The permutability of $\sigma_i$-sylowizers of some $\sigma_i$-subgroups in finite groups

TL;DR

This paper explores how the permutability of $\sigma_i$-sylowizers of certain $\sigma_i$-subgroups affects the structure of finite groups, providing new characterizations of supersoluble groups.

Contribution

It introduces new characterizations of supersoluble groups based on the permutability of $\sigma_i$-sylowizers of specific $\sigma_i$-subgroups.

Findings

Characterizations of supersoluble groups via $\sigma_i$-sylowizer permutability

Influence of $\sigma_i$-sylowizers on finite group structure

Conditions under which $\sigma_i$-sylowizers determine group properties

Abstract

Let $\sigma=\{\sigma_{i}|i\in I\}$ be a partition of the set of all primes $\mathbb{P}$, $G$ a finite group and $\sigma(G)=\{\sigma_{i}|\sigma_{i}\cap \pi(|G|)\neq\emptyset\}$. A subgroup $S$ of a group $G$ is called a $\sigma_i$-sylowizer of a $\sigma_i$-subgroup $R$ in $G$ if $S$ is maximal in $G$ with respect to having $R$ as its Hall $\sigma_i$-subgroup. The main aim of this paper is to investigate the influence of $\sigma_i$-sylowizers on the structure of finite groups. We obtained some new characterizations of supersoluble groups by the permutability of the $\sigma_i$-sylowizers of some $\sigma_i$-subgroups.