Perturbations of completely positive maps and strong NF algebras

Abstract

Let φ:Mn B(H) be an injective, completely positive contraction with φ-1:φ(Mn) Mncb≤1+δ(ε). We show that if either (i) φ(Mn) is faithful modulo the compact operators or (ii) φ(Mn) approximately contains a rank 1 projection, then there is a complete order embedding :Mn B(H) with φ-cb<ε. We also give examples showing that such a perturbation does not exist in general. As an application, we show that every C*-algebra A with OL∞(A)=1 and a finite separating family of primitive ideals is a strong NF algebra, providing a partial answer to a question of Junge, Ozawa and Ruan.