Recently, new polynomial approximation formulas were proposed for the reconstruction of compactly supported piecewise smooth functions from Fourier data. Formulas for zero and first degree polynomials were presented. For higher degree approximations, polynomial formulas become extremely complicated to be handled. In this paper we solve this problem by introducing spline approximations. The new approach can be used in the same way as the polynomial one but producing computable formulas for any degree of approximation in Fourier reconstruction. We present general error estimates and numerical experiments.5641489150
A new smoothing method is proposed which can be viewed as a finite element thin plate spline. This a...
L'approximation de fonctions et de données discrètes est fondamentale dans des domaines tels que la ...
In recent years several workers have published methods for accurately approximating a function with...
and Anders C. Hansen Abstract In this paper, we consider the problem of reconstructing piecewise smo...
In several applications, data are collected in the frequency (Fourier) domain non-uniformly, either ...
The problem of data approximation is of great interest. There are a lot of approaches to solve this ...
abstract: The reconstruction of piecewise smooth functions from non-uniform Fourier data arises in s...
Data and function approximation is fundamental in application domains like path planning or signal p...
The problem of data approximation is of great interest. There are a lot of approaches to solve this ...
The scientific and application-oriented interest in the Laplace transform and its inversion is testi...
The Inverse Polynomial Reconstruction Method (IPRM) has been re-cently introduced by J.-H. Jung and ...
Generalized splines are smooth functions belonging piecewisely to spaces which are a natural general...
The scientific and application-oriented interest in the Laplace transform and its inversion is testi...
One of the main problems in the analysis of measured spectra is how to reduce the influence of noise...
AbstractIn recent years, several workers have published methods for accurately approximating a funct...
A new smoothing method is proposed which can be viewed as a finite element thin plate spline. This a...
L'approximation de fonctions et de données discrètes est fondamentale dans des domaines tels que la ...
In recent years several workers have published methods for accurately approximating a function with...
and Anders C. Hansen Abstract In this paper, we consider the problem of reconstructing piecewise smo...
In several applications, data are collected in the frequency (Fourier) domain non-uniformly, either ...
The problem of data approximation is of great interest. There are a lot of approaches to solve this ...
abstract: The reconstruction of piecewise smooth functions from non-uniform Fourier data arises in s...
Data and function approximation is fundamental in application domains like path planning or signal p...
The problem of data approximation is of great interest. There are a lot of approaches to solve this ...
The scientific and application-oriented interest in the Laplace transform and its inversion is testi...
The Inverse Polynomial Reconstruction Method (IPRM) has been re-cently introduced by J.-H. Jung and ...
Generalized splines are smooth functions belonging piecewisely to spaces which are a natural general...
The scientific and application-oriented interest in the Laplace transform and its inversion is testi...
One of the main problems in the analysis of measured spectra is how to reduce the influence of noise...
AbstractIn recent years, several workers have published methods for accurately approximating a funct...
A new smoothing method is proposed which can be viewed as a finite element thin plate spline. This a...
L'approximation de fonctions et de données discrètes est fondamentale dans des domaines tels que la ...
In recent years several workers have published methods for accurately approximating a function with...