Stochastic CGL equations without linear dispersion in any space dimension

Abstract

We consider the stochastic CGL equation u- u+(i+a) |u|2u =η(t,x),\;\;\; dim \,x=n, where >0 and a 0, in a cube (or in a smooth bounded domain) with Dirichlet boundary condition. The force η is white in time, regular in x and non-degenerate. We study this equation in the space of continuous complex functions u(x), and prove that for any n it defines there a unique mixing Markov process. So for a large class of functionals f(u(·)) and for any solution u(t,x), the averaged observable f(u(t,·)) converges to a quantity, independent from the initial data u(0,x), and equal to the integral of f(u) against the unique stationary measure of the equation.