Global Well-Posedness for NLS with a Class of Hs-Supercritical Data

Abstract

We study the Cauchy problem for NLS with a class of Hs-super-critical data align & iut + u+ λ |u|2 u =0, u(0)=u0 NLSabstract align and show that NLSabstract is globally well-posed and scattering in α-modulation spaces Ms,α2,1 (α∈ [0,1), \ s> dα/2-α/, ∈ N and ≥ 2/d) for the sufficiently small data. Moreover, NLS is ill-posed in Ms,α2,1 if s< dα/2-α/. In particular, we obtain a class of initial data u0 satisfying for any M 1, align \|u0\|2 M1/-d/2 , \ \ \|u0\|∞ \ =∞ , \ \ \|u0\|Ms,α2,1 ≥ M(1-α)/, \ \ \ \|u0\|Bs()2,∞ =∞ align such that NLS is globally well-posed in Ms,α2,1 if >2/d, \ α∈ [0,1)\ dα/2-α/ <s < s():= d/2-1/. Such a kind of data are super-critical in Hs() and have infinite amplitude.