V. S. Monakhov, D. V. Gritsuk, “On derived $\pi$-length of a finite $\pi$-solvable group with supersolvable $\pi$-Hall subgroup”, Algebra Discrete Math., 16:2 (2013), 233

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Algebra and Discrete Mathematics, 2013, Volume 16, Issue 2, Pages 233–241 (Mi adm450)

RESEARCH ARTICLE

On derived

$\pi$ -length of a finite

$\pi$ -solvable group with supersolvable

$\pi$ -Hall subgroup

V. S. Monakhov, D. V. Gritsuk

Department of Mathematics, Gomel Francisk Skorina State University, Gomel, Belarus

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Abstract: It is proved that if

$\pi$ -Hall subgroup is a supersolvable group then the derived

$\pi$ -length of a

$\pi$ -solvable group

$G$ is at most

$1+ \max_{r\in \pi}l_r^a(G),$ where

$l_r^a(G)$ is the derived

$r$ -length of a

$\pi$ -solvable group

$G.$

Keywords: finite group,

$\pi$ -soluble group, supersolvable group,

$\pi$ -Hall subgroup, derived

$\pi$ -length.

Received: 18.05.2013
Revised: 18.05.2013

Bibliographic databases:

Document Type: Article

MSC: 20D10, 20D20, 20F16

Language: English

Citation: V. S. Monakhov, D. V. Gritsuk, “On derived

$\pi$ -length of a finite

$\pi$ -solvable group with supersolvable

$\pi$ -Hall subgroup”, Algebra Discrete Math., 16:2 (2013), 233–241

Citation in format AMSBIB

\Bibitem{MonGri13}

\by V.~S.~Monakhov, D.~V.~Gritsuk

\paper On derived $\pi$-length of a finite $\pi$-solvable group with  supersolvable $\pi$-Hall subgroup

\jour Algebra Discrete Math.

\yr 2013

\vol 16

\issue 2

\pages 233--241

\mathnet{http://mi.mathnet.ru/adm450}

\mathscinet{http://mathscinet.ams.org/mathscinet-getitem?mr=3186087}

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