Convergence rate of general entropic optimal transport costs

Abstract

We investigate the convergence rate of the optimal entropic cost v to the optimal transport cost as the noise parameter 0. We show that for a large class of cost functions c on Rd× Rd (for which optimal plans are not necessarily unique or induced by a transport map) and compactly supported and L∞ marginals, one has v-v0= d2 (1/)+ O(). Upper bounds are obtained by a block approximation strategy and an integral variant of Alexandrov's theorem. Under an infinitesimal twist condition on c, i.e. invertibility of ∇xy2 c(x,y), we get the lower bound by establishing a quadratic detachment of the duality gap in d dimensions thanks to Minty's trick.