A Unified Approach to Time-Frequency Representations and Generalized Spectrogram
Abstract
To overcome the impossibility of representing the energy of a signal simultaneously in time and frequency, many time-frequency representations have been introduced in the literature. Some of these are recalled in the Introduction. In this work we propose a unified approach of the previous theory by means of metaplectic Wigner distributions , with symplectic matrix in , which were introduced by Cordero, Rodino (2022) and then widely studied in subsequent papers. Namely, the short-time Fourier transform and the most popular members of the Cohen's class can be represented via metaplectic Wigner distributions. In particular, we introduce -metaplectic spectrograms which contain the classical ones and their variations arising from the -Wigner distributions of Boggiatto, De Donno, and Oliaro (2010). We provide a complete characterization of those -Wigner distributions which give rise to generalized spectrograms. This characterization is related to the block decomposition of the symplectic matrix . Moreover, a characterization of the -boundedness of both -Wigner distributions and related metaplectic pseudodifferential operators is provided.
Cite
@article{arxiv.2401.03882,
title = {A Unified Approach to Time-Frequency Representations and Generalized Spectrogram},
author = {Elena Cordero and Gianluca Giacchi and Luigi Rodino},
journal= {arXiv preprint arXiv:2401.03882},
year = {2025}
}