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Datei: Partial_Order.v Sprache: Unknown
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(* * The Coq Proof Assistant / The Coq Development Team *) (* v * INRIA, CNRS and contributors - Copyright 1999-2018 *) (* <O___,, * (see CREDITS file for the list of authors) *) (* \VV/ **************************************************************) (* // * This file is distributed under the terms of the *) (* * GNU Lesser General Public License Version 2.1 *) (* * (see LICENSE file for the text of the license) *) (************************************************************************) (****************************************************************************) (* *) (* Naive Set Theory in Coq *) (* *) (* INRIA INRIA *) (* Rocquencourt Sophia-Antipolis *) (* *) (* Coq V6.1 *) (* *) (* Gilles Kahn *) (* Gerard Huet *) (* *) (* *) (* *) (* Acknowledgments: This work was started in July 1993 by F. Prost. Thanks *) (* to the Newton Institute for providing an exceptional work environment *) (* in Summer 1995. Several developments by E. Ledinot were an inspiration. *) (****************************************************************************) Require Export Ensembles. Require Export Relations_1. Section Partial_orders. Variable U : Type. Definition Carrier := Ensemble U. Definition Rel := Relation U. Record PO : Type := Definition_of_PO { Carrier_of : Ensemble U; Rel_of : Relation U; PO_cond1 : Inhabited U Carrier_of; PO_cond2 : Order U Rel_of }. Variable p : PO. Definition Strict_Rel_of : Rel := fun x y:U => Rel_of p x y /\ x <> y. Inductive covers (y x:U) : Prop := Definition_of_covers : Strict_Rel_of x y -> ~ (exists z : _, Strict_Rel_of x z /\ Strict_Rel_of z y) -> covers y x. End Partial_orders. Hint Unfold Carrier_of Rel_of Strict_Rel_of: sets. Hint Resolve Definition_of_covers: sets. Section Partial_order_facts. Variable U : Type. Variable D : PO U. Lemma Strict_Rel_Transitive_with_Rel : forall x y z:U, Strict_Rel_of U D x y -> @Rel_of U D y z -> Strict_Rel_of U D x z. Proof. unfold Strict_Rel_of at 1. red. elim D; simpl. intros C R H' H'0; elim H'0. intros H'1 H'2 H'3 x y z H'4 H'5; split. - apply H'2 with (y := y); tauto. - red; intro H'6. elim H'4; intros H'7 H'8; apply H'8; clear H'4. apply H'3; auto. rewrite H'6; tauto. Qed. Lemma Strict_Rel_Transitive_with_Rel_left : forall x y z:U, @Rel_of U D x y -> Strict_Rel_of U D y z -> Strict_Rel_of U D x z. Proof. unfold Strict_Rel_of at 1. red. elim D; simpl. intros C R H' H'0; elim H'0. intros H'1 H'2 H'3 x y z H'4 H'5; split. - apply H'2 with (y := y); tauto. - red; intro H'6. elim H'5; intros H'7 H'8; apply H'8; clear H'5. apply H'3; auto. rewrite <- H'6; auto. Qed. Lemma Strict_Rel_Transitive : Transitive U (Strict_Rel_of U D). red. intros x y z H' H'0. apply Strict_Rel_Transitive_with_Rel with (y := y); [ intuition | unfold Strict_Rel_of in H', H'0; intuition ]. Qed. End Partial_order_facts. [ Dauer der Verarbeitung: 0.21 Sekunden (vorverarbeitet) ] |