The Wasserstein distance for Ricci shrinkers

Abstract

Let (Mn,g,f) be a Ricci shrinker such that Ricf=12g and the measure induced by the weighted volume element (4π)-n2e-fdvg is a probability measure. Given a point p∈ M, we consider two probability measures defined in the tangent space TpM, namely the Gaussian measure γ and the measure induced by the exponential map of M to p. In this paper, we prove a result that provides an upper estimate for the Wasserstein distance with respect to the Euclidean metric g0 between the measures and γ, and which also elucidates the rigidity implications resulting from this estimate.