AbstractMadych and Nelson [1] proved multiquadric (MQ) mesh-independent radial basis functions (RBFs) enjoy exponential convergence. The primary disadvantage of the MQ scheme is that it is global, hence, the coefficient matrices obtained from this discretization scheme are full. Full matrices tend to become progressively more ill-conditioned as the rank increases.In this paper, we explore several techniques, each of which improves the conditioning of the coefficient matrix and the solution accuracy. The methods that were investigated are 1.(1) replacement of global solvers by block partitioning, LU decomposition schemes,2.(2) matrix preconditioners,3.(3) variable MQ shape parameters based upon the local radius of curvature of the function b...
In recent years radial basis function collocation has become a useful alternative to finite differe...
In this paper, we discuss multiscale radial basis function collocation methods for solving certain e...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...
AbstractThe multiquadric radial basis function (MQ) method is a recent meshless collocation method w...
We present a new method based upon the paper of Volokh and Vilney (2000) that produces highly accura...
We propose a multiscale approximation method for constructing numerical solutions to elliptic partia...
Radial Basis Functions (RBF) are well-known as powerful tools for multivariate interpolation from sc...
Abstract-Spectrally accurate interpolation and approximation of derivatives used to be practical onl...
The traditional basis functions in numerical PDEs are mostly coordinate functions, such as polynomia...
In this paper, we discuss multiscale radial basis function collocation methods for solving elliptic ...
The Radial Basis Function (RBF) method has been considered an important meshfree tool for numerical ...
The multiquadric radial basis function method (MQ RBF or, simply, MQ) developed recently is a truly ...
AbstractThis study examines the generalized multiquadrics (MQ), φj(x) = [(x−xj)2+cj2]β in the numeri...
Radial Basis Function (RBF) methods have become a truly meshless alternative for the interpolation o...
Radial basis function (RBF) methods are meshfree, i.e., they can operate on unstructured node sets. ...
In recent years radial basis function collocation has become a useful alternative to finite differe...
In this paper, we discuss multiscale radial basis function collocation methods for solving certain e...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...
AbstractThe multiquadric radial basis function (MQ) method is a recent meshless collocation method w...
We present a new method based upon the paper of Volokh and Vilney (2000) that produces highly accura...
We propose a multiscale approximation method for constructing numerical solutions to elliptic partia...
Radial Basis Functions (RBF) are well-known as powerful tools for multivariate interpolation from sc...
Abstract-Spectrally accurate interpolation and approximation of derivatives used to be practical onl...
The traditional basis functions in numerical PDEs are mostly coordinate functions, such as polynomia...
In this paper, we discuss multiscale radial basis function collocation methods for solving elliptic ...
The Radial Basis Function (RBF) method has been considered an important meshfree tool for numerical ...
The multiquadric radial basis function method (MQ RBF or, simply, MQ) developed recently is a truly ...
AbstractThis study examines the generalized multiquadrics (MQ), φj(x) = [(x−xj)2+cj2]β in the numeri...
Radial Basis Function (RBF) methods have become a truly meshless alternative for the interpolation o...
Radial basis function (RBF) methods are meshfree, i.e., they can operate on unstructured node sets. ...
In recent years radial basis function collocation has become a useful alternative to finite differe...
In this paper, we discuss multiscale radial basis function collocation methods for solving certain e...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...