Tracial states on groupoid C*-algebras and essential freeness

Abstract

Let G be a locally compact Hausdorff \'etale groupoid. We call a tracial state τ on a general groupoid C*-algebra C*(G) canonical if τ=τ|C0(G(0)) E, where E:C*(G) C0(G(0)) is the canonical conditional expectation. In this paper, we consider so-called fixed point traces on Cc(G), and prove that G is essentially free if and only if any tracial state on C*(G) is canonical and any fixed point trace is extendable to C*(G). As applications, we obtain the following: 1) a group action is essentially free if every tracial state on the reduced crossed product is canonical and every isotropy group is amenable; 2) if the groupoid G is second countable, amenable and essentially free then every (not necessarily faithful) tracial state on the reduced groupoid C*-algebra is quasidiagonal.