Blow-up solutions of the intercritical inhomogeneous NLS equation: the non-radial case

Abstract

In this paper we consider the inhomogeneous nonlinear Schr\"odinger (INLS) equation aligninls i ∂t u + u +|x|-b |u|2σu = 0, \,\,\, x ∈ RN align with N≥ 3. We focus on the intercritical case, where the scaling invariant Sobolev index sc=N2-2-b2σ satisfies 0<sc<1. In a previous work, for radial initial data in Hsc H1, we prove the existence of blow-up solutions and also a lower bound for the blow-up rate. Here we extend these results to the non-radial case. We also prove an upper bound for the blow-up rate and a concentration result for general finite time blow-up solutions in H1.