On π-Solvable and Locally π-Solvable Groups with Factorization

С. В. Путилов; Н. С. Черников

On π-Solvable and Locally π-Solvable Groups with Factorization

Authors

S. V. Putilov
N. S. Chernikov

Abstract

We prove that, in a locally π-solvable group G = AB with locally normal subgroups A and B, there exist pairwise-permutable Sylow π′- and p-subgroups A _π′, A _p and B _π′, B _p, p ∈ π, of the subgroups A and B, respectively, such that A _π′ B _π′ is a Sylow π′-subgroup of the group G and, for an arbitrary nonempty set σ

$\subseteq$ π,

$\left( {\prod\nolimits_{p \in {\sigma }} {A_p } } \right)\left( {\prod\nolimits_{p \in {\sigma }} {B_p } } \right)\quad {and}\quad \left( {A_{{\pi }\prime } \prod\nolimits_{p \in {\sigma }} {A_p } } \right)\left( {B_{{\pi }\prime } \prod\nolimits_{p \in {\sigma }} {B_p } } \right)$ are Sylow σ- and π′ ∪ σ-subgroups, respectively, of the group G.

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Published

25.06.2001

Issue

Vol. 53 No. 6 (2001)

Section

Research articles

How to Cite

Putilov, S. V., and N. S. Chernikov. “On π-Solvable and Locally π-Solvable Groups With Factorization”. Ukrains’kyi Matematychnyi Zhurnal, vol. 53, no. 6, June 2001, pp. 840-6, https://umj.imath.kiev.ua/index.php/umj/article/view/4304.

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On π-Solvable and Locally π-Solvable Groups with Factorization

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