On finite groups factorized by σ-nilpotent subgroups

Abstract

Let G be a finite group and σ=\σi|i∈ I\ be a partition of the set of all primes P, that is, P=i∈ Iσi and σi σj= for all i≠ j. A chief factor H/K of G is said to be σ-central in G, if the semidirect product (H/K)(G/CG(H/K)) is a σi-group for some i∈ I. The group G is said to be σ-nilpotent if either G=1 or every chief factor of G is σ-central. In this paper, we study the properties of a finite group G=AB, factorized by two σ-nilpotent subgroups A and B, and also generalize some known results.