Superadditivity of quantum relative entropy for general states

Abstract

The property of superadditivity of the quantum relative entropy states that, in a bipartite system HAB=HA HB, for every density operator AB one has D( AB || σA σB ) D( A || σA ) +D( B || σB) . In this work, we provide an extension of this inequality for arbitrary density operators σAB . More specifically, we prove that α (σAB)· D(AB||σAB) D(A||σA)+D(B||σB) holds for all bipartite states AB and σAB, where α(σAB)= 1+2 || σA-1/2 σB-1/2 \, σAB \, σA-1/2 σB-1/2 - 1AB ||∞.