Gibbs measures associated to the integrals of motion of the periodic derivative nonlinear Schr\"odinger equation

Abstract

We study the one dimensional periodic derivative nonlinear Schr\"odinger (DNLS) equation. This is known to be a completely integrable system, in the sense that there is an infinite sequence of formal integrals of motion ∫ hk, k∈ Z+. In each ∫ h2k the term with the highest regularity involves the Sobolev norm Hk(T) of the solution of the DNLS equation. We show that a functional measure on L2(T), absolutely continuous w.r.t. the Gaussian measure with covariance (I+(-)k)-1, is associated to each integral of motion ∫ h2k, k≥1.