Equivariant Z-stability for single automorphisms on simple C*-algebras with tractable trace simplices

Abstract

Let A be an algebraically simple, separable, nuclear, Z-stable C*-algebra for which the trace space T(A) is a Bauer simplex and the extremal boundary ∂e T(A) has finite covering dimension. We prove that each automorphism α on A is cocycle conjugate to its tensor product with the trivial automorphism on the Jiang-Su algebra. At least for single automorphisms this generalizes a recent result by Gardella-Hirshberg-Vaccaro. If α is strongly outer as an action of Z, we prove it has finite Rokhlin dimension with commuting towers. As a consequence it tensorially absorbs any automorphism on the Jiang-Su algebra.