Recovering signals from inner products involving prolate spheroidals in the presence of jitter
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Publication:4821048
DOI10.1090/S0025-5718-04-01648-5zbMath1093.94017OpenAlexW2101665694MaRDI QIDQ4821048
Publication date: 7 October 2004
Published in: Mathematics of Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/s0025-5718-04-01648-5
Application of orthogonal and other special functions (94A11) Sampling theory in information and communication theory (94A20) Lamé, Mathieu, and spheroidal wave functions (33E10)
Related Items (2)
Analysis of spectral approximations using prolate spheroidal wave functions ⋮ A new generalization of the PSWFs with applications to spectral approximations on quasi-uniform grids
Cites Work
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- Optimal complexity recovery of band- and energy-limited signals
- On approximation of band-limited signals
- Optimal complexity recovery of band- and energy-limited signals. II
- Approximating band- and energy-limited signals in the presence of jitter
- Recovering linear operators from inaccurate data
- On the eivenvalues of an integral equation arising in the theory of band-limited signals
- n-Widths and Optimal Interpolation of Time- and Band-Limited Functions II
- Noisy Information and Computational Complexity
- Approximating linear functionals on unitary spaces in the presence of bounded data errors with applications to signal recovery
- Some Asymptotic Expansions for Prolate Spheroidal Wave Functions
- Prolate Spheroidal Wave Functions, Fourier Analysis and Uncertainty - I
- Prolate Spheroidal Wave Functions, Fourier Analysis and Uncertainty - II
- Prolate Spheroidal Wave Functions, Fourier Analysis and Uncertainty-III: The Dimension of the Space of Essentially Time- and Band-Limited Signals
- The Eigenvalue Behavior of Certain Convolution Equations
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