Traveling waves of the quintic focusing NLS-Szeg\"o equation

Abstract

We study the influence of Szeg\"o projector on the L 2 --critical one-dimensional non linear focusing Schr\"odinger equation, leading to the quintic focusing NLS-Szeg\"o equation i∂ t u + ∂ 2 x u + (|u| 4 u) = 0, (t, x) ∈ R x R, u(0, ×) = u 0. This equation is globally well-posed in H 1 + = (H 1 (R)), for every initial datum u 0. The solution L 2-scatters both forward and backward in time if u 0 has sufficiently small mass. We prove the orbital stability with scaling of the traveling wave : u ω,c (t, x) = e iωt Q(x + ct), for some ω, c > 0, where Q is a ground state associated to Gagliardo-Nirenberg type functional I (γ) (f) = ∂ x f 2 L 2 f 4 L 2 + γ --i∂ x f, f 2 L 2 f 2 L 2 f 6 L 6 , ∀f ∈ H 1 + \0, for some γ 0. The ground states are completely classified in the case γ = 2, leading to the actual orbital stability without scaling for appropriate traveling waves. As a consequence, the scattering mass threshold of the focusing quintic NLS-Szeg\"o equation is strictly below the mass of ground state associated to the functional I (0) , unlike the recent result by Dodson [6] on the usual quintic focusing non linear Schr\"odinger equation.