Remarks on multi-marginal symmetric Monge-Kantorovich problems

Abstract

Symmetric Monge-Kantorovich transport problems involving a cost function given by a family of vector fields were used by Ghoussoub-Moameni to establish polar decompositions of such vector fields into m-cyclically monotone maps composed with measure preserving m-involutions (m≥ 2). In this note, we relate these symmetric transport problems to the Brenier solutions of the Monge and Monge-Kantorovich problem, as well as to the Gangbo-\'Swiech solutions of their multi-marginal counterparts, both of which involving quadratic cost functions.