Nonpositive curvature, the variance functional, and the Wasserstein barycenter

Abstract

This paper connects nonpositive sectional curvature of a Riemannian manifold with the displacement convexity of the variance functional on the space P(M) of probability measures over M. We show that M has nonpositive sectional curvature and has trivial topology (i.e, is homeomorphic to Rn) if and only if the variance functional on P(M) is displacement convex. This is followed by a Jensen type inequality for the variance functional with respect to Wasserstein barycenters, as well as by a result comparing the variance of the Wasserstein and linear barycenters of a probability measure on P(M) (that is, an element of P(P(M))). These results are applied to invariant measures under isometry group actions, giving a comparison for the variance functional between the Wasserstein projection and the L2 projection to the set of invariant measures.