The famous Shannon sampling theorem gives an answer to the question of how a one-dimensional time-dependent bandlimited signal can be reconstructed from discrete values in lattice points. In this work, we are concerned with multi-variate Hardy-type lattice point identities from which space-dependent Shannon-type sampling theorems can be obtained by straightforward integration over certain regular regions. An answer is given to the problem of how a signal bandlimited to a regular region in q-dimensional Euclidean space allows a reconstruction from discrete values in the lattice points of a (general) q-dimensional lattice. Weighted Hardy-type lattice point formulas are derived to allow explicit characterizations of over- and undersampling, th...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
AbstractNowadays the topic of sampling in a shift-invariant space is having a significant impact: it...
A historical overview leading to present generalizations of Shannon\u27s sampling theorem (1949) and...
Sampling Theory is that branch of mathematics which seeks to reconstruct functions from their values...
The well-known Whittaker-Kotel'nikov-Shannon sampling theorem for frequency-bandlimited functions of...
Recently a new sampling lattice - the quincunx lattice - has been introduced [1] as a sampling geome...
In this article a generalized sampling theorem using an arbitrary sequence of sampling points is der...
In this paper we discuss the interplay between discrete-time and continuous-time signals and the que...
The generalization of the sampling theorem to multidimensional signals is considered, with or withou...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
AbstractSampling series expansions for functions (signals) that are bandlimited to N-dimensional rec...
This paper presents an account of the current state of sampling, 50 years after Shannon’s formulatio...
We provide a method for constructing regular sampling lattices in arbitrary dimensions together with...
Shannon’s sampling formula has been extended for subspaces of a multiresolution analysis in L2(R). T...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
AbstractNowadays the topic of sampling in a shift-invariant space is having a significant impact: it...
A historical overview leading to present generalizations of Shannon\u27s sampling theorem (1949) and...
Sampling Theory is that branch of mathematics which seeks to reconstruct functions from their values...
The well-known Whittaker-Kotel'nikov-Shannon sampling theorem for frequency-bandlimited functions of...
Recently a new sampling lattice - the quincunx lattice - has been introduced [1] as a sampling geome...
In this article a generalized sampling theorem using an arbitrary sequence of sampling points is der...
In this paper we discuss the interplay between discrete-time and continuous-time signals and the que...
The generalization of the sampling theorem to multidimensional signals is considered, with or withou...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
AbstractSampling series expansions for functions (signals) that are bandlimited to N-dimensional rec...
This paper presents an account of the current state of sampling, 50 years after Shannon’s formulatio...
We provide a method for constructing regular sampling lattices in arbitrary dimensions together with...
Shannon’s sampling formula has been extended for subspaces of a multiresolution analysis in L2(R). T...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
AbstractNowadays the topic of sampling in a shift-invariant space is having a significant impact: it...