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Main Authors: Huang, Zhouxiang, Peng, Dekui, Zhang, Gao
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2601.03000
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author Huang, Zhouxiang
Peng, Dekui
Zhang, Gao
author_facet Huang, Zhouxiang
Peng, Dekui
Zhang, Gao
contents A non-trivial topological group is called \emph{$d$-independent} if for every subgroup of cardinality less than the continuum there exists a countable dense subgroup intersecting it trivially. This notion was introduced by Márquez and Tkachenko and has been intensively studied in the metrizable setting. In particular, they proved that a second-countable locally compact abelian group is $d$-independent if and only if it is algebraically an $M$-group, and asked whether the same conclusion holds for all separable locally compact groups. In this paper we give an affirmative answer to this question. We show that every separable locally compact abelian $M$-group is $d$-independent, thereby removing the metrizability assumption from the result of Márquez and Tkachenko. In addition, we investigate several further aspects of $d$-independence. We study its behaviour under taking powers of topological groups and extend the notion of $d$-independence to the non-abelian setting. Moreover, we prove that every separable connected compact group is $d$-independent, thereby answering another question posed by Márquez and Tkachenko.
format Preprint
id arxiv_https___arxiv_org_abs_2601_03000
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Remarks on $d$-independent topological groups
Huang, Zhouxiang
Peng, Dekui
Zhang, Gao
Group Theory
A non-trivial topological group is called \emph{$d$-independent} if for every subgroup of cardinality less than the continuum there exists a countable dense subgroup intersecting it trivially. This notion was introduced by Márquez and Tkachenko and has been intensively studied in the metrizable setting. In particular, they proved that a second-countable locally compact abelian group is $d$-independent if and only if it is algebraically an $M$-group, and asked whether the same conclusion holds for all separable locally compact groups. In this paper we give an affirmative answer to this question. We show that every separable locally compact abelian $M$-group is $d$-independent, thereby removing the metrizability assumption from the result of Márquez and Tkachenko. In addition, we investigate several further aspects of $d$-independence. We study its behaviour under taking powers of topological groups and extend the notion of $d$-independence to the non-abelian setting. Moreover, we prove that every separable connected compact group is $d$-independent, thereby answering another question posed by Márquez and Tkachenko.
title Remarks on $d$-independent topological groups
topic Group Theory
url https://arxiv.org/abs/2601.03000