(* $Id$ *)
theory If
imports FOLP
begin
constdefs
"if" :: "[o,o,o]=>o"
"if(P,Q,R) == P&Q | ~P&R"
lemma ifI:
assumes "!!x. x : P ==> f(x) : Q" "!!x. x : ~P ==> g(x) : R"
shows "?p : if(P,Q,R)"
apply (unfold if_def)
apply (tactic {* fast_tac (FOLP_cs addIs @{thms assms}) 1 *})
done
lemma ifE:
assumes 1: "p : if(P,Q,R)" and
2: "!!x y. [| x : P; y : Q |] ==> f(x, y) : S" and
3: "!!x y. [| x : ~P; y : R |] ==> g(x, y) : S"
shows "?p : S"
apply (insert 1)
apply (unfold if_def)
apply (tactic {* fast_tac (FOLP_cs addIs [@{thm 2}, @{thm 3}]) 1 *})
done
lemma if_commute: "?p : if(P, if(Q,A,B), if(Q,C,D)) <-> if(Q, if(P,A,C), if(P,B,D))"
apply (rule iffI)
apply (erule ifE)
apply (erule ifE)
apply (rule ifI)
apply (rule ifI)
oops
ML {* val if_cs = FOLP_cs addSIs [@{thm ifI}] addSEs [@{thm ifE}] *}
lemma if_commute: "?p : if(P, if(Q,A,B), if(Q,C,D)) <-> if(Q, if(P,A,C), if(P,B,D))"
apply (tactic {* fast_tac if_cs 1 *})
done
lemma nested_ifs: "?p : if(if(P,Q,R), A, B) <-> if(P, if(Q,A,B), if(R,A,B))"
apply (tactic {* fast_tac if_cs 1 *})
done
end