A note on Stone-Cech compactification in ZFA

Abstract

Working in Zermelo-Fraenkel Set Theory with Atoms over an ω-categorical ω-stable structure, we show how infinite constructions over definable sets can be encoded as finite constructions over the Stone-Cech compactification of the sets. In particular, we show that for a definable set X with its Stone-Cech compactification X the following holds: a) the powerset P(X) of X is isomorphic to the finite-powerset Pfin(X) of X, b) the vector space KX over a field K is the free vector space FK(X) on X over K, c) every measure on X is tantamount to a discrete measure on X. Moreover, we prove that the Stone-Cech compactification of a definable set is still definable, which allows us to obtain some results about equivalence of certain formalizations of register machines.