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-(************************************************************************)
-(*  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        *)
-(************************************************************************)
-
-(*i $Id: Rstar.v,v 1.1.2.1 2004/07/16 19:31:38 herbelin Exp $ i*)
-
-(** Properties of a binary relation [R] on type [A] *)
-
-Section Rstar.
-
-Variable A : Type.  
-Variable R : A->A->Prop.  
-
-(** Definition of the reflexive-transitive closure [R*] of [R] *)
-(** Smallest reflexive [P] containing [R o P] *)
-
-Definition Rstar  := [x,y:A](P:A->A->Prop)
-   ((u:A)(P u u))->((u:A)(v:A)(w:A)(R u v)->(P v w)->(P u w)) -> (P x y).  
-
-Theorem Rstar_reflexive:  (x:A)(Rstar x x).
- Proof [x:A][P:A->A->Prop]
-       [h1:(u:A)(P u u)][h2:(u:A)(v:A)(w:A)(R u v)->(P v w)->(P u w)]
-       (h1 x).  
-  
-Theorem Rstar_R: (x:A)(y:A)(z:A)(R x y)->(Rstar y z)->(Rstar x z).
- Proof [x:A][y:A][z:A][t1:(R x y)][t2:(Rstar y z)]
-       [P:A->A->Prop]
-       [h1:(u:A)(P u u)][h2:(u:A)(v:A)(w:A)(R u v)->(P v w)->(P u w)]
-       (h2 x y z t1 (t2 P h1 h2)).  
-  
-(** We conclude with transitivity of [Rstar] : *)
-
-Theorem  Rstar_transitive:  (x:A)(y:A)(z:A)(Rstar x y)->(Rstar y z)->(Rstar x z).
- Proof  [x:A][y:A][z:A][h:(Rstar x y)]
-        (h ([u:A][v:A](Rstar v z)->(Rstar u z))
-           ([u:A][t:(Rstar u z)]t)
-           ([u:A][v:A][w:A][t1:(R u v)][t2:(Rstar w z)->(Rstar v z)]
-            [t3:(Rstar w z)](Rstar_R u v z t1 (t2 t3)))).  
-
-(** Another characterization of [R*] *)
-(** Smallest reflexive [P] containing [R o R*] *)
-
-Definition Rstar' := [x:A][y:A](P:A->A->Prop)
-    ((P x x))->((u:A)(R x u)->(Rstar u y)->(P x y)) -> (P x y).  
-
-Theorem Rstar'_reflexive: (x:A)(Rstar' x x).
- Proof  [x:A][P:A->A->Prop][h:(P x x)][h':(u:A)(R x u)->(Rstar u x)->(P x x)]h.
-  
-Theorem Rstar'_R: (x:A)(y:A)(z:A)(R x z)->(Rstar z y)->(Rstar' x y).
- Proof  [x:A][y:A][z:A][t1:(R x z)][t2:(Rstar z y)]
-        [P:A->A->Prop][h1:(P x x)]
-        [h2:(u:A)(R x u)->(Rstar u y)->(P x y)](h2 z t1 t2).  
-  
-(** Equivalence of the two definitions: *)
-
-Theorem Rstar'_Rstar:  (x:A)(y:A)(Rstar' x y)->(Rstar x y).
- Proof  [x:A][y:A][h:(Rstar' x y)]
-        (h Rstar (Rstar_reflexive x) ([u:A](Rstar_R x u y))).  
-  
-Theorem Rstar_Rstar':  (x:A)(y:A)(Rstar x y)->(Rstar' x y).
- Proof  [x:A][y:A][h:(Rstar x y)](h Rstar' ([u:A](Rstar'_reflexive u))
-         ([u:A][v:A][w:A][h1:(R u v)][h2:(Rstar' v w)]
-          (Rstar'_R u w v h1 (Rstar'_Rstar v w h2)))).  
-
-
-(** Property of Commutativity of two relations *)
-
-Definition commut := [A:Set][R1,R2:A->A->Prop]
-                       (x,y:A)(R1 y x)->(z:A)(R2 z y)
-                        ->(EX y':A |(R2 y' x) & (R1 z y')).
-
-
-End Rstar.
-