Formal Riemannian Structure of the Wasserstein metric
Given a closed and convex space , two probability measures on the same space, , the 2-Wasserstein metric is defined as
where is a transport plan from to . The Wasserstein metric is indeed a metric in the sense that it satisfies the desired properties of a distance function between probability measures on . Moreover, the Wasserstein metric can be used to define a Riemannian metric on . Such a metric allows one to define angles and lengths of vectors at each point in our ambient space.
Tangent Space Induced by the Wasserstein Metric
Riemannian Metric Induced by the Wasserstein Metric
References
Cite error: <ref>
tag with name "Ambrosio, Gigli, Savaré" defined in <references>
has group attribute "" which does not appear in prior text.
Cite error: <ref>
tag with name "Villani" defined in <references>
has group attribute "" which does not appear in prior text.