In many applications one seeks to recover an entire function of exponential type from its non-uniformly spaced samples. Whereas the mathematical theory usually addresses the question of when such a function in L 2 (R) can be recovered, numerical methods operate with a finite-dimensional model. The numerical reconstruction or approximation of the original function amounts to the solution of a large linear system. We show that the solutions of a particularly efficient discrete model in which the data are fit by trigonometric polynomials converge to the solution of the original infinite-dimensional reconstruction problem. This legitimatizes the numerical computations and explains why the algorithms employed produce reasonable results. The main...
AbstractDiscrete irregular sampling is the problem of recovering a band-limited discrete signal from...
The approximation theory contains many statements where the rate of approximation of a function by ...
AbstractAssume that a sequence of samples of a filtered version of a function in a shift-invariant s...
AbstractWe derive algorithms for the iterative reconstruction of discrete band-limited signals from ...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...
In this article a generalized sampling theorem using an arbitrary sequence of sampling points is der...
In this note we study the connection between best approximation and interpolation by entire function...
In a previous paper "Frames and numerical approximation" we described the numerical properties of fu...
We present a new "second generation" reconstruction algorithm for irregular sampling, i.e....
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
Consider the problem of sampling signals which are not bandlimited, but still have a finite number o...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...
The paper presents a method to recover exponential accuracy at all points (including at the disconti...
AbstractIn this paper, band-limited functions are reconstructed from their values taken at a sequenc...
We consider the problem of sampling from a discrete probability distribution specified by a graphica...
AbstractDiscrete irregular sampling is the problem of recovering a band-limited discrete signal from...
The approximation theory contains many statements where the rate of approximation of a function by ...
AbstractAssume that a sequence of samples of a filtered version of a function in a shift-invariant s...
AbstractWe derive algorithms for the iterative reconstruction of discrete band-limited signals from ...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...
In this article a generalized sampling theorem using an arbitrary sequence of sampling points is der...
In this note we study the connection between best approximation and interpolation by entire function...
In a previous paper "Frames and numerical approximation" we described the numerical properties of fu...
We present a new "second generation" reconstruction algorithm for irregular sampling, i.e....
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
Consider the problem of sampling signals which are not bandlimited, but still have a finite number o...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...
The paper presents a method to recover exponential accuracy at all points (including at the disconti...
AbstractIn this paper, band-limited functions are reconstructed from their values taken at a sequenc...
We consider the problem of sampling from a discrete probability distribution specified by a graphica...
AbstractDiscrete irregular sampling is the problem of recovering a band-limited discrete signal from...
The approximation theory contains many statements where the rate of approximation of a function by ...
AbstractAssume that a sequence of samples of a filtered version of a function in a shift-invariant s...