The Schr\"odinger Bridge Problem for Jump Diffusions with Regime Switching

Abstract

The Schr\"odinger bridge problem (SBP) aims at finding the measure P on a certain path space which possesses the desired state-space distributions 0 at time 0 and T at time T while minimizing the KL divergence from a reference path measure R. This work focuses on the SBP in the case when R is the path measure of a jump diffusion with regime switching, which is a Markov process that combines the dynamics of a jump diffusion with interspersed discrete events representing changing environmental states. To the best of our knowledge, the SBP in such a setting has not been previously studied. In this paper, we conduct a comprehensive analysis of the dynamics of the SBP solution P in the regime-switching jump-diffusion setting. In particular, we show that P is again a path measure of a regime-switching jump diffusion; under proper assumptions, we establish various properties of P from both a stochastic calculus perspective and an analytic viewpoint. In addition, as an demonstration of the general theory developed in this work, we examine a concrete unbalanced SBP (uSBP) from the angle of a regime-switching SBP, where we also obtain novel results in the realm of uSBP.

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