Dynamic Markov bridges motivated by models of insider trading

Abstract

Given a Markovian Brownian martingale Z, we build a process X which is a martingale in its own filtration and satisfies X1 = Z1. We call X a dynamic bridge, because its terminal value Z1 is not known in advance. We compute explicitly its semimartingale decomposition under both its own filtration X and the filtration X,Z jointly generated by X and Z. Our construction is heavily based on parabolic PDE's and filtering techniques. As an application, we explicitly solve an equilibrium model with insider trading, that can be viewed as a non-Gaussian generalization of Back and Pedersen's BP, where insider's additional information evolves over time.