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Error Estimates for the Deep Ritz Method with Boundary Penalty

Numerical Analysis 2022-09-07 v4 Machine Learning Numerical Analysis

Abstract

We estimate the error of the Deep Ritz Method for linear elliptic equations. For Dirichlet boundary conditions, we estimate the error when the boundary values are imposed through the boundary penalty method. Our results apply to arbitrary sets of ansatz functions and estimate the error in dependence of the optimization accuracy, the approximation capabilities of the ansatz class and -- in the case of Dirichlet boundary values -- the penalization strength λ\lambda. To the best of our knowledge, our results are presently the only ones in the literature that treat the case of Dirichlet boundary conditions in full generality, i.e., without a lower order term that leads to coercivity on all of H1(Ω)H^1(\Omega). Further, we discuss the implications of our results for ansatz classes which are given through ReLU networks and the relation to existing estimates for finite element functions. For high dimensional problems our results show that the favourable approximation capabilities of neural networks for smooth functions are inherited by the Deep Ritz Method.

Keywords

Cite

@article{arxiv.2103.01007,
  title  = {Error Estimates for the Deep Ritz Method with Boundary Penalty},
  author = {Johannes Müller and Marius Zeinhofer},
  journal= {arXiv preprint arXiv:2103.01007},
  year   = {2022}
}

Comments

3rd Annual Conference on Mathematical and Scientific Machine Learning (MSML22), 20 pages, no figures

R2 v1 2026-06-23T23:37:04.405Z