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RBF-FD discretization of the Oseen equations
Citation Link: https://doi.org/10.15480/882.15952
Publikationstyp
Journal Article
Date Issued
2025-12-01
Sprache
English
Author(s)
Koch, Michael
TORE-DOI
Journal
Volume
542
Article Number
114375
Citation
Journal of Computational Physics 542: 114375 (2025)
Publisher DOI
Scopus ID
Publisher
Elsevier
The radial basis function - finite difference (RBF-FD) method is a (meshless) technique for the discretization of differential operators on scattered node sets. In recent years, it has been successfully applied mostly to scalar partial differential equations (PDEs). The extension to the application to the steady state Oseen equations on (several) scattered node sets is not straightforward but requires novel components which are the subject of this paper. We consider the steady-state Oseen equations in three spatial dimensions, and as a radial basis function, we restrict ourselves to the polyharmonic spline (PHS) with polynomial augmentation. However, the following contributions of our paper may also be applied to other model problems and RBFs. In particular, we will consider the selection of two node sets for the two types of unknowns, velocity and pressure, and subsequent (flexible order) RBF-FD discretization of the various differential operators in the coupled system. We discuss variants for the discretization of the pressure constraint as well as the influence of the viscosity parameter on the convergence of the RBF-FD discretization. Finally, we provide numerical tests for the Oseen equations in three dimensions on complex domains using several node arrangements, convection directions and parameters inherent to the PHS RBF-FD method. The tests demonstrate that the proposed method is stable for discretization step widths between ℎ𝑢 = 0.01 and ℎ𝑢 = 0.5 and viscosities in the range of 10−3 to 1 not just on the unit cube but also on a more complicated three-dimensional bunny-shaped domain. In particular, for even degrees of polynomial augmentation of the Laplacian (and lower degrees for involved first order differential operators), we can reach convergence of the same (even) order.
Subjects
Meshless methods
Oseen equations
Pressure constraint
RBF-FD
DDC Class
515: Analysis
530: Physics
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