$\mathfrak P_0$-spaces
Abstract
A regular topological space is defined to be a -space if it has countable Pytkeev network. A network for is called a Pytkeev network if for any point , neighborhood of and subset accumulating at a there is a set such that and is infinite. The class of -spaces contains all metrizable separable spaces and is (properly) contained in the Michael's class of -spaces. It is closed under many topological operations: taking subspaces, countable Tychonoff products, small countable box-products, countable direct limits, hyperspaces of compact subsets. For an -space and a -space the function space endowed with the compact-open topology is a -space. For any sequential -space the free abelian topological group and the free locally convex linear topological space both are -spaces. A sequential space is a -space if and only if it is an -space. A topological space is metrizable and separable if and only if it is a -space with countable fan tightness.
Cite
@article{arxiv.1311.1468,
title = {$\mathfrak P_0$-spaces},
author = {Taras Banakh},
journal= {arXiv preprint arXiv:1311.1468},
year = {2016}
}
Comments
18 pages (an improved version of Proposition 1.4)