Notes on C0-representations and the Haagerup property

Abstract

For any locally compact group G, we show the existence and uniqueness up to quasi-equivalence of a unitary C0-representation π0 of G such that all coefficient functions of C0-representations of G are coefficient functions of π0. The present work, strongly influenced by the work of N. Brown and E. Guentner (which dealt exclusively with discrete groups), leads to new characterizations of the Haagerup property: if G is second countable, then it has that property if and only if the representation π0 induces a *-isomorphism of C*(G) onto C*π0(G). When G is discrete, we also relate the Haagerup property to relative strong mixing properties of the group von Neumann algebra L(G) into finite von Neumann algebras.