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Algebra and Discrete Mathematics, 2012, Volume 13, Issue 1, Pages 107–110
(Mi adm68)
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This article is cited in 2 scientific papers (total in 2 papers)
RESEARCH ARTICLE
Partitions of groups into sparse subsets
Igor Protasov Department of Cybernetics, Kyiv National University, Volodimirska 64, 01033, Kyiv, Ukraine
Abstract:
A subset $A$ of a group $G$ is called sparse if, for every infinite subset $X$ of $G$, there exists a finite subset $F\subset X$, such that $\bigcap_{x\in F} xA$ is finite. We denote by $\eta(G)$ the minimal cardinal such that $G$ can be partitioned in $\eta(G)$ sparse subsets. If $|G| > (\kappa^+)^{\aleph_0}$ then $\eta(G) > \kappa$, if $|G|\leqslant \kappa^+$ then $\eta(G) \leqslant \kappa$. We show also that $cov(A) \geqslant cf|G|$ for each sparse subset $A$ of an infinite group $G$, where $cov(A)=\min\{|X|: G = XA\}$.
Keywords:
partition of a group, sparse subset of a group.
Citation:
Igor Protasov, “Partitions of groups into sparse subsets”, Algebra Discrete Math., 13:1 (2012), 107–110
Linking options:
https://www.mathnet.ru/eng/adm68 https://www.mathnet.ru/eng/adm/v13/i1/p107
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Abstract page: | 260 | Full-text PDF : | 104 | References: | 44 | First page: | 1 |
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