Exact solution of a nonlinear Langevin equation with applications to photoelectron counting and noise-induced instability
- 1 June 1983
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 24 (6) , 1401-1404
- https://doi.org/10.1063/1.525874
Abstract
A stochastic differential equation of the Langevin type involving a linear and a quadratic noise is considered and an exact solution for the stochastic average of this equation is obtained. This solution is employed to calculate the effect of amplitude fluctuations of an electromagnetic field on the photoelectron counting, and an explicit expression is obtained for the photon counting probability. Finally, the steady state limit is studied and the possibility of an instability induced by the noise is discussed.Keywords
This publication has 15 references indexed in Scilit:
- Theory of nonlinear Langevin equation with quadratic noiseJournal of Mathematical Physics, 1982
- Path-integral approach to problems in quantum opticsPhysical Review A, 1982
- Theory of nonlinear Gaussian noiseZeitschrift für Physik B Condensed Matter, 1981
- Multiphoton ionization rate with a non-Lorentzian-band-shape laserPhysical Review A, 1981
- Theory of photoelectron counting statistics: An essayPhysics Reports, 1980
- Laser temporal coherence effects in two-photon resonant three-photon ionisationJournal of Physics B: Atomic and Molecular Physics, 1980
- ac Stark splitting in double optical resonance and resonance fluorescence by a nonmonochromatic chaotic fieldPhysical Review A, 1979
- Gaussian stochastic processes in physicsPhysics Reports, 1978
- Cooperative phenomena in systems far from thermal equilibrium and in nonphysical systemsReviews of Modern Physics, 1975
- Coherence Properties of Optical FieldsReviews of Modern Physics, 1965