Wasserstein distance in terms of the comonotonicity Copula
Abstract
The aim of this article is to write the p-Wasserstein metric Wp with the p-norm, p∈ [1,∞), on d in terms of copula. In particular for the case of one-dimensional distributions, we get that the copula employed to get the optimal coupling of the Wasserstein distances is the comotonicity copula. We obtain the equivalent result also for d-dimensional distributions under the sufficient and necessary condition that these have the same dependence structure of their one-dimensional marginals, i.e that the d-dimensional distributions share the same copula. Assuming p≠ q, p,q ∈ [1,∞) and that the probability measures μ and are sharing the same copula, we also analyze the Wasserstein distance Wp,q discussed in Alfonsi and get an upper and lower bounds of Wp,q in terms of Wp, written in terms of comonotonicity copula. We show that as a consequence the lower and upper bound of Wp,q can be written in terms of generalized inverse functions.
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