Completely Bounded Norms of k-positive Maps

Abstract

Given an operator system S, we define the parameters rk(S) (resp. dk(S)) defined as the maximal value of the completely bounded norm of a unital k-positive map from an arbitrary operator system into S (resp. from S into an arbitrary operator system). In the case of the matrix algebras Mn, for 1 ≤ k ≤ n, we compute the exact value rk(Mn) = 2n-kk and show upper and lower bounds on the parameters dk(Mn). Moreover, when S is a finite-dimensional operator system, adapting recent results of Passer and the 4th author, we show that the sequence (rk( S)) tends to 1 if and only if S is exact and that the sequence (dk(S)) tends to 1 if and only if S has the lifting property.