On the C*-algebra generated by the Koopman representation of a topological full group

Abstract

Let (X,T,μ) be a Cantor minimal sytem and [[T]] the associated topological full group. We analyze C*π([[T]]), where π is the Koopman representation attached to the action of [[T]] on (X,μ). Specifically, we show that C*π([[T]])=C*π([[T]]') and that the kernel of the character τ on C*π([[T]]) coming from weak containment of the trivial representation is a hereditary C*-subalgebra of C(X). Consequently, τ is stably isomorphic to C(X), and C*π([[T]]') is not AF. We also prove that if G is a finitely generated, elementary amenable group and C *(G) has real rank zero, then G is finite.