Suitable sets for topological groups revisited
Abstract
A discrete subset of a topological group is called a {\it suitable set} for if is closed in and the subgroup generated by is dense in , where is the identity element of . In this paper, the existence of suitable sets in topological groups is studied. It is proved that, for a non-separable -space without non-trivial convergent sequences, the -countability of implies that does not have a suitable set, which gives a partial answer to \cite[Problem 2.1]{TKA1997}. Moreover, the existence of suitable sets in some particular classes of linearly orderable topological groups is considered, where Theorem~\ref{t4} provides an affirmative answer to \cite[Problem 4.3]{ST2002}. Then, topological groups with an -base are discussed, and every linearly orderable topological group with an -base being metrizable is proved; thus it has a suitable set. Further, it follows that each topological group with an -base has a suitable set whenever is a -space, which gives a generalization of a well-known result in \cite{CM}. Finally, some cardinal invariant of topological groups with a suitable set are provided. Some results of this paper give some partial answers to some open problems posed in~\cite{DTA} and~\cite{TKA1997} respectively.
Cite
@article{arxiv.2508.13443,
title = {Suitable sets for topological groups revisited},
author = {Fucai Lin and Jiamin He and Jiajia Yang and Chuan Liu},
journal= {arXiv preprint arXiv:2508.13443},
year = {2026}
}
Comments
15 pages