Jensen's inequality in geodesic spaces with lower bounded curvature

Abstract

Let (M,d) be a separable and complete geodesic space with curvature lower bounded, by ∈ R, in the sense of Alexandrov. Let μ be a Borel probability measure on M, such that μ∈ P2(M), and that has at least one barycenter x*∈ M. We show that for any geodesically α-convex function f:M R, for α∈ R, the inequality \[f(x*) ∫M (f -α2d2(x*,.))\, dμ,\] holds provided f is locally Lipschitz at x* and either positive or in L1(μ). Our proof relies on the properties of tangent cones at barycenters and on the existence of gradients for semi-concave functions in spaces with lower bounded curvature.