On the existence of Monge solutions to multi-marginal optimal transport with quadratic cost and uniform discrete marginals

Abstract

A natural and important question in multi-marginal optimal transport is whether the Monge ansatz is justified; does there exist a solution of Monge, or deterministic, form? We address this question for the quadratic cost when each marginal measure is m-empirical (that is, uniformly supported on m points). By direct computation, we provide an example showing that the ansatz can fail when the underlying dimension d is 2, number of marginals N to be matched is 3 and the size m of their supports is 3. As a consequence, the set of m-empirical measures is not barycentrically convex when N ≥ 3, d ≥ 2 and m ≥3. It is a well known consequence of the Birkhoff-von Neumann Theorem that the Monge ansatz holds for N=2, standard techniques show it holds when d=1, and we provide a simple proof here that it holds whenever m=2. Therefore, the N, d and m in our counterexample are as small as possible.