Gabor (Super)Frames with Hermite Functions

Abstract

We investigate vector-valued Gabor frames (sometimes called Gabor superframes) based on Hermite functions Hn. Let h= (H0, H1, ..., Hn) be the vector of the first n+1 Hermite functions. We give a complete characterization of all lattices ⊂eq 2 such that the Gabor system \e2π i λ2 t (t-λ1): λ = (λ1, λ2) ∈ \ is a frame for L2 (, n+1). As a corollary we obtain sufficient conditions for a single Hermite function to generate a Gabor frame and a new estimate for the lower frame bound. The main tools are growth estimates for the Weierstrass σ -function, a new type of interpolation problem for entire functions on the Bargmann-Fock space, and structural results about vector-valued Gabor frames.