A well-balanced path conservative SPH scheme for nonconservative hyperbolic systems with applications to shallow water and multi-phase flows
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Publication:1648376
DOI10.1016/j.compfluid.2017.05.034zbMath1390.76760OpenAlexW2620659057MaRDI QIDQ1648376
Giulia Rossi, Aronne Armanini, Michael Dumbser
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.2017.05.034
and HLLEMBaer Nunziato model of compressible multiphase flowcomparison of different approximate Riemann solvers: RusanovOsher (DOT)path-conservative SPH schemes for non-conservative hyperbolic PDEsingle and two-layer shallow water equationssmoothed particle hydrodynamics (SPH) based on Riemann solverswell-balanced SPH schemes
Water waves, gravity waves; dispersion and scattering, nonlinear interaction (76B15) Particle methods and lattice-gas methods (76M28) Probabilistic methods, particle methods, etc. for initial value and initial-boundary value problems involving PDEs (65M75)
Related Items (7)
An augmented HLLEM ADER numerical model parallel on GPU for the porous shallow water equations ⋮ A mesh-free particle method for continuum modelling of granular flow ⋮ A new smoothed particle hydrodynamics method based on high-order moving-least-square targeted essentially non-oscillatory scheme for compressible flows ⋮ An alternative SPH formulation: ADER-WENO-SPH ⋮ A well-balanced SPH-ALE scheme for shallow water applications ⋮ High order entropy preserving ADER-DG schemes ⋮ Structure-preserving finite volume arbitrary Lagrangian-Eulerian WENO schemes for the shallow water equations
Uses Software
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