Alternating minimization for computing doubly minimized Petz Renyi mutual information

Abstract

The doubly minimized Petz Renyi mutual information (PRMI) of order α is defined as the minimization of the Petz divergence of order α of a fixed bipartite quantum state AB relative to any product state σA τB. To date, no closed-form expression for this measure has been found, necessitating the development of numerical methods for its computation. In this work, we show that alternating minimization over σA and τB asymptotically converges to the doubly minimized PRMI for any α∈ (12,1) (1,2], by proving linear convergence of the objective function values with respect to the number of iterations for α∈ (1,2] and sublinear convergence for α∈ (12,1). Previous studies have only addressed the specific case where AB is a classical-classical state, while our results hold for any quantum state AB.