Invariant Cantor manifolds of quasi-periodic solutions for the derivative nonlinear Schrodinger equation

Abstract

This paper is concerned with the derivative nonlinear Schrodinger equation with periodic boundary conditions iut+uxx+i(f(x,u,u))x=0, x∈T:=R/2πZ, where f is an analytic function of the form f(x,u,u)=μ|u|2u+f≥4(x,u,u), 0≠μ∈R, and f≥4(x,u,u) denotes terms of order at least four in u,u. We show the above equation possesses Cantor families of smooth quasi-periodic solutions of small amplitude. The proof is based on an infinite dimensional KAM theorem for unbounded perturbation vector fields.