On Gabor orthonormal bases over finite prime fields

Abstract

We study Gabor orthonormal windows in L2( Zpd) for translation and modulation sets A and B, respectively, where p is prime and d≥ 2. We prove that for a set E⊂ Zpd, the indicator function 1E is a Gabor window if and only if E tiles and is spectral. Moreover, we prove that for any function g: Zpd C with support E, if the size of E coincides with the size of the modulation set B or if g is positive, then g is a unimodular function, i.e., |g|=c1E, for some constant c>0, and E tiles and is spectral. We also prove the existence of a Gabor window g with full support where neither |g| nor | g| is an indicator function and |B|<<pd. We conclude the paper with an example and open questions.