Suitable sets for topological groups revisited

Abstract

A discrete subset S of a topological group G is called a suitable set for G if S \e\ is closed in G and the subgroup generated by S is dense in G, where e is the identity element of G. In this paper, the existence of suitable sets in topological groups is studied. It is proved that, for a non-separable kω-space X without non-trivial convergent sequences, the snf-countability of A(X) implies that A(X) does not have a suitable set, which gives a partial answer to [Problem 2.1]TKA1997. Moreover, the existence of suitable sets in some particular classes of linearly orderable topological groups is considered, where Theorem~t4 provides an affirmative answer to [Problem 4.3]ST2002. Then, topological groups with an ωω-base are discussed, and every linearly orderable topological group with an ωω-base being metrizable is proved; thus it has a suitable set. Further, it follows that each topological group G with an ωω-base has a suitable set whenever G is a k-space, which gives a generalization of a well-known result in 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~DTA and~TKA1997 respectively.