Sampling Theory is that branch of mathematics which seeks to reconstruct functions from their values at a discrete set of points. The fundamental result in Sampling Theory, known as Shannon's Sampling Theorem, has many applications to signal processing and communications engineering. We will demonstrate Shannon's result via complex interpolation methods. We then quote a result of Casey which uses these methods to solve interpolation problems on unions of non-commensurate lattices, which are created via specific number theoretic guidelines. These interpolations give Shannon-type reconstructions on these lattices. We close by doing simulations in MATLAB of the sampling reconstructions on these non-commensurate grids.Source: Masters Abstracts ...
The well-known Whittaker-Kotel'nikov-Shannon sampling theorem for frequency-bandlimited functions of...
In this paper we discuss the interplay between discrete-time and continuous-time signals and the que...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
The famous Shannon sampling theorem gives an answer to the question of how a one-dimensional time-de...
This paper presents an account of the current state of sampling, 50 years after Shannon’s formulatio...
A historical overview leading to present generalizations of Shannon\u27s sampling theorem (1949) and...
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...
Roughly speaking sampling theory deals with determining whether we can or can not recover a continuo...
In this paper, the authors have provided a brief review of the recent advances in the Shannon sampli...
In this article, by defining the generalized co-dimension-p sinc function, the corresponding sinc in...
This paper presents an account of the current state of sampling, 50 years after Shannon's formulatio...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...
The generalization of the sampling theorem to multidimensional signals is considered, with or withou...
The well-known Whittaker-Kotel'nikov-Shannon sampling theorem for frequency-bandlimited functions of...
In this paper we discuss the interplay between discrete-time and continuous-time signals and the que...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...
Sampling Theory is the branch of mathematics that seeks to reconstruct functions from knowledge of t...
The famous Shannon sampling theorem gives an answer to the question of how a one-dimensional time-de...
This paper presents an account of the current state of sampling, 50 years after Shannon’s formulatio...
A historical overview leading to present generalizations of Shannon\u27s sampling theorem (1949) and...
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...
Roughly speaking sampling theory deals with determining whether we can or can not recover a continuo...
In this paper, the authors have provided a brief review of the recent advances in the Shannon sampli...
In this article, by defining the generalized co-dimension-p sinc function, the corresponding sinc in...
This paper presents an account of the current state of sampling, 50 years after Shannon's formulatio...
The classical sampling problem is to reconstruct entire functions with given spectrum S from their v...
The generalization of the sampling theorem to multidimensional signals is considered, with or withou...
The well-known Whittaker-Kotel'nikov-Shannon sampling theorem for frequency-bandlimited functions of...
In this paper we discuss the interplay between discrete-time and continuous-time signals and the que...
73 pages, 4 figures.Sampling Theory deals with the reconstruction of functions (signals) through the...