Paper Info
Title
Approximate Osher–Solomon schemes for hyperbolic systems
Abstract
This paper is concerned with a new kind of Riemann solvers for hyperbolic systems, which can be applied both in the conservative and nonconservative cases. In particular, the proposed schemes constitute a simple version of the classical Osher–Solomon Riemann solver, and extend in some sense the schemes proposed in Dumbser and Toro (2011) [19,20]. The viscosity matrix of the numerical flux is constructed as a linear combination of functional evaluations of the Jacobian of the flux at several quadrature points. Some families of functions have been proposed to this end: Chebyshev polynomials and rational-type functions. Our schemes have been tested with different initial value Riemann problems for ideal gas dynamics, magnetohydrodynamics and multilayer shallow water equations. The numerical tests indicate that the proposed schemes are robust, stable and accurate with a satisfactory time step restriction, and provide an efficient alternative for approximating time-dependent solutions in which the spectral decomposition is computationally expensive.
Year
DOI
Venue
2016
10.1016/j.amc.2015.06.104
Applied Mathematics and Computation
Keywords
Field
DocType
Hyperbolic systems,Incomplete Riemann solvers,Osher–Solomon method,Euler equations,Ideal magnetohydrodynamics,Multilayer shallow water equations
Chebyshev polynomials,Mathematical optimization,Jacobian matrix and determinant,Mathematical analysis,Riemann hypothesis,Numerical analysis,Euler equations,Riemann problem,Shallow water equations,Mathematics,Riemann solver
Journal
Volume
ISSN
Citations 
272
0096-3003
9
PageRank 
References 
Authors
0.54
14
3
Name
Order
Citations
PageRank
Manuel J. Castro120221.36
José M. Gallardo212613.35
Antonio Marquina343145.30