Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles (N ≥ 1) have been studied extensively; however, if a function is bandlimited to a general region in RN, not much is known about its sampling series expansion. In this paper, we derive a sampling theorem for functions that are bandlimited (in the sense of Kramer) to finite regions with smooth boundaries in RN. The sampling series expansions obtained for these functions are Lagrange-type interpolation series. Our technique utilizes Green′s function of the region involved. As an application of our sampling theorem, we obtain a new method for summing infinite series in several variables. © 1994 Academic Press, Inc
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
We use the eigenfunction expansion of Green's function of Dirichlet problems to obtain sampling theo...
An expansion related to the sampling theorem is derived for functions with Fourier transforms that v...
AbstractSampling series expansions for functions (signals) that are bandlimited to N-dimensional rec...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Kramer\u27s sampling theorem, which is a generalization of the Whittaker-Shannon-Kotel\u27nikov (WSK...
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 ...
The sampling theorem for bandlimited functions allows one to reconstruct exactly a function containi...
We derive a sampling expansion for bandlimited signals with polynomial growth on the real axis. The ...
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
In recent years many of the results for bandlimited sampling have been extended to the case of nonba...
This master thesis presents a short introduction into the field of sampling of functions of one vari...
We use a discrete version of Kramer's sampling theorem to derive sampling expansions for discrete tr...
Abstract. 1 In recent years many of the results for band limited sampling have been extended to the ...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
We use the eigenfunction expansion of Green's function of Dirichlet problems to obtain sampling theo...
An expansion related to the sampling theorem is derived for functions with Fourier transforms that v...
AbstractSampling series expansions for functions (signals) that are bandlimited to N-dimensional rec...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Kramer\u27s sampling theorem, which is a generalization of the Whittaker-Shannon-Kotel\u27nikov (WSK...
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 ...
The sampling theorem for bandlimited functions allows one to reconstruct exactly a function containi...
We derive a sampling expansion for bandlimited signals with polynomial growth on the real axis. The ...
AbstractWe present a new approach to the problem of irregular sampling of band-limited functions tha...
In recent years many of the results for bandlimited sampling have been extended to the case of nonba...
This master thesis presents a short introduction into the field of sampling of functions of one vari...
We use a discrete version of Kramer's sampling theorem to derive sampling expansions for discrete tr...
Abstract. 1 In recent years many of the results for band limited sampling have been extended to the ...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
We use the eigenfunction expansion of Green's function of Dirichlet problems to obtain sampling theo...
An expansion related to the sampling theorem is derived for functions with Fourier transforms that v...