Small data well-posedness for derivative nonlinear Schr\"odinger equations

Abstract

We study the generalized derivative nonlinear Schr\"odinger equation i∂t u+ u = P(u,u,∂x u,∂x u), where P is a polynomial, in Sobolev spaces. It turns out that when deg P≥ 3, the equation is locally well-posed in H12 when each term in P contains only one derivative, otherwise we have a local well-posedness in H32. If deg P ≥ 5, the solution can be extended globally. By restricting to equations of the form i∂t u+ u = ∂x P(u,u) with deg P≥5, we were able to obtain the global well-posedness in the critical Sobolev space.