theory Abs_Int_Tests imports ACom begin subsection "Test Programs" text{* For constant propagation: *} text{* Straight line code: *} definition "test1_const = ''y'' ::= N 7; ''z'' ::= Plus (V ''y'') (N 2); ''y'' ::= Plus (V ''x'') (N 0)" text{* Conditional: *} definition "test2_const = IF Less (N 41) (V ''x'') THEN ''x'' ::= N 5 ELSE ''x'' ::= N 5" text{* Conditional, test is relevant: *} definition "test3_const = ''x'' ::= N 42; IF Less (N 41) (V ''x'') THEN ''x'' ::= N 5 ELSE ''x'' ::= N 6" text{* While: *} definition "test4_const = ''x'' ::= N 0; WHILE Bc True DO ''x'' ::= N 0" text{* While, test is relevant: *} definition "test5_const = ''x'' ::= N 0; WHILE Less (V ''x'') (N 1) DO ''x'' ::= N 1" text{* Iteration is needed: *} definition "test6_const = ''x'' ::= N 0; ''y'' ::= N 0; ''z'' ::= N 2; WHILE Less (V ''x'') (N 1) DO (''x'' ::= V ''y''; ''y'' ::= V ''z'')" text{* For intervals: *} definition "test1_ivl = ''y'' ::= N 7; IF Less (V ''x'') (V ''y'') THEN ''y'' ::= Plus (V ''y'') (V ''x'') ELSE ''x'' ::= Plus (V ''x'') (V ''y'')" definition "test2_ivl = WHILE Less (V ''x'') (N 100) DO ''x'' ::= Plus (V ''x'') (N 1)" definition "test3_ivl = ''x'' ::= N 7; WHILE Less (V ''x'') (N 100) DO ''x'' ::= Plus (V ''x'') (N 1)" definition "test4_ivl = ''x'' ::= N 0; ''y'' ::= N 0; WHILE Less (V ''x'') (N 11) DO (''x'' ::= Plus (V ''x'') (N 1); ''y'' ::= Plus (V ''y'') (N 1))" definition "test5_ivl = ''x'' ::= N 0; ''y'' ::= N 0; WHILE Less (V ''x'') (N 1000) DO (''y'' ::= V ''x''; ''x'' ::= Plus (V ''x'') (N 1))" definition "test6_ivl = ''x'' ::= N 0; WHILE Less (V ''x'') (N 1) DO ''x'' ::= Plus (V ''x'') (N -1)" end