The X-series of a p-group and complements of abelian subgroups

Abstract

Let G be a p-group. We denote by Xi(G) the intersection of all subgroups of G having index pi, for i ≤ p(|G|). In this paper, the newly introduced series \Xi(G)\i is investigated and a number of results concerning its behaviour are proved. As an application of these results, we show that if an abelian subgroup A of G intersects each one of the subgroups Xi(G) at Xi(A), then A has a complement in G. Conversely if an arbitrary subgroup H of G has a normal complement, then Xi(H) = Xi(G) H.

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