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Eigensolution analysis of immersed boundary method based on volume penalization: Applications to high-order schemes
- Source :
- Journal of Computational Physics
- Publication Year :
- 2022
-
Abstract
- This paper presents eigensolution and non-modal analyses for immersed boundary methods (IBMs) based on volume penalization for the linear advection equation. This approach is used to analyze the behavior of flux reconstruction (FR) discretization, including the influence of polynomial order and penalization parameter on numerical errors and stability. Through a semi-discrete analysis, we find that the inclusion of IBM adds additional dissipation without changing significantly the dispersion of the original numerical discretization. This agrees with the physical intuition that in this type of approach, the solid wall is modelled as a porous medium with vanishing viscosity. From a stability point of view, the variation of penalty parameter can be analyzed based on a fully-discrete analysis, which leads to practical guidelines on the selection of penalization parameter. Numerical experiments indicate that the penalization term needs to be increased to damp oscillations inside the solid (i.e. porous region), which leads to undesirable time step restrictions. As an alternative, we propose to include a second-order term in the solid for the no-slip wall boundary condition. Results show that by adding a second-order term we improve the overall accuracy with relaxed time step restriction. This indicates that the optimal value of the penalization parameter and the second-order damping can be carefully chosen to obtain a more accurate scheme. Finally, the approximated relationship between these two parameters is obtained and used as a guideline to select the optimum penalty terms in a Navier-Stokes solver, to simulate flow past a cylinder.
- Subjects :
- Physics and Astronomy (miscellaneous)
Discretization
FOS: Physical sciences
Boundary (topology)
010103 numerical & computational mathematics
01 natural sciences
Stability (probability)
FOS: Mathematics
Applied mathematics
Boundary value problem
Mathematics - Numerical Analysis
0101 mathematics
Mathematics
Numerical Analysis
Applied Mathematics
Numerical Analysis (math.NA)
Computational Physics (physics.comp-ph)
Solver
Immersed boundary method
Dissipation
Computer Science Applications
Term (time)
010101 applied mathematics
Computational Mathematics
Modeling and Simulation
Physics - Computational Physics
Subjects
Details
- ISSN :
- 00219991
- Database :
- OpenAIRE
- Journal :
- Journal of Computational Physics
- Accession number :
- edsair.doi.dedup.....33cafd954b8a1a69aa10de4ea7f39e4e
- Full Text :
- https://doi.org/10.1016/j.jcp.2021.110817