The MOOD method for the non-conservative shallow-water system
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Publication:1648165
DOI10.1016/j.compfluid.2016.11.013zbMath1390.76415OpenAlexW2554366247MaRDI QIDQ1648165
Publication date: 27 June 2018
Published in: Computers and Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.compfluid.2016.11.013
unstructured meshfinite volumeshallow-waterpositivity-preservinghigh-orderwell-balanced schemenon-conservative problempolynomial reconstructionMOOD
Finite volume methods applied to problems in fluid mechanics (76M12) Finite volume methods for initial value and initial-boundary value problems involving PDEs (65M08)
Related Items (12)
\textit{A posteriori} stabilized sixth-order finite volume scheme for one-dimensional steady-state hyperbolic equations ⋮ Very high-order asymptotic-preserving schemes for hyperbolic systems of conservation laws with parabolic degeneracy on unstructured meshes ⋮ A well-balanced scheme for the shallow-water equations with topography or Manning friction ⋮ Solution property preserving reconstruction BVD+MOOD scheme for compressible Euler equations with source terms and detonations ⋮ A second-order cell-centered Lagrangian ADER-MOOD finite volume scheme on multidimensional unstructured meshes for hydrodynamics ⋮ A MOOD-like compact high order finite volume scheme with adaptive mesh refinement ⋮ Positivity preserving and entropy consistent approximate Riemann solvers dedicated to the high-order MOOD-based finite volume discretization of Lagrangian and Eulerian gas dynamics ⋮ A two-dimensional high-order well-balanced scheme for the shallow water equations with topography and Manning friction ⋮ A well-balanced scheme for the shallow-water equations with topography ⋮ A priori neural networks versus a posteriori MOOD loop: a high accurate 1D FV scheme testing bed ⋮ A MOOD-MUSCL hybrid formulation for the non-conservative shallow-water system ⋮ A well-balanced SPH-ALE scheme for shallow water applications
Uses Software
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