Shape variable radial basis function and its application in dual reciprocity boundary face method
- Autores: Fenglin Zhou, Jianming Zhan, Xiaomin Sheng, Guangyao Li
- Localización: Engineering analysis with boundary elements, ISSN 0955-7997, Vol. 35, Nº. 2, 2011 (Ejemplar dedicado a: Special issue on the advances in mesh reduction methods- In honor of Professor Subrata Mukherjee on the occasion of his 65th birthday), págs. 244-252
- Idioma: inglés
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Resumen
The radial basis functions (RBFs) is an efficient tool in multivariate approximation, but it usually suffers from an ill-conditioned interpolation matrix when interpolation points are very dense or irregularly spaced. The RBFs with variable shape parameters can usually improve the interpolation matrix condition number. In this paper a new shape parameter variation scheme is implemented. Comparison studies with the constant shaped RBF on convergence and stability are made. Results show that under the same accuracy level, the interpolation matrix condition number by our scheme grows much slower than that of the constant shaped RBF interpolation matrix with increase in the number of interpolation points. As an application example, the dual reciprocity method equipped with the new RBF is combined with the boundary face method to solve boundary value problems governed by Poisson equations. Numerical results further demonstrate the robustness and better stability of the new RBF.
