Add to ORKGIn this article, we study three interconnected inverse problems in shift invariant spaces: 1) the convolution/deconvolution problem; 2) the uniformly sampled convolution and the reconstruction problem; 3) the sampled convolution followed by sampling on irregular grid and the reconstruction problem. In all three cases, we study both the stable reconstruction as well as ill-posed reconstruction problems. We characterize the convolutors for stable deconvolution as well as those giving rise to ill-posed deconvolution. We also characterize the convolutors that allow stable reconstruction as well as those giving rise to ill-posed reconstruction from uniform sampling. The connection between stable deconvolution, and stable reconstruction from samp...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
The local reconstruction from samples is one of most desirable properties for many applications in s...
Abstract. This article discusses modern techniques for non-uni-form sampling and reconstruction of f...
Abstract. This article discusses modern techniques for nonuniform sampling and reconstruction of fun...
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spa...
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spa...
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spa...
AbstractNowadays the topic of sampling in a shift-invariant space is having a significant impact: it...
Sampling in shift invariant spaces Sampling operator (matrix) Sampling in shift invariant spaces Φ =...
AbstractBeurling–Landau-type results are known for a rather small class of functions limited to the ...
An attractive formulation of the sampling problem is based on the principle of a consistent signal r...
From an average (ideal) sampling/reconstruction process, the question arises whether the original si...
AbstractIn this paper, we study the reconstruction of functions in shift invariant subspaces from lo...
Sampling in shift invariant spaces Sampling operator (matrix) Sampling in shift invariant spaces Φ =...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
The local reconstruction from samples is one of most desirable properties for many applications in s...
Abstract. This article discusses modern techniques for non-uni-form sampling and reconstruction of f...
Abstract. This article discusses modern techniques for nonuniform sampling and reconstruction of fun...
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spa...
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spa...
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spa...
AbstractNowadays the topic of sampling in a shift-invariant space is having a significant impact: it...
Sampling in shift invariant spaces Sampling operator (matrix) Sampling in shift invariant spaces Φ =...
AbstractBeurling–Landau-type results are known for a rather small class of functions limited to the ...
An attractive formulation of the sampling problem is based on the principle of a consistent signal r...
From an average (ideal) sampling/reconstruction process, the question arises whether the original si...
AbstractIn this paper, we study the reconstruction of functions in shift invariant subspaces from lo...
Sampling in shift invariant spaces Sampling operator (matrix) Sampling in shift invariant spaces Φ =...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
We consider convolution sampling and reconstruction of signals in certain reproducing kernel subspac...
The local reconstruction from samples is one of most desirable properties for many applications in s...