Litcius/Paper detail

The <scp>Data‐Driven</scp> Schrödinger Bridge

Michele Pavon, Giulio Trigila, Esteban G. Tabak

2021Communications on Pure and Applied Mathematics29 citationsDOIOpen Access PDF

Abstract

Abstract Erwin Schrödinger posed—and to a large extent solved—in 1931/32 the problem of finding the most likely random evolution between two continuous probability distributions. This article considers this problem in the case when only samples of the two distributions are available. A novel iterative procedure is proposed, inspired by Fortet‐IPF‐Sinkhorn type algorithms. Since only samples of the marginals are available, the new approach features constrained maximum likelihood estimation in place of the nonlinear boundary couplings, and importance sampling to propagate the functions ϕ and solving the Schrödinger system. This method mitigates the curse of dimensionality, compared to the introduction of grids, which in high dimensions lead to numerically unfeasible methods. The methodology is illustrated in two applications: entropic interpolation of two‐dimensional Gaussian mixtures, and the estimation of integrals through a variation of importance sampling. © 2020 Wiley Periodicals LLC.

Topics & Concepts

Curse of dimensionalityMathematicsInterpolation (computer graphics)Nonlinear systemApplied mathematicsMathematical optimizationSampling (signal processing)GaussianBoundary (topology)Importance samplingComputer scienceMathematical analysisArtificial intelligenceStatisticsMonte Carlo methodFilter (signal processing)Motion (physics)Quantum mechanicsPhysicsComputer visionBayesian Methods and Mixture ModelsStatistical Methods and InferenceStatistical Mechanics and Entropy
The <scp>Data‐Driven</scp> Schrödinger Bridge | Litcius