On the final-state problem for the 1D cubic NLS

Abstract

We consider the one-dimensional cubic nonlinear Schrödinger equation ∂tu+12∂xxu=|u|2u,\,λ= 1 and solve the final-state (modified wave operator) problem for small asymptotic data. More precisely, given a small W(ξ), we construct a solution u such that equation* u→ (2π)-1/2( t)-1/2e x2/(2t)\, W\!(xt)(-|W(x/t)|2 t). equation* Crucially, we design a contraction map, so that we can run the analysis in the spirit of Kato--Pusateri KP for w with a forcing term depending only on the final data W. This scheme is easy to adapt to solving final state problems with a complete theory for the forward problems.