期刊
JOURNAL OF SCIENTIFIC COMPUTING
卷 51, 期 3, 页码 683-702出版社
SPRINGER/PLENUM PUBLISHERS
DOI: 10.1007/s10915-011-9526-y
关键词
Multiquadric radial basis functions; Numerical stability; Matrix stability; Eigenvalue stability; CFL condition
资金
- Div Of Biological Infrastructure
- Direct For Biological Sciences [0959870] Funding Source: National Science Foundation
The fully discretized multiquadric radial basis function methods for hyperbolic equations are considered. We use the matrix stability analysis for various methods, including the single and multi-domain method and the local radial basis function method, to find the stability condition. The CFL condition for each method is obtained numerically. It is explained that the obtained CFL condition is only a necessary condition. That is, the numerical solution may grow for a finite time. It is also explained that the boundary condition is crucial for stability; however, it may degrade accuracy if it is imposed.
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