A factorization property of positive maps on C*-algebras

Abstract

The purpose of this short note is to clarify and present a general version of an interesting observation by Piani and Mora (Physic. Rev. A 75, 012305 (2007)), linking complete positivity of linear maps on matrix algebras to decomposability of their ampliations. Let Ai, Ci be unital C*-algebras and let αi be positive linear maps from Ai to Ci, i=1,2. We obtain conditions under which any positive map β from the minimal C*-tensor product A1 min A2 to C1 min C2, such that α1 α2 ≥ β, factorizes as β = γ α2 for some positive map γ. In particular we show that when αi Ai → B( Hi) are completely positive (CP) maps for some Hilbert spaces Hi (i=1,2), and α2 is a pure CP map and β is a CP map so that α1 α2 - β is also CP, then β = γ α2 for some CP map γ. We show that a similar result holds in the context of positive linear maps when A2 = C2 = B( H) and α2 = id. As an application we extend [IX Theorem]PM( revisited recently by Huber et al in HLLM) to show that for any linear map τ from a unital C*-algebra A to a C*-algebra C, if τ idk is decomposable for some k ≥ 2, where idk is the identity map on the algebra Mk( C ) of k× k matrices, then τ is completely positive.