X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Flibrary%2Ftechnicalities%2Fsetoids.ma;h=5c19f925e96c64794cf52c26185eaccafb941f5a;hb=c156170ba340354ea3da250b4d6c35d80c855849;hp=4d23d77258bc99f04be8e76d82831a8716a93438;hpb=a3eabd0f0dc4de2800c96e29b85ca9a4c06cce0c;p=helm.git diff --git a/helm/software/matita/library/technicalities/setoids.ma b/helm/software/matita/library/technicalities/setoids.ma index 4d23d7725..5c19f925e 100644 --- a/helm/software/matita/library/technicalities/setoids.ma +++ b/helm/software/matita/library/technicalities/setoids.ma @@ -246,10 +246,11 @@ definition equality_morphism_of_symmetric_reflexive_transitive_relation: intro; unfold transitive in H; unfold symmetric in sym; - auto. + auto depth=4. ] qed. +(* definition equality_morphism_of_asymmetric_areflexive_transitive_relation: ∀(A: Type)(Aeq: relation A)(trans: transitive ? Aeq). let ASetoidClass1 := AsymmetricAreflexive Contravariant Aeq in @@ -257,7 +258,7 @@ definition equality_morphism_of_asymmetric_areflexive_transitive_relation: (Morphism_Theory (cons ASetoidClass1 (singl ASetoidClass2)) Impl_Relation_Class). intros. exists Aeq. - unfold make_compatibility_goal; simpl; unfold impl; eauto. + unfold make_compatibility_goal; simpl; unfold impl; auto. qed. definition equality_morphism_of_asymmetric_reflexive_transitive_relation: @@ -745,3 +746,4 @@ Ltac refl_st := match goal with definition gen_st : ∀A : Set. Setoid_Theory ? (@eq A). Proof. constructor; congruence. Qed. +*) \ No newline at end of file