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Diffstat (limited to 'theories/Sets/Relations_2_facts.v')
-rwxr-xr-x | theories/Sets/Relations_2_facts.v | 153 |
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diff --git a/theories/Sets/Relations_2_facts.v b/theories/Sets/Relations_2_facts.v new file mode 100755 index 00000000..4c729fe7 --- /dev/null +++ b/theories/Sets/Relations_2_facts.v @@ -0,0 +1,153 @@ +(************************************************************************) +(* v * The Coq Proof Assistant / The Coq Development Team *) +(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *) +(* \VV/ **************************************************************) +(* // * This file is distributed under the terms of the *) +(* * GNU Lesser General Public License Version 2.1 *) +(************************************************************************) +(****************************************************************************) +(* *) +(* 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. *) +(****************************************************************************) + +(*i $Id: Relations_2_facts.v,v 1.6.2.1 2004/07/16 19:31:18 herbelin Exp $ i*) + +Require Export Relations_1. +Require Export Relations_1_facts. +Require Export Relations_2. + +Theorem Rstar_reflexive : + forall (U:Type) (R:Relation U), Reflexive U (Rstar U R). +Proof. +auto with sets. +Qed. + +Theorem Rplus_contains_R : + forall (U:Type) (R:Relation U), contains U (Rplus U R) R. +Proof. +auto with sets. +Qed. + +Theorem Rstar_contains_R : + forall (U:Type) (R:Relation U), contains U (Rstar U R) R. +Proof. +intros U R; red in |- *; intros x y H'; apply Rstar_n with y; auto with sets. +Qed. + +Theorem Rstar_contains_Rplus : + forall (U:Type) (R:Relation U), contains U (Rstar U R) (Rplus U R). +Proof. +intros U R; red in |- *. +intros x y H'; elim H'. +generalize Rstar_contains_R; intro T; red in T; auto with sets. +intros x0 y0 z H'0 H'1 H'2; apply Rstar_n with y0; auto with sets. +Qed. + +Theorem Rstar_transitive : + forall (U:Type) (R:Relation U), Transitive U (Rstar U R). +Proof. +intros U R; red in |- *. +intros x y z H'; elim H'; auto with sets. +intros x0 y0 z0 H'0 H'1 H'2 H'3; apply Rstar_n with y0; auto with sets. +Qed. + +Theorem Rstar_cases : + forall (U:Type) (R:Relation U) (x y:U), + Rstar U R x y -> x = y \/ (exists u : _, R x u /\ Rstar U R u y). +Proof. +intros U R x y H'; elim H'; auto with sets. +intros x0 y0 z H'0 H'1 H'2; right; exists y0; auto with sets. +Qed. + +Theorem Rstar_equiv_Rstar1 : + forall (U:Type) (R:Relation U), same_relation U (Rstar U R) (Rstar1 U R). +Proof. +generalize Rstar_contains_R; intro T; red in T. +intros U R; unfold same_relation, contains in |- *. +split; intros x y H'; elim H'; auto with sets. +generalize Rstar_transitive; intro T1; red in T1. +intros x0 y0 z H'0 H'1 H'2 H'3; apply T1 with y0; auto with sets. +intros x0 y0 z H'0 H'1 H'2; apply Rstar1_n with y0; auto with sets. +Qed. + +Theorem Rsym_imp_Rstarsym : + forall (U:Type) (R:Relation U), Symmetric U R -> Symmetric U (Rstar U R). +Proof. +intros U R H'; red in |- *. +intros x y H'0; elim H'0; auto with sets. +intros x0 y0 z H'1 H'2 H'3. +generalize Rstar_transitive; intro T1; red in T1. +apply T1 with y0; auto with sets. +apply Rstar_n with x0; auto with sets. +Qed. + +Theorem Sstar_contains_Rstar : + forall (U:Type) (R S:Relation U), + contains U (Rstar U S) R -> contains U (Rstar U S) (Rstar U R). +Proof. +unfold contains in |- *. +intros U R S H' x y H'0; elim H'0; auto with sets. +generalize Rstar_transitive; intro T1; red in T1. +intros x0 y0 z H'1 H'2 H'3; apply T1 with y0; auto with sets. +Qed. + +Theorem star_monotone : + forall (U:Type) (R S:Relation U), + contains U S R -> contains U (Rstar U S) (Rstar U R). +Proof. +intros U R S H'. +apply Sstar_contains_Rstar; auto with sets. +generalize (Rstar_contains_R U S); auto with sets. +Qed. + +Theorem RstarRplus_RRstar : + forall (U:Type) (R:Relation U) (x y z:U), + Rstar U R x y -> Rplus U R y z -> exists u : _, R x u /\ Rstar U R u z. +Proof. +generalize Rstar_contains_Rplus; intro T; red in T. +generalize Rstar_transitive; intro T1; red in T1. +intros U R x y z H'; elim H'. +intros x0 H'0; elim H'0. +intros x1 y0 H'1; exists y0; auto with sets. +intros x1 y0 z0 H'1 H'2 H'3; exists y0; auto with sets. +intros x0 y0 z0 H'0 H'1 H'2 H'3; exists y0. +split; [ try assumption | idtac ]. +apply T1 with z0; auto with sets. +Qed. + +Theorem Lemma1 : + forall (U:Type) (R:Relation U), + Strongly_confluent U R -> + forall x b:U, + Rstar U R x b -> + forall a:U, R x a -> exists z : _, Rstar U R a z /\ R b z. +Proof. +intros U R H' x b H'0; elim H'0. +intros x0 a H'1; exists a; auto with sets. +intros x0 y z H'1 H'2 H'3 a H'4. +red in H'. +specialize 3H' with (x := x0) (a := a) (b := y); intro H'7; lapply H'7; + [ intro H'8; lapply H'8; + [ intro H'9; try exact H'9; clear H'8 H'7 | clear H'8 H'7 ] + | clear H'7 ]; auto with sets. +elim H'9. +intros t H'5; elim H'5; intros H'6 H'7; try exact H'6; clear H'5. +elim (H'3 t); auto with sets. +intros z1 H'5; elim H'5; intros H'8 H'10; try exact H'8; clear H'5. +exists z1; split; [ idtac | assumption ]. +apply Rstar_n with t; auto with sets. +Qed.
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