Uniqueness for embeddings of nuclear C*-algebras into type II1 factors

Abstract

Let A be a separable, unital and exact C*-algebra satisfying the universal coefficient theorem. We prove uniqueness theorems up to unitary conjugacy for unital, full and nuclear maps from A into ultraproducts of finite von Neumann factors: any two such maps agreeing on traces and total K-theory are unitarily equivalent. There are two consequences. Firstly if one takes the factors to be a sequence (Mkn)n of matrix algebras, we obtain a uniqueness result for quasidiagonal approximations of A. Secondly, when ( M,τ) is a II1 factor, a pair ϕ,ψ:A M of unital, injective and nuclear maps are norm approximately unitarily equivalent if and only if τ Mϕ=τ Mψ. The main strategy is to use Schafhauser's classification of lifts along the trace--kernel extension. Since our codomains may lack the tensorial absorption properties needed in this work, the main new ingredient is a suitable KK-uniqueness theorem tailored to our situation. This is inspired by KK-uniqueness theorems of Loreaux, Ng and Sutradhar.