Homogenisation of one-dimensional discrete optimal transport

Abstract

This paper deals with dynamical optimal transport metrics defined by spatial discretisation of the Benamou--Benamou formula for the Kantorovich metric W2. Such metrics appear naturally in discretisations of W2-gradient flow formulations for dissipative PDE. However, it has recently been shown that these metrics do not in general converge to W2, unless strong geometric constraints are imposed on the discrete mesh. In this paper we prove that, in a 1-dimensional periodic setting, discrete transport metrics converge to a limiting transport metric with a non-trivial effective mobility. This mobility depends sensitively on the geometry of the mesh and on the non-local mobility at the discrete level. Our result quantifies to what extent discrete transport can make use of microstructure in the mesh to reduce the cost of transport.