The cubic szego equation and hankel operators

Abstract

This monograph is an expanded version of the preprint arXiv:1402.1716 or hal-00943396v1.It is devoted to the dynamics on Sobolev spaces of the cubic Szeg\"o equation on the circle S 1, i∂ \t u= ( u 2u)\ .Here denotes the orthogonal projector from L2( S 1) onto the subspace L2\+( S 1) of functions with nonnegative Fourier modes.We construct a nonlinear Fourier transformation on H1/2( S 1) L2\+( S 1) allowing to describe explicitly the solutions of this equationwith data in H1/2( S 1) L2\+( S 1). This explicit description implies almost-periodicity of every solution in H 12\+. Furthermore, it allows to display the following turbulence phenomenon. For a dense G\δ subset of initial data in C∞ ( S 1) L2\+( S 1), the solutions tend to infinity in Hs for every s 12 with super--polynomial growth on some sequence of times, while they go back to their initial data on another sequence of times tending to infinity. This transformation is defined by solving a general inverse spectral problem involving singular values of a Hilbert--Schmidt Hankel operator and of its shifted Hankel operator.