$p$-central action on groups
Abstract
Let be a finite -group acted on faithfully by a group . We prove that if fixes every element of order dividing ( if ) in a specified subgroup of , then both and behave regularly, that is the elements of order dividing any power in each one of them form a subgroup; moreover and have the same exponent, and they are nilpotent of class bounded in terms of and the exponent of . This leads in particular to a solution of a problems posed by Y. Berkovich. In another direction we discuss some aspects of the influence of a -group on the structure of a finite group which contains as a Sylow subgroup, under assumptions like every element of order ( if ) in a given term of the lower central series of lies in the center of .
Keywords
Cite
@article{arxiv.1404.3621,
title = {$p$-central action on groups},
author = {Yassine Guerboussa},
journal= {arXiv preprint arXiv:1404.3621},
year = {2014}
}
Comments
There is a small mistake in the proof of Lemma 2.5, and a mistake arising from a mistake (or I think a misprint) in a paper of M. Y. Xu. These are corrected in this version