Primary Area: applications to physical sciences (physics, chemistry, biology, etc.)
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Keywords: PDE, scientific machine learning, neural operators, a posteriori error estimate, error estimate of functional type, physics-informed neural networks
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TL;DR: We introduce a new loss function that allows rigorous error estimates in physics-informed training for partial differential equations.
Abstract: We propose a new loss function for supervised and physics-informed training of neural networks and operators that incorporates a posteriori error estimate. More specifically, during the training stage, the neural network learns additional physical fields that lead to rigorous error majorants after a computationally cheap postprocessing stage. Theoretical results are based upon the theory of functional a posteriori error estimates, which allows for the systematic construction of such loss functions for a diverse class of practically relevant partial differential equations. From the numerical side, we demonstrate on a series of elliptic problems that for a variety of architectures and approaches (physics-informed neural networks, physics-informed neural operators, neural operators, and classical architectures in the regression and physics-informed settings), we can reach better or comparable accuracy and in addition to that cheaply recover high-quality upper bounds on the error after training.
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Submission Number: 8021
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