José Luis Romero scite author profile

We introduce a new notion for the deformation of Gabor systems. Such deformations are in general nonlinear and, in particular, include the standard jitter error and linear deformations of phase space. With this new notion we prove a strong deformation result for Gabor frames and Gabor Riesz sequences that covers the known perturbation and deformation results. Our proof of the deformation theorem requires a new characterization of Gabor frames and Gabor Riesz sequences. It is in the style of Beurling's characterization of sets of sampling for bandlimited functions and extends significantly the known characterization of Gabor frames "without inequalities" from lattices to non-uniform sets.Comment: 31 pages, 2 figure

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On accumulated spectrograms

Abreu

Gröchenig

Romero

2015

Trans. Amer. Math. Soc.

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Sampling theorems for shift-invariant spaces, Gabor frames, and totally positive functions

2017

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We study nonuniform sampling in shift-invariant spaces and the construction of Gabor frames with respect to the class of totally positive functions whose Fourier transform factors asĝ(ξ ) = n j=1 (1 + 2πiδ j ξ ) −1 e −cξ 2 for δ 1 , . . . , δ n ∈ R, c > 0 (in which case g is called totally positive of Gaussian type). In analogy to Beurling's sampling theorem for the Paley-Wiener space of entire functions, we prove that every separated set with lower Beurling density > 1 is a sampling set for the shift-invariant space generated by such a g. In view of the known necessary density conditions, this result is optimal and validates the heuristic reasonings in the engineering literature. Using a K. G. was supported in part by the Project P26273 -N25 of the Austrian Science Fund (FWF subtle connection between sampling in shift-invariant spaces and the theory of Gabor frames, we show that the set of phase-space shifts of g with respect to a rectangular lattice αZ × βZ forms a frame, if and only if αβ < 1. This solves an open problem going back to Daubechies in 1990 for the class of totally positive functions of Gaussian type. The proof strategy involves the connection between sampling in shift-invariant spaces and Gabor frames, a new characterization of sampling sets "without inequalities" in the style of Beurling, new properties of totally positive functions, and the interplay between zero sets of functions in a shift-invariant space and functions in the Bargmann-Fock space.Mathematics Subject Classification 42C15 · 42C40 · 94A20

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