Hessian metrics, CD(K,N)-spaces, and optimal transportation of log-concave measures

Abstract

We study the optimal transportation mapping ∇ : Rd Rd pushing forward a probability measure μ = e-V \ dx onto another probability measure = e-W \ dx. Following a classical approach of E. Calabi we introduce the Riemannian metric g = D2 on Rd and study spectral properties of the metric-measure space M=(Rd, g, μ). We prove, in particular, that M admits a non-negative Bakry--\'Emery tensor provided both V and W are convex. If the target measure is the Lebesgue measure on a convex set and μ is log-concave we prove that M is a CD(K,N) space. Applications of these results include some global dimension-free a priori estimates of \| D2 \|. With the help of comparison techniques on Riemannian manifolds and probabilistic concentration arguments we proof some diameter estimates for M.