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Solving Partial Differential Equations Using Deep Learning and Physical Constraints

Yanan Guo, Xiaoqun Cao, Bainian Liu, Mei Gao

2020Applied Sciences134 citationsDOIOpen Access PDF

Abstract

The various studies of partial differential equations (PDEs) are hot topics of mathematical research. Among them, solving PDEs is a very important and difficult task. Since many partial differential equations do not have analytical solutions, numerical methods are widely used to solve PDEs. Although numerical methods have been widely used with good performance, researchers are still searching for new methods for solving partial differential equations. In recent years, deep learning has achieved great success in many fields, such as image classification and natural language processing. Studies have shown that deep neural networks have powerful function-fitting capabilities and have great potential in the study of partial differential equations. In this paper, we introduce an improved Physics Informed Neural Network (PINN) for solving partial differential equations. PINN takes the physical information that is contained in partial differential equations as a regularization term, which improves the performance of neural networks. In this study, we use the method to study the wave equation, the KdV–Burgers equation, and the KdV equation. The experimental results show that PINN is effective in solving partial differential equations and deserves further research.

Topics & Concepts

Partial differential equationSeparable partial differential equationFirst-order partial differential equationKorteweg–de Vries equationStochastic partial differential equationComputer scienceNumerical partial differential equationsMethod of characteristicsDifferential equationPartial derivativeApplied mathematicsHyperbolic partial differential equationMathematicsMathematical analysisDifferential algebraic equationOrdinary differential equationPhysicsNonlinear systemQuantum mechanicsModel Reduction and Neural NetworksHydrological Forecasting Using AIMeteorological Phenomena and Simulations