Frame spectral pairs and exponential bases

Abstract

Given a domain ⊂ Rd with positive and finite Lebesgue measure and a discrete set ⊂ Rd, we say that (, ) is a frame spectral pair if the set of exponential functions E():=\e2π i λ · x: λ∈ \ is a frame for L2(). 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. %(Here, ZN is the cyclic abelian group of order.) We show how to construct and obtain new classes of frame spectral pairs in Rd by "adding" frame spectral pairs in Rd and 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.