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Problemy Fiziki, Matematiki i Tekhniki (Problems of Physics, Mathematics and Technics), 2012, Issue 3(12), Pages 41–42
(Mi pfmt41)
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MATHEMATICS
On maximal subgroups of finite groups
N. M. Adarchenko F. Scorina Gomel State University, Gomel
Abstract:
In 1986 V.A. Vedernikov proved that if $M$ is a non-normal maximal subgroup of a finite soluble group $G$, then $M$ contains a normalizer of some Sylow subgroup of $G$. In the paper the following generalization of Vedernikov’s result is proved.
Theorem. Let $G$ be a $\pi$-soluble finite group. Let $M$ be a non-normal maximal subgroup of $G$ such that $|G : M|$ is a power of a prime $p$ in $\pi$. Let H be a Hall subgroup in $M$ such that $p$ does not divide $|H|$, and either $|\pi(H) \cap \pi'|\le 1$ or $|M : H|$ is a $\pi$-number. If the core of $HM_G / M_G$ in $M / M_G$ is not equal to $1$, then $N_G(H)$ is contained in $M$.
Here $M_G$ is the core of $M$ in $G$, i. e., the largest normal subgroup in $G$ contained in $M$; $\pi(H)$ is the set of prime divisors of $|H|$.
Keywords:
$\pi$-soluble group, maximal subgroup.
Received: 07.06.2012
Citation:
N. M. Adarchenko, “On maximal subgroups of finite groups”, PFMT, 2012, no. 3(12), 41–42
Linking options:
https://www.mathnet.ru/eng/pfmt41 https://www.mathnet.ru/eng/pfmt/y2012/i3/p41
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Abstract page: | 157 | Full-text PDF : | 81 | References: | 60 |
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