Specific Wasserstein divergence between continuous martingales
Abstract
Defining a divergence between the laws of continuous martingales is a delicate task, owing to the fact that these laws tend to be singular to each other. An important idea, put forward by N. Gantert, is to instead consider a scaling limit of the relative entropy between such continuous martingales sampled over a finite time grid. This gives rise to the concept of specific relative entropy. In order to develop a general theory of divergences between continuous martingales, it is only natural to replace the role of the relative entropy in this construction by a different notion of discrepancy between finite dimensional probability distributions. In the present work we take a first step in this direction, taking a power of the Wasserstein distance instead of the relative entropy. We call the newly obtained scaling limit the specific -Wasserstein divergence. In our first main result we prove that the specific -Wasserstein divergence is well-defined, exhibit an explicit expression for it in terms of the quadratic variations of the martingales involved, and compare it with the specific relative entropy and adapted Wasserstein distance on a class of SDEs. Next we consider the specific -Wasserstein divergence optimization over the set of win-martingales. In our second main result we characterize the solution of this optimization problem for all and, somewhat surprisingly, we single out the case as the one with the best probabilistic properties. For instance, the optimal martingale in this case is very explicit and can be connected to the solution of a variant of the Schr\"odinger problem.
Cite
@article{arxiv.2404.19672,
title = {Specific Wasserstein divergence between continuous martingales},
author = {Julio Backhoff-Veraguas and Xin Zhang},
journal= {arXiv preprint arXiv:2404.19672},
year = {2025}
}