Isometries and isometric embeddings of Wasserstein spaces over the Heisenberg group

Abstract

Our purpose in this paper is to study isometries and isometric embeddings of the p-Wasserstein space Wp(Hn) over the Heisenberg group Hn for all p>1 and for all n≥ 1. First, we create a link between optimal transport maps in the Euclidean space R2n and the Heisenberg group Hn. Then we use this link to understand isometric embeddings of R and R+ into Wp(Hn) for p>1. That is, we characterize complete geodesics and geodesic rays in the Wasserstein space. Using these results we determine the metric rank of Wp(Hn). Namely, we show that Rk can be embedded isometrically into Wp(Hn) for p>1 if and only if k≤ n. As a consequence, we conclude that Wp(Rk) and Wp(Hk) can be embedded isometrically into Wp(Hn) if and only if k≤ n. In the second part of the paper, we study the isometry group of Wp(Hn) for p>1. We find that these spaces are all isometrically rigid meaning that for every isometry :Wp(Hn)p(Hn) there exists a :Hnn such that =\#.