A perturbative approach to the parabolic optimal transport problem for non-MTW costs

Abstract

Fix a pair of smooth source and target densities and * of equal mass, supported on bounded domains , * ⊂ Rn. Also fix a cost function c0 ∈ C4,α( × *) satisfying the weak regularity criterion of Ma, Trudinger, and Wang, and assume and * are uniformly c0- and c0*-convex with respect to each other. We consider a parabolic version of the optimal transport problem between (,) and (*,*) when the cost function c is a sufficiently small C4 perturbation of c0, and where the size of the perturbation depends on the given data. Our main result establishes global-in-time existence of a solution u ∈ C2xC1t( × [0, ∞)) of this parabolic problem, and convergence of u(·,t) as t ∞ to a Kantorovich potential for the optimal transport map between (,) and (*,*) with cost function c. A noteworthy aspect of our work is that c does not necessarily satisfy the weak Ma-Trudinger-Wang condition.