(* Title: ZF/AC/DC.thy
ID: $Id$
Author: Krzysztof Grabczewski
Theory file for the proofs concernind the Axiom of Dependent Choice
*)
DC = AC_Equiv + Hartog + Cardinal_aux + DC_lemmas +
consts
DC :: i => o
DC0 :: o
ff :: [i, i, i, i] => i
rules
DC_def "DC(a) == ALL X R. R<=Pow(X)*X &
(ALL Y:Pow(X). Y lesspoll a --> (EX x:X. <Y,x> : R))
--> (EX f:a->X. ALL b<a. <f``b,f`b> : R)"
DC0_def "DC0 == ALL A B R. R <= A*B & R~=0 & range(R) <= domain(R)
--> (EX f:nat->domain(R). ALL n:nat. <f`n,f`succ(n)>:R)"
ff_def "ff(b, X, Q, R) == transrec(b, %c r.
THE x. first(x, {x:X. <r``c, x> : R}, Q))"
end