Local structure of centred tangent cones in the Wasserstein space (2508.10837v1)

Abstract: This article investigates the geometric tangent cone to a probability measure with finite second moment. It is known that the tangent elements induced by a map belong to the $L^2_{\mu}$ closure of smooth gradients. We show that at the opposite, the elements that have barycenter 0 are characterized by a local condition, i.e. as the barycenter-free measures that are concentrated on a family of vector subspaces attached to any point. Our results rely on a decomposition of a measure into $d+1$ components, each allowing optimal plans to split mass in a fixed number of directions. We conclude by giving some links with Preiss tangent measures and illustrating the difference with Alberti and Marchese's decomposability bundle.