Sparse Approximation of Triangular Transports, Part II: The Infinite-Dimensional Case

Author(s)

Zech, Jakob; Marzouk, Youssef

Abstract

Abstract For two probability measures $${\rho }$$ ρ and $${\pi }$$ π on $$[-1,1]^{{\mathbb {N}}}$$ [ - 1 , 1 ] N we investigate the approximation of the triangular Knothe–Rosenblatt transport $$T:[-1,1]^{{\mathbb {N}}}\rightarrow [-1,1]^{{\mathbb {N}}}$$ T : [ - 1 , 1 ] N → [ - 1 , 1 ] N that pushes forward $${\rho }$$ ρ to $${\pi }$$ π . Under suitable assumptions, we show that T can be approximated by rational functions without suffering from the curse of dimension. Our results are applicable to posterior measures arising in certain inference problems where the unknown belongs to an (infinite dimensional) Banach space. In particular, we show that it is possible to efficiently approximately sample from certain high-dimensional measures by transforming a lower-dimensional latent variable.

Date issued

2022-03-17

URI

https://hdl.handle.net/1721.1/141312

Department

Massachusetts Institute of Technology. Department of Aeronautics and Astronautics
Massachusetts Institute of Technology. Center for Computational Science and Engineering

Publisher

Springer US

Citation

Zech, Jakob and Marzouk, Youssef. 2022. "Sparse Approximation of Triangular Transports, Part II: The Infinite-Dimensional Case."

Version: Final published version