The classical Shannon sampling theorem is concerned with the representation of bandlimited signal functions by a sum built up from a countable number of samples. It is shown that a not necessarily bandlimited function f can be approximately represented by generalized sampling sums which originate from discretized convolution integrals known, e.g., in approximation theory. The rate of convergence of the new sums to f is precisely as good as that of the associated convolution integrals. This gives sufficient as well as matching necessary conditions for a certain rate of convergence
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
This paper presents an account of the current state of sampling, 50 years after Shannon's formulatio...
Shannon's sampling theorem for bandlimited signals has been generalized in many directions in the la...
The classical Shannon sampling theorem is concerned with the representation of bandlimited signal fu...
AbstractIn order to reconstruct a bandlimited signal f from its sampled values, it is a standard pra...
In contrast to the classical Shannon sampling theorem, signal functions are considered which are not...
The sampling theorem for bandlimited functions allows one to reconstruct exactly a function containi...
Several classes of bandlimited functions are defined and characterized in a variety of ways and the ...
The sampling theorem is one of the most basic and fascinating topics in engineering sciences. The mo...
Shannon's sampling theorem is fundamental in signal processing. It provides the exact reconstru...
AbstractIt has been known since long that an oversampled function can be represented by a generalize...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
Errors appear when the Shannon sampling series is applied to approximate a signal in practice. This ...
AbstractWe investigate the order of approximation of a real-valued function f by means of suitable f...
The sampling theorem states that any frequency bandlimited signal can be exactly reconstructed from ...
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
This paper presents an account of the current state of sampling, 50 years after Shannon's formulatio...
Shannon's sampling theorem for bandlimited signals has been generalized in many directions in the la...
The classical Shannon sampling theorem is concerned with the representation of bandlimited signal fu...
AbstractIn order to reconstruct a bandlimited signal f from its sampled values, it is a standard pra...
In contrast to the classical Shannon sampling theorem, signal functions are considered which are not...
The sampling theorem for bandlimited functions allows one to reconstruct exactly a function containi...
Several classes of bandlimited functions are defined and characterized in a variety of ways and the ...
The sampling theorem is one of the most basic and fascinating topics in engineering sciences. The mo...
Shannon's sampling theorem is fundamental in signal processing. It provides the exact reconstru...
AbstractIt has been known since long that an oversampled function can be represented by a generalize...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
Errors appear when the Shannon sampling series is applied to approximate a signal in practice. This ...
AbstractWe investigate the order of approximation of a real-valued function f by means of suitable f...
The sampling theorem states that any frequency bandlimited signal can be exactly reconstructed from ...
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
This paper presents an account of the current state of sampling, 50 years after Shannon's formulatio...
Shannon's sampling theorem for bandlimited signals has been generalized in many directions in the la...