--- a/src/HOL/Library/Inner_Product.thy Sun Feb 22 08:52:44 2009 -0800
+++ b/src/HOL/Library/Inner_Product.thy Sun Feb 22 10:53:10 2009 -0800
@@ -21,19 +21,10 @@
begin
lemma inner_zero_left [simp]: "inner 0 x = 0"
-proof -
- have "inner 0 x = inner (0 + 0) x" by simp
- also have "\<dots> = inner 0 x + inner 0 x" by (rule inner_left_distrib)
- finally show "inner 0 x = 0" by simp
-qed
+ using inner_left_distrib [of 0 0 x] by simp
lemma inner_minus_left [simp]: "inner (- x) y = - inner x y"
-proof -
- have "inner (- x) y + inner x y = inner (- x + x) y"
- by (rule inner_left_distrib [symmetric])
- also have "\<dots> = - inner x y + inner x y" by simp
- finally show "inner (- x) y = - inner x y" by simp
-qed
+ using inner_left_distrib [of x "- x" y] by simp
lemma inner_diff_left: "inner (x - y) z = inner x z - inner y z"
by (simp add: diff_minus inner_left_distrib)