Representation growth of quasi-semisimple profinite groups

Abstract

The representation zeta function of a profinite group G encodes the distribution of continuous irreducible complex representations of G as a function of the dimension. Its abscissa of convergence α(G) describes the polynomial degree of representation growth of G. Within the class of quasi-semisimple profinite groups, we characterise those of polynomial representation growth (PRG) and we prove that whether such a group G has PRG or not only depends on its semisimple part G/Z(G). Moreover, we show that, for quasi-semisimple profinite groups G that have uniformly bounded Lie ranks, the degree of growth satisfies α(G) = α(G/Z(G)). We provide a technique to produce, for any prescribed positive real number , quasi-semisimple profinite groups G with PRG of degree α(G) = . Our method allows for considerable flexibility regarding the inclusion of finite simple groups of Lie type as composition factors of G. Furthermore, we can arrange for the groups G of prescribed representation growth to be profinite completions of suitable finitely generated discrete groups so that the group has the same representation zeta function as G.