Fairness and discrimination, PhD Course, #4 Wasserstein Distances and Optimal Transport | allainews.com

Jan. 21, 2024, 4:51 p.m. | arthur charpentier

R-bloggers www.r-bloggers.com

For the fourth course, we will discuss Wasserstein distance and Optimal Transport. Last week, we mentioned distances, dissimilarity and divergences. But before talking about Wasserstein, we should mention Cramer distance. Cramer and Wasserstein distances The definition of Cramér distance, for , is while Wasserstein will be (also for ) If we ...

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