We study a class of quadratic time-frequency representations that, roughly speaking, are obtained by linear perturbations of the Wigner transform. They satisfy Moyal’s formula by default and share many other properties with the Wigner transform, but in general they do not belong to Cohen’s class. We provide a characterization of the intersection of the two classes. To any such time-frequency representation, we associate a pseudodifferential calculus. We investigate the related quantization procedure, study the properties of the pseudodifferential operators, and compare the formalism with that of the Weyl calculus.
Linear Perturbations of the Wigner Transform and the Weyl Quantization / Bayer, Dominik; Cordero, Elena; Gröchenig, Karlheinz; Trapasso, Salvatore Ivan. (APPLIED AND NUMERICAL HARMONIC ANALYSIS). - In: Applied and Numerical Harmonic Analysis[s.l] : Birkhauser, 2020. - ISBN 978-3-030-36137-2. - pp. 79-120 [10.1007/978-3-030-36138-9_5]
Linear Perturbations of the Wigner Transform and the Weyl Quantization
Trapasso, Salvatore Ivan.
2020
Abstract
We study a class of quadratic time-frequency representations that, roughly speaking, are obtained by linear perturbations of the Wigner transform. They satisfy Moyal’s formula by default and share many other properties with the Wigner transform, but in general they do not belong to Cohen’s class. We provide a characterization of the intersection of the two classes. To any such time-frequency representation, we associate a pseudodifferential calculus. We investigate the related quantization procedure, study the properties of the pseudodifferential operators, and compare the formalism with that of the Weyl calculus.File | Dimensione | Formato | |
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Bayer, Cordero, Groechenig, Trapasso - Chapter MLTFA 2020.pdf
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BCGT - ANHA Chapter (AAM) 2020.pdf
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https://hdl.handle.net/11583/2971950