Riemann solver
Computational physics |
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A Riemann solver is a numerical method used to solve a Riemann problem. They are heavily used in computational fluid dynamics and computational magnetohydrodynamics.
Definition
Generally speaking, Riemann solvers are specific methods for computing the numerical flux across a discontinuity in the Riemann problem.[1] They form an important part of high-resolution schemes; typically the right and left states for the Riemann problem are calculated using some form of nonlinear reconstruction, such as a flux limiter or a WENO method, and then used as the input for the Riemann solver.[2]
Exact solvers
More recent research shows that an exact series solution to the Riemann problem exists, which may converge fast enough in some cases to avoid the iterative methods required in Godunov's scheme.[4]
Approximate solvers
As iterative solutions are too costly, especially in magnetohydrodynamics, some approximations have to be made. Some popular solvers are:
Roe solver
Philip L. Roe used the linearisation of the Jacobian, which he then solves exactly.[5]
HLLE solver
The HLLE solver (developed by Ami Harten, Peter Lax, Bram van Leer and Einfeldt) is an approximate solution to the Riemann problem, which is only based on the integral form of the conservation laws and the largest and smallest signal velocities at the interface.[6][7] The stability and robustness of the HLLE solver is closely related to the signal velocities and a single central average state, as proposed by Einfeldt in the original paper
HLLC solver
The HLLC (Harten-Lax-van Leer-Contact) solver was introduced by Toro.[8] It restores the missing rarefaction wave by using an estimation technique, such as linearisation. More advanced techniques exist, like using the Roe average velocity for the middle wave speed. These schemes are quite robust and efficient but somewhat more diffusive.[9]
Rotated-hybrid Riemann solvers
These solvers were introduced by Hiroaki Nishikawa and Kitamura,[10] in order to overcome the carbuncle problems of the Roe solver and the excessive diffusion of the HLLE solver at the same time. They developed robust and accurate Riemann solvers by combining the Roe solver and the HLLE/Rusanov solvers: they show that being applied in two orthogonal directions the two Riemann solvers can be combined into a single Roe-type solver (the Roe solver with modified wave speeds). In particular, the one derived from the Roe and HLLE solvers, called Rotated-RHLL solver, is extremely robust (carbuncle-free for all possible test cases on both structured and unstructured grids) and accurate (as accurate as the Roe solver for the boundary layer calculation).
Other solvers
There are a variety of other solvers available, including more variants of the HLL scheme[11] and solvers based on flux-splitting via characteristic decomposition.[12]
Notes
- )
- OCLC 405546150.
- ^ Godunov, S. K. (1959), "A difference scheme for numerical computation of discontinuous solution of hyperbolic equation", Mat. Sbornik, 47: 271–306
- S2CID 122832179
- JSTOR 2030019.
- doi:10.1137/0725021
- S2CID 119972653
- hdl:2060/19930015894.
- .
- .
See also
References
- Toro, Eleuterio F. (1999), Riemann Solvers and Numerical Methods for Fluid Dynamics, Berlin: Springer Verlag, ISBN 978-3-540-65966-2