Nonlinear fractional Schr\"odinger equations in one dimension

Abstract

We consider the question of global existence of small, smooth, and localized solutions of a certain fractional semilinear cubic NLS in one dimension, i∂t u - u = c0|u|2 u + c1 u3 + c2 u u2 + c3 u3, = (∂x) = |∂x|(1/2), where c0∈R and c1,c2,c3∈C. This model is motivated by the two-dimensional water waves equations, which have a somewhat similar structure in the Eulerian formulation, in the case of irrotational flows. We show that one cannot expect linear scattering, even in this simplified model. More precisely, we identify a suitable nonlinear logarithmic correction, and prove global existence and modified scattering of solutions.