Relaxed many-body optimal transport and related asymptotics

Abstract

Optimization problems on probability measures in Rd are considered where the cost functional involves multi-marginal optimal transport. In a model of N interacting particles, like in Density Functional Theory, the interaction cost is repulsive and described by a two-point function c(x,y) =(|x-y|) where : R+ [0,∞] is decreasing to zero at infinity. Due to a possible loss of mass at infinity, non existence may occur and relaxing the initial problem over sub-probabilities becomes necessary. In this paper we characterize the relaxed functional generalizing the results of bouchitte2020relaxed and present a duality method which allows to compute the -limit as N∞ under very general assumptions on the cost (r). We show that this limit coincides with the convex hull of the so-called direct energy. Then we study the limit optimization problem when a continuous external potential is applied. Conditions are given with explicit examples under which minimizers are probabilities or have a mass <1 . In a last part we study the case of a small range interaction N(r)= (r/) ( 1) and we show how the duality approach can be also used to determine the limit energy as 0 of a very large number N of particles.