Gabor frames generated by Random-Periodic time-frequency shifts
Abstract
In this article, we consider a variation of the existence of Gabor frames in a probabilistic setting, in which we consider time-frequency shifts taken over random-periodic sets. We demonstrate that the method of selecting random-periodic time-frequency shifts is successful with high probability for specific categories of well-behaved functions, notably including Hermite functions, totally positive functions, and B-spline functions. In particular, we show that if x1, x2, … ,xm are independent and uniformly distributed in [0,1), with m sufficiently large, then the set of time-frequency shifts × , where = + \x1, x2, …, xm\, forms Gabor frame with high probability.
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