An asymptotic preserving Maxwell solver resulting in the Darwin limit of electrodynamics
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Publication:2014318
DOI10.1007/s10915-016-0328-0zbMath1372.78023arXiv1606.08867OpenAlexW2964288184MaRDI QIDQ2014318
Andrew J. Christlieb, Wei Guo, Yingda Cheng, Benjamin W. Ong
Publication date: 11 August 2017
Published in: Journal of Scientific Computing (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1606.08867
Maxwell's equationsimplicit methodmethod of lines transposeDarwin approximationfast summation methodasymptotic preserving method
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Cites Work
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- A treecode-accelerated boundary integral Poisson-Boltzmann solver for electrostatics of solvated biomolecules
- Microscopically implicit-macroscopically explicit schemes for the BGK equation
- Numerical approximation of the Euler-Maxwell model in the quasineutral limit
- High order asymptotic preserving nodal discontinuous Galerkin IMEX schemes for the BGK equation
- A periodic FMM for Maxwell's equations in 3D and its applications to problems related to photonic crystals
- A Cartesian treecode for screened Coulomb interactions
- An adaptive Rothe method for the wave equation
- Numerical approximation of the Maxwell equations in inhomogeneous media by a \(P^ 1\) conforming finite element method
- A finite element formulation of the Darwin PIC model for use on unstructured grids
- Approximate models for the Maxwell equations
- A hierarchy of approximate models for the Maxwell equations
- The fast multipole method: Numerical implementation
- Uniformly stable numerical schemes for the Boltzmann equation preserving the compressible Navier-Stokes asymptotics
- Continuous Galerkin methods for solving the time-dependent Maxwell equations in 3D geometries
- Darwin--Vlasov simulations of magnetised plasmas
- A class of asymptotic-preserving schemes for kinetic equations and related problems with stiff sources
- Implicit-explicit schemes for BGK kinetic equations
- Finite element convergence for the Darwin model to Maxwell's equations
- Method of lines transpose: An implicit solution to the wave equation
- Numerical Approximation of Self-Consistent Vlasov Models for Low-Frequency Electromagnetic Phenomena
- Analysis of an Asymptotic Preserving Scheme for the Euler–Poisson System in the Quasineutral Limit
- A General Algorithm for Multidimensional Cauchy Principal Value Integrals in the Boundary Element Method
- An analysis of the Darwin model of approximation to Maxwell’s equations
- Absorbing Boundary Conditions for the Numerical Simulation of Waves
- The Numerical Solution of Integral Equations of the Second Kind
- A Generalized Fast Multipole Method for Nonoscillatory Kernels
- Higher Order A-Stable Schemes for the Wave Equation Using a Successive Convolution Approach
- Boundary Element Methods
- A fast algorithm for particle simulations
- The selfconsistent Pauli equation
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