Profinite groups in which the probabilistic zeta function has no negative coefficients

Abstract

To a finitely generated profinite group G, a formal Dirichlet series PG(s)=Σn ∈ N an(G)/ns is associated, where an(G)=Σ|G:H|=nμ(H, G) and μ(H,G) denotes the M\"obius function of the lattice of open subgroups of G. Its formal inverse PG-1(s) is the probabilistic zeta function of G. When G is prosoluble, every coefficient of (PG(s))-1 is nonnegative. In this paper we discuss the general case and we produce % existence of a non-prosoluble example and We construct a non-prosoluble finitely generated group G with the same property.