Annealed quantitative estimates for the quadratic 2D-discrete random matching problem
Abstract
We study a random matching problem on closed compact -dimensional Riemannian manifolds (with respect to the squared Riemannian distance), with samples of random points whose common law is absolutely continuous with respect to the volume measure with strictly positive and bounded density. We show that given two sequences of numbers and of points, asymptotically equivalent as goes to infinity, the optimal transport plan between the two empirical measures and is quantitatively well-approximated by where solves a linear elliptic PDE obtained by a regularized first-order linearization of the Monge-Amp\`ere equation. This is obtained in the case of samples of correlated random points for which a stretched exponential decay of the -mixing coefficient holds and for a class of discrete-time Markov chains having a unique absolutely continuous invariant measure with respect to the volume measure.
Cite
@article{arxiv.2303.00353,
title = {Annealed quantitative estimates for the quadratic 2D-discrete random matching problem},
author = {Nicolas Clozeau and Francesco Mattesini},
journal= {arXiv preprint arXiv:2303.00353},
year = {2026}
}
Comments
Typos correction. Comments very welcome!