Modified scattering for the critical nonlinear Schr\"odinger equation

Abstract

We consider the nonlinear Schr\"odinger equation iut + u= λ |u| 2 N u in all dimensions N 1, where λ ∈ C and λ 0. We construct a class of initial values for which the corresponding solution is global and decays as t ∞ , like t- N 2 if λ =0 and like (t t)- N 2 if λ <0. Moreover, we give an asymptotic expansion of those solutions as t ∞ . We construct solutions that do not vanish, so as to avoid any issue related to the lack of regularity of the nonlinearity at u=0. To study the asymptotic behavior, we apply the pseudo-conformal transformation and estimate the solutions by allowing a certain growth of the Sobolev norms which depends on the order of regularity through a cascade of exponents.