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arxiv: 2306.17648 · v2 · pith:DLS42QIFnew · submitted 2023-06-30 · 🧮 math.NA · cs.LG· cs.NA· math.OC

Enhancing training of physics-informed neural networks using domain-decomposition based preconditioning strategies

classification 🧮 math.NA cs.LGcs.NAmath.OC
keywords additivedomain-decompositionl-bfgsmultiplicativenetworksneuralnonlinearoptimizer
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We propose to enhance the training of physics-informed neural networks (PINNs). To this aim, we introduce nonlinear additive and multiplicative preconditioning strategies for the widely used L-BFGS optimizer. The nonlinear preconditioners are constructed by utilizing the Schwarz domain-decomposition framework, where the parameters of the network are decomposed in a layer-wise manner. Through a series of numerical experiments, we demonstrate that both, additive and multiplicative preconditioners significantly improve the convergence of the standard L-BFGS optimizer, while providing more accurate solutions of the underlying partial differential equations. Moreover, the additive preconditioner is inherently parallel, thus giving rise to a novel approach to model parallelism.

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