On Urysohn's Lemma for generalized topological spaces in ZF

Abstract

A strong generalized topological space is an ordered pair X= X, T such that X is a set and T is a collection of subsets of X such that , X∈ T and T is stable under arbitrary unions. A necessary and sufficient condition for a strong generalized topological space X to satisfy Urysohn's lemma or its appropriate variant is shown in ZF. Notions of a U-normal and an effectively normal generalized topological space are introduced. It is observed that, in ZF+DC, every U-normal generalized topological space satisfies Urysohn's lemma. It is shown that every effectively normal generalized topological space satisfies Csasz\'ar's modification of Urysohn's Lemma. A ZF- example of a strong generalized topological normal space which satisfies the Tietze-Urysohn Extension Theorem and fails to satisfy Urysohn's Lemma is shown.