Hausdorff compactifications in ZF

Abstract

For a compactification α X of a Tychonoff space X, the algebra of all functions f∈ C(X) that are continuously extendable over % α X is denoted by Cα(X). It is shown that, in a model of ZF, it may happen that a discrete space X can have non-equivalent Hausdorff compactifications α X and γ X such that % Cα(X)=Cγ(X). Amorphous sets are applied to a proof that Glicksberg's theorem that β X× β Y is the Cech-Stone compactification of X× Y when X× Y is a Tychonoff pseudocompact space is false in some models of ZF. It is noticed that if all Tychonoff compactifications of locally compact spaces had C-embedded remainders, then van Douwen's choice principle would be satisfied. Necessary and sufficient conditions for a set of continuous bounded real functions on a Tychonoff space X to generate a compactification of X are given in ZF. A concept of a functional Cech-Stone compactification is investigated in the absence of the axiom of choice.