Spectral densities of a dispersive dielectric sphere in the modified Langevin noise formalism
Abstract
This paper deals with the spectral densities of a dispersive dielectric object in the framework of macroscopic quantum electrodynamics based on the modified Langevin noise formalism. In this formalism, the electromagnetic field in the presence of a dielectric object has two contributions, one taking into account the polarization current fluctuations of the object and the other taking into account the vacuum field fluctuations scattered by the object. The combined effect of these fields on the dynamics of a quantum emitter can be described by means of two independent continuous bosonic reservoirs, a medium-assisted reservoir and a scattering-assisted reservoir, each described by its own spectral density. Therefore, for initial thermal states of the reservoirs having different temperatures, the common approach based on the dyadic Green function of the dielectric object cannot be employed. We study the interaction of a quantum emitter with these two reservoirs introducing a temperature-dependent effective spectral density of the electromagnetic environment, focusing on the case of a homogeneous dielectric sphere. We derive analytical expressions for the medium-assisted, scattering-assisted, and effective spectral densities in this setting. We then study the dynamics of the quantum emitter for initial thermal states of the two reservoirs, adopting a non-perturbative approach.