On finite groups factorized by $σ$-nilpotent subgroups

Zhenfeng Wu, Chi Zhang

Published 2021-04-18Version 1

Let $G$ be a finite group and $\sigma=\{\sigma_{i}|i\in I\}$ be a partition of the set of all primes $\mathbb{P}$, that is, $\mathbb{P}=\bigcup_{i\in I}\sigma_{i}$ and $\sigma_{i}\cap \sigma_{j}=\emptyset$ for all $i\neq j$. A chief factor $H/K$ of $G$ is said to be $\sigma$-central in $G$, if the semidirect product $(H/K)\rtimes(G/C_G(H/K))$ is a $\sigma_i$-group for some $i\in I$. The group $G$ is said to be $\sigma$-nilpotent if either $G=1$ or every chief factor of $G$ is $\sigma$-central. In this paper, we study the properties of a finite group $G=AB$, factorized by two $\sigma$-nilpotent subgroups $A$ and $B$, and also generalize some known results.