Structure-preserving Method for Reconstructing Unknown Hamiltonian Systems from Trajectory Data
Numerical Analysis
2021-07-13 v2 Machine Learning
Numerical Analysis
Dynamical Systems
Computational Physics
Machine Learning
Abstract
We present a numerical approach for approximating unknown Hamiltonian systems using observation data. A distinct feature of the proposed method is that it is structure-preserving, in the sense that it enforces conservation of the reconstructed Hamiltonian. This is achieved by directly approximating the underlying unknown Hamiltonian, rather than the right-hand-side of the governing equations. We present the technical details of the proposed algorithm and its error estimate in a special case, along with a practical de-noising procedure to cope with noisy data. A set of numerical examples are then presented to demonstrate the structure-preserving property and effectiveness of the algorithm.
Cite
@article{arxiv.1905.10396,
title = {Structure-preserving Method for Reconstructing Unknown Hamiltonian Systems from Trajectory Data},
author = {Kailiang Wu and Tong Qin and Dongbin Xiu},
journal= {arXiv preprint arXiv:1905.10396},
year = {2021}
}
Comments
27 pages, 19 figures