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http://dx.doi.org/10.4134/BKMS.2016.53.1.091

ON π𝔉-EMBEDDED SUBGROUPS OF FINITE GROUPS  

Guo, Wenbin (Department of Mathematics University of Science and Technology of China)
Yu, Haifeng (Department of Mathematics and Physics Hefei University)
Zhang, Li (Department of Mathematics University of Science and Technology of China)
Publication Information
Bulletin of the Korean Mathematical Society / v.53, no.1, 2016 , pp. 91-102 More about this Journal
Abstract
A chief factor H/K of G is called F-central in G provided $(H/K){\rtimes}(G/C_G(H/K)){\in}{\mathfrak{F}}$. A normal subgroup N of G is said to be ${\pi}{\mathfrak{F}}$-hypercentral in G if either N = 1 or $N{\neq}1$ and every chief factor of G below N of order divisible by at least one prime in ${\pi}$ is $\mathfrak{F}$-central in G. The symbol $Z_{{\pi}{\mathfrak{F}}}(G)$ denotes the ${\pi}{\mathfrak{F}}$-hypercentre of G, that is, the product of all the normal ${\pi}{\mathfrak{F}}$-hypercentral subgroups of G. We say that a subgroup H of G is ${\pi}{\mathfrak{F}}$-embedded in G if there exists a normal subgroup T of G such that HT is s-quasinormal in G and $(H{\cap}T)H_G/H_G{\leq}Z_{{\pi}{\mathfrak{F}}}(G/H_G)$, where $H_G$ is the maximal normal subgroup of G contained in H. In this paper, we use the ${\pi}{\mathfrak{F}}$-embedded subgroups to determine the structures of finite groups. In particular, we give some new characterizations of p-nilpotency and supersolvability of a group.
Keywords
${\pi}{\mathfrak{F}}$-hypercenter; ${\pi}{\mathfrak{F}}$-embedded subgroup; Sylow subgroup; n-maximal subgroup;
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