English

Higher-order multi-scale deep Ritz method for multi-scale problems of authentic composite materials

Numerical Analysis 2023-08-14 v2 Numerical Analysis

Abstract

The direct deep learning simulation for multi-scale problems remains a challenging issue. In this work, a novel higher-order multi-scale deep Ritz method (HOMS-DRM) is developed for thermal transfer equation of authentic composite materials with highly oscillatory and discontinuous coefficients. In this novel HOMS-DRM, higher-order multi-scale analysis and modeling are first employed to overcome limitations of prohibitive computation and Frequency Principle when direct deep learning simulation. Then, improved deep Ritz method are designed to high-accuracy and mesh-free simulation for macroscopic homogenized equation without multi-scale property and microscopic lower-order and higher-order cell problems with highly discontinuous coefficients. Moreover, the theoretical convergence of the proposed HOMS-DRM is rigorously demonstrated under appropriate assumptions. Finally, extensive numerical experiments are presented to show the computational accuracy of the proposed HOMS-DRM. This study offers a robust and high-accuracy multi-scale deep learning framework that enables the effective simulation and analysis of multi-scale problems of authentic composite materials.

Keywords

Cite

@article{arxiv.2307.15256,
  title  = {Higher-order multi-scale deep Ritz method for multi-scale problems of authentic composite materials},
  author = {Jiale Linghu and Hao Dong and Junzhi Cui and Yufeng Nie},
  journal= {arXiv preprint arXiv:2307.15256},
  year   = {2023}
}
R2 v1 2026-06-28T11:42:28.311Z