Optimal small data Scattering for the generalized derivative nonlinear Schr\"odinger equations

Abstract

In this work, we consider the following generalized derivative nonlinear Schr\"odinger equation align* i∂t u+∂xx u +i |u|2σ∂x u=0, (t,x)∈ R× R. align* We prove that when σ 2, the solution is global and scattering when the initial data is small in Hs( R), 12≤ s≤1. Moreover, we show that when 0<σ<2, there exist a class of solitary wave solutions \φc\ satisfying \|φc\|H1( R) 0, when c tends to some endpoint, which is against the small data scattering statement. Therefore, in this model, the exponent σ2 is optimal for small data scattering. We remark that this exponent is larger than the short range exponent and the Strauss exponent.