Localization operators on Bergman and Fock spaces

Abstract

We introduce localization operators on weighted Bergman and Fock spaces and show that, under a natural scaling of symbols and window functions, localization operators on the weighted Bergman space Aβ r22 converge, in the weak sense, to localization operators on the Fock space Fβ2 as r∞. From this we derive several applications, including one about sharp norm estimates for certain Toeplitz operators on Fock spaces, one about windowed Berezin transforms for weighted Bergman spaces, and another about Szeg\"o-type theorems for localization operators on weighted Bergman spaces.

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