Average and convolution sampling over shift-invariant spaces
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Publication:2075616
DOI10.1007/s11785-021-01165-9zbMath1482.94035OpenAlexW4220730967MaRDI QIDQ2075616
Ankush Kumar Garg, Devaraj Ponnaian, Yugesh Shanmugam
Publication date: 15 February 2022
Published in: Complex Analysis and Operator Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11785-021-01165-9
Nontrigonometric harmonic analysis involving wavelets and other special systems (42C40) General harmonic expansions, frames (42C15) Sampling theory in information and communication theory (94A20)
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Cites Work
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- On the zeros of the generalized Euler-Frobenius Laurent polynomial and reconstruction of cardinal splines of polynomial growth from local average samples
- A local weighted average sampling and reconstruction theorem over shift invariant subspaces
- Lattice invariant subspaces and sampling
- Perturbed sampling formulas and local reconstruction in shift invariant spaces
- Sampling in unitary invariant subspaces associated to LCA groups
- Asymmetric multi-channel sampling in shift invariant spaces
- Multivariate generalized sampling in shift-invariant spaces and its approximation properties
- Frames and sampling theorem
- On the sampling theorem for wavelet subspaces
- Irregular sampling in wavelet subspaces
- Average sampling in shift invariant subspaces with symmetric averaging functions
- Reconstruction of band-limited functions from local averages
- Average sampling in spline subspaces
- Non-uniform weighted average sampling and reconstruction in shift-invariant and wavelet spaces
- Nonuniform average sampling and reconstruction in multiply generated shift-invariant spaces
- Invariance of shift-invariant spaces
- Generalized sampling in shift invariant spaces with frames
- Beurling-Landau-type theorems for non-uniform sampling in shift invariant spline spaces
- Sampling and reconstruction of signals in a reproducing kernel subspace of \(L^p(\mathbb R^d)\)
- Generalized sampling in shift-invariant spaces with multiple stable generators
- Sampling theorems on locally compact groups from oscillation estimates
- Dual frames in \(L^2(0,1)\) connected with generalized sampling in shift-invariant spaces
- Nonuniform Sampling and Reconstruction in Shift-Invariant Spaces
- MULTI-CHANNEL SAMPLING ON SHIFT-INVARIANT SPACES WITH FRAME GENERATORS
- Sampling Expansions in Reproducing Kernel Hilbert and Banach Spaces
- SAMPLING EXPANSION IN SHIFT INVARIANT SPACES
- GENERALIZED IRREGULAR SAMPLING IN SHIFT-INVARIANT SPACES
- A sampling theorem for wavelet subspaces
- Ten Lectures on Wavelets
- Reconstruction Algorithms in Irregular Sampling
- Exact iterative reconstruction algorithm for multivariate irregularly sampled functions in spline-like spaces: The 𝐿^{𝑝}-theory
- Irregular sampling theorems for wavelet subspaces
- Reconstruction of band-limited signals from local averages
- Reconstruction of functions in spline subspaces from local averages
- Generalized Sampling in $${L}^{2}({\mathbb{R}}^{d})$$ Shift-Invariant Subspaces with Multiple Stable Generators
- CHANNELED SAMPLING IN SHIFT INVARIANT SPACES
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