Mass concentration and characterization of finite time blow-up solutions for the nonlinear Schr\"odinger equation with inverse-square potential

Abstract

We consider the L2-critical NLS with inverse-square potential i ∂t u + u + c|x|-2 u = -|u|4d u, u(0) = u0, (t,x) ∈ R+ × Rd, where d≥ 3 and c 0 satisfies c<λ(d) := (d-22)2. Using a refined compactness lemma, we extend the mass concentration of finite time blow-up solutions established in the attractive case by the first author in [Bensouilah] to c<λ(d). By means of a simple and short limiting profile theorem, we get the same classification result obtained by Csobo and Genoud in [CsoboGenoud] for 0<c<λ(d). It also enables us to extend the classification to c<λ(d).