English

Weak Selections and Suborderable Metrizable Spaces

General Topology 2020-03-31 v1

Abstract

Each continuous weak selection for a space XX defines a coarser topology on XX, called a selection topology. Spaces whose topology is determined by a collection of such selection topologies are called continuous weak selection spaces. For such spaces, Garc\'{\i}a-Ferreira, Miyazaki, Nogura and Tomita considered the minimal number cws(X)\text{cws}(X) of selection topologies which generate the original topology of XX, and called it the cws-number of XX. In this paper, we show that cws(X)2\text{cws}(X)\leq 2 for every semi-orderable space XX, and that cws(X)=2\text{cws}(X)=2 precisely when such a space XX has two components and is not orderable. Complementary to this result, we also show that cws(X)=1\text{cws}(X)=1 for each suborderable metrizable space XX which has at least 3 components.

Keywords

Cite

@article{arxiv.2003.13134,
  title  = {Weak Selections and Suborderable Metrizable Spaces},
  author = {Valentin Gutev},
  journal= {arXiv preprint arXiv:2003.13134},
  year   = {2020}
}
R2 v1 2026-06-23T14:31:07.251Z