A remark on the optimal transport between two probability measures sharing the same copula

Abstract

We are interested in the Wasserstein distance between two probability measures on n sharing the same copula C. The image of the probability measure dC by the vectors of pseudo-inverses of marginal distributions is a natural generalization of the coupling known to be optimal in dimension n=1. It turns out that for cost functions c(x,y) equal to the p-th power of the Lq norm of x-y in n, this coupling is optimal only when p=q i.e. when c(x,y) may be decomposed as the sum of coordinate-wise costs.