Dense-separable groups and its applications in $d$-independence
Abstract
A topological space is called {\it dense-separable} if each dense subset of its is separable. Therefore, each dense-separable space is separable. We establish some basic properties of dense-separable topological groups. We prove that each separable space with a countable tightness is dense-separable, and give a dense-separable topological group which is not hereditarily separable. We also prove that, for a Hausdorff locally compact group , it is locally dense-separable iff it is metrizable. Moreover, we study dense-subgroup-separable topological groups. We prove that, for each compact torsion (or divisible, or torsion-free, or totally disconnected) abelian group, it is dense-subgroup-separable iff it is dense-separable iff it is metrizable. Finally, we discuss some applications in -independent topological groups and related structures. We prove that each regular dense-subgroup-separable abelian semitopological group with is -independent. We also prove that, for each regular dense-subgroup-separable bounded paratopological abelian group with , it is -independent iff it is a nontrivial -group iff each nontrivial primary component of is -independent. Apply this result, we prove that a separable metrizable almost torsion-free paratopological abelian group with is -independent. Further, we prove that each dense-subgroup-separable MAP abelian group with a nontrivial connected component is also -independent.
Cite
@article{arxiv.2211.14588,
title = {Dense-separable groups and its applications in $d$-independence},
author = {Fucai Lin and Qiyun Wu and Chuan Liu},
journal= {arXiv preprint arXiv:2211.14588},
year = {2022}
}
Comments
19 pages