AbstractFunctions with poles occur in many branches of applied mathematics which involve resonance phenomena. Such functions are challenging to interpolate, in particular in higher dimensions. In this paper we develop a technique for interpolation with quotients of two radial basis function (RBF) expansions to approximate such functions as an alternative to rational approximation. Since the quotient is not uniquely determined we introduce an additional constraint, the sum of the RBF-norms of the numerator and denominator squared should be minimal subjected to a norm condition on the function values. The method was designed for antenna design applications and we show by examples that the scattering matrix for a patch antenna as a function of...
Radial basis functions are excellent interpolators for scattered data in Rd. Previously the use of R...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
For radial basis function interpolation of scattered data in IR d the approximative reproduction of ...
AbstractFunctions with poles occur in many branches of applied mathematics which involve resonance p...
Functions with poles occur in many branches of applied mathematics which involve resonance phenomena...
We present a recently developed method to interpolate functions with poles by quotients of two radia...
Interpolation based on radial basis functions (RBF) is a standard data map- ping method used in mul...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
We propose a new approach to study Radial Basis Function (RBF) interpolation in the limit of increas...
We consider the interpolatory theory of bandlimited functions at both the integer lattice and at mor...
Radial Basis Functions (RBF) interpolation is primarily used for interpolation of scattered data in ...
AbstractRadial basis function interpolation involves two stages. The first is fitting, solving a lin...
AbstractInterpolation problems for analytic radial basis functions like the Gaussian and inverse mul...
AbstractRadial basis functions (RBFs) form a primary tool for multivariate interpolation. Some of th...
Radial Basis Functions (RBF) interpolation theory is briefly introduced at the “application level” i...
Radial basis functions are excellent interpolators for scattered data in Rd. Previously the use of R...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
For radial basis function interpolation of scattered data in IR d the approximative reproduction of ...
AbstractFunctions with poles occur in many branches of applied mathematics which involve resonance p...
Functions with poles occur in many branches of applied mathematics which involve resonance phenomena...
We present a recently developed method to interpolate functions with poles by quotients of two radia...
Interpolation based on radial basis functions (RBF) is a standard data map- ping method used in mul...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
We propose a new approach to study Radial Basis Function (RBF) interpolation in the limit of increas...
We consider the interpolatory theory of bandlimited functions at both the integer lattice and at mor...
Radial Basis Functions (RBF) interpolation is primarily used for interpolation of scattered data in ...
AbstractRadial basis function interpolation involves two stages. The first is fitting, solving a lin...
AbstractInterpolation problems for analytic radial basis functions like the Gaussian and inverse mul...
AbstractRadial basis functions (RBFs) form a primary tool for multivariate interpolation. Some of th...
Radial Basis Functions (RBF) interpolation theory is briefly introduced at the “application level” i...
Radial basis functions are excellent interpolators for scattered data in Rd. Previously the use of R...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
For radial basis function interpolation of scattered data in IR d the approximative reproduction of ...