Asymptotically unitary equivalence and asymptotically inner automorphisms
Abstract
Let C be a unital AH-algebra and let A be a unital separable simple with tracial rank zero. Suppose that φ1, φ2: C A are two unital monomorphisms. We show that there is a continuous path of unitaries \ut: t∈ [0, ∞)\ of A such that t∞ut*φ1(a)ut=φ2(a) a∈ C if and only if [φ1]=[φ2] in KK(C,A), τ φ1=τ φ2 for all τ∈ T(A) and the rotation map ηφ1,φ2 associated with φ1 and φ2 is zero. In particular, an automorphism on a unital separable simple A in N with tracial rank zero is asymptotically inner if and only if []=[ idA] in KK(A,A) and the rotation map ηφ1, φ2 is zero. Let A be a unital AH-algebra (not necessarily simple) and let ∈ Aut(A) be an automorphism. As an application, we show that the associated crossed product A can be embedded into a unital simple AF-algebra if and only if A admits a strictly positive -invariant tracial state.
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