Prolate Shift Frames and Sampling of Bandlimited Functions

Hogan, Jeffery A.; Lakey, Joseph D.

Title: Prolate Shift Frames and Sampling of Bandlimited Functions
Creator: Hogan, Jeffery A.; Lakey, Joseph D.
Relation: ARC.DP160101537 http://purl.org/au-research/grants/arc/DP160101537
Relation: Sampling: Theory and Applications A Centennial Celebration of Claude Shannon p. 141-167
Relation: Applied and Numerical Harmonic Analysis
Publisher Link: http://dx.doi.org/10.1007/978-3-030-36291-1_5
Publisher: Birkhauser
Resource Type: book chapter
Date: 2020
Description: The Shannon sampling theorem can be viewed as a special case of (generalized) sampling reconstructions for bandlimited signals in which the signal is expressed as a superposition of shifts of finitely many bandlimited generators. The coefficients of these expansions can be regarded as generalized samples taken at a Nyquist rate determined by the number of generators and basic shift rate parameter. When the shifts of the generators form a frame for the Paley-Wiener space, the coefficients are inner products with dual frame elements. There is a tradeoff between time localization of the generators and localization of dual generators. The Shannon sampling theorem is an extreme manifestation in which the coefficients are point values but the generating sinc function is poorly localized in time. This work reviews and extends some recent related work of the authors regarding frames for the Paley Wiener space generated by shifts of prolate spheroidal wave functions, and the question of tradeoff between localization of the generators and of the dual frames is considered.
Subject: prolate spheroidal wave function; bandpass prolate; prolate shift frame; Paley–Wiener space
Identifier: http://hdl.handle.net/1959.13/1445659
Identifier: uon:42638
Identifier: ISBN:9783030362911
Language: eng

Hits: 919
Visitors: 918
Downloads: 0

		Thumbnail	File	Description	Size	Format