Sample complexity of Schr\"odinger potential estimation

Abstract

We address the problem of Schr\"odinger potential estimation, which plays a crucial role in modern generative modelling approaches based on Schr\"odinger bridges and stochastic optimal control for SDEs. Given a simple prior diffusion process, these methods search for a path between two given distributions 0 and T* requiring minimal efforts. The optimal drift in this case can be expressed through a Schr\"odinger potential. In the present paper, we study generalization ability of an empirical Kullback-Leibler (KL) risk minimizer over a class of admissible log-potentials aimed at fitting the marginal distribution at time T. Under reasonable assumptions on the target distribution T* and the prior process, we derive a non-asymptotic high-probability upper bound on the KL-divergence between T* and the terminal density corresponding to the estimated log-potential. In particular, we show that the excess KL-risk may decrease as fast as O(2 n / n) when the sample size n tends to infinity even if both 0 and T* have unbounded supports.