On finite p-groups with powerful subgroups

Abstract

In this paper we investigate the structure of finite p-groups with the property that every subgroup of index pi is powerful for some i. For odd primes p, we show that under certain conditions these groups must be potent. Then, motivated by a question of Mann, we investigate in detail the case when all maximal subgroups are powerful. We show that for odd p any finite p-group G with all maximal subgroups powerful has a regular power structure - with precisely one exceptional case which is a 3-group of maximal class and order 81. To show this counterexample is unique we use a computational approach. We briefly discuss the case p=2 and some generalisations.

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