Well-posedness and scattering of odd solutions for the defocusing INLS in one dimension

Abstract

We consider the defocusing inhomogeneous nonlinear Schr\"odinger equation i∂tu+ u= |x|-b|u|αu, where 0<b<1 and 0<α<∞. This problem has been extensively studied for initial data in H1(N) with N≥ 2. However, in the one-dimensional setting, due to the difficulty in dealing with the singularity factor |x|-b, the well-posedness and scattering in H1() are scarce, and almost known results have been established in Hs() with s<1. In this paper, we focus on the odd initial data in H1(). For this case, we establish local well-posedness for 0<α<∞, as well as global well-posedness and scattering for 4-2b<α<∞, which corresponds to the mass-supercritical case. The key ingredient is the application of the one-dimensional Hardy inequality for odd functions to overcome the singularity induced by |x|-b. Our proof is based on the Strichartz estimates and employs the concentration-compactness/rigidity method developed by Kenig-Merle as well as the technique for handling initial data living far from the origin, as proposed by Miao-Murphy-Zheng. Our results fill a gap in the theory of well-posedness and energy scattering for the inhomogeneous nonlinear Schr\"odinger equation in one dimension.