First countability, ω-well-filtered spaces and reflections

Abstract

We first introduce and study two new classes of subsets in T0 spaces - ω-Rudin sets and ω-well-filtered determined sets lying between the class of all closures of countable directed subsets and that of irreducible closed subsets, and two new types of spaces - ω-d spaces and ω-well-filtered spaces. We prove that an ω-well-filtered T0 space is locally compact iff it is core compact. One immediate corollary is that every core compact well-filtered space is sober, answering Jia-Jung problem with a new method. We also prove that all irreducible closed subsets in a first countable ω-well-filtered T0 space are directed. Therefore, a first countable T0 space X is sober iff X is well-filtered iff X is an ω-well-filtered d-space. Using ω-well-filtered determined sets, we present a direct construction of the ω-well-filtered reflections of T0 spaces, and show that products of ω-well-filtered spaces are ω-well-filtered.