Exact Solution for the Influence of Spectral Diffusion on Single-Molecule Photon-Statistics

Yong He, Eli Barkai

Published 2003-12-09Version 1

We investigate the distribution of number of photons emitted by a single molecule undergoing a spectral diffusion process and interacting with a continuous wave field. Using a generating function formalism an exact analytical formula for Mandel's $Q$ parameter is obtained. The solution exhibits transitions between: (i) Quantum sub-Poissonian and Classical super-Poissonian behaviors, and (ii) fast to slow modulation limits. Our solution yields the conditions on the magnitude of the spectral diffusion time scales on which these transitions are observed. We show how to choose the Rabi frequency in such a way that the Quantum sub-Poissonian nature of the emission process becomes strongest, we find ${\Omega^2 \over \Gamma} = {\Gamma_{{\rm SD}} + \Gamma \over 2}$ where $\Gamma_{{\rm SD}}$ ($\Gamma$) is the spectral diffusion (radiative) contribution to the width of the line shape.