Mitigating Numerical Stiffness in Least-Squares Formulations of Elliptic PDEs for Physics-Informed Neural Networks

Abstract

We present theoretical insights into H-1 residual loss formulations of physics-informed neural networks (PINNs) for learning solutions of partial differential equations (PDEs). Standard PINN formulations use a multi-term loss functional consisting of interior and boundary loss terms that are based on L2-residuals and discretized as mean square errors (MSE). Imbalanced magnitudes of these terms cause numerical stiffness phenomena, resulting in ill-conditioning and slow convergence. In this work, we analyze discretizations of the H-1-norm that are used in the context of elliptic PDEs with arbitrary, nonzero Dirichlet boundary conditions. We prove that these H-1 discretizations rebalance the PDE loss, improve conditioning, and mitigate stiffness effects compared with the standard MSE discretization. We validate our theoretic results through operator-level experiments with randomly sampled residuals and PINN experiments for the Poisson and stationary incompressible Navier-Stokes equations. These experiments confirm the numerical effectiveness of the proposed rebalancing for elliptic PDEs and, more broadly, for problems with elliptic behavior.

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