On the Representation and Learning of Monotone Triangular Transport Maps

Author(s)

Baptista, Ricardo; Marzouk, Youssef; Zahm, Olivier

Abstract

Transportation of measure provides a versatile approach for modeling complex probability distributions, with applications in density estimation, Bayesian inference, generative modeling, and beyond. Monotone triangular transport maps—approximations of the Knothe–Rosenblatt (KR) rearrangement—are a canonical choice for these tasks. Yet the representation and parameterization of such maps have a significant impact on their generality and expressiveness, and on properties of the optimization problem that arises in learning a map from data (e.g., via maximum likelihood estimation). We present a general framework for representing monotone triangular maps via invertible transformations of smooth functions. We establish conditions on the transformation such that the associated infinite-dimensional minimization problem has no spurious local minima, i.e., all local minima are global minima; and we show for target distributions satisfying certain tail conditions that the unique global minimizer corresponds to the KR map. Given a sample from the target, we then propose an adaptive algorithm that estimates a sparse semi-parametric approximation of the underlying KR map. We demonstrate how this framework can be applied to joint and conditional density estimation, likelihood-free inference, and structure learning of directed graphical models, with stable generalization performance across a range of sample sizes.

Date issued

2023-11-16

URI

https://hdl.handle.net/1721.1/157755

Department

Massachusetts Institute of Technology. Department of Aeronautics and Astronautics

Journal

Foundations of Computational Mathematics

Publisher

Springer US

Citation

Baptista, R., Marzouk, Y. & Zahm, O. On the Representation and Learning of Monotone Triangular Transport Maps. Found Comput Math 24, 2063–2108 (2024).

Version: Author's final manuscript