Riesz bounds for prolate shifts

Hogan, Jeffrey A.; Lakey, Joseph D.

Title: Riesz bounds for prolate shifts
Creator: Hogan, Jeffrey A.; Lakey, Joseph D.
Relation: 2017 12th International Conference on Sampling Theory and Applications (SAMPTA). Proceedings of the 2017 12th International Conference on Sampling Theory and Applications (Tallinn, Estonia 3-7 July, 2017) p. 271-274
Relation: Funding BodyARCGrant NumberDP160101537 http://purl.org/au-research/grants/arc/DP160101537
Publisher Link: http://dx.doi.org/10.1109/SAMPTA.2017.8024405
Publisher: Institute of Electrical and Electronics Engineers (IEEE)
Resource Type: conference paper
Date: 2017
Description: We investigate shifts of prolate spheroidal wave functions and more particularly the shift-invariant spaces generated by the shifts of the first N of these functions. The Markov property satisfied by the prolates is used to show that at the Nyquist rate, such collections form a Riesz basis for the associated Paley-Wiener space, although explicit Riesz bounds cannot be derived. The fact that the prolate functions are eigenfunctions of the finite Fourier transform and a quadrature estimate for integrals of complex exponentials is used to provide Riesz bounds when the sampling rate is much lower than Nyquist. In this case, the Riesz basis will typically not span all of the Paley-Wiener space.
Subject: eigenvalues and eigenfunctions; Markov processes; Fourier transforms; wave functions; upper bound; integral equations
Identifier: http://hdl.handle.net/1959.13/1386098
Identifier: uon:32356
Identifier: ISBN:9781538615652
Language: eng
Reviewed

Hits: 1100
Visitors: 1261
Downloads: 0

		Thumbnail	File	Description	Size	Format