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Algebra and Discrete Mathematics, 2010, Volume 9, Issue 1, Pages 79–85
(Mi adm21)
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RESEARCH ARTICLE
A generalization of groups with many almost normal subgroups
Francesco G. Russo
Department of Mathematics, University of Naples Federico II, via Cinthia I-80126, Naples, Italy
Abstract:
A subgroup $H$ of a group $G$ is called almost normal in $G$ if it has finitely many conjugates in $G$. A
classic result of B. H. Neumann informs us that $|G:\mathbf{Z}(G)|$ is finite if and only if each $H$ is almost
normal in $G$. Starting from this result, we investigate the structure of a group in which each non-finitely
generated subgroup satisfies a property, which is weaker to be almost normal.
Keywords:
Dietzmann classes; anti-$\mathfrak{X}C$-groups; groups with $\mathfrak{X}$-classes of conjugate
subgroups; Chernikov groups.
Received: 25.02.2010
Revised: 25.02.2010
Citation:
Francesco G. Russo, “A generalization of groups with many almost normal subgroups”, Algebra Discrete Math., 9:1 (2010), 79–85
Linking options:
https://www.mathnet.ru/eng/adm21 https://www.mathnet.ru/eng/adm/v9/i1/p79
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