English

Gabor orthonormal bases generated by the unit cubes

Functional Analysis 2016-05-03 v1

Abstract

We consider the problem in determining the countable sets Λ\Lambda in the time-frequency plane such that the Gabor system generated by the time-frequency shifts of the window χ[0,1]d\chi_{[0,1]^d} associated with Λ\Lambda forms a Gabor orthonormal basis for L2(Rd) L^2({\Bbb R}^d). We show that, if this is the case, the translates by elements Λ\Lambda of the unit cube in R2d{\Bbb R}^{2d} must tile the time-frequency space R2d{\Bbb R}^{2d}. By studying the possible structure of such tiling sets, we completely classify all such admissible sets Λ\Lambda of time-frequency shifts when d=1,2d=1,2. Moreover, an inductive procedure for constructing such sets Λ\Lambda in dimension d3d\ge 3 is also given. An interesting and surprising consequence of our results is the existence, for d2d\geq 2, of discrete sets Λ\Lambda with G(χ[0,1]d,Λ){\mathcal G}(\chi_{[0,1]^d},\Lambda) forming a Gabor orthonormal basis but with the associated "time"-translates of the window χ[0,1]d\chi_{[0,1]^d} having significant overlaps.

Cite

@article{arxiv.1411.7765,
  title  = {Gabor orthonormal bases generated by the unit cubes},
  author = {Jean-Pierre Gabardo and Chun-Kit Lai and Yang Wang},
  journal= {arXiv preprint arXiv:1411.7765},
  year   = {2016}
}
R2 v1 2026-06-22T07:14:47.397Z