P-spaces in the absence of the Axiom of Choice

Abstract

A P-space is a topological space whose every Gδ-set is open. In this article, basic properties of P-spaces are investigated in the absence of the Axiom of Choice. New weaker forms of the Axiom of Choice, all relevant to P-spaces or to countable intersections of Gδ-sets, are introduced. Several independence results are obtained and open problems are posed. It is shown that a zero-dimensional subspace of the real line may fail to be strongly zero-dimensional in ZF. Among the open problems there is the question whether it is provable in ZF that every finite product of P-spaces is a P-space. A partial answer to this question is given.