ocaml 3.09 transition

[helm.git] / helm / matita / library / nat / times.ma

diff --git a/helm/matita/library/nat/times.ma b/helm/matita/library/nat/times.ma
index 8c53a56c8adfb7872ffa6a846525edf58069cc60..2ae5ffd749b745783a2cf8c3eded7166cc4f8108 100644 (file)
--- a/helm/matita/library/nat/times.ma
+++ b/helm/matita/library/nat/times.ma
@@ -52,7 +52,7 @@ reflexivity.
 qed.
 
 theorem symmetric_times : symmetric nat times. 
-simplify.
+unfold symmetric.
 intros.elim x.
 simplify.apply times_n_O.
 simplify.rewrite > H.apply times_n_Sm.
@@ -62,11 +62,11 @@ variant sym_times : \forall n,m:nat. n*m = m*n \def
 symmetric_times.
 
 theorem distributive_times_plus : distributive nat times plus.
-simplify.
+unfold distributive.
 intros.elim x.
 simplify.reflexivity.
 simplify.rewrite > H. rewrite > assoc_plus.rewrite > assoc_plus.
-apply eq_f.rewrite < assoc_plus. rewrite < sym_plus ? z.
+apply eq_f.rewrite < assoc_plus. rewrite < (sym_plus ? z).
 rewrite > assoc_plus.reflexivity.
 qed.
 
@@ -74,12 +74,12 @@ variant distr_times_plus: \forall n,m,p:nat. n*(m+p) = n*m + n*p
 \def distributive_times_plus.
 
 theorem associative_times: associative nat times.
-simplify.intros.
+unfold associative.intros.
 elim x.simplify.apply refl_eq.
 simplify.rewrite < sym_times.
 rewrite > distr_times_plus.
 rewrite < sym_times.
-rewrite < sym_times (times n y) z.
+rewrite < (sym_times (times n y) z).
 rewrite < H.apply refl_eq.
 qed.