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A two-dimensional high-order well-balanced scheme for the shallow water equations with topography and Manning friction

Abstract : We develop a two-dimensional high-order numerical scheme that exactly preserves and captures the moving steady states of the shallow water equations with topography or Manning friction. The high-order accuracy relies on a suitable polynomial reconstruction, while the well-balancedness property is based on the first-order scheme from [Michel-Dansac et al., 2016 & Michel-Dansac et al., 2017], extended to two space dimensions. To get both properties, we use a convex combination between the high-order scheme and the first-order well-balanced scheme. By adequately choosing the convex combination parameter following a very simple steady state detector, we ensure that the resulting scheme is both high-order accurate and well-balanced. The method is then supplemented with a MOOD procedure to eliminate the spurious oscillations coming from the high-order polynomial reconstruction and to guarantee the physical admissibility of the solution. Numerical experiments show that the scheme indeed possesses the claimed properties. The simulation of the 2011 Japan tsunami, on real data, further confirms the relevance of this technique.
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https://hal.archives-ouvertes.fr/hal-02536791
Contributor : Victor Michel-Dansac Connect in order to contact the contributor
Submitted on : Wednesday, September 15, 2021 - 11:22:23 AM
Last modification on : Tuesday, September 21, 2021 - 4:06:03 PM

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Victor Michel-Dansac, Christophe Berthon, Stéphane Clain, Françoise Foucher. A two-dimensional high-order well-balanced scheme for the shallow water equations with topography and Manning friction. Computers and Fluids, Elsevier, inPress, ⟨10.1016/j.compfluid.2021.105152⟩. ⟨hal-02536791v2⟩

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