Paper detail

A family of class-2 nilpotent groups, their automorphisms and pro-isomorphic zeta functions

The pro-isomorphic zeta function of a finitely generated nilpotent group $Γ$ is a Dirichlet generating function that enumerates finite-index subgroups whose profinite completion is isomorphic to that of $Γ$. Such zeta functions can be expressed as Euler products of $p$-adic integrals over the $p$-adic points of an algebraic automorphism group associated to $Γ$. In this way they are closely related to classical zeta functions of algebraic groups over local fields. We describe the algebraic automorphism groups for a natural family of class-$2$ nilpotent groups; these groups can be viewed as generalizations of $D^*$-groups of odd Hirsch length. General $D^*$-groups, that is `indecomposable' finitely generated, torsion-free class-$2$ nilpotent groups with central Hirsch length $2$, were classified up to commensurability by Grunewald and Segal. We calculate the local pro-isomorphic zeta functions for our groups and obtain, in particular, explicit formulae for the local pro-isomorphic zeta functions associated to $D^*$-groups of odd Hirsch length. From these we deduce local functional equations; for the global zeta functions we describe the abscissae of convergence and find meromorphic continuations. We deduce that the spectrum of abscissae of convergence for pro-isomorphic zeta functions of class-2 nilpotent groups contains infinitely many cluster points. For instance, the global abscissae of convergence of the pro-isomorphic zeta functions of $D^*$-groups of odd Hirsch length are determined and yield the cluster point $6$.