The permutability of σi-sylowizers of some σi-subgroups in finite groups

Abstract

Let σ=\σi|i∈ I\ be a partition of the set of all primes P, G a finite group and σ(G)=\σi|σi π(|G|)≠\. A subgroup S of a group G is called a σi-sylowizer of a σi-subgroup R in G if S is maximal in G with respect to having R as its Hall σi-subgroup. The main aim of this paper is to investigate the influence of σi-sylowizers on the structure of finite groups. We obtained some new characterizations of supersoluble groups by the permutability of the σi-sylowizers of some σi-subgroups.