Topological Orbit Dimension of MF C*-algebras

Abstract

This paper is a continuation of our work on D. Voiculescu's topological free entropy dimension in unital C*-algebras. In this paper we first prove the topological free entropy dimension of a MF-nuclear and inner QD algebra is irrelevant to its generating family. Then we give the relation between the topological orbit dimension Ktop2 and the modified free orbit dimension K22 by using MF-traces. We also introduce a new invariant Ktop3 which is a modification of the topological orbit dimension Ktop2 when Ktop2 is defined. As the applications of Ktop3, We prove that Ktop3(A)=0 if A has property c*- and has no finite-dimensional representations. We also give the definition of property MF-c*-. We then conclude that, for the unital MF C*-algebra with no finite-dimensional representations, if A has property MF-c*-, then Ktop3(A)=0.