A generalized Fourier transform of the P-quasi distribution function

TL;DR

This paper introduces a generalized Fourier transform applicable to P-quasi and Husimi distributions in complex space, extending previous results to various types of nonlinear coherent states.

Contribution

It generalizes the Fourier transform for P-quasi distributions to include nonlinear coherent states beyond canonical ones.

Findings

Unified framework for Fourier transforms of P-quasi distributions

Applicable to multiple types of nonlinear coherent states

Extends previous results to broader state classes

Abstract

In the paper we made a generalization of the Fourier transform in the complex space, applicable to the pair of Husimi and P-quasi distributions, in the representation of nonlinear coherent states. Implicitly, our result is a generalization similar result of Mehta, but which referred only to the canonical coherent states (associated with the one-dimensional harmonic oscillator). Our result is valid for both types of coherent states (defined in the Barut-Girardello, respectively Klauder-Perelomov manner).