Z-stability of C(X)

Abstract

Let (X, ) be a free and minimal topological dynamical system, where X is a separable compact Hausdorff space and is a countable infinite discrete amenable group. It is shown that if (X, ) has the Uniform Rokhlin Property and Cuntz comparison of open sets, then mdim(X, )=0 implies that (C(X) ) Z C(X) , where mdim is the mean dimension and Z is the Jiang-Su algebra. In particular, in this case, mdim(X, )=0 implies that the C*-algebra C(X) is classified by the Elliott invariant.