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JAT
2007

Characterization and perturbation of Gabor frame sequences with rational parameters

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Characterization and perturbation of Gabor frame sequences with rational parameters
Let A ⊂ L2(R) be at most countable, and p, q ∈ N. We characterize various frame-properties for Gabor systems of the form G(1, p/q,A) = {e2 imxg(x − np/q) : m, n ∈ Z, g ∈ A} in terms of the corresponding frame properties for the row vectors in the Zibulski–Zeevi matrix. This extends work by [Ron and Shen, Weyl–Heisenberg systems and Riesz bases in L2(Rd). Duke Math. J. 89 (1997) 237–282], who considered the case where A is finite. As a consequence of the results, we obtain results concerning stability of Gabor frames under perturbation of the generators. We also introduce the concept of rigid frame sequences, which have the property that all sufficiently small perturbations with a lower frame bound above some threshold value, automatically generate the same closed linear span. Finally, we characterize rigid Gabor frame sequences in terms of their Zibulski–Zeevi matrix. © 2007 Elsevier Inc. All rights reserved. MSC: Primary 42C40
Marcin Bownik, Ole Christensen
Added 15 Dec 2010
Updated 15 Dec 2010
Type Journal
Year 2007
Where JAT
Authors Marcin Bownik, Ole Christensen
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