A new approach for designing well-balanced schemes for the shallow water equations: a combination of conservative and primitive formulations
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Publication:6638204
DOI10.1137/23M1624610MaRDI QIDQ6638204
Publication date: 14 November 2024
Published in: SIAM Journal on Scientific Computing (Search for Journal in Brave)
hyperbolic systempositivity-preserving propertyone-dimensional Saint-Venant systemManning friction termstill-water/moving-water equilibrium
Water waves, gravity waves; dispersion and scattering, nonlinear interaction (76B15) Finite volume methods applied to problems in fluid mechanics (76M12) Finite volume methods for initial value and initial-boundary value problems involving PDEs (65M08)
Cites Work
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- Moving-water equilibria preserving central-upwind schemes for the shallow water equations
- High order exactly well-balanced numerical methods for shallow water systems
- Exactly well-balanced discontinuous Galerkin methods for the shallow water equations with moving water equilibrium
- An explicit residual based approach for shallow water flows
- A well-balanced reconstruction of wet/dry fronts for the shallow water equations
- Well-balanced unstaggered central schemes for one and two-dimensional shallow water equation systems
- Well-balanced RKDG2 solutions to the shallow water equations over irregular domains with wetting and drying
- Efficient well-balanced hydrostatic upwind schemes for shallow-water equations
- A simple well-balanced and positive numerical scheme for the shallow-water system
- A well-balanced scheme for the shallow-water equations with topography
- A high-order finite volume method for systems of conservation laws-multi-dimensional optimal order detection (MOOD)
- Well-balanced and energy stable schemes for the shallow water equations with discontinuous topography
- Well-balanced finite volume evolution Galerkin methods for the shallow water equations
- Stabilized residual distribution for shallow water simulations
- Balancing source terms and flux gradients in high-resolution Godunov methods: The quasi-steady wave-propagation algorithm
- A posteriori sub-cell finite volume limiting of staggered semi-implicit discontinuous Galerkin schemes for the shallow water equations
- A well-balanced scheme for the shallow-water equations with topography or Manning friction
- Definition and weak stability of nonconservative products
- Well-balancing via flux globalization: applications to shallow water equations with wet/dry fronts
- Some preliminary results on a high order asymptotic preserving computationally explicit kinetic scheme
- A fully well-balanced scheme for shallow water equations with Coriolis force
- Flux globalization based well-balanced path-conservative central-upwind schemes for shallow water models
- \textit{A posteriori} correction of high-order discontinuous Galerkin scheme through subcell finite volume formulation and flux reconstruction
- A new approach for designing moving-water equilibria preserving schemes for the shallow water equations
- Well-balanced high order 1D schemes on non-uniform grids and entropy residuals
- High-order well-balanced finite volume WENO schemes for shallow water equation with moving water
- On a well-balanced high-order finite volume scheme for shallow water equations with topography and dry areas
- A second-order well-balanced positivity preserving central-upwind scheme for the Saint-Venant system
- An oscillation-free discontinuous Galerkin method for shallow water equations
- Well-balanced fifth-order finite difference Hermite WENO scheme for the shallow water equations
- A combination of residual distribution and the active flux formulations or a new class of schemes that can combine several writings of the same hyperbolic problem: application to the 1D Euler equations
- A mass conservative, well balanced and positivity-preserving central scheme for shallow water equations
- Strong stability-preserving high-order time discretization methods
- A fully well-balanced, positive and entropy-satisfying Godunov-type method for the shallow-water equations
- Moving-Water Equilibria Preserving Partial Relaxation Scheme for the Saint-Venant System
- WELL-BALANCED NUMERICAL SCHEMES BASED ON A GENERALIZED HYDROSTATIC RECONSTRUCTION TECHNIQUE
- A well-balanced Runge-Kutta discontinuous Galerkin method for the shallow-water equations with flooding and drying
- A Fast and Stable Well-Balanced Scheme with Hydrostatic Reconstruction for Shallow Water Flows
- GRAPH SOLUTIONS OF NONLINEAR HYPERBOLIC SYSTEMS
- Moving-Water Equilibria Preserving HLL-Type Schemes for the Shallow Water Equations
- A Survey of High Order Schemes for the Shallow Water Equations
- Finite Volume Evolution Galerkin Methods for the Shallow Water Equations with Dry Beds
- Two Interface-Type Numerical Methods for Computing Hyperbolic Systems with Geometrical Source Terms Having Concentrations
- Moving water equilibria preserving discontinuous Galerkin method for the shallow water equations
- Arbitrary high order WENO finite volume scheme with flux globalization for moving equilibria preservation
- A New Well-Balanced Finite Volume CWENO Scheme for Shallow Water Equations over Bottom Topography
- Novel well-balanced continuous interior penalty stabilizations
- A well-balanced active flux method for the shallow water equations with wetting and drying
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