Formal Riemannian Structure of the Wasserstein metric: Difference between revisions

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The Wasserstein metric is defined as  
The Wasserstein metric is defined as  


:<math> W_2(\mu, \nu) := \min_{\gamma \in \Gamma(\mu, \nu) \left( \int |x_1 - x_2|^2 \, d\gamma(x_1, x_2) \right)^{1/2}  </math>
:<math> W_2(\mu, \nu) := \min_{\gamma \in \Gamma(\mu, \nu)} \left( \int |x_1 - x_2|^2 \, d\gamma(x_1, x_2) \right)^{1/2}  </math>


==Basic Structure of Riemannian Manifolds==
==Basic Structure of Riemannian Manifolds==

Revision as of 06:04, 6 June 2020

The Wasserstein metric is defined as

Basic Structure of Riemannian Manifolds

Tangent Space Induced by Wasserstein Metric

Riemannian Metric Induced by Wasserstein Metric

References

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