Frame set for Gabor systems with Haar window

We describe the full structure of the frame set for the Gabor system $G(g;\alpha ,\beta ):=\left\{e^{-2\pi im\beta \cdot }g\right(\cdot -n\alpha ):m,n\in Z\}$ with the window being the Haar function $g=-{\chi }_{[-1/2,0)}+{\chi }_{[0,1/2)}$. This is the first compactly supported window function for which the frame set is represented explicitly.

The strategy of this paper is to introduce the piecewise linear transformation $M$ on the unit circle, and to provide a complete characterization of structures for its (symmetric) maximal invariant sets. This transformation is related to the famous three gap theorem of Steinhaus which may be of independent interest. Furthermore, a classical criterion on Gabor frames is improved, which allows us to establish a necessary and sufficient condition for the Gabor system $G(g;\alpha ,\beta )$ to be a frame, i.e., the symmetric invariant set of the transformation $M$ is empty.