Primitive subgroups and PST-groups

Primitive subgroups and PST-groups

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Primitive subgroups and PST-groups

Show simple item record Ballester-Bolinches, Adolfo Beidleman, J.C. Esteban Romero, Ramón 2015-10-07T06:19:44Z 2015-10-07T06:19:44Z 2014
dc.description.abstract All groups are finite. A subgroup H of a group G is called a primitive subgroup if it is a proper subgroup in the intersection of all subgroups of G containing H as its proper subgroup. He, Qiao and Wang [7] proved that every primitive subgroup of a group G has index a power of a prime if and only if G/Φ(G) is a solvable PST-group. Let X denote the class of groups G all of whose primitive subgroups have prime power index. It is established here that a group G is a solvable PST-group if and only if every subgroup of G is an X-group.
dc.language.iso eng
dc.relation.ispartof Bulletin of the Australian Mathematical Society, 2014, vol. 89, num. 3, p. 373-378
dc.rights.uri info:eu-repo/semantics/openAccess
dc.source Ballester Bolinches, Adolfo Beidleman, J.C. Esteban Romero, Ramón 2014 Primitive subgroups and PST-groups Bulletin of the Australian Mathematical Society 89 3 373 378
dc.subject Àlgebra
dc.subject Grups, Teoria de
dc.title Primitive subgroups and PST-groups
dc.type info:eu-repo/semantics/article 2015-10-07T06:19:45Z
dc.identifier.idgrec 090324

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