Sampling theorem and reconstruction formula for the space of translates on the Heisenberg group
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Publication:2699531
DOI10.3934/cpaa.2022161OpenAlexW4313378951MaRDI QIDQ2699531
Publication date: 19 April 2023
Published in: Communications on Pure and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1902.01531
General harmonic expansions, frames (42C15) Harmonic analysis in several variables (42B99) Sampling theory in information and communication theory (94A20)
Cites Work
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- A Mathematical Theory of Communication
- On the sampling theorem for wavelet subspaces
- Harmonic analysis on the Heisenberg group
- Frames and Riesz bases for shift invariant spaces on the abstract Heisenberg group
- Left translates of a square integrable function on the Heisenberg group
- Shift-invariant system on the Heisenberg group
- Bracket map for the Heisenberg group and the characterization of cyclic subspaces
- Orthonormality of wavelet system on the Heisenberg group
- On Paley-Wiener theorems for the Heisenberg group
- A sampling theorem for the twisted shift-invariant space
- Necessary density conditions for sampling an interpolation of certain entire functions
- Frames and bases. An introductory course
- Spaces invariant under unitary representations of discrete groups
- Reproducing formulas for generalized translation invariant systems on locally compact abelian groups
- A sampling theorem for wavelet subspaces
- Sampling Theory for not Necessarily Band-Limited Functions: A Historical Overview
- Harmonic Analysis in Phase Space. (AM-122)
- Frames generated by compact group actions
- Shift-invariant Spaces with Countably Many Mutually Orthogonal Generators on the Heisenberg group
- Wavelet system and Muckenhoupt $\mathcal {A}_2$ condition on the Heisenberg group
- Some notes on an expansion theorem of Paley and Wiener
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