Backward martingale transport maps and equilibrium with insider

Abstract

We consider an optimal transport problem with backward martingale constraint. The objective function is given by the scalar product of a pseudo-Euclidean space S. We show that the supremums over maps and plans coincide, provided that the law of the input random variable Y is atomless. An optimal map X exists if does not charge any c-c surface (the graph of a difference of convex functions) with strictly positive normal vectors in the sense of the S-space. The optimal map X is unique if does not charge c-c surfaces with nonnegative normal vectors in the S-space. As an application, we derive sharp conditions for the existence and uniqueness of equilibrium in a multi-asset version of the model with insider from Rochet and Vila [10]. In the linear-Gaussian case, we characterize Kyle's lambda, the sensitivity of price to trading volume, as the unique positive solution of a non-symmetric algebraic Riccati equation.