Add to ORKGSufficient conditions are established in order that, for a fixed infinite set of sampling points on the full line, a function satisfies a sampling theorem on a suitable closed subspace of a unitarily translation invariant reproducing kernel Hilbert space. A number of examples of such reproducing kernel Hilbert spaces and the corresponding sampling expansions are given. Sampling theorems for functions on the half-line are also established in RKHS using Riesz bases in subspaces of L2 (ℝ+)
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
summary:Let $H(K)$ be the Hilbert space with reproducing kernel $K$. This paper characterizes some...
Sufficient conditions are established in order that, for a fixed infinite set of sampling points on ...
Sufficient conditions are established in order that, for a fixed infi-nite set of sampling points on...
Abstract: We present a converse Kramer type sampling theorem over semi-inner product reproducing k...
This work focuses on the study of sampling formulas for the range space H of a linear transform defi...
In this chapter, we consider a variety of Hilbert and Banach spaces that admit sampling expansions, ...
The theme of sampling is the reconstruction of a function from its values at a set of points in its ...
In this chapter, we consider a variety of Hilbert and Banach spaces that admit sampling expansions, ...
Abstract—A perfect reconstruction of functions in a reproducing kernel Hilbert space from a given se...
Given a countable subset Λ of a set Ω, we investigate the construction of all the reproducing kernel...
Given a countable subset of a set , we investigate the construction of all the reproducing kernel Hi...
Given a countable subset Λ of a set Ω, we investigate the construction of all the reproducing kernel...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
summary:Let $H(K)$ be the Hilbert space with reproducing kernel $K$. This paper characterizes some...
Sufficient conditions are established in order that, for a fixed infinite set of sampling points on ...
Sufficient conditions are established in order that, for a fixed infi-nite set of sampling points on...
Abstract: We present a converse Kramer type sampling theorem over semi-inner product reproducing k...
This work focuses on the study of sampling formulas for the range space H of a linear transform defi...
In this chapter, we consider a variety of Hilbert and Banach spaces that admit sampling expansions, ...
The theme of sampling is the reconstruction of a function from its values at a set of points in its ...
In this chapter, we consider a variety of Hilbert and Banach spaces that admit sampling expansions, ...
Abstract—A perfect reconstruction of functions in a reproducing kernel Hilbert space from a given se...
Given a countable subset Λ of a set Ω, we investigate the construction of all the reproducing kernel...
Given a countable subset of a set , we investigate the construction of all the reproducing kernel Hi...
Given a countable subset Λ of a set Ω, we investigate the construction of all the reproducing kernel...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
An analog of the Whittaker-Shannon-Kotel\u27nikov sampling theorem is derived for functions with val...
summary:Let $H(K)$ be the Hilbert space with reproducing kernel $K$. This paper characterizes some...