English

Discovering Dynamics with Kolmogorov Arnold Networks: Linear Multistep Method-Based Algorithms and Error Estimation

Numerical Analysis 2025-01-28 v1 Numerical Analysis Dynamical Systems

Abstract

Uncovering the underlying dynamics from observed data is a critical task in various scientific fields. Recent advances have shown that combining deep learning techniques with linear multistep methods (LMMs) can be highly effective for this purpose. In this work, we propose a novel framework that integrates Kolmogorov Arnold Networks (KANs) with LMMs for the discovery and approximation of dynamical systems' vector fields. Specifically, we begin by establishing precise error bounds for two-layer B-spline KANs when approximating the governing functions of dynamical systems. Leveraging the approximation capabilities of KANs, we demonstrate that for certain families of LMMs, the total error is constrained within a specific range that accounts for both the method's step size and the network's approximation accuracy. Additionally, we analyze the difference between the numerical solution obtained from solving the ordinary differential equations with the fitted vector fields and the true solution of the dynamical system. To validate our theoretical results, we provide several numerical examples that highlight the effectiveness of our approach.

Keywords

Cite

@article{arxiv.2501.15066,
  title  = {Discovering Dynamics with Kolmogorov Arnold Networks: Linear Multistep Method-Based Algorithms and Error Estimation},
  author = {Jintao Hu and Hongjiong Tian and Qian Guo},
  journal= {arXiv preprint arXiv:2501.15066},
  year   = {2025}
}

Comments

24 pages, 8 figures, Submitted to SIAM Journal on Scientific Computing

R2 v1 2026-06-28T21:17:17.843Z