AbstractWe show that band limited functions can be recovered from their values on certain irregularly distributed discrete sampling sets as the limits of the piecewise polynomial spline interpolants when the order of the splines goes to infinity. This is an extension of the classical case when the sampling set is a lattice which was considered by Collatz, Quade, Schoenberg, and others
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
When interpolating data with certain regularity, spline functions are useful. They are defined as pi...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...
Abstract.1 It is well-known that certain non bandlimited signals such as splines can be reconstructe...
AbstractIn this paper, band-limited functions are reconstructed from their values taken at a sequenc...
Abstract. 1 It is well-known that certain non bandlimited signals such as splines can be reconstruct...
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
In a previous paper we constructed frames and oversampling formulas for band-limited functions, in t...
In many applications one seeks to recover an entire function of exponential type from its non-unifor...
Abstract. In this article we study various perturbation techniques in the con-text of irregular spli...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
The goal of derivative sampling is to reconstruct a signal from the samples of the function and of i...
Whittaker's sampling theorem is extended to periodic and not necessarily simultaneous sampling of ba...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
When interpolating data with certain regularity, spline functions are useful. They are defined as pi...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...
Abstract.1 It is well-known that certain non bandlimited signals such as splines can be reconstructe...
AbstractIn this paper, band-limited functions are reconstructed from their values taken at a sequenc...
Abstract. 1 It is well-known that certain non bandlimited signals such as splines can be reconstruct...
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
In a previous paper we constructed frames and oversampling formulas for band-limited functions, in t...
In many applications one seeks to recover an entire function of exponential type from its non-unifor...
Abstract. In this article we study various perturbation techniques in the con-text of irregular spli...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
The goal of derivative sampling is to reconstruct a signal from the samples of the function and of i...
Whittaker's sampling theorem is extended to periodic and not necessarily simultaneous sampling of ba...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
When interpolating data with certain regularity, spline functions are useful. They are defined as pi...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...