Khasminskii--Whitham averaging for randomly perturbed KdV equation

Abstract

We consider the damped-driven KdV equation u-uxx+uxxx-6uux= η(t,x), x∈ S1, ∫ u dx ∫η dx0, where 0<1 and the random process η is smooth in x and white in t. For any periodic function u(x) let I=(I1,I2,...) be the vector, formed by the KdV integrals of motion, calculated for the potential u(x). We prove that if u(t,x) is a solution of the equation above, then for 0 t-1 and 0 the vector I(t)=(I1(u(t,·)),I2(u(t,·)),...) satisfies the (Whitham) averaged equation.