%0 Journal Article
%T On p-soluble groups with a generalized p-central or powerful Sylow p-subgroup
%A Evgeny Khukhro
%J International Journal of Group Theory
%D 2012
%I University of Isfahan
%X Let $G$ be a finite $p$-soluble group, and $P$ a Sylow $p$-sub-group of $G$. It is proved that if all elements of $P$ of order $p$ (or of order ${}leq 4$ for $p=2$) are contained in the $k$-th term of the upper central series of $P$, then the $p$-length of $G$ is at most $2m+1$, where $m$ is the greatest integer such that $p^m-p^{m-1}leq k$, and the exponent of the image of $P$ in $G/O_{p',p}(G)$ is at most $p^m$. It is also proved that if $P$ is a powerful $p$-group, then the $p$-length of $G$ is equal to 1.
%K p-central p-group of height k
%K powerful p-group
%K p-soluble
%K p-length
%U http://www.theoryofgroups.ir/?_action=showPDF&article=761&_ob=a54f9c582725efbbb45bb105f241bdb7&fileName=full_text.pdf