A note on proper asymptotic uniqueness for semifinite factors

Abstract

Let A be a separable nuclear C*-algebra, and let M be a semifinite von Neumann factor with separable predual. Let φ, : A → M be essential trivial extensions with φ(a) - (a) ∈ KM for all a ∈ A such that either both φ and (and hence A) are unital or both φ and have large complement. Then φ and are properly asymptotically unitarily equivalent if and only if [φ, ]CS = 0 in KK(A, C(S KM)).

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