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Numerical solution of inverse problems by weak adversarial networks

Gang Bao, Xiaojing Ye, Yaohua Zang, Haomin Zhou

2020Inverse Problems60 citationsDOIOpen Access PDF

Abstract

Abstract In this paper, a weak adversarial network approach is developed to numerically solve a class of inverse problems, including electrical impedance tomography and dynamic electrical impedance tomography problems. The weak formulation of the partial differential equation for the given inverse problem is leveraged, where the solution and the test function are parameterized as deep neural networks. Then, the weak formulation and the boundary conditions induce a minimax problem of a saddle function of the network parameters. As the parameters are alternatively updated, the network gradually approximates the solution of the inverse problem. Theoretical justifications are provided on the convergence of the proposed algorithm. The proposed method is completely mesh-free without any spatial discretization, and is particularly suitable for problems with high dimensionality and low regularity on solutions. Numerical experiments on a variety of test inverse problems demonstrate the promising accuracy and efficiency of this approach.

Topics & Concepts

MathematicsInverse problemElectrical impedance tomographyMinimaxConvergence (economics)InverseParameterized complexityApplied mathematicsBoundary (topology)Saddle pointFunction (biology)Mathematical optimizationCurse of dimensionalityPartial differential equationArtificial neural networkBoundary value problemMathematical analysisSaddleOptimization problemNumerical analysisTrajectoryWeak solutionElectrical impedanceBessel functionInverse scattering problemWeak convergencePercolation (cognitive psychology)Laplace transformNumerical methods in inverse problemsModel Reduction and Neural NetworksMicrowave Imaging and Scattering Analysis
Numerical solution of inverse problems by weak adversarial networks | Litcius