Convexity of a certain operator trace functional

Abstract

In this article the operator trace function r,s(A)[K, M] := tr(K*Ar M Ar K)s is introduced and its convexity and concavity properties are investigated. This function has a direct connection to several well-studied operator trace functions that appear in quantum information theory, in particular when studying data processing inequalities of various relative entropies. In the paper the interplay between r,s and the well-known operator functions p,s and p,q,s is used to study the stability of their convexity (concavity) properties. This interplay may be used to ensure that r,s is convex (concave) in certain parameter ranges when M=I or K=I. However, our main result shows that convexity (concavity) is surprisingly lost when perturbing those matrices even a little. To complement the main theorem, the convexity (concavity) domain of itself is examined. The final result states that r,s is never concave and it is convex if and only if r=1 and s≥ 1/2.