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[helm.git] / helm / matita / library / datatypes / bool.ma

diff --git a/helm/matita/library/datatypes/bool.ma b/helm/matita/library/datatypes/bool.ma
index 8267aa7f63fcb692311dc916f8f325471805952d..a223d7d0c9333c27b77e328b253e19229fe319f1 100644 (file)
--- a/helm/matita/library/datatypes/bool.ma
+++ b/helm/matita/library/datatypes/bool.ma
@@ -12,36 +12,69 @@
 (*                                                                        *)
 (**************************************************************************)
 
-set "baseuri" "cic:/matita/bool/".
+set "baseuri" "cic:/matita/datatypes/bool/".
+
+include "logic/equality.ma".
 
 inductive bool : Set \def 
   | true : bool
   | false : bool.
+  
+theorem not_eq_true_false : true \neq false.
+simplify.intro.
+change with 
+match true with
+[ true \Rightarrow False
+| flase \Rightarrow True].
+rewrite > H.simplify.exact I.
+qed.
 
 definition notb : bool \to bool \def
 \lambda b:bool. 
  match b with 
  [ true \Rightarrow false
  | false \Rightarrow true ].
+ 
+theorem notb_elim: \forall b:bool.\forall P:bool \to Prop.
+match b with
+[ true \Rightarrow P false
+| false \Rightarrow P true] \to P (notb b).
+intros 2.elim b.exact H. exact H.
+qed.
 
+(*CSC: the URI must disappear: there is a bug now *)
 interpretation "boolean not" 'not x = (cic:/matita/datatypes/bool/notb.con x).
 
 definition andb : bool \to bool \to bool\def
 \lambda b1,b2:bool. 
  match b1 with 
- [ true \Rightarrow 
-       match b2 with [true \Rightarrow true | false \Rightarrow false]
+ [ true \Rightarrow b2
  | false \Rightarrow false ].
 
+theorem andb_elim: \forall b1,b2:bool. \forall P:bool \to Prop.
+match b1 with
+[ true \Rightarrow P b2
+| false \Rightarrow P false] \to P (andb b1 b2).
+intros 3.elim b1.exact H. exact H.
+qed.
+
+(*CSC: the URI must disappear: there is a bug now *)
 interpretation "boolean and" 'and x y = (cic:/matita/datatypes/bool/andb.con x y).
 
 definition orb : bool \to bool \to bool\def
 \lambda b1,b2:bool. 
  match b1 with 
- [ true \Rightarrow 
-       match b2 with [true \Rightarrow true | false \Rightarrow false]
- | false \Rightarrow false ].
+ [ true \Rightarrow true
+ | false \Rightarrow b2].
+
+theorem orb_elim: \forall b1,b2:bool. \forall P:bool \to Prop.
+match b1 with
+[ true \Rightarrow P true
+| false \Rightarrow P b2] \to P (orb b1 b2).
+intros 3.elim b1.exact H. exact H.
+qed.
 
+(*CSC: the URI must disappear: there is a bug now *)
 interpretation "boolean or" 'or x y = (cic:/matita/datatypes/bool/orb.con x y).
 
 definition if_then_else : bool \to Prop \to Prop \to Prop \def