The abc-problem for Gabor systems

A longstanding problem in Gabor theory is to identify time-frequency shifting lattices $a\mathbb{Z}\times b\mathbb{Z}$ and ideal window functions $\chi_I$ on intervals $I$ of length $c$ such that $\{e^{-2\pi i n bt} \chi_I(t- m a):\ (m, n)\in \mathbb{Z}\times \mathbb{Z}\}$ are Gabor frames for the space of all square-integrable functions on the real line. In this paper, the authors create a time-domain approach for Gabor frames, introduce novel techniques involving invariant sets of non-contractive and non-measure-preserving transformations on the line, and provide a complete answer to the above $abc$-problem for Gabor systems.

Introduction Gabor frames and infinite matrices Maximal invariant sets Piecewise linear transformations Maximal invariant sets with irrational time Shifts Maximal invariant sets with rational time shifts The $abc$-problem for Gabor systems Appendix A. Algorithm Appendix B. Uniform sampling of signals in a shift-invariant space Bibliography