Gabor frames for quasi-periodic functions and polyanalytic spaces on the flat cylinder
Abstract
We develop an alternative approach to the study of Fourier series, based on the Short-Time-Fourier Transform (STFT) acting on L 2(0,1), the space of measurable functions f in R, square-integrable in (0,1), and time-periodic up to a phase factor: for fixed ∈ R, equation* f(t+k)=e2π ik f(t), k∈ Z. equation* The resulting phase space is [0,1)× R, a flat model of an infinite cylinder, leading to Gabor frames with a rich structure, including a Janssen-type representation. A Gaussian window leads to a Fock space of entire functions, studied in the companion paper by the same authors [Beurling-type density theorems for sampling and interpolation on the flat cylinder]. When g is a Hermite function, we are lead to true Fock spaces of polyanalytic functions (Landau Level eigenspaces) on the vertical strip [0,1)×R. Furthermore, an analogue of the sufficient Wexler-Raz conditions is obtained. This leads to a new criteria for Gabor frames in L2(R), to sufficient conditions for Gabor frames in L 2(0,1) with Hermite windows (an analogue of a theorem of Gr\"ochenig and Lyubarskii about Gabor frames with Hermite windows) and with totally positive windows. We also consider a vectorial STFT in L 2(0,1) and the (full) Fock spaces of polyanalytic functions on [0,1)× R, associated Bargmann-type transforms, and an analogue of Vasilevski's orthogonal decomposition into true polyanalytic Fock spaces (Landau level eigenspaces on [0,1)× R). We conclude with an analogue of Gr\"ochenig-Lyubarskii's sufficient condition for Gabor super-frames with Hermite functions, equivalent to a sufficient sampling condition on the full Fock space of polyanalytic functions on [0,1)× R.
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