Abstract: A qversion of the sampling theorem is derived using the qHankel transform introduced by Koornwinder and Swarttouw. The sampling points are the zeros of the third Jackson qBessel function
Kramer\u27s sampling theorem, which is a generalization of the Whittaker-Shannon-Kotel\u27nikov (WSK...
The sampling theorem states that any frequency bandlimited signal can be exactly reconstructed from ...
Two q-analogues of the well-known Laplace transform are defined with the help of the Jackson integra...
AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives th...
The Whittaker-Shannon-Kotel\u27nikov (WSK) sampling theorem plays an important role not only in harm...
AbstractWe derive two real Paley–Wiener theorems in the setting of quantum calculus. The first uses ...
Sampling and reconstruction of functions is a central tool in science. A key result is given by the ...
We use the Paley–Wiener theorem for the Fourier and Hankel transforms to compare Fourier and Hankel ...
Kramer's sampling theorem gives us the possibility to reconstruct integral transforms from their val...
In this article a generalized sampling theorem using an arbitrary sequence of sampling points is der...
AbstractOne of the most fundamental theorems in interpolation and sampling theory is the Whittaker-S...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
Sampling and reconstruction of functions is a fundamental tool in science. We develop an analogous s...
Abstract—A sampling theorem for regular sampling in shift invariant subspaces is established. The su...
The investigation of a q-analogue of the convolution on the line, started in conjunction with Koornw...
Kramer\u27s sampling theorem, which is a generalization of the Whittaker-Shannon-Kotel\u27nikov (WSK...
The sampling theorem states that any frequency bandlimited signal can be exactly reconstructed from ...
Two q-analogues of the well-known Laplace transform are defined with the help of the Jackson integra...
AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives th...
The Whittaker-Shannon-Kotel\u27nikov (WSK) sampling theorem plays an important role not only in harm...
AbstractWe derive two real Paley–Wiener theorems in the setting of quantum calculus. The first uses ...
Sampling and reconstruction of functions is a central tool in science. A key result is given by the ...
We use the Paley–Wiener theorem for the Fourier and Hankel transforms to compare Fourier and Hankel ...
Kramer's sampling theorem gives us the possibility to reconstruct integral transforms from their val...
In this article a generalized sampling theorem using an arbitrary sequence of sampling points is der...
AbstractOne of the most fundamental theorems in interpolation and sampling theory is the Whittaker-S...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
Sampling and reconstruction of functions is a fundamental tool in science. We develop an analogous s...
Abstract—A sampling theorem for regular sampling in shift invariant subspaces is established. The su...
The investigation of a q-analogue of the convolution on the line, started in conjunction with Koornw...
Kramer\u27s sampling theorem, which is a generalization of the Whittaker-Shannon-Kotel\u27nikov (WSK...
The sampling theorem states that any frequency bandlimited signal can be exactly reconstructed from ...
Two q-analogues of the well-known Laplace transform are defined with the help of the Jackson integra...