Time-frequency localization and sampling of multiband signals
DOI10.1007/s10440-008-9416-yzbMath1178.94077OpenAlexW1972422297MaRDI QIDQ1038744
Publication date: 20 November 2009
Published in: Acta Applicandae Mathematicae (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10440-008-9416-y
samplinguncertainty principlesparsitycompressive samplingNyquist sampling ratetime-frequency localizationessentially time- and bandlimited signalmultiband signal
Signal theory (characterization, reconstruction, filtering, etc.) (94A12) Statistical aspects of information-theoretic topics (62B10) Sampling theory in information and communication theory (94A20)
Related Items (5)
Cites Work
- On Fourier transforms of functions supported on sets of finite Lebesgue measure
- Eigenvalue distribution of time and frequency limiting
- On Szegö's eigenvalue distribution theorem and non-Hermitian kernels
- Sampling of bandlimited functions on unions of shifted lattices
- Time-frequency and time-scale methods. Adaptive decompositions, uncertainty principles, and sampling
- An uncertainty principle for cyclic groups of prime order
- On generalized Gaussian quadratures for exponentials and their applications
- Necessary density conditions for sampling an interpolation of certain entire functions
- Perfect reconstruction formulas and bounds on aliasing error in sub-Nyquist nonuniform sampling of multiband signals
- Prolate spheroidal wavefunctions, quadrature and interpolation
- Uncertainty Principles and Signal Recovery
- A generalization of the prolate spheroidal wave functions
- Robust uncertainty principles: exact signal reconstruction from highly incomplete frequency information
- Five short stories about the cardinal series
- The Fourier transform and the discrete Fourier transform
- A note on rearrangements, spectral concentration, and the zero-order prolate spheroidal wavefunction
- Prolate Spheroidal Wave Functions, Fourier Analysis, and Uncertainty-V: The Discrete Case
- On the density of phase-space expansions
- Sampling theory approach to prolate spheroidal wavefunctions
- Minimum rate sampling and reconstruction of signals with arbitrary frequency support
- Sparsity and incoherence in compressive sampling
- 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
- Prolate Spheroidal Wave Functions, Fourier Analysis and Uncertainty - IV: Extensions to Many Dimensions; Generalized Prolate Spheroidal Functions
- The Eigenvalue Behavior of Certain Convolution Equations
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: Time-frequency localization and sampling of multiband signals
