Probabilistic construction of some extremal p-groups

Abstract

A p-group G is called *ab-maximal* if |H : H'| < |G:G'| for every proper subgroup H of G. Similarly, G is called *d-maximal* if d(H) < d(G) for every proper subgroup H of G, where d(H) is the minimal number of generators of H. If G is ab-maximal then |G:G'| p3 |G'|, while if G is d-maximal and p 2 then |G:G'| p2 |G'|. Answering questions of Gonz\'alez-S\'anchez--Klopsch and Lisi--Sabatini, for all p we construct infinitely many ab-maximal p-groups of class 2 with |G:G'| = p3 |G'|, and infinitely many d-maximal p-groups of class 2 with |G:G'| = p2 |G'|. The construction is probabilistic and based on the degeneracy of random alternating bilinear maps on subspaces. It is notable however that in the ab-maximal case we do not have a high-probability result but rather in a suitable sense the proportion of class-2 groups with |G:G'| = pn and |G'| = pn-3 that are ab-maximal is close to 1/e.

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