An optimal transport problem with backward martingale constraints motivated by insider trading

Abstract

We study a single-period optimal transport problem on R2 with a covariance-type cost function c(x,y) = (x1-y1)(x2-y2) and a backward martingale constraint. We show that a transport plan γ is optimal if and only if there is a maximal monotone set G that supports the x-marginal of γ and such that c(x,y) = z∈ Gc(z,y) for every (x,y) in the support of γ. We obtain sharp regularity conditions for the uniqueness of an optimal plan and for its representation in terms of a map. Our study is motivated by a variant of the classical Kyle model of insider trading from Rochet and Vila (1994).