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Suitable sets for topological groups revisited

General Topology 2026-04-23 v2 Group Theory

Abstract

A discrete subset SS of a topological group GG is called a {\it suitable set} for GG if S{e}S\cup \{e\} is closed in GG and the subgroup generated by SS is dense in GG, where ee is the identity element of GG. In this paper, the existence of suitable sets in topological groups is studied. It is proved that, for a non-separable kωk_{\omega}-space XX without non-trivial convergent sequences, the snfsnf-countability of A(X)A(X) implies that A(X)A(X) 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 ωω\omega^{\omega}-base are discussed, and every linearly orderable topological group with an ωω\omega^{\omega}-base being metrizable is proved; thus it has a suitable set. Further, it follows that each topological group GG with an ωω\omega^{\omega}-base has a suitable set whenever GG is a kk-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.

Keywords

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

R2 v1 2026-07-01T04:55:51.148Z