English

A Shallow Ritz Method for Elliptic Problems with Singular Sources

Numerical Analysis 2023-06-13 v3 Machine Learning Numerical Analysis

Abstract

In this paper, a shallow Ritz-type neural network for solving elliptic equations with delta function singular sources on an interface is developed. There are three novel features in the present work; namely, (i) the delta function singularity is naturally removed, (ii) level set function is introduced as a feature input, (iii) it is completely shallow, comprising only one hidden layer. We first introduce the energy functional of the problem and then transform the contribution of singular sources to a regular surface integral along the interface. In such a way, the delta function singularity can be naturally removed without introducing a discrete one that is commonly used in traditional regularization methods, such as the well-known immersed boundary method. The original problem is then reformulated as a minimization problem. We propose a shallow Ritz-type neural network with one hidden layer to approximate the global minimizer of the energy functional. As a result, the network is trained by minimizing the loss function that is a discrete version of the energy. In addition, we include the level set function of the interface as a feature input of the network and find that it significantly improves the training efficiency and accuracy. We perform a series of numerical tests to show the accuracy of the present method and its capability for problems in irregular domains and higher dimensions.

Keywords

Cite

@article{arxiv.2107.12013,
  title  = {A Shallow Ritz Method for Elliptic Problems with Singular Sources},
  author = {Ming-Chih Lai and Che-Chia Chang and Wei-Syuan Lin and Wei-Fan Hu and Te-Sheng Lin},
  journal= {arXiv preprint arXiv:2107.12013},
  year   = {2023}
}
R2 v1 2026-06-24T04:31:00.272Z