论文信息 - Methods for hyperbolic systems with stiff relaxation

Methods for hyperbolic systems with stiff relaxation

Three methods are analysed for solving a linear hyperbolic system that contains stiff relaxation. We show that the semi-discrete discontinuous Galerkin method, with a linear basis, is accurate when the relaxation time is unresolved (asymptotic preserving-AP). The two other methods are shown to be non-AP. To discriminate between AP and non-AP methods, we argue that in the limit of small relaxation time, one should fix the dimensionless parameters that characterize the near-equilibrium limit

Jim E. Morel | Robert B. Lowrie | J. Morel | R. Lowrie

[1] Lorenzo Pareschi,et al. Numerical Schemes for Hyperbolic Systems of Conservation Laws with Stiff Diffusive Relaxation , 2000, SIAM J. Numer. Anal..

[2] Shi Jin,et al. Efficient Asymptotic-Preserving (AP) Schemes For Some Multiscale Kinetic Equations , 1999, SIAM J. Sci. Comput..

[3] E. Larsen,et al. Asymptotic solutions of numerical transport problems in optically thick, diffusive regimes II , 1989 .

[4] B. V. Leer,et al. Towards the ultimate conservative difference scheme. IV. A new approach to numerical convection , 1977 .

[5] Jim E. Morel,et al. Issues with high-resolution Godunov methods for radiation hydrodynamics , 2001 .

[6] Giovanni Russo,et al. Uniformly Accurate Schemes for Hyperbolic Systems with Relaxation , 1997 .

[7] Jeffrey Hittinger. Foundations for the generalization of the Godunov method to hyperbolic systems with stiff relaxation source terms , 2000 .

[8] C. D. Levermore,et al. Numerical Schemes for Hyperbolic Conservation Laws with Stiff Relaxation Terms , 1996 .

[9] Jim E. Morel,et al. Discontinuous Galerkin for Hyperbolic Systems with Stiff Relaxation , 2000 .

[10] Vittorio Romano,et al. Central Schemes for Balance Laws of Relaxation Type , 2000, SIAM J. Numer. Anal..

[11] Jim E. Morel,et al. Discontinuous Galerkin for Stiff Hyperbolic Systems , 1999 .