On long time dynamics of perturbed KdV equations

Abstract

Consider perturbed KdV equations: \[ut+uxxx-6uux=ε f(u(·)), x∈T=R/Z,\;∫Tu(x,t)dx=0,\] where the nonlinearity defines analytic operators u(·) f(u(·)) in sufficiently smooth Sobolev spaces. Assume that the equation has an ε-quasi-invariant measure μ and satisfies some additional mild assumptions. Let uε(t) be a solution. Then on time intervals of order ε-1, as ε0, its actions I(uε(t,·)) can be approximated by solutions of a certain well-posed averaged equation, provided that the initial datum is μ-typical.