Semi-discretization and full-discretization with improved accuracy for charged-particle dynamics in a strong nonuniform magnetic field
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Publication:6050035
DOI10.1051/m2an/2023058arXiv2205.08191OpenAlexW4381804484MaRDI QIDQ6050035
Publication date: 18 September 2023
Published in: ESAIM: Mathematical Modelling and Numerical Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2205.08191
charged particle dynamicshigh oscillationsimproved accuracystrong nonuniform magnetic fieldtwo-scale exponential integrators
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- Symplectic integration of magnetic systems
- Volume-preserving algorithms for charged particle dynamics
- Energy behaviour of the Boris method for charged-particle dynamics
- Explicit high-order symplectic integrators for charged particles in general electromagnetic fields
- Uniformly accurate particle-in-cell method for the long time solution of the two-dimensional Vlasov-Poisson equation with uniform strong magnetic field
- Numerical methods for the two-dimensional Vlasov-Poisson equation in the finite Larmor radius approximation regime
- Convergence analysis of asymptotic preserving schemes for strongly magnetized plasmas
- An energy-conserving and asymptotic-preserving charged-particle orbit implicit time integrator for arbitrary electromagnetic fields
- Arbitrarily high-order energy-preserving methods for simulating the gyrocenter dynamics of charged particles
- High-order energy-conserving line integral methods for charged particle dynamics
- Exponential energy-preserving methods for charged-particle dynamics in a strong and constant magnetic field
- Efficient energy-preserving methods for charged-particle dynamics
- Long-term analysis of a variational integrator for charged-particle dynamics in a strong magnetic field
- A filtered Boris algorithm for charged-particle dynamics in a strong magnetic field
- Explicit \(K\)-symplectic algorithms for charged particle dynamics
- Uniformly accurate numerical schemes for highly oscillatory Klein-Gordon and nonlinear Schrödinger equations
- Asymptotically Stable Particle-In-Cell Methods for the Vlasov--Poisson System with a Strong External Magnetic Field
- Exponential integrators
- Spectral Methods
- Hamiltonian theory of guiding-center motion
- Foundations of nonlinear gyrokinetic theory
- LONG TIME SIMULATION OF A BEAM IN A PERIODIC FOCUSING CHANNEL VIA A TWO-SCALE PIC-METHOD
- Gyrokinetic approach in particle simulation
- Gyrokinetics from variational averaging: Existence and error bounds
- On the Vlasov--Maxwell System with a Strong Magnetic Field
- Adiabatic invariants and trapping of a point charge in a strong nonuniform magnetic field
- Symmetric multistep methods for charged-particle dynamics
- Error Estimates of Some Splitting Schemes for Charged-Particle Dynamics under Strong Magnetic Field
- Uniformly Accurate Methods for Three Dimensional Vlasov Equations under Strong Magnetic Field with Varying Direction
- Computing Ground States of Bose--Einstein Condensates with Higher Order Interaction via a Regularized Density Function Formulation
- Uniformly accurate methods for Vlasov equations with non-homogeneous strong magnetic field
- Nonlinear geometric optics method-based multi-scale numerical schemes for a class of highly oscillatory transport equations
- Asymptotically Preserving Particle-in-Cell Methods for Inhomogeneous Strongly Magnetized Plasmas
- Long Time Behaviour of an Exponential Integrator for a Vlasov-Poisson System with Strong Magnetic Field
- Geometric Numerical Integration
- Explicit Exponential Runge--Kutta Methods for Semilinear Parabolic Problems
- Improved error estimates for splitting methods applied to highly-oscillatory nonlinear Schrödinger equations
- Geometric Two-Scale Integrators for Highly Oscillatory System: Uniform Accuracy and Near Conservations
- Multiscale particle-in-cell methods and comparisons for the long-time two-dimensional Vlasov-Poisson equation with strong magnetic field
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