Stochastic approach to generalized Schr\"odinger equation: A method of eigenfunction expansion

Abstract

Using a method of eigenfunction expansion, a stochastic equation is developed for the generalized Schr\"odinger equation with random fluctuations. The wave field is expanded in terms of eigenfunctions: = Σn an (t) φn (x) , with φn being the eigenfunction that satisfies the eigenvalue equation H0 φn = λn φn , where H0 is the reference "Hamiltonian" conventionally called "unperturbed" Hamiltonian. The Langevin equation is derived for the expansion coefficient an (t) , and it is converted to the Fokker--Planck (FP) equation for a set \ an \ under the assumption of the Gaussian white noise for the fluctuation. This procedure is carried out by a functional integral, in which the functional Jacobian plays a crucial role for determining the form of the FP equation. The analyses are given for the FP equation by adopting several approximate schemes.