Quadratic Wasserstein distance between Gaussian laws revisited with correlation

Abstract

In this note, we give a simple derivation of the formula obtained in Dowson and Landau (1982), Olkin and Pukelsheim (1982) and Givens and Shortt (1984) for the quadratic Wasserstein distance between two Gaussian distributions on d with respective covariance matrices μ and . This derivation relies on the existence of an orthogonal matrix O such that O*μ O and O* O share the same correlation matrix and on the simplicity of optimal couplings in the case with the same correlation matrix and therefore the same copula.