Global existence and blowup for a class of the focusing nonlinear Schr\"odinger equation with inverse-square potential

Abstract

We consider a class of the focusing nonlinear Schr\"odinger equation with inverse-square potential \[ i∂t u + u -c|x|-2u = - |u|α u, u(0)=u0 ∈ H1, (t,x)∈ R × Rd, \] where d≥ 3, 4d≤ α ≤ 4d-2 and c 0 satisfies c>-λ(d):=-(d-22)2. In the mass-critical case α=4d, we prove the global existence and blowup below ground states for the equation with d≥ 3 and c>-λ(d). In the mass and energy intercritical case 4d<α<4d-2, we prove the global existence and blowup below the ground state threshold for the equation. This extends similar results of KillipMurphyVisanZheng and LuMiaoMurphy to any dimensions d≥ 3 and a full range c>-λ(d). We finally prove the blowup below ground states for the equation in the energy-critical case α=4d-2 with d≥ 3 and c>-d2+4d(d+2)2 λ(d).