A General Duality Theorem for the Monge--Kantorovich Transport Problem

Abstract

The duality theory of the Monge--Kantorovich transport problem is analyzed in a general setting. The spaces X, Y are assumed to be polish and equipped with Borel probability measures μ and . The transport cost function c:X× Y [0,∞] is assumed to be Borel. Our main result states that in this setting there is no duality gap, provided the optimal transport problem is formulated in a suitably relaxed way. The relaxed transport problem is defined as the limiting cost of the partial transport of masses 1- from (X,μ) to (Y, ), as >0 tends to zero. The classical duality theorems of H.\ Kellerer, where c is lower semi-continuous or uniformly bounded, quickly follow from these general results.