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This article is cited in 22 scientific papers (total in 22 papers)
Finite groups with submodular Sylow subgroups
V. A. Vasilyev Francisk Skorina Gomel State University, Gomel, Belarus
Abstract:
A subgroup $H$ of a finite group $G$ is submodular in $G$ if $H$ can be joined with $G$ by a chain of subgroups each of which is modular in the subsequent subgroup. We reveal some properties of groups with submodular Sylow subgroups. A group $G$ is called strongly supersoluble if $G$ is supersoluble and every Sylow subgroup of $G$ is submodular. We show that $G$ is strongly supersoluble if and only if $G$ is metanilpotent and every Sylow subgroup of $G$ is submodular. The following are proved to be equivalent: (1) every Sylow subgroup of a group is submodular; (2) a group is Ore dispersive and its every biprimary subgroup is strongly supersoluble; and (3) every metanilpotent subgroup of a group is supersoluble.
Keywords:
finite group, modular subgroup, submodular subgroup, strongly supersoluble group, Ore dispersive group.
Received: 12.02.2015
Citation:
V. A. Vasilyev, “Finite groups with submodular Sylow subgroups”, Sibirsk. Mat. Zh., 56:6 (2015), 1277–1288; Siberian Math. J., 56:6 (2015), 1019–1027
Linking options:
https://www.mathnet.ru/eng/smj2712 https://www.mathnet.ru/eng/smj/v56/i6/p1277
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Abstract page: | 504 | Full-text PDF : | 114 | References: | 91 | First page: | 35 |
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