On global well-posedness, scattering and other properties for infinity energy solutions to inhomogeneous NLS Equation

Abstract

In this work, we consider the inhomogeneous nonlinear Schr\"odinger (INLS) equation in Rn align i∂t u + u + γ |x|-b|u|α u = 0, align where γ= 1, and α and b are positive numbers. Our main focus is to estabilish the global well-posedness of the INLS equation in Lorentz spaces for 0<b<2 and α<4-2bN-2. To achieve this, we use Strichartz estimates in Lorentz spaces Lr,q(n) combined with a fixed point argument. Working on Lorentz space setting instead the classical Lp is motivated by the fact that the potential |x|-b does not belong the usual Lp-space. As a consequence of the ideas developed here on the global solution study we obtain some other properties for INLS, such as, existence of self-similar solutions, scattering, wave operators and assymptotic stability.