On a class of finite soluble groups

Ballester‐Bolinches, A.; Cossey, John; Li, Yangming

doi:10.1515/jgth-2018-0015

Journal of Group Theory

2018

DOI: 10.1515/jgth-2018-0015

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On a class of finite soluble groups

A. Ballester‐Bolinches

John Cossey

Yangming Li

Abstract: The aim of this paper is to study the class of finite groups in which every subgroup is self-normalising in its subnormal closure. It is proved that this class is a subgroup-closed formation of finite soluble groups which is not closed under taking Frattini extensions and whose members can be characterised by means of their Carter subgroups. This leads to new characterisations of finite soluble T-, PT- and PST-groups. Finite groups whose p-subgroups, p a prime, are self-normalising in their subnormal closure a… Show more

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Finite groups in which every cyclic subgroup is self-normalizing in its subnormal closure

Qian

2019

Journal of Group Theory

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For a given prime p, a finite group G is said to be a {\widetilde{\mathcal{C}}_{p}} -group if every cyclic p-subgroup of G is self-normalizing in its subnormal closure. In this paper, we get some descriptions of {\widetilde{\mathcal{C}}_{p}} -groups, show that the class of {\widetilde{\mathcal{C}}_{p}} -groups is a subgroup-closed formation and that {O^{p^{\prime}}(G)} is a solvable p-nilpotent group for every {\widetilde{\mathcal{C}}_{p}} -group G. We also prove that if a finite group G is a {\widetilde{\mathcal{C}}_{p}} -group for all primes p, then every subgroup of G is self-normalizing in its subnormal closure.

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Finite groups in which every cyclic subgroup is self-normalizing in its subnormal closure

Qian

2019

Journal of Group Theory

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On a class of finite soluble groups

Cited by 1 publication

References 4 publications

Finite groups in which every cyclic subgroup is self-normalizing in its subnormal closure

Finite groups in which every cyclic subgroup is self-normalizing in its subnormal closure

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