The nonlinear Schr\"odinger equation with t-periodic data: II. Perturbative results

Abstract

We consider the nonlinear Schr\"odinger equation on the half-line with a given Dirichlet boundary datum which for large t tends to a periodic function. We assume that this function is sufficiently small, namely that it can be expressed in the form α g0b(t), where α is a small constant. Assuming that the Neumann boundary value tends for large t to the periodic function g1b(t), we show that g1b(t) can be expressed in terms of a perturbation series in α which can be constructed explicitly to any desired order. As an illustration, we compute g1b(t) to order α8 for the particular case that g0b(t) is the sum of two exponentials. We also show that there exist particular functions g0b(t) for which the above series can be summed up, and therefore for these functions g1b(t) can be obtained in closed form. The simplest such function is (iω t), where ω is a real constant.