Convergence to Scattering States in the Nonlinear Schr\"odinger Equation

Abstract

In this paper, we consider global solutions of the following nonlinear Schr\"odinger equation iut+ u+λ|u|α u = 0, in N, with λ∈, α∈(0,4N-2) (α∈(0,∞) if N=1) and u(0)∈ X H1(N) L2(|x|2;dx). We show that, under suitable conditions, if the solution u satisfies e-itu(t)-u 0 in X as t∞ then u(t)-eitu0 in X as t∞. We also study the converse. Finally, we estimate |\:\|u(t)\|X-\|eitu\|X\:| under some less restrictive assumptions.