V. A. Belonogov, “Finite groups in which all $2$-maximal subgroups are $\pi$-decomposable”, Trudy Inst. Mat. i Mekh. UrO RAN, 20, no. 2, 2014, 29–43; Proc. Steklov Inst. Math. (Suppl.), 289, suppl. 1 (2015), 26

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Trudy Instituta Matematiki i Mekhaniki UrO RAN, 2014, Volume 20, Number 2, Pages 29–43 (Mi timm1056)

This article is cited in 11 scientific papers (total in 11 papers)

Finite groups in which all $2$-maximal subgroups are $\pi$-decomposable

V. A. Belonogov

Institute of Mathematics and Mechanics, Ural Branch of the Russian Academy of Sciences

Full-text PDF (241 kB) Citations (11)

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Abstract: Let $\pi$ is a set of prime numbers. A very broad generalization of notion of nilpotent group is the notion of $\pi$-decomposable group, i.e. the direct product of $\pi$-group and $\pi'$-group. In the paper, the description of the finite non-$\pi$-decomposable groups in which all $2$-maximal subgroups are $\pi$-decomposable is obtained. The proof used the author's results connected with the notion of control the prime spectrum of finite simple groups. The finite nonnilpotent groups in which all $2$-maximal subgroups are nilpotent was studied by Z. Janko in 1962 in case of nonsolvable groups and the author in 1968 in case of solvable groups.

Keywords: finite group, simple group, $\pi$-decomposable group, maximal subgroup, control of prime spectrum of group.

Received: 10.12.2013

English version:
Proceedings of the Steklov Institute of Mathematics (Supplementary issues), 2015, Volume 289, Issue 1, Pages 26–41
DOI: https://doi.org/10.1134/S008154381505003X

Bibliographic databases:

Document Type: Article

UDC: 512.54

Language: Russian

Citation: V. A. Belonogov, “Finite groups in which all $2$-maximal subgroups are $\pi$-decomposable”, Trudy Inst. Mat. i Mekh. UrO RAN, 20, no. 2, 2014, 29–43; Proc. Steklov Inst. Math. (Suppl.), 289, suppl. 1 (2015), 26–41

Citation in format AMSBIB

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This publication is cited in the following 11 articles:

Citing articles in Google Scholar: Russian citations, English citations
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Trudy Instituta Matematiki i Mekhaniki UrO RAN

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