On the pseudovariety of groups U = p ∈ P Ab(p) Ab(p-1)

Abstract

We introduce the pseudovariety of finite groups U = p ∈ P Ab(p) Ab(p-1), where P is the set of all primes. We show that U consists of all finite supersolvable groups with elementary abelian derived subgroup and abelian Sylow subgroups, being therefore decidable. We prove that it is decidable whether or not a finitely generated subgroup of a free group is closed or dense for the pro- U topology. We consider also the pseudovariety of finite groups Ab(p) Ab(d) (where p is a prime and d divides p-1). We study the pro-( Ab(p) Ab(d)) topology on a free group and construct the unique generator of minimum size of the pseudovariety Ab(p) Ab(d). Finally, we prove that the variety of groups generated by U is the variety of all metabelian groups, obtaining also results on the varieties generated by a Baumslag-Solitar group of the form BS(1,q) for q prime.