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Exact solution of the Riemann problem for the shallow water equations with discontinuous bottom geometry

โœ Scribed by R. Bernetti; V.A. Titarev; E.F. Toro

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
551 KB
Volume
227
Category
Article
ISSN
0021-9991

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โœฆ Synopsis

In this paper we present the exact solution of the Riemann problem for the non-linear shallow water equations with a step-like bottom. The solution has been obtained by solving an enlarged system that includes an additional equation for the bottom geometry and then using the principles of conservation of mass and momentum across the step. The resulting solution is unique and satisfies the principle of dissipation of energy across the shock wave. We provide examples of possible wave patterns. Numerical solution of a first-order dissipative scheme as well as an implementation of our Riemann solver in the second-order upwind method are compared with the proposed exact Riemann problem solution. A practical implementation of the proposed exact Riemann solver in the framework of a second-order upwind TVD method is also illustrated.

๐Ÿ“œ SIMILAR VOLUMES

Improved application of the HLLE Riemann
Improved application of the HLLE Riemann solver for the shallow water equations with source terms
โœ I. Delis, A. ๐Ÿ“‚ Article ๐Ÿ“… 2002 ๐Ÿ› John Wiley and Sons ๐ŸŒ English โš– 369 KB ๐Ÿ‘ 2 views

## Abstract The present work addresses the numerical prediction of shallow water flows with the application of the HLLE approximate Riemann solver. This Riemann solver has several desirable properties, such as, ease of implementation, satisfaction of entropy conditions, high shock resolution and po