Radial basis functions (RBFs) have become a popular method for interpolation and solution of partial differential equations (PDEs). Many types of RBFs used in these problems contain a shape parameter, and there is much experimental evidence showing that accuracy strongly depends on the value of this shape parameter. In this paper, we focus on PDE problems solved with a multiquadric based RBF finite difference (RBF-FD) method. We propose an efficient algorithm to compute the optimal value of the shape parameter that minimizes the approximation error. The algorithm is based on analytical approximations to the local RBF-FD error derived in [1]. We show through several examples in 1D and 2D, both with structured and unstructured nodes, that ver...
We investigate the influence of the shape parameter in the meshless Gaussian RBF finite difference m...
Radial basis function generated finite difference (RBF-FD) methods for PDEs require a set of interpo...
Spectrally accurate interpolation and approximation of derivatives used to be prac-tical only on hig...
In this follow up paper to our previous study in Bayona et al. (2011) [2], we present a new techniqu...
Radial basis functions (RBFs) have become a popular method for the solution of partial differential ...
AbstractWe investigate the influence of the shape parameter in the meshless Gaussian radial basis fu...
The local RBF is becoming increasingly popular as an alternative to the global version that suffers ...
We present a new method based upon the paper of Volokh and Vilney (2000) that produces highly accura...
Radial Basis Function (RBF) methods have become a truly meshless alternative for the interpolation o...
Abstract-Spectrally accurate interpolation and approximation of derivatives used to be practical onl...
This study was aimed to develop a computational routine for the numerical solution of partial differ...
AbstractPromising numerical results using once and twice integrated radial basis functions have been...
In this work we derive analytical expressions for the weights of Gaussian RBF-FD and Gaussian RBF-HF...
Radial basis function (RBF) methods are meshfree, i.e., they can operate on unstructured node sets. ...
The classical finite difference methods for solving initial value problems are based on the polynomi...
We investigate the influence of the shape parameter in the meshless Gaussian RBF finite difference m...
Radial basis function generated finite difference (RBF-FD) methods for PDEs require a set of interpo...
Spectrally accurate interpolation and approximation of derivatives used to be prac-tical only on hig...
In this follow up paper to our previous study in Bayona et al. (2011) [2], we present a new techniqu...
Radial basis functions (RBFs) have become a popular method for the solution of partial differential ...
AbstractWe investigate the influence of the shape parameter in the meshless Gaussian radial basis fu...
The local RBF is becoming increasingly popular as an alternative to the global version that suffers ...
We present a new method based upon the paper of Volokh and Vilney (2000) that produces highly accura...
Radial Basis Function (RBF) methods have become a truly meshless alternative for the interpolation o...
Abstract-Spectrally accurate interpolation and approximation of derivatives used to be practical onl...
This study was aimed to develop a computational routine for the numerical solution of partial differ...
AbstractPromising numerical results using once and twice integrated radial basis functions have been...
In this work we derive analytical expressions for the weights of Gaussian RBF-FD and Gaussian RBF-HF...
Radial basis function (RBF) methods are meshfree, i.e., they can operate on unstructured node sets. ...
The classical finite difference methods for solving initial value problems are based on the polynomi...
We investigate the influence of the shape parameter in the meshless Gaussian RBF finite difference m...
Radial basis function generated finite difference (RBF-FD) methods for PDEs require a set of interpo...
Spectrally accurate interpolation and approximation of derivatives used to be prac-tical only on hig...