Certain tracially nuclear dimensional for certain crossed product C*-algebras

Abstract

Let be a class of unital C*-algebras which have the second type tracial nuclear dimensional at moat n (or have tracial nuclear dimensional at most n). Let A be an infinite dimensional unital simple C*-algebra such that A is asymptotical tracially in . Then T2dimnuc(A)≤ n (or Tdimnuc(A)≤ n). As an application, let A be an infinite dimensional simple separable amenable unital C*-algebra with T2dimnuc(A)≤ n (or Tdimnuc(A)≤ n). Suppose that α:G Aut(A) is an action of a finite group G on A which has the tracial Rokhlin property. Then T2dimnuc( C*(G, A,α))≤ n (or Tdimnuc ( C*(G, A,α))≤ n).