A Finite Difference Method with Optimized Dispersion Correction for the Helmholtz Equation
DOI10.1007/978-3-319-93873-8_18zbMath1443.65280OpenAlexW2906857173MaRDI QIDQ5114538
Martin J. Gander, Xueshuang Xiang, Pierre-Henri Cocquet
Publication date: 24 June 2020
Published in: Lecture Notes in Computational Science and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-319-93873-8_18
Finite difference methods applied to problems in optics and electromagnetic theory (78M20) Laplace operator, Helmholtz equation (reduced wave equation), Poisson equation (35J05) Finite difference methods for boundary value problems involving PDEs (65N06)
Related Items (8)
Cites Work
- A dispersion minimizing compact finite difference scheme for the 2D Helmholtz equation
- Finite element solution of the Helmholtz equation with high wave number. I: The \(h\)-version of the FEM
- Compact 2D and 3D sixth order schemes for the Helmholtz equation with variable wave number
- A generalized finite element method for solving the Helmholtz equation in two dimensions with minimal pollution
- A dispersion minimizing scheme for the 3-D Helmholtz equation based on ray theory
- A dispersion minimizing finite difference scheme for the Helmholtz equation based on point-weighting
- A dispersion minimizing finite difference scheme and preconditioned solver for the 3D Helmholtz equation
- Is the Pollution Effect of the FEM Avoidable for the Helmholtz Equation Considering High Wave Numbers?
- Dispersion analysis and error estimation of Galerkin finite element methods for the Helmholtz equation
- A Multigrid Method for the Helmholtz Equation with Optimized Coarse Grid Corrections
- Multigrid methods for Helmholtz problems: A convergent scheme in 1D using standard components
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