Criteria for the existence of Schwartz Gabor frames over rational lattices

Ulrik Enstad, Hannes Thiel, Eduard Vilalta
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Abstract

We give an explicit criterion for a rational lattice in the time-frequency plane to admit a Gabor frame with window in the Schwartz class. The criterion is an inequality formulated in terms of the lattice covolume, the dimension of the underlying Euclidean space, and the index of an associated subgroup measuring the degree of non-integrality of the lattice. For arbitrary lattices we also give an upper bound on the number of windows in the Schwartz class needed for a multi-window Gabor frame.
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有理网格上施瓦茨 Gabor 框架的存在标准
我们给出了一个明确的标准,要求时频平面上的有理晶格能够容纳 Schwartz 类窗口的 Gabor 框架。该判据是一个不等式,它是用网格卷积、底层欧几里得空间的维数以及衡量网格非积分程度的相关子群的指数来表示的。对于任意网格,我们还给出了多窗口 Gabor 框架所需的 Schwartz 类窗口数量的上限。
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