(* Title: FOL/ex/foundn.ML ID: $Id: foundn.ML,v 1.5 2000/06/29 20:48:08 wenzelm Exp $ Author: Lawrence C Paulson, Cambridge University Computer Laboratory Copyright 1991 University of Cambridge Intuitionistic FOL: Examples from The Foundation of a Generic Theorem Prover *) goal IFOL.thy "A&B --> (C-->A&C)"; by (rtac impI 1); by (rtac impI 1); by (rtac conjI 1); by (assume_tac 2); by (rtac conjunct1 1); by (assume_tac 1); result(); (*A form of conj-elimination*) val prems = goal IFOL.thy "A&B ==> ([| A; B |] ==> C) ==> C"; by (resolve_tac prems 1); by (rtac conjunct1 1); by (resolve_tac prems 1); by (rtac conjunct2 1); by (resolve_tac prems 1); result(); val prems = goal IFOL.thy "(!!A. ~ ~A ==> A) ==> B | ~B"; by (resolve_tac prems 1); by (rtac notI 1); by (res_inst_tac [ ("P", "~B") ] notE 1); by (rtac notI 2); by (res_inst_tac [ ("P", "B | ~B") ] notE 2); by (assume_tac 2); by (rtac disjI1 2); by (assume_tac 2); by (rtac notI 1); by (res_inst_tac [ ("P", "B | ~B") ] notE 1); by (assume_tac 1); by (rtac disjI2 1); by (assume_tac 1); result(); val prems = goal IFOL.thy "(!!A. ~ ~A ==> A) ==> B | ~B"; by (resolve_tac prems 1); by (rtac notI 1); by (rtac notE 1); by (rtac notI 2); by (etac notE 2); by (etac disjI1 2); by (rtac notI 1); by (etac notE 1); by (etac disjI2 1); result(); val prems = goal IFOL.thy "[| A | ~A; ~ ~A |] ==> A"; by (rtac disjE 1); by (resolve_tac prems 1); by (assume_tac 1); by (rtac FalseE 1); by (res_inst_tac [ ("P", "~A") ] notE 1); by (resolve_tac prems 1); by (assume_tac 1); result(); writeln"Examples with quantifiers"; val prems = goal IFOL.thy "ALL z. G(z) ==> ALL z. G(z)|H(z)"; by (rtac allI 1); by (rtac disjI1 1); by (resolve_tac (prems RL [spec]) 1); (*can use instead by (rtac spec 1); by (resolve_tac prems 1); *) result(); goal IFOL.thy "ALL x. EX y. x=y"; by (rtac allI 1); by (rtac exI 1); by (rtac refl 1); result(); goal IFOL.thy "EX y. ALL x. x=y"; by (rtac exI 1); by (rtac allI 1); by (rtac refl 1) handle ERROR => writeln"Failed, as expected"; getgoal 1; (*Parallel lifting example. *) goal IFOL.thy "EX u. ALL x. EX v. ALL y. EX w. P(u,x,v,y,w)"; by (resolve_tac [exI, allI] 1); by (resolve_tac [exI, allI] 1); by (resolve_tac [exI, allI] 1); by (resolve_tac [exI, allI] 1); by (resolve_tac [exI, allI] 1); val prems = goal IFOL.thy "(EX z. F(z)) & B ==> (EX z. F(z) & B)"; by (rtac conjE 1); by (resolve_tac prems 1); by (rtac exE 1); by (assume_tac 1); by (rtac exI 1); by (rtac conjI 1); by (assume_tac 1); by (assume_tac 1); result(); (*A bigger demonstration of quantifiers -- not in the paper*) goal IFOL.thy "(EX y. ALL x. Q(x,y)) --> (ALL x. EX y. Q(x,y))"; by (rtac impI 1); by (rtac allI 1); by (rtac exE 1 THEN assume_tac 1); by (rtac exI 1); by (rtac allE 1 THEN assume_tac 1); by (assume_tac 1); result();