AbstractA hierarchical scheme is presented for smoothly interpolating scattered data with radial basis functions of compact support. A nested sequence of subsets of the data is computed efficiently using successive Delaunay triangulations. The scale of the basis function at each level is determined from the current density of the points using information from the triangulation. The method is rotationally invariant and has good reproduction properties. Moreover the solution can be calculated and evaluated in acceptable computing time
We describe algebraic methods for creating implicit sur-faces using linear combinations of radial ba...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
AbstractRadial basis functions (RBFs) form a primary tool for multivariate interpolation. Some of th...
AbstractA hierarchical scheme is presented for smoothly interpolating scattered data with radial bas...
In this paper, we propose a hierarchical approach to 3D scattered data interpolation with compactly...
Compactly supported basis functions are widely required and used in many applications. We explain wh...
Radial Basis Functions (RBF) interpolation theory is briefly introduced at the “application level” i...
The use of radial basis functions have attracted increasing attention in recent years as an elegant ...
Interpolation or approximation of scattered data is very often task in engineering problems. The Rad...
Radial Basis Functions (RBF) interpolation is primarily used for interpolation of scattered data in ...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
Over the past decade, the radial basis function method has been shown to produce high quality soluti...
AbstractAn efficient method for the multivariate interpolation of very large scattered data sets is ...
AbstractWe study the scattered Hermite interpolation problem and find several classes of radial basi...
. We study the computational complexity, the error behavior, and the numerical stability of interpol...
We describe algebraic methods for creating implicit sur-faces using linear combinations of radial ba...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
AbstractRadial basis functions (RBFs) form a primary tool for multivariate interpolation. Some of th...
AbstractA hierarchical scheme is presented for smoothly interpolating scattered data with radial bas...
In this paper, we propose a hierarchical approach to 3D scattered data interpolation with compactly...
Compactly supported basis functions are widely required and used in many applications. We explain wh...
Radial Basis Functions (RBF) interpolation theory is briefly introduced at the “application level” i...
The use of radial basis functions have attracted increasing attention in recent years as an elegant ...
Interpolation or approximation of scattered data is very often task in engineering problems. The Rad...
Radial Basis Functions (RBF) interpolation is primarily used for interpolation of scattered data in ...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
Over the past decade, the radial basis function method has been shown to produce high quality soluti...
AbstractAn efficient method for the multivariate interpolation of very large scattered data sets is ...
AbstractWe study the scattered Hermite interpolation problem and find several classes of radial basi...
. We study the computational complexity, the error behavior, and the numerical stability of interpol...
We describe algebraic methods for creating implicit sur-faces using linear combinations of radial ba...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
AbstractRadial basis functions (RBFs) form a primary tool for multivariate interpolation. Some of th...