Polynomial upwind schemes for hyperbolic systems
From MaRDI portal
Publication:4260660
DOI10.1016/S0764-4442(99)80194-3zbMath0933.65101WikidataQ127018652 ScholiaQ127018652MaRDI QIDQ4260660
Pierre-François Peyrard, Pierre Degond, Giovanni Russo, Philippe Villedieu
Publication date: 1999
Published in: Comptes Rendus de l'Académie des Sciences - Series I - Mathematics (Search for Journal in Brave)
Hyperbolic conservation laws (35L65) Finite difference methods for initial value and initial-boundary value problems involving PDEs (65M06)
Related Items (37)
A path-conservative Osher-type scheme for axially symmetric compressible flows in flexible visco-elastic tubes ⋮ A hybrid kinetic/fluid model for solving the gas dynamics Boltzmann-BGK equation ⋮ Multidimensional approximate Riemann solvers for hyperbolic nonconservative systems. Applications to shallow water systems ⋮ A new efficient formulation of the HLLEM Riemann solver for general conservative and non-conservative hyperbolic systems ⋮ A volume of fluid method for a two-dimensional plasma expansion problem ⋮ A second order PVM flux limiter method. Application to magnetohydrodynamics and shallow stratified flows ⋮ A one-dimensional model of plasma expansion ⋮ An asymptotic preserving scheme for the two-fluid Euler-Poisson model in the quasineutral limit ⋮ Hyperbolicity and nonconservativity of a hydrodynamic model of swarming rigid bodies ⋮ Hybrid entropy stable HLL-type Riemann solvers for hyperbolic conservation laws ⋮ A Hybrid Riemann Solver for Large Hyperbolic Systems of Conservation Laws ⋮ Numerical approximation of the Euler-Maxwell model in the quasineutral limit ⋮ Phase appearance or disappearance in two-phase flows ⋮ On a class of two-dimensional incomplete Riemann solvers ⋮ Trois formulations d'un modèle de plasma quasi-neutre avec courant non nul. (Three formulations of a quasi-neutral plasma model with non-vanishing current). ⋮ A PLASMA EXPANSION MODEL BASED ON THE FULL EULER–POISSON SYSTEM ⋮ A class of incomplete Riemann solvers based on uniform rational approximations to the absolute value function ⋮ Approximate Osher-Solomon schemes for hyperbolic systems ⋮ Jacobian-free approximate solvers for hyperbolic systems: application to relativistic magnetohydrodynamics ⋮ Implicit-Explicit Methods for the Efficient Simulation of the Settling of Dispersions of Droplets and Colloidal Particles ⋮ Numerical schemes for a system of one-dimensional hyperbolic equations ⋮ Efficient multilayer shallow-water simulation system based on gpus ⋮ Polynomial viscosity methods for multispecies kinematic flow models ⋮ A model for plasma expansion in vacuum ⋮ A hybrid kinetic--fluid model for solving the Vlasov--BGK equation ⋮ Quasi-neutral fluid models for current-carrying plasmas ⋮ Finite volume approximations of the Euler system with variable congestion ⋮ Intrusive Galerkin methods with upwinding for uncertain nonlinear hyperbolic systems ⋮ Self-organized hydrodynamics with density-dependent velocity ⋮ A central Rankine-Hugoniot solver for hyperbolic conservation laws ⋮ An asymptotic preserving scheme for the Euler equations in a strong magnetic field ⋮ Semi-Conservative Finite Volume Schemes for Conservation Laws ⋮ Low-dissipation centred schemes for hyperbolic equations in conservative and non-conservative form ⋮ Incomplete Riemann Solvers Based on Functional Approximations to the Absolute Value Function ⋮ Hyperbolic divergence cleaning for the MHD equations ⋮ Relation between PVM schemes and simple Riemann solvers ⋮ New Types of Jacobian-Free Approximate Riemann Solvers for Hyperbolic Systems
This page was built for publication: Polynomial upwind schemes for hyperbolic systems
