Martingale Wasserstein inequality for probability measures in the convex order

Abstract

It was shown by the authors that two one-dimensional probability measures in the convex order admit a martingale coupling with respect to which the integral of x-y is smaller than twice their W1-distance (Wasserstein distance with index 1). We showed that replacing x-y and W1 respectively with x-y and W does not lead to a finite multiplicative constant. We show here that a finite constant is recovered when replacing W with the product of W times the centred -th moment of the second marginal to the power -1. Then we study the generalisation of this new stability inequality to higher dimension.