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Poster

Newton Informed Neural Operator for Computing Multiple Solutions of Nonlinear Partials Differential Equations

Wenrui Hao · Xinliang Liu · Yahong Yang

East Exhibit Hall A-C #1007
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Fri 13 Dec 11 a.m. PST — 2 p.m. PST

Abstract:

Solving nonlinear partial differential equations (PDEs) with multiple solutions using neural networks has found widespread applications in various fields such as physics, biology and engineering. However, classical neural network methods for solving nonlinear PDEs, such as Physics-Informed Neural Networks (PINN), Deep Ritz methods, and DeepONet, often encounter challenges when confronted with the presence of multiple solutions inherent in the nonlinear problem. These methods may encounter ill-posedness issues.In this paper, we propose a novel approach called the Newton Informed Neural Operator, which builds upon existing neural network techniques to tackle nonlinearities. Our method combines classical Newton methods, addressing well-posed problems, and efficiently learns multiple solutions in a single learning process while requiring fewer supervised data points compared to existing neural network methods.

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