Non-commutative f-divergence functional

Abstract

We introduce the non-commutative f-divergence functional (A,B):=∫TBt12f(Bt-12 AtBt-12)Bt12dμ(t) for an operator convex function f, where A=(At)t∈ T and B=(Bt)t∈ T are continuous fields of Hilbert space operators and study its properties. We establish some relations between the perspective of an operator convex function f and the non-commutative f-divergence functional. In particular, an operator extension of Csisz\'ar's result regarding f-divergence functional is presented. As some applications, we establish a refinement of the Choi--Davis--Jensen operator inequality, obtain some unitarily invariant norm inequalities and give some results related to the Kullback--Leibler distance.