From 85cfd259eec7bef210b8e1feac1db5ab522e415b Mon Sep 17 00:00:00 2001 From: Enrico Tassi Date: Fri, 23 Nov 2007 18:15:10 +0000 Subject: [PATCH] since the previous commit fixed some bugs when the context has a deleted hp, the script is better --- matita/dama/valued_lattice.ma | 18 ++++++++---------- 1 file changed, 8 insertions(+), 10 deletions(-) diff --git a/matita/dama/valued_lattice.ma b/matita/dama/valued_lattice.ma index 53855975d..6ad88424a 100644 --- a/matita/dama/valued_lattice.ma +++ b/matita/dama/valued_lattice.ma @@ -52,7 +52,7 @@ intros (R L x y z H H1); apply (plus_cancr ??? (μ(z∧x))); apply (eq_trans ?? (μz + μx) ? (modular_mjp ????)); apply (eq_trans ?? (μz + μy) ? H); clear H; -apply (eq_trans ?? (μ(z∨y) + μ(z∧y))); [1: apply eq_sym; apply modular_mjp] +apply (eq_trans ?? (μ(z∨y) + μ(z∧y)) ? (modular_mjp ??z y)); apply (plus_cancl ??? (- μ (z ∨ y))); apply (eq_trans ?? ? ? (plus_assoc ????)); apply (eq_trans ?? (0+ μ(z∧y)) ? (opp_inverse ??)); @@ -68,7 +68,7 @@ lapply (modular_mjp ?? y z) as H1; apply (plus_cancr ??? (μ(y ∧ z))); apply (eq_trans ?? ? ? H1); clear H1; apply (eq_trans ?? ? ?? (plus_assoc ????)); -apply (eq_trans ?? (μy+ μz + 0)); [2: apply feq_plusl; apply eq_sym; apply opp_inverse] +apply (eq_trans ?? (μy+ μz + 0) ?? (opp_inverse ??)); apply (eq_trans ?? ? ?? (plus_comm ???)); apply (eq_trans ?? (μy + μz) ?? (eq_sym ??? (zero_neutral ??))); apply eq_reflexive. @@ -80,8 +80,8 @@ lapply (modular_mjp ?? y z) as H1; apply (plus_cancl ??? (μ(y ∨ z))); apply (eq_trans ?? ? ? H1); clear H1; apply (eq_trans ????? (plus_comm ???)); -apply (eq_trans ?? ? ?? (plus_assoc ????)); -apply (eq_trans ?? (μy+ μz + 0)); [2: apply feq_plusl; apply eq_sym; apply opp_inverse] +apply (eq_trans ?? ? ?? (plus_assoc ????)); +apply (eq_trans ?? (μy+ μz + 0) ?? (opp_inverse ??)); apply (eq_trans ?? ? ?? (plus_comm ???)); apply (eq_trans ?? (μy + μz) ?? (eq_sym ??? (zero_neutral ??))); apply eq_reflexive. @@ -92,12 +92,10 @@ intros (R L x y z); lapply (modular_mjp ?? x (y ∨ z)) as H1; apply (eq_trans ?? (μ(x∨(y∨z))+ μ(x∧(y∨z)) +-μ(x∨(y∨z)))); [2: apply feq_plusr; apply H1;] clear H1; apply (eq_trans ?? ? ?? (plus_comm ???)); -(* apply (eq_trans ?? (0+μ(x∧(y∧z))) ?? (opp_inverse ??)); ASSERT FALSE *) -apply (eq_trans ?? (- μ(x∨(y∨z))+ μ(x∨(y∨z))+ μ(x∧(y∨z)))); [2: apply eq_sym; apply plus_assoc;] -apply (eq_trans ?? (0+μ(x∧(y∨z)))); [2: apply feq_plusr; apply eq_sym; apply opp_inverse;] -(* apply (eq_trans ?? ? ? (eq_refl ??) (zero_neutral ??)); ASSERT FALSE *) -apply (eq_trans ?? (μ(x∧(y∨z)))); [apply eq_reflexive] -apply eq_sym; apply zero_neutral. +apply (eq_trans ?? (- μ(x∨(y∨z))+ μ(x∨(y∨z))+ μ(x∧(y∨z))) ?? (plus_assoc ????)); +apply (eq_trans ?? (0+μ(x∧(y∨z))) ?? (opp_inverse ??)); +apply (eq_trans ?? (μ(x∧(y∨z))) ?? (zero_neutral ??)); +apply eq_reflexive. qed. lemma modularjm: ∀R.∀L:vlattice R.∀x,y,z:L.μ(x∨(y∧z))≈(μx + μ(y ∧ z) + - μ(x∧(y∧z))). -- 2.39.2