Tracial Rokhlin property for automorphisms on simple A T-algebras
Abstract
Let A be a unital simple A-algebra of real rank zero. Given an isomorphism γ1: K1(A) K1(A), we show that there is an automorphism : A A such that *1=γ1 which has the tracial Rokhlin property. Consequently, the crossed product A is a simple unital AH-algebra with real rank zero. We also show that automorphism with Rokhlin property can be constructed from minimal homeomorphisms on a connected compact metric space.
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