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The structure of finite groups whose elements outside a normal subgroup have prime power orders

Part of: Representation theory of groups

Published online by Cambridge University Press:  18 September 2024

Changguo Shao  and
Qinhui Jiang
Changguo Shao
Affiliation:
College of Science, Nanjing University of Posts and Telecommunications, 210023 Nanjing, China ([email protected]; [email protected])
Qinhui Jiang*
Affiliation:
College of Science, Nanjing University of Posts and Telecommunications, 210023 Nanjing, China ([email protected]; [email protected])
*
*Corresponding author.
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Abstract

The structure of groups in which every element has prime power order (CP-groups) is extensively studied. We first investigate the properties of group $G$ such that each element of $G\setminus N$ has prime power order. It is proved that $N$ is solvable or every non-solvable chief factor $H/K$ of $G$ satisfying $H\leq N$ is isomorphic to $PSL_2(3^f)$ with $f$ a 2-power. This partially answers the question proposed by Lewis in 2023, asking whether $G\cong M_{10}$? Furthermore, we prove that if each element $x\in G\backslash N$ has prime power order and ${\bf C}_G(x)$ is maximal in $G$, then $N$ is solvable. Relying on this, we give the structure of group $G$ with normal subgroup $N$ such that ${\bf C}_G(x)$ is maximal in $G$ for any element $x\in G\setminus N$. Finally, we investigate the structure of a normal subgroup $N$ when the centralizer ${\bf C}_G(x)$ is maximal in $G$ for any element $x\in N\setminus {\bf Z}(N)$, which is a generalization of results of Zhao, Chen, and Guo in 2020, investigating a special case that $N=G$ for our main result. We also provide a new proof for Zhao, Chen, and Guo's results above.

Keywords

prime power ordercentralizersmaximal subgroupsFrobenius groupsCP-groups

MSC classification

Primary: 20D06: Simple groups
Secondary: 20D45: Automorphisms 20D15: Nilpotent groups, $p$-groups
Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , First View , pp. 1 - 20
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Copyright
Copyright © The Author(s), 2024. Published by Cambridge University Press on behalf of The Royal Society of Edinburgh

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