On the reach of isometric embeddings into Wasserstein type spaces

Abstract

We study the reach (in the sense of Federer) of the natural isometric embedding X Wp(X) of X inside its p-Wasserstein space, where (X,dist) is a geodesic metric space. We prove that if a point x∈ X can be joined to another point y∈ X by two minimizing geodesics, then reach(x, X⊂ Wp(X)) = 0. This includes the cases where X is a compact manifold or a non-simply connected one. On the other hand, we show that reach(X⊂ Wp(X)) = ∞ when X is a CAT(0) space. The infinite reach enables us to examine the regularity of the projection map. Furthermore, we replicate these findings by considering the isometric embedding X W(X) into an Orlicz--Wasserstein space, a generalization by Sturm of the classical Wasserstein space. Lastly, we establish the nullity of the reach for the isometric embedding of X into Dgm∞, the space of persistence diagrams equipped with the bottleneck distance.