Time-Frequency Shift Invariance of Gabor Spaces with an S0-Generator

Abstract

We consider Gabor Riesz sequences generated by a lattice ⊂ R2 and a window function g ∈ L2(R) which is well localized in both time and frequency. When g belongs to the Feichtinger algebra, we prove that only those time-frequency shifts with parameters from the lattice leave the corresponding Gabor space invariant. This improves on earlier results where only lattices of rational density were considered. A slightly weaker result is proved - again for lattices of general density - under the regularity assumptions of the classical Balian-Low theorem, where both g and its Fourier transform belong to the Sobolev space H1(R). The proof relies on a combination of methods from time-frequency analysis and the theory of C-algebras, specifically the so-called irrational rotation algebra.