Hybrid Multiscale Methods II. Kinetic Equations
From MaRDI portal
Publication:3545643
DOI10.1137/070680916zbMath1185.65198OpenAlexW1992756672MaRDI QIDQ3545643
Giacomo Dimarco, Lorenzo Pareschi
Publication date: 11 December 2008
Published in: Multiscale Modeling & Simulation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/070680916
Euler equationBoltzmann equationMonte Carlo methodsmultiscale methodskinetic schemesfluid-dynamic limit
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (33)
A velocity space hybridization-based Boltzmann equation solver ⋮ High order central WENO-implicit-explicit Runge Kutta schemes for the BGK model on general polygonal meshes ⋮ Regularity of velocity averages for transport equations on random discrete velocity grids ⋮ Solving the linear transport equation by a deep neural network approach ⋮ Deterministic numerical solutions of the Boltzmann equation using the fast spectral method ⋮ A Kinetic-Diffusion Asymptotic-Preserving Monte Carlo Algorithm for the Boltzmann-BGK Model in the Diffusive Scaling ⋮ Towards an ultra efficient kinetic scheme. I: Basics on the BGK equation ⋮ Towards an ultra efficient kinetic scheme. II: The high order case ⋮ Locally refined discrete velocity grids for stationary rarefied flow simulations ⋮ On efficient simulations of multiscale kinetic transport ⋮ Hybrid kinetic/fluid numerical method for the Vlasov-BGK equation in the diffusive scaling ⋮ A velocity-space adaptive unified gas kinetic scheme for continuum and rarefied flows ⋮ Microscopically implicit-macroscopically explicit schemes for the BGK equation ⋮ Accelerated Simulation of Boltzmann-BGK Equations near the Diffusive Limit with Asymptotic-Preserving Multilevel Monte Carlo ⋮ Efficient numerical methods for multiscale crowd dynamics with emotional contagion ⋮ Asymptotic-Preserving Monte Carlo Methods for Transport Equations in the Diffusive Limit ⋮ A Multilevel Monte Carlo Asymptotic-Preserving Particle Method for Kinetic Equations in the Diffusion Limit ⋮ A hybrid method for hydrodynamic-kinetic flow. II: Coupling of hydrodynamic and kinetic models ⋮ Asymptotically complexity diminishing schemes (ACDS) for kinetic equations in the diffusive scaling ⋮ A comparative study of the DSBGK and DVM methods for low-speed rarefied gas flows ⋮ A hybrid moment method for multi-scale kinetic equations based on maximum entropy principle ⋮ A moving interface method for dynamic kinetic-fluid coupling ⋮ Asymptotic preserving and time diminishing schemes for rarefied gas dynamic ⋮ SIMULATING INDIVIDUAL-BASED MODELS OF BACTERIAL CHEMOTAXIS WITH ASYMPTOTIC VARIANCE REDUCTION ⋮ Variance-Reduced Simulation of Multiscale Tumor Growth Modeling ⋮ A hybrid method for hydrodynamic-kinetic flow. I: A particle-grid method for reducing stochastic noise in kinetic regimes ⋮ Numerical methods for kinetic equations ⋮ An asymptotic preserving automatic domain decomposition method for the Vlasov-Poisson-BGK system with applications to plasmas ⋮ A multilevel Monte Carlo method for asymptotic-preserving particle schemes in the diffusive limit ⋮ A discontinuous Galerkin fast spectral method for the full Boltzmann equation with general collision kernels ⋮ High order modal discontinuous Galerkin implicit-explicit Runge Kutta and linear multistep schemes for the Boltzmann model on general polygonal meshes ⋮ A hybrid fluid-kinetic model for hydrogenic atoms in the plasma edge of tokamaks based on a micro-macro decomposition of the kinetic equation ⋮ A Hierarchy of Hybrid Numerical Methods for Multiscale Kinetic Equations
This page was built for publication: Hybrid Multiscale Methods II. Kinetic Equations
