Authors: Sokolov, Andriy
Davydov, Oleg
Kuzmin, Dmitri
Westermann, Alexander
Turek, Stefan
Title: A flux-corrected RBF-FD method for convection dominated problems in domains and on manifolds
Language (ISO): en
Abstract: In this article we introduce a FCT stabilized Radial Basis Function (RBF)-Finite Difference (FD) method for the numerical solution of convection dominated problems. The proposed algorithm is designed to maintain mass conservation and to guarantee positivity of the solution for an almost random placement of scattered data nodes. The method can be applicable both for problems defined in a domain or if equipped with level set techniques, on a stationary manifold. We demonstrate the numerical behavior of the method by performing numerical tests for the solid-body rotation benchmark in a unit square and for a transport problem along a curve implicitly prescribed by a level set function. Extension of the proposed method to higher dimensions is straightforward and easily realizable.
Subject Headings: flux correction
radial basis functions
generalized finite differences
level set
convection dominated problems
Issue Date: 2018-06
Appears in Collections:Ergebnisberichte des Instituts für Angewandte Mathematik

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