We discuss the class of univariate Radial Basis Functions for which the ith cardinal function ui for interpolation at x1 < x2 < .... < xn has support [x_i; x_i+1]: We also give an explicit example where it can be proven that the points in an interval [a, b] for which the associated Lebesgue constant is minimal, are equally spaced
We construct a new class of positive definite and compactly supported radial functions which consist...
Firstly, we present new sets of nodes for {\em polynomial interpolation on the square} that are asym...
AbstractWe address interpolation with radial basis functions on half-planes or -spaces, where the ce...
We discuss the class of univariate Radial Basis Functions for which the ith cardinal function ui for...
Abstract. Radial basis functions are well-known and successful tools for the interpolation of data i...
AbstractWe consider error estimates for interpolation by a special class of compactly supported radi...
We consider error estimates for interpolation by a special class of compactly supported radial basis...
Suppose is a positive number. Basic theory of cardinal interpolation ensures the existence of the G...
We consider positive definite and radial functions. After giving general results concerning the smoo...
AbstractAmong other things we derive sufficient conditions for a radial basis function φ: R≥ 0 → R t...
AbstractSuppose that K⊂Rd is compact and that we are given a function f∈C(K) together with distinct ...
This paper compares radial basis function interpolants on different spaces. The spaces are generated...
: Interpolation by translates of "radial" basis functions \Phi is optimal in the sense tha...
The goal of this paper is to construct %discuss the concept of data--independent optimal point sets ...
: We prove that the well known Lp -error estimates for radial basis function interpolation are optim...
We construct a new class of positive definite and compactly supported radial functions which consist...
Firstly, we present new sets of nodes for {\em polynomial interpolation on the square} that are asym...
AbstractWe address interpolation with radial basis functions on half-planes or -spaces, where the ce...
We discuss the class of univariate Radial Basis Functions for which the ith cardinal function ui for...
Abstract. Radial basis functions are well-known and successful tools for the interpolation of data i...
AbstractWe consider error estimates for interpolation by a special class of compactly supported radi...
We consider error estimates for interpolation by a special class of compactly supported radial basis...
Suppose is a positive number. Basic theory of cardinal interpolation ensures the existence of the G...
We consider positive definite and radial functions. After giving general results concerning the smoo...
AbstractAmong other things we derive sufficient conditions for a radial basis function φ: R≥ 0 → R t...
AbstractSuppose that K⊂Rd is compact and that we are given a function f∈C(K) together with distinct ...
This paper compares radial basis function interpolants on different spaces. The spaces are generated...
: Interpolation by translates of "radial" basis functions \Phi is optimal in the sense tha...
The goal of this paper is to construct %discuss the concept of data--independent optimal point sets ...
: We prove that the well known Lp -error estimates for radial basis function interpolation are optim...
We construct a new class of positive definite and compactly supported radial functions which consist...
Firstly, we present new sets of nodes for {\em polynomial interpolation on the square} that are asym...
AbstractWe address interpolation with radial basis functions on half-planes or -spaces, where the ce...