Nilpotent group C*-algebras as compact quantum metric spaces

Abstract

Let L be a length function on a group G, and let ML denote the operator of pointwise multiplication by L on 2(G). Following Connes, ML can be used as a "Dirac" operator for the reduced group C*-algebra Cr*(G). It defines a Lipschitz seminorm on Cr*(G), which defines a metric on the state space of Cr*(G). We show that for any length function of a strong form of polynomial growth on a discrete group, the topology from this metric coincides with the weak-* topology (a key property for the definition of a "compact quantum metric space"). In particular, this holds for all word-length functions on finitely generated nilpotent-by-finite groups.