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Algebra and Discrete Mathematics, 2021, Volume 31, Issue 2, Pages 167–194
DOI: https://doi.org/10.12958/adm1347
(Mi adm794)
 

This article is cited in 1 scientific paper (total in 1 paper)

RESEARCH ARTICLE

Groups containing locally maximal product-free sets of size $4$

C. S. Anabanti

Department of Mathematics and Applied Mathematics, University of Pretoria, South Africa
Full-text PDF (477 kB) Citations (1)
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Abstract: Every locally maximal product-free set $S$ in a finite group $G$ satisfies $G=S\cup SS \cup S^{-1}S \cup SS^{-1}\cup \sqrt{S}$, where $SS=\{xy\mid x,y\in S\}$, $S^{-1}S=\{x^{-1}y\mid x,y\in S\}$, $SS^{-1}=\{xy^{-1}\mid x,y\in S\}$ and $\sqrt{S}=\{x\in G\mid x^2\in S\}$. To better understand locally maximal product-free sets, Bertram asked whether every locally maximal product-free set $S$ in a finite abelian group satisfy $|\sqrt{S}|\leq 2|S|$. This question was recently answered in the negation by the current author. Here, we improve some results on the structures and sizes of finite groups in terms of their locally maximal product-free sets. A consequence of our results is the classification of abelian groups that contain locally maximal product-free sets of size $4$, continuing the work of Street, Whitehead, Giudici and Hart on the classification of groups containing locally maximal product-free sets of small sizes. We also obtain partial results on arbitrary groups containing locally maximal product-free sets of size $4$, and conclude with a conjecture on the size $4$ problem as well as an open problem on the general case.
Keywords: product-free sets, locally maximal, maximal, groups.
Funding agency Grant number
Birkbeck Сollege
The author is thankful to Birkbeck College for the financial support provided.
Received: 05.03.2019
Document Type: Article
MSC: 20D60, 05E15, 11B75
Language: English
Citation: C. S. Anabanti, “Groups containing locally maximal product-free sets of size $4$”, Algebra Discrete Math., 31:2 (2021), 167–194
Citation in format AMSBIB
\Bibitem{Ana21}
\by C.~S.~Anabanti
\paper Groups containing locally maximal product-free sets of size~$4$
\jour Algebra Discrete Math.
\yr 2021
\vol 31
\issue 2
\pages 167--194
\mathnet{http://mi.mathnet.ru/adm794}
\crossref{https://doi.org/10.12958/adm1347}
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  • https://www.mathnet.ru/eng/adm/v31/i2/p167
  • This publication is cited in the following 1 articles:
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    Algebra and Discrete Mathematics
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