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arxiv: 2403.12764 · v1 · pith:2K7J7GX3 · submitted 2024-03-19 · cs.LG · cs.NA· math.NA

Neural Parameter Regression for Explicit Representations of PDE Solution Operators

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classification cs.LG cs.NAmath.NA
keywords neuralparametersolutionconditionsefficiencyframeworkinitiallearning
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We introduce Neural Parameter Regression (NPR), a novel framework specifically developed for learning solution operators in Partial Differential Equations (PDEs). Tailored for operator learning, this approach surpasses traditional DeepONets (Lu et al., 2021) by employing Physics-Informed Neural Network (PINN, Raissi et al., 2019) techniques to regress Neural Network (NN) parameters. By parametrizing each solution based on specific initial conditions, it effectively approximates a mapping between function spaces. Our method enhances parameter efficiency by incorporating low-rank matrices, thereby boosting computational efficiency and scalability. The framework shows remarkable adaptability to new initial and boundary conditions, allowing for rapid fine-tuning and inference, even in cases of out-of-distribution examples.

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