Invariant trace simplices and relative property (T)

Abstract

Let α G A be an action of a countable discrete group on a separable unital C*-algebra. We study the simplex T(A)G of G-invariant traces and ask when it is Bauer. Our main result is a noncommutative version of the Glasner-Weiss theorem: if (G,H) has relative property (T) and the H-action on the von Neumann algebra of every extremal invariant trace is ergodic, that is, has only scalar fixed points, then T(A)G is Bauer. We give criteria for the ergodicity hypothesis and apply them to certain quasi-local permutation actions, generalized Bernoulli actions, traces on group C*-algebras, and reduced crossed products. In particular, if G is infinite, has property (T), and trivial amenable radical, then Cr*( G) has Bauer trace simplex for every countable discrete group .