English

Regression-based projection for learning Mori-Zwanzig operators

Dynamical Systems 2023-04-24 v3 Chaotic Dynamics Computational Physics Machine Learning

Abstract

We propose to adopt statistical regression as the projection operator to enable data-driven learning of the operators in the Mori--Zwanzig formalism. We present a principled method to extract the Markov and memory operators for any regression models. We show that the choice of linear regression results in a recently proposed data-driven learning algorithm based on Mori's projection operator, which is a higher-order approximate Koopman learning method. We show that more expressive nonlinear regression models naturally fill in the gap between the highly idealized and computationally efficient Mori's projection operator and the most optimal yet computationally infeasible Zwanzig's projection operator. We performed numerical experiments and extracted the operators for an array of regression-based projections, including linear, polynomial, spline, and neural-network-based regressions, showing a progressive improvement as the complexity of the regression model increased. Our proposition provides a general framework to extract memory-dependent corrections and can be readily applied to an array of data-driven learning methods for stationary dynamical systems in the literature.

Keywords

Cite

@article{arxiv.2205.05135,
  title  = {Regression-based projection for learning Mori-Zwanzig operators},
  author = {Yen Ting Lin and Yifeng Tian and Danny Perez and Daniel Livescu},
  journal= {arXiv preprint arXiv:2205.05135},
  year   = {2023}
}

Comments

41 pages, 12 figures; major revision of V2

R2 v1 2026-06-24T11:13:35.830Z