Finite and locally solvable periodic groups with given intersections of certain subgroups

doi:10.1285/i15900932v14n2p147

Finite and locally solvable periodic groups with given intersections of certain subgroups

Y. Berkovich, P. Longobardi, M. Maj

Abstract

Let G be a group and p be a prime. We say that two subgroups $H, K$ are incident if either $H ∩ K = H$ or $H∩ K = K$ . A group G is an $IC<sub>p</sub>$ -group if, for any finite non-incident subgroups $H, K$ of G, a p-Sylow subgroup of $H ∩ K$ is cyclic. In this paper we give a complete classification of solvable and locally solvable periodic $IC<sub>p</sub>$ -groups.

DOI Code: 10.1285/i15900932v14n2p147

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Finite and locally solvable periodic groups with given intersections of certain subgroups

Abstract