X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Fground_2%2Fstar.ma;h=da13e67452f37b6f59fcab87d6242da363c52a45;hb=29973426e0227ee48368d1c24dc0c17bf2baef77;hp=ef0db595ad3f56c191e48d28789ba852fa54eded;hpb=f95f6cb21b86f3dad114b21f687aa5df36088064;p=helm.git diff --git a/matita/matita/contribs/lambdadelta/ground_2/star.ma b/matita/matita/contribs/lambdadelta/ground_2/star.ma index ef0db595a..da13e6745 100644 --- a/matita/matita/contribs/lambdadelta/ground_2/star.ma +++ b/matita/matita/contribs/lambdadelta/ground_2/star.ma @@ -155,6 +155,24 @@ lemma NF_to_SN_sn: ∀A,R,S,a. NF_sn A R S a → SN_sn A R S a. elim HSa12 -HSa12 /2 width=1/ qed. +lemma TC_lsub_trans: ∀A,B,R,S. lsub_trans A B R S → lsub_trans A B (LTC … R) S. +#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 [ /3 width=3/ ] +#T #T2 #_ #HT2 #IHT1 #L1 #HL12 +lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3/ +qed-. + +lemma s_r_trans_TC1: ∀A,B,R,S. s_r_trans A B R S → s_rs_trans A B R S. +#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 [ /3 width=3/ ] +#T #T2 #_ #HT2 #IHT1 #L1 #HL12 +lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3/ +qed-. + +lemma s_r_trans_TC2: ∀A,B,R,S. s_rs_trans A B R S → s_r_trans A B R (TC … S). +#A #B #R #S #HRS #L2 #T1 #T2 #HT12 #L1 #H @(TC_ind_dx … L1 H) -L1 /2 width=3/ /3 width=3/ +qed-. + +(* relations on unboxed pairs ***********************************************) + lemma bi_TC_strip: ∀A,B,R. bi_confluent A B R → ∀a0,a1,b0,b1. R a0 b0 a1 b1 → ∀a2,b2. bi_TC … R a0 b0 a2 b2 → ∃∃a,b. bi_TC … R a1 b1 a b & R a2 b2 a b. @@ -194,18 +212,89 @@ lemma bi_TC_decomp_l: ∀A,B. ∀R:bi_relation A B. ] qed-. -lemma TC_lsub_trans: ∀A,B,R,S. lsub_trans A B R S → lsub_trans A B (LTC … R) S. -#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 [ /3 width=3/ ] -#T #T2 #_ #HT2 #IHT1 #L1 #HL12 -lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3/ -qed-. +(* relations on unboxed triples *********************************************) -lemma s_r_trans_TC1: ∀A,B,R,S. s_r_trans A B R S → s_rs_trans A B R S. -#A #B #R #S #HRS #L2 #T1 #T2 #H elim H -T2 [ /3 width=3/ ] -#T #T2 #_ #HT2 #IHT1 #L1 #HL12 -lapply (HRS … HT2 … HL12) -HRS -HT2 /3 width=3/ +definition tri_RC: ∀A,B,C. tri_relation A B C → tri_relation A B C ≝ + λA,B,C,R,a1,b1,c1,a2,b2,c2. R … a1 b1 c1 a2 b2 c2 ∨ + ∧∧ a1 = a2 & b1 = b2 & c1 = c2. + +lemma tri_RC_reflexive: ∀A,B,C,R. tri_reflexive A B C (tri_RC … R). +/3 width=1/ qed. + +definition tri_star: ∀A,B,C,R. tri_relation A B C ≝ + λA,B,C,R. tri_RC A B C (tri_TC … R). + +lemma tri_star_tri_reflexive: ∀A,B,C,R. tri_reflexive A B C (tri_star … R). +/2 width=1/ qed. + +lemma tri_TC_to_tri_star: ∀A,B,C,R,a1,b1,c1,a2,b2,c2. + tri_TC A B C R a1 b1 c1 a2 b2 c2 → + tri_star A B C R a1 b1 c1 a2 b2 c2. +/2 width=1/ qed. + +lemma tri_R_to_tri_star: ∀A,B,C,R,a1,b1,c1,a2,b2,c2. + R a1 b1 c1 a2 b2 c2 → tri_star A B C R a1 b1 c1 a2 b2 c2. +/3 width=1/ qed. + +lemma tri_star_strap1: ∀A,B,C,R,a1,a,a2,b1,b,b2,c1,c,c2. + tri_star A B C R a1 b1 c1 a b c → + R a b c a2 b2 c2 → tri_star A B C R a1 b1 c1 a2 b2 c2. +#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 * +[ /3 width=5/ +| * #H1 #H2 #H3 destruct /2 width=1/ +] +qed. + +lemma tri_star_strap2: ∀A,B,C,R,a1,a,a2,b1,b,b2,c1,c,c2. R a1 b1 c1 a b c → + tri_star A B C R a b c a2 b2 c2 → + tri_star A B C R a1 b1 c1 a2 b2 c2. +#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 #H * +[ /3 width=5/ +| * #H1 #H2 #H3 destruct /2 width=1/ +] +qed. + +lemma tri_star_to_tri_TC_to_tri_TC: ∀A,B,C,R,a1,a,a2,b1,b,b2,c1,c,c2. + tri_star A B C R a1 b1 c1 a b c → + tri_TC A B C R a b c a2 b2 c2 → + tri_TC A B C R a1 b1 c1 a2 b2 c2. +#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 * +[ /2 width=5/ +| * #H1 #H2 #H3 destruct /2 width=1/ +] +qed. + +lemma tri_TC_to_tri_star_to_tri_TC: ∀A,B,C,R,a1,a,a2,b1,b,b2,c1,c,c2. + tri_TC A B C R a1 b1 c1 a b c → + tri_star A B C R a b c a2 b2 c2 → + tri_TC A B C R a1 b1 c1 a2 b2 c2. +#A #B #C #R #a1 #a #a2 #b1 #b #b2 #c1 #c #c2 #H * +[ /2 width=5/ +| * #H1 #H2 #H3 destruct /2 width=1/ +] +qed. + +lemma tri_tansitive_tri_star: ∀A,B,C,R. tri_transitive A B C (tri_star … R). +#A #B #C #R #a1 #a #b1 #b #c1 #c #H #a2 #b2 #c2 * +[ /3 width=5/ +| * #H1 #H2 #H3 destruct /2 width=1/ +] +qed. + +lemma tri_star_ind: ∀A,B,C,R,a1,b1,c1. ∀P:relation3 A B C. P a1 b1 c1 → + (∀a,a2,b,b2,c,c2. tri_star … R a1 b1 c1 a b c → R a b c a2 b2 c2 → P a b c → P a2 b2 c2) → + ∀a2,b2,c2. tri_star … R a1 b1 c1 a2 b2 c2 → P a2 b2 c2. +#A #B #C #R #a1 #b1 #c1 #P #H #IH #a2 #b2 #c2 * +[ #H12 elim H12 -a2 -b2 -c2 /2 width=6/ -H /3 width=6/ +| * #H1 #H2 #H3 destruct // +] qed-. -lemma s_r_trans_TC2: ∀A,B,R,S. s_rs_trans A B R S → s_r_trans A B R (TC … S). -#A #B #R #S #HRS #L2 #T1 #T2 #HT12 #L1 #H @(TC_ind_dx … L1 H) -L1 /2 width=3/ /3 width=3/ +lemma tri_star_ind_dx: ∀A,B,C,R,a2,b2,c2. ∀P:relation3 A B C. P a2 b2 c2 → + (∀a1,a,b1,b,c1,c. R a1 b1 c1 a b c → tri_star … R a b c a2 b2 c2 → P a b c → P a1 b1 c1) → + ∀a1,b1,c1. tri_star … R a1 b1 c1 a2 b2 c2 → P a1 b1 c1. +#A #B #C #R #a2 #b2 #c2 #P #H #IH #a1 #b1 #c1 * +[ #H12 @(tri_TC_ind_dx … a1 b1 c1 H12) -a1 -b1 -c1 /2 width=6/ -H /3 width=6/ +| * #H1 #H2 #H3 destruct // +] qed-.