=2 by lifts_inv_sort2/ -| #i1 #j #t #Hi1j #X #HX elim (lifts_inv_lref2 … HX) -HX - /4 width=4 by at_inj, eq_f/ -| /2 width=2 by lifts_inv_gref2/ -| #a #I #V1 #V2 #T1 #T2 #t #_ #_ #IHV12 #IHT12 #X #HX elim (lifts_inv_bind2 … HX) -HX - #V #T #HV1 #HT1 #HX destruct /3 width=1 by eq_f2/ -| #I #V1 #V2 #T1 #T2 #t #_ #_ #IHV12 #IHT12 #X #HX elim (lifts_inv_flat2 … HX) -HX - #V #T #HV1 #HT1 #HX destruct /3 width=1 by eq_f2/ +(* Basic_1: includes: lift_gen_lift *) +(* Basic_2A1: includes: lift_div_le lift_div_be *) +theorem lifts_div4: ∀f2,Tf,T. ⬆*[f2] Tf ≘ T → ∀g2,Tg. ⬆*[g2] Tg ≘ T → + ∀f1,g1. H_at_div f2 g2 f1 g1 → + ∃∃T0. ⬆*[f1] T0 ≘ Tf & ⬆*[g1] T0 ≘ Tg. +#f2 #Tf #T #H elim H -f2 -Tf -T +[ #f2 #s #g2 #Tg #H #f1 #g1 #_ + lapply (lifts_inv_sort2 … H) -H #H destruct + /2 width=3 by ex2_intro/ +| #f2 #jf #j #Hf2 #g2 #Tg #H #f1 #g1 #H0 + elim (lifts_inv_lref2 … H) -H #jg #Hg2 #H destruct + elim (H0 … Hf2 Hg2) -H0 -j /3 width=3 by lifts_lref, ex2_intro/ +| #f2 #l #g2 #Tg #H #f1 #g1 #_ + lapply (lifts_inv_gref2 … H) -H #H destruct + /2 width=3 by ex2_intro/ +| #f2 #p #I #Vf #V #Tf #T #_ #_ #IHV #IHT #g2 #X #H #f1 #g1 #H0 + elim (lifts_inv_bind2 … H) -H #Vg #Tg #HVg #HTg #H destruct + elim (IHV … HVg … H0) -IHV -HVg + elim (IHT … HTg) -IHT -HTg [ |*: /2 width=8 by at_div_pp/ ] + /3 width=5 by lifts_bind, ex2_intro/ +| #f2 #I #Vf #V #Tf #T #_ #_ #IHV #IHT #g2 #X #H #f1 #g1 #H0 + elim (lifts_inv_flat2 … H) -H #Vg #Tg #HVg #HTg #H destruct + elim (IHV … HVg … H0) -IHV -HVg + elim (IHT … HTg … H0) -IHT -HTg -H0 + /3 width=5 by lifts_flat, ex2_intro/ ] qed-. -(* Basic_1: includes: lift_gen_lift *) -(* Basic_2A1: includes: lift_div_le lift_div_be *) -theorem lifts_div: ∀T,T2,t2. ⬆*[t2] T2 ≡ T → ∀T1,t. ⬆*[t] T1 ≡ T → - ∀t1. t2 ⊚ t1 ≡ t → ⬆*[t1] T1 ≡ T2. -#T #T2 #t2 #H elim H -T -T2 -t2 -[ #k #t2 #T1 #t #H >(lifts_inv_sort2 … H) -T1 // -| #i2 #i #t2 #Hi2 #T1 #t #H #t1 #Ht21 elim (lifts_inv_lref2 … H) -H +lemma lifts_div4_one: ∀f,Tf,T. ⬆*[⫯f] Tf ≘ T → + ∀T1. ⬆*[1] T1 ≘ T → + ∃∃T0. ⬆*[1] T0 ≘ Tf & ⬆*[f] T0 ≘ T1. +/4 width=6 by lifts_div4, at_div_id_dx, at_div_pn/ qed-. + +theorem lifts_div3: ∀f2,T,T2. ⬆*[f2] T2 ≘ T → ∀f,T1. ⬆*[f] T1 ≘ T → + ∀f1. f2 ⊚ f1 ≘ f → ⬆*[f1] T1 ≘ T2. +#f2 #T #T2 #H elim H -f2 -T -T2 +[ #f2 #s #f #T1 #H >(lifts_inv_sort2 … H) -T1 // +| #f2 #i2 #i #Hi2 #f #T1 #H #f1 #Ht21 elim (lifts_inv_lref2 … H) -H #i1 #Hi1 #H destruct /3 width=6 by lifts_lref, after_fwd_at1/ -| #p #t2 #T1 #t #H >(lifts_inv_gref2 … H) -T1 // -| #a #I #W2 #W #U2 #U #t2 #_ #_ #IHW #IHU #T1 #t #H +| #f2 #l #f #T1 #H >(lifts_inv_gref2 … H) -T1 // +| #f2 #p #I #W2 #W #U2 #U #_ #_ #IHW #IHU #f #T1 #H elim (lifts_inv_bind2 … H) -H #W1 #U1 #HW1 #HU1 #H destruct - /4 width=3 by lifts_bind, after_true/ -| #I #W2 #W #U2 #U #t2 #_ #_ #IHW #IHU #T1 #t #H + /4 width=3 by lifts_bind, after_O2/ +| #f2 #I #W2 #W #U2 #U #_ #_ #IHW #IHU #f #T1 #H elim (lifts_inv_flat2 … H) -H #W1 #U1 #HW1 #HU1 #H destruct /3 width=3 by lifts_flat/ ] qed-. -(* Basic_2A1: includes: lift_mono *) -theorem lifts_mono: ∀t,T,U1. ⬆*[t] T ≡ U1 → ∀U2. ⬆*[t] T ≡ U2 → U1 = U2. -#t #T #U1 #H elim H -t -T -U1 -[ /2 width=2 by lifts_inv_sort1/ -| #i1 #j #t #Hi1j #X #HX elim (lifts_inv_lref1 … HX) -HX - /4 width=4 by at_mono, eq_f/ -| /2 width=2 by lifts_inv_gref1/ -| #a #I #V1 #V2 #T1 #T2 #t #_ #_ #IHV12 #IHT12 #X #HX elim (lifts_inv_bind1 … HX) -HX - #V #T #HV1 #HT1 #HX destruct /3 width=1 by eq_f2/ -| #I #V1 #V2 #T1 #T2 #t #_ #_ #IHV12 #IHT12 #X #HX elim (lifts_inv_flat1 … HX) -HX - #V #T #HV1 #HT1 #HX destruct /3 width=1 by eq_f2/ -] -qed-. - (* Basic_1: was: lift1_lift1 (left to right) *) (* Basic_1: includes: lift_free (left to right) lift_d lift1_xhg (right to left) lift1_free (right to left) *) (* Basic_2A1: includes: lift_trans_be lift_trans_le lift_trans_ge lifts_lift_trans_le lifts_lift_trans *) -theorem lifts_trans: ∀T1,T,t1. ⬆*[t1] T1 ≡ T → ∀T2,t2. ⬆*[t2] T ≡ T2 → - ∀t. t2 ⊚ t1 ≡ t → ⬆*[t] T1 ≡ T2. -#T1 #T #t1 #H elim H -T1 -T -t1 -[ #k #t1 #T2 #t2 #H >(lifts_inv_sort1 … H) -T2 // -| #i1 #i #t1 #Hi1 #T2 #t2 #H #t #Ht21 elim (lifts_inv_lref1 … H) -H +theorem lifts_trans: ∀f1,T1,T. ⬆*[f1] T1 ≘ T → ∀f2,T2. ⬆*[f2] T ≘ T2 → + ∀f. f2 ⊚ f1 ≘ f → ⬆*[f] T1 ≘ T2. +#f1 #T1 #T #H elim H -f1 -T1 -T +[ #f1 #s #f2 #T2 #H >(lifts_inv_sort1 … H) -T2 // +| #f1 #i1 #i #Hi1 #f2 #T2 #H #f #Ht21 elim (lifts_inv_lref1 … H) -H #i2 #Hi2 #H destruct /3 width=6 by lifts_lref, after_fwd_at/ -| #p #t1 #T2 #t2 #H >(lifts_inv_gref1 … H) -T2 // -| #a #I #W1 #W #U1 #U #t1 #_ #_ #IHW #IHU #T2 #t2 #H +| #f1 #l #f2 #T2 #H >(lifts_inv_gref1 … H) -T2 // +| #f1 #p #I #W1 #W #U1 #U #_ #_ #IHW #IHU #f2 #T2 #H elim (lifts_inv_bind1 … H) -H #W2 #U2 #HW2 #HU2 #H destruct - /4 width=3 by lifts_bind, after_true/ -| #I #W1 #W #U1 #U #t1 #_ #_ #IHW #IHU #T2 #t2 #H + /4 width=3 by lifts_bind, after_O2/ +| #f1 #I #W1 #W #U1 #U #_ #_ #IHW #IHU #f2 #T2 #H elim (lifts_inv_flat1 … H) -H #W2 #U2 #HW2 #HU2 #H destruct /3 width=3 by lifts_flat/ ] qed-. (* Basic_2A1: includes: lift_conf_O1 lift_conf_be *) -theorem lifts_conf: ∀T,T1,t1. ⬆*[t1] T ≡ T1 → ∀T2,t. ⬆*[t] T ≡ T2 → - ∀t2. t2 ⊚ t1 ≡ t → ⬆*[t2] T1 ≡ T2. -#T #T1 #t1 #H elim H -T -T1 -t1 -[ #k #t1 #T2 #t #H >(lifts_inv_sort1 … H) -T2 // -| #i #i1 #t1 #Hi1 #T2 #t #H #t2 #Ht21 elim (lifts_inv_lref1 … H) -H +theorem lifts_conf: ∀f1,T,T1. ⬆*[f1] T ≘ T1 → ∀f,T2. ⬆*[f] T ≘ T2 → + ∀f2. f2 ⊚ f1 ≘ f → ⬆*[f2] T1 ≘ T2. +#f1 #T #T1 #H elim H -f1 -T -T1 +[ #f1 #s #f #T2 #H >(lifts_inv_sort1 … H) -T2 // +| #f1 #i #i1 #Hi1 #f #T2 #H #f2 #Ht21 elim (lifts_inv_lref1 … H) -H #i2 #Hi2 #H destruct /3 width=6 by lifts_lref, after_fwd_at2/ -| #p #t1 #T2 #t #H >(lifts_inv_gref1 … H) -T2 // -| #a #I #W #W1 #U #U1 #t1 #_ #_ #IHW #IHU #T2 #t #H +| #f1 #l #f #T2 #H >(lifts_inv_gref1 … H) -T2 // +| #f1 #p #I #W #W1 #U #U1 #_ #_ #IHW #IHU #f #T2 #H elim (lifts_inv_bind1 … H) -H #W2 #U2 #HW2 #HU2 #H destruct - /4 width=3 by lifts_bind, after_true/ -| #I #W #W1 #U #U1 #t1 #_ #_ #IHW #IHU #T2 #t #H + /4 width=3 by lifts_bind, after_O2/ +| #f1 #I #W #W1 #U #U1 #_ #_ #IHW #IHU #f #T2 #H elim (lifts_inv_flat1 … H) -H #W2 #U2 #HW2 #HU2 #H destruct /3 width=3 by lifts_flat/ ] qed-. + +(* Advanced proprerties *****************************************************) + +(* Basic_2A1: includes: lift_inj *) +lemma lifts_inj: ∀f. is_inj2 … (lifts f). +#f #T1 #U #H1 #T2 #H2 lapply (after_isid_dx 𝐈𝐝 … f) +/3 width=6 by lifts_div3, lifts_fwd_isid/ +qed-. + +(* Basic_2A1: includes: lift_mono *) +lemma lifts_mono: ∀f,T. is_mono … (lifts f T). +#f #T #U1 #H1 #U2 #H2 lapply (after_isid_sn 𝐈𝐝 … f) +/3 width=6 by lifts_conf, lifts_fwd_isid/ +qed-. + +lemma liftable2_sn_bi: ∀R. liftable2_sn R → liftable2_bi R. +#R #HR #T1 #T2 #HT12 #f #U1 #HTU1 #U2 #HTU2 +elim (HR … HT12 … HTU1) -HR -T1 #X #HTX #HUX +<(lifts_mono … HTX … HTU2) -T2 -U2 -f // +qed-. + +lemma deliftable2_sn_bi: ∀R. deliftable2_sn R → deliftable2_bi R. +#R #HR #U1 #U2 #HU12 #f #T1 #HTU1 #T2 #HTU2 +elim (HR … HU12 … HTU1) -HR -U1 #X #HUX #HTX +<(lifts_inj … HUX … HTU2) -U2 -T2 -f // +qed-.