"Frame Spectral Pairs and Exponential Bases" by Christina Frederick and Azita Mayeli
 

Frame Spectral Pairs and Exponential Bases

Document Type

Article

Publication Date

10-1-2021

Abstract

Given a domain Ω⊂ Rd with positive and finite Lebesgue measure and a discrete set Λ⊂ Rd, we say that (Ω, Λ) is a frame spectral pair if the set of exponential functions E(Λ) : = { e2πiλ·x: λ∈ Λ} is a frame for L2(Ω). Special cases of frames include Riesz bases and orthogonal bases. In the finite setting ZNd, d, N≥ 1 , a frame spectral pair can be similarly defined. In this paper we show how to construct and obtain new classes of frame spectral pairs in Rd by “adding” a frame spectral pair in Rd to a frame spectral pair in ZNd. Our construction unifies the well-known examples of exponential frames for the union of cubes with equal volumes. We also remark on the link between the spectral property of a domain and sampling theory.

Identifier

85113175006 (Scopus)

Publication Title

Journal of Fourier Analysis and Applications

External Full Text Location

https://doi.org/10.1007/s00041-021-09872-9

e-ISSN

15315851

ISSN

10695869

Issue

5

Volume

27

Grant

1720306

Fund Ref

National Science Foundation

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