Scattering and blow-up criteria for 3D cubic focusing nonlinear inhomogeneous NLS with a potential

Abstract

In this paper, we consider the 3d cubic focusing inhomogeneous nonlinear Schr\"odinger equation with a potential iut+ u-Vu+|x|-b|u|2u=0,\;\;(t,x) ∈ R×R3, where 0<b<1. We first establish global well-posedness and scattering for the radial initial data u0 in H1( R3) satisfying M(u0)1-scE(u0)sc<E and \|u0\|L22(1-sc)\|H12u0\|L22sc<K provided that V is repulsive, where E and K are the mass-energy and mass-kinetic of the ground states, respectively. Our result extends the results of Hong H and Farah-Guzm an FG1 with b∈(0,12) to the case 0<b<1. We then obtain a blow-up result for initial data u0 in H1( R3) satisfying M(u0)1-scE(u0)sc<E and \|u0\|L22(1-sc)\|H12u0\|L22sc>K if V satisfies some additional assumptions.0\|L22(1-sc)\|H12u0\|L22sc>K if V$ satisfies some additional assumptions.