On well-posedness and concentration of blow-up solutions for the intercritical inhomogeneous NLS equation

Abstract

We consider the focusing inhomogeneous nonlinear Schr\"odinger (INLS) equation in RN i ∂t u + u + |x|-b |u|2σu = 0, where N≥ 2 and σ, b>0. We first obtain a small data global result in H1, which, in the two spatial dimensional case, improves the third author result in [22] on the range of b. For N≥ 3 and 2-bN<σ<2-bN-2, we also study the local well posedness in Hsc H1 , where sc=N2-2-b2σ. Sufficient conditions for global existence of solutions in Hsc H1 are also established, using a Gagliardo-Nirenberg type estimate. Finally, we study the Lσc-norm concentration phenomenon, where σc=2Nσ2-b, for finite time blow-up solutions in Hsc H1 with bounded Hsc-norm. Our approach is based on the compact embedding of Hsc H1 into a weighted L2σ+2 space.