SPH-ALE Scheme for Weakly Compressible Viscous Flow with a Posteriori Stabilization
Ver/ abrir
Use este enlace para citar
http://hdl.handle.net/2183/27258
A non ser que se indique outra cousa, a licenza do ítem descríbese como Atribución 4.0 Internacional
Coleccións
- GI-GMNE - Artigos [58]
Metadatos
Mostrar o rexistro completo do ítemTítulo
SPH-ALE Scheme for Weakly Compressible Viscous Flow with a Posteriori StabilizationData
2021Cita bibliográfica
Eirís A, Ramírez L, Fernández-Fidalgo J, Couceiro I, Nogueira X. SPH-ALE Scheme for Weakly Compressible Viscous Flow with a Posteriori Stabilization. Water. 2021; 13(3):245. https://doi.org/10.3390/w13030245
Resumo
[Abstract] A highly accurate SPH method with a new stabilization paradigm has been introduced by the authors in a recent paper aimed to solve Euler equations for ideal gases. We present here the extension of the method to viscous incompressible flow. Incompressibility is tackled assuming a weakly compressible approach. The method adopts the SPH-ALE framework and improves accuracy by taking high-order variable reconstruction of the Riemann states at the midpoints between interacting particles. The moving least squares technique is used to estimate the derivatives required for the Taylor approximations for convective fluxes, and also provides the derivatives needed to discretize the viscous flux terms. Stability is preserved by implementing the a posteriori Multi-dimensional Optimal Order Detection (MOOD) method procedure thus avoiding the utilization of any slope/flux limiter or artificial viscosity. The capabilities of the method are illustrated by solving one- and two-dimensional Riemann problems and benchmark cases. The proposed methodology shows improvements in accuracy in the Riemann problems and does not require any parameter calibration. In addition, the method is extended to the solution of viscous flow and results are validated with the analytical Taylor–Green, Couette and Poiseuille flows, and lid-driven cavity test cases.
Palabras chave
High-order methods
Smoothed particle hydrodynamics
Meshless methods
Multi-dimensional optimal order detection
Moving least squares
Weakly compressible
Smoothed particle hydrodynamics
Meshless methods
Multi-dimensional optimal order detection
Moving least squares
Weakly compressible
Versión do editor
Dereitos
Atribución 4.0 Internacional