diff -r 67fb21ddfe15 -r 2ee005e46d6d src/HOL/subset.ML --- a/src/HOL/subset.ML Fri Apr 04 11:20:31 1997 +0200 +++ b/src/HOL/subset.ML Fri Apr 04 11:27:02 1997 +0200 @@ -13,7 +13,7 @@ (fn _=> [ (rtac subsetI 1), (etac insertI2 1) ]); goal Set.thy "!!x. x ~: A ==> (A <= insert x B) = (A <= B)"; -by (Fast_tac 1); +by (Blast_tac 1); qed "subset_insert"; (*** Big Union -- least upper bound of a set ***) @@ -54,9 +54,8 @@ (*** Big Intersection -- greatest lower bound of a set ***) -val prems = goal Set.thy "B:A ==> Inter(A) <= B"; -by (rtac subsetI 1); -by (REPEAT (resolve_tac prems 1 ORELSE etac InterD 1)); +goal Set.thy "!!B. B:A ==> Inter(A) <= B"; +by (Blast_tac 1); qed "Inter_lower"; val [prem] = goal Set.thy @@ -77,8 +76,7 @@ qed "INT_greatest"; goal Set.thy "(INT x. B(x)) <= B(a)"; -by (rtac subsetI 1); -by (REPEAT (resolve_tac prems 1 ORELSE etac INT1_D 1)); +by (Blast_tac 1); qed "INT1_lower"; val [prem] = goal Set.thy @@ -90,39 +88,35 @@ (*** Finite Union -- the least upper bound of 2 sets ***) goal Set.thy "A <= A Un B"; -by (REPEAT (ares_tac [subsetI,UnI1] 1)); +by (Blast_tac 1); qed "Un_upper1"; goal Set.thy "B <= A Un B"; -by (REPEAT (ares_tac [subsetI,UnI2] 1)); +by (Blast_tac 1); qed "Un_upper2"; -val prems = goal Set.thy "[| A<=C; B<=C |] ==> A Un B <= C"; -by (cut_facts_tac prems 1); -by (DEPTH_SOLVE (ares_tac [subsetI] 1 - ORELSE eresolve_tac [UnE,subsetD] 1)); +goal Set.thy "!!C. [| A<=C; B<=C |] ==> A Un B <= C"; +by (Blast_tac 1); qed "Un_least"; (*** Finite Intersection -- the greatest lower bound of 2 sets *) goal Set.thy "A Int B <= A"; -by (REPEAT (ares_tac [subsetI] 1 ORELSE etac IntE 1)); +by (Blast_tac 1); qed "Int_lower1"; goal Set.thy "A Int B <= B"; -by (REPEAT (ares_tac [subsetI] 1 ORELSE etac IntE 1)); +by (Blast_tac 1); qed "Int_lower2"; -val prems = goal Set.thy "[| C<=A; C<=B |] ==> C <= A Int B"; -by (cut_facts_tac prems 1); -by (REPEAT (ares_tac [subsetI,IntI] 1 - ORELSE etac subsetD 1)); +goal Set.thy "!!C. [| C<=A; C<=B |] ==> C <= A Int B"; +by (Blast_tac 1); qed "Int_greatest"; (*** Set difference ***) qed_goal "Diff_subset" Set.thy "A-B <= (A::'a set)" - (fn _ => [ (REPEAT (ares_tac [subsetI] 1 ORELSE etac DiffE 1)) ]); + (fn _ => [ (Blast_tac 1) ]); (*** Monotonicity ***)