Michael A. Golberg scite author profile

The radial basis function (RBF) collocation method uses global shape functions to interpolate and collocate the approximate solution of PDEs. It is a truly meshless method as compared to some of the so-called meshless or element-free finite element methods. For the multiquadric and Gaussian RBFs, there are two ways to make the solution converge-either by refining the mesh size h, or by increasing the shape parameter c. While the h-scheme requires the increase of computational cost, the c-scheme is performed without extra effort. In this paper we establish by numerical experiment the exponential error estimate ⑀ ϳ O( ͌c/h ), where 0 Ͻ Ͻ 1. We also propose the use of residual error as an error indicator to optimize the selection of c.

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The method of fundamental solutions for Poisson's equation

Golberg

1995

Engineering Analysis with Boundary Elements

201

117

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Improved multiquadric approximation for partial differential equations

Golberg

Chen

Karur

1996

Engineering Analysis with Boundary Elements

249

117

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Some recent results and proposals for the use of radial basis functions in the BEM

Golberg

Chen

Bowman

1999

Engineering Analysis with Boundary Elements

279

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Particular solutions of Helmholtz-type operators using higher order polyhrmonic splines

Muleshkov

Golberg

Chen

1999

Computational Mechanics

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