Related papers: Coherent and incoherent superposition of transition matrix elements of the squeezing operator

Coherent and incoherent superposition of transition matrix elements of the squeezing operator

URL: http://arxiv.org/abs/2112.08430v1
Date: Wed, 15 Dec 2021 19:17:13 GMT
Title: Coherent and incoherent superposition of transition matrix elements of the squeezing operator
Authors: Sandor Varro
Abstract summary: We describe multiphoton transitions in the system "charged particle + electromagnetic radiation" We will show that in case of interaction with a thermal field, the semi-classical result yields an acceptable approximation only in the Rayleigh-Jeans limit.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We discuss the general matrix elements of the squeezing operator between number eigenstates of a harmonic oscillator (which may also represent a quantized mode of the electromagnetic radiation). These matrix elements have first been used by Popov and Perelomov (1969) long ago, in their thorough analysis of the parametric excitation of harmonic oscillators. They expressed the matrix elements in terms of transcendental functions, the associated Legendre functions. In the present paper we will show that these matrix elements can also be expressed by the classical Gegenbauer polynomials. This new expression makes it possible to determine coherent and incoherent superpositions of these matrix elements in closed analytic forms. As an application, we describe multiphoton transitions in the system "charged particle + electromagnetic radiation", induced by a (strong) coherent field or by a black-body radiation component (with a Planck-Bose photon number distribution). The exact results are compared with the semi-classical ones. We will show that in case of interaction with a thermal field, the semi-classical result (with a Gaussian stochastic field amplitude) yields an acceptable approximation only in the Rayleigh-Jeans limit, however, in the Wien limit it completely fails.

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