Vlasov on GPU (VOG project)
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Publication:3451687
DOI10.1051/proc/201343003zbMath1329.65330arXiv1301.5892OpenAlexW2963360838MaRDI QIDQ3451687
L. Marradi, Nicolas Crouseilles, Eric Sonnendrücker, Michel Mehrenberger, Christophe Steiner, B. Afeyan
Publication date: 17 November 2015
Published in: ESAIM: Proceedings (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1301.5892
Numerical methods for discrete and fast Fourier transforms (65T50) Numerical algorithms for specific classes of architectures (65Y10)
Related Items (9)
Exponential methods for solving hyperbolic problems with application to collisionless kinetic equations ⋮ A \(\mu\)-mode integrator for solving evolution equations in Kronecker form ⋮ Solving the guiding-center model on a regular hexagonal mesh ⋮ The semi-Lagrangian method on curvilinear grids ⋮ Non-uniform splines for semi-Lagrangian kinetic simulations of the plasma sheath ⋮ Verification of 2D × 2D and Two-Species Vlasov-Poisson Solvers, ⋮ A Low-Rank Projector-Splitting Integrator for the Vlasov--Poisson Equation ⋮ Energy conserving discontinuous Galerkin spectral element method for the Vlasov-Poisson system ⋮ A Semi-Lagrangian Vlasov Solver in Tensor Train Format
Uses Software
Cites Work
- Study of conservation and recurrence of Runge-Kutta discontinuous Galerkin schemes for Vlasov-Poisson systems
- A critical comparison of Eulerian-grid-based Vlasov solvers
- Comparison of Eulerian Vlasov solvers
- Numerical solution to the Vlasov equation: the 1D code
- Conservative semi-Lagrangian schemes for Vlasov equations
- Enhanced Convergence Estimates for Semi-Lagrangian Schemes Application to the Vlasov--Poisson Equation
- Resolution of the Vlasov-Maxwell system by PIC discontinuous Galerkin method on GPU with OpenCL
- Toeplitz and Circulant Matrices: A Review
- Conservative Semi-Lagrangian Finite Difference WENO Formulations with Applications to the Vlasov Equation
- Convergence of classes of high-order semi-Lagrangian schemes for the Vlasov--Poisson system
- Flux-corrected transport. I: SHASTA, a fluid transport algorithm that works
- Conservative numerical schemes for the Vlasov equation
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