Effective support, Dirac combs, and signal recovery

Abstract

Let f: ZNd C be a signal with the Fourier transform f: ZNd C. A classical result due to Matolcsi and Szucs (MS73), and, independently, to Donoho and Stark (DS89) states if a subset of frequencies \f(m)\m ∈ S of f are unobserved due to noise or other interference, then f can be recovered exactly and uniquely provided that |E| · |S|<Nd2, where E is the support of f, i.e., E=\x ∈ ZNd: f(x) =0\. In this paper, we consider signals that are Dirac combs of complexity γ, meaning they have the form f(x)=Σi=1γ ai 1Ai(x), where the sets Ai ⊂ ZNd are disjoint, ai are complex numbers, and γ ≤ Nd. We will define the concept of effective support of these signals and show that if γ is not too large, a good recovery condition can be obtained by pigeonholing under additional reasonable assumptions on the distribution of values. Our approach produces a non-trivial uncertainty principle and a signal recovery condition in many situations when the support of the function is too large to apply the classical theory.

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