Localization Operators On Discrete Modulation Spaces (2202.10791v2)
Abstract: In this paper, we study a class of pseudo-differential operators known as time-frequency localization operators on $\mathbb Zn$, which depend on a symbol $\varsigma$ and two windows functions $g_1$ and $g_2$. We define the short-time Fourier transform on $ \mathbb Zn \times \mathbb Tn $ and modulation spaces on $\mathbb Zn$, and present some basic properties. Then, we use modulation spaces on $\mathbb Zn \times \mathbb Tn$ as appropriate classes for symbols, and study the boundedness and compactness of the localization operators on modulation spaces on $\mathbb Zn$. Then, we show that these operators are in the Schatten--von Neumann class. Also, we obtain the relation between the Landau--Pollak--Slepian type operator and the localization operator on $\mathbb Zn$. Finally, under suitable conditions on the symbols, we prove that the localization operators are paracommutators, paraproducts and Fourier multipliers.
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