A characterization of Gabor Riesz bases with separable time-frequency shifts

Abstract

A Gabor system generated by a window function g∈ L2(Rd) and a separable set × ⊂ R2d is the collection of time-frequency shifts of g given by G(g, × ) = \ e2π i · tg(t-x)\ (x,)∈ × . One of the fundamental problems in Gabor analysis is to characterize all windows and time-frequency sets that generate a Gabor frame or Gabor orthonormal basis. The case of Gabor orthonormal bases generated by characteristic functions g= has been solved by Han and Wang. In this paper, we build on these results and obtain a full characterization of Riesz Gabor systems of the form G(, × ) when is a tiling of Rd with respect to . Furthermore, for a certain class of lattices × , we prove that a necessary condition for the characteristic function of a multi-tiling set to serve as a window function for a Riesz Gabor basis is that the set must be a tiling set. To prove this, we develop new results on the zeros of the Zak transform and connect these results to Gabor frames.