Litcius/Paper detail

Physics-Informed Neural Networks for Solving 2-D Magnetostatic Fields

Zhi Gong, Yang Chu, Shiyou Yang

2023IEEE Transactions on Magnetics31 citationsDOI

Abstract

Physics-informed neural network (PINN) has shown great potential in inverse and parametric designing problems in electrical engineering. Moreover, most existing works on PINN are dedicated to computational fluids, and very little attention has been paid to static and low-frequency electromagnetic near fields with multiple media in electrical engineering applications. In this work, a PINN for solving 2-D magnetostatic fields in electromagnetic devices and systems is proposed. The magnetic field intensity and the magnetic vector potential are solved by training a neural network (NN) which encodes partial differential equations (PDEs) and boundary conditions (BCs) as residuals. The computation of the spatial derivatives of media constitutive parameters, which negatively impacts the training of PINN, is eliminated. A mesh-assisted non-uniform sampling method for the selection of collocation points is proposed to further improve the performance of PINN. The proposed PINN is verified by comparing its results with those of the finite-element method (FEM) in two 2-D magnetostatic case studies. It is expected that this work will promote further applications of PINN in the modeling, numerical analysis, and parametric design of electromagnetic devices and systems.

Topics & Concepts

Artificial neural networkFinite element methodParametric statisticsCollocation (remote sensing)Computer scienceInverse problemComputationBoundary value problemBoundary (topology)Electromagnetic fieldApplied mathematicsPhysicsMathematical analysisAlgorithmMathematicsArtificial intelligenceMachine learningStatisticsQuantum mechanicsThermodynamicsModel Reduction and Neural NetworksMagnetic Properties and ApplicationsNumerical methods in engineering