The focus of this dissertation is the interpolation and approximation of multivariate bandlimited functions via sampled (function) values. The first set of results investigates polynomial interpolation in connection with multivariate bandlimited functions. To this end, the concept of a uniformly invertible Riesz basis is developed (with examples), and is used to construct Lagrangian polynomial interpolants for particular classes of sampled square-summable data. These interpolants are used to derive two asymptotic recovery and approximation formulas. The first recovery formula is theoretically straightforward, with global convergence in the appropriate metrics; however, it becomes computationally complicated in the limit. This complexity is...
AbstractA class of multivariate scattered data interpolation methods which includes the so-called mu...
AbstractWe establish several types of a a priori error bounds for multiquadric and related interpola...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
The focus of this dissertation is the interpolation and approximation of multivariate bandlimited fu...
AbstractIn this paper, an equivalence between existence of particular exponential Riesz bases for sp...
We consider the interpolatory theory of bandlimited functions at both the integer lattice and at mor...
Dedicated to the well-respected research mathematician Ambikeshwar Sharma, Frontiers in Interpolatio...
A multiresolution analysis is a nested chain of related approximation spaces.This nesting in turn im...
AbstractIn this paper, we investigate frames for L2[−π,π]d consisting of exponential functions in co...
Abstract. This contribution will touch the following topics: Short introduction into the theory of ...
AbstractLet λ be a positive number, and let (xj:j∈Z)⊂R be a fixed Riesz-basis sequence, namely, (xj)...
Abstract. Let λ be a positive number, and let (xj: j ∈ Z) ⊂ R be a fixed Riesz-basis sequence, name...
summary:The paper is concerned with the approximation and interpolation employing polyharmonic splin...
AbstractWe consider interpolation of univariate functions on arbitrary sets of nodes by Gaussian rad...
This book is a collection of eleven articles, written by leading experts and dealing with special to...
AbstractA class of multivariate scattered data interpolation methods which includes the so-called mu...
AbstractWe establish several types of a a priori error bounds for multiquadric and related interpola...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....
The focus of this dissertation is the interpolation and approximation of multivariate bandlimited fu...
AbstractIn this paper, an equivalence between existence of particular exponential Riesz bases for sp...
We consider the interpolatory theory of bandlimited functions at both the integer lattice and at mor...
Dedicated to the well-respected research mathematician Ambikeshwar Sharma, Frontiers in Interpolatio...
A multiresolution analysis is a nested chain of related approximation spaces.This nesting in turn im...
AbstractIn this paper, we investigate frames for L2[−π,π]d consisting of exponential functions in co...
Abstract. This contribution will touch the following topics: Short introduction into the theory of ...
AbstractLet λ be a positive number, and let (xj:j∈Z)⊂R be a fixed Riesz-basis sequence, namely, (xj)...
Abstract. Let λ be a positive number, and let (xj: j ∈ Z) ⊂ R be a fixed Riesz-basis sequence, name...
summary:The paper is concerned with the approximation and interpolation employing polyharmonic splin...
AbstractWe consider interpolation of univariate functions on arbitrary sets of nodes by Gaussian rad...
This book is a collection of eleven articles, written by leading experts and dealing with special to...
AbstractA class of multivariate scattered data interpolation methods which includes the so-called mu...
AbstractWe establish several types of a a priori error bounds for multiquadric and related interpola...
AbstractMultivariate interpolation of smooth data using smooth radial basis functions is considered....