Matrix versions of the Hellinger distance

Abstract

On the space of positive definite matrices we consider distance functions of the form d(A,B)=[(A,B)-(A,B)]1/2, where A(A,B) is the arithmetic mean and G(A,B) is one of the different versions of the geometric mean. When G(A,B)=A1/2B1/2 this distance is \|A1/2-B1/2\|2, and when G(A,B)=(A1/2BA1/2)1/2 it is the Bures-Wasserstein metric. We study two other cases: G(A,B)=A1/2(A-1/2BA-1/2)1/2A1/2, the Pusz-Woronowicz geometric mean, and G(A,B)=( A+ B2), the log Euclidean mean. With these choices d(A,B) is no longer a metric, but it turns out that d2(A,B) is a divergence. We establish some (strict) convexity properties of these divergences. We obtain characterisations of barycentres of m positive definite matrices with respect to these distance measures.