A coupled complex boundary expanding compacts method for inverse source problems
DOI10.1515/jiip-2017-0002zbMath1411.35287OpenAlexW2892285295MaRDI QIDQ2633403
Mårten Gulliksson, Rongfang Gong, Ye Zhang, Xiao-liang Cheng
Publication date: 8 May 2019
Published in: Journal of Inverse and Ill-Posed Problems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/jiip-2017-0002
Inverse problems for PDEs (35R30) Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30) Numerical methods for ill-posed problems for integral equations (65R30) Linear operators and ill-posed problems, regularization (47A52) Overdetermined boundary value problems for PDEs and systems of PDEs (35N25)
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Cites Work
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- A modified coupled complex boundary method for an inverse chromatography problem
- Guaranteed and robust discontinuous Galerkin a posteriori error estimates for convection-diffusion-reaction problems
- Minimization of functions having Lipschitz continuous first partial derivatives
- Reconstructing gas distribution maps via an adaptive sparse regularization algorithm
- The method of extending compacts and a posteriori error estimates for nonlinear ill-posed problems
- An Inverse Source Problem for Maxwell's Equations in Magnetoencephalography
- Guaranteed and robusta posteriorierror estimates for singularly perturbed reaction–diffusion problems
- Mathematical theory and numerical analysis of bioluminescence tomography
- Theoretical Numerical Analysis
- Analysis of the Efficiency of an a Posteriori Error Estimator for Linear Triangular Finite Elements
- Numerical Optimization
- Geometry of linear ill-posed problems in variable Hilbert scales
- A dynamical regularization algorithm for solving inverse source problems of elliptic partial differential equations
- A regularizing Kohn–Vogelius formulation for the model-free adsorption isotherm estimation problem in chromatography
- Conditional stability in determining a heat source
- Estimating the Number of Sources in Magnetoencephalography Using Spiked Population Eigenvalues
- A novel coupled complex boundary method for solving inverse source problems
- Identification results for inverse source problems in unsteady Stokes flows
- Bioluminescence tomography with optimized optical parameters
- Shape Methods for the Transmission Problem with a Single Measurement
- An adjoint method in inverse problems of chromatography
- Inverse problems for partial differential equations
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