From Wigner-Yanase-Dyson conjecture to Carlen-Frank-Lieb conjecture (New title)

Abstract

In this paper we study the joint convexity/concavity of the trace functions \[ p,q,s(A,B)=Tr(Bq2K*ApKBq2)s,~~p,q,s∈ R, \] where A and B are positive definite matrices and K is any fixed invertible matrix. We will give full range of (p,q,s)∈R3 for p,q,s to be jointly convex/concave for all K. As a consequence, we confirm a conjecture of Carlen, Frank and Lieb. In particular, we confirm a weaker conjecture of Audenaert and Datta and obtain the full range of (α,z) for α-z R\'enyi relative entropies to be monotone under completely positive trace preserving maps. We also give simpler proofs of many known results, including the concavity of p,0,1/p for 0<p<1 which was first proved by Epstein using complex analysis. The key is to reduce the problem to the joint convexity/concavity of the trace functions \[ p,1-p,1(A,B)=Tr K*ApKB1-p,~~-1 p 1, \] using a variational method.