<i>c </i><sup>*</sup> -Supplemented subgroups and <i>p </i>-nilpotency of finite groups

  • Youyu Wang
  • H. Wei

Abstract

A subgroup $H$ of a finite group $G$ is said to be $c^{*}$-supplemented in $G$ if there exists a subgroup $K$ such that $G = HK$ and $H ⋂ K$ is permutable in $G$. It is proved that a finite group $G$ that is $S_4$-free is $p$-nilpotent if $N_G (P)$ is $p$-nilpotent and, for all $x ∈ G \backslash N_G (P)$, every minimal subgroup of $P ∩ P^x ∩ G^{N_p}$ is $c^{*}$-supplemented in $P$ and (if $p = 2$) one of the following conditions is satisfied:
(a) every cyclic subgroup of $P ∩ P^x ∩ G^{N_p}$ of order 4 is $c^{*}$-supplemented in $P$,
(b) $[Ω2(P ∩ P^x ∩ G^{N_p}),P] ⩽ Z(P ∩ G^{N_p})$,
(c) $P$ is quaternion-free, where $P$ a Sylow $p$-subgroup of $G$ and $G^{N_p}$ is the $p$-nilpotent residual of $G$.
This extends and improves some known results.
Published
25.08.2007
How to Cite
WangY., and WeiH. “<i>c </i><sup>*</sup> -Supplemented Subgroups and <i>p </I&gt;-Nilpotency of Finite Groups”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 59, no. 8, Aug. 2007, pp. 1011–1019, https://umj.imath.kiev.ua/index.php/umj/article/view/3364.
Section
Research articles