Kishimoto's Conjugacy Theorems in simple C*-algebras of tracial rank one

Abstract

Let A be a unital separable simple amenable C*-algebra with finite tracial rank which satisfies the Universal Coefficient Theorem (UCT). Suppose and are two automorphisms with the Rokhlin property that induce the same action on the K-theoretical data of A. We show that and are strongly cocycle conjugate and uniformly approximately conjugate, that is, there exists a sequence of unitaries \un\⊂ A and a sequence of strongly asymptotically inner automorphisms σn such that = Ad\, un σn σn-1 n∞\|un-1\|=0, and that the converse holds. We then give a K-theoretic description as to exactly when and are cocycle conjugate, at least under a mild restriction. Moreover, we show that given any K-theoretical data, there exists an automorphism with the Rokhlin property which has the same K-theoretical data.