On SS-quasinormalities of the maximal subgroup series of finite groups
Abstract
Let G be finite group. A subgroup H of G is said to be an SS-quasinormal subgroup of G, if there exists a subgroup B of G such that G = HB and H permutes with every Sylow subgroup of B. Let : G=G0>G1>·s>Gn-1>Gn=1 be a maximal subgroup series of G, where Gi is a maximal subgroup of Gi-1 for every i = 1, … , n. In this paper, we investigate the finite groups G that admit an SS-quasinormal maximal subgroup series, i.e., all Gi are SS-quasinormal in G. First, we prove that if G possesses an SS-quasinormal maximal subgroup series, then G is solvable. Furthermore, we show that G is supersolvable if and only if G possesses an SS-quasinormal maximal subgroup series which is subnormal in G.
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