Characterization of minimal-mass blowup solutions to the focusing mass-critical NLS

Abstract

Let d≥ 4 and let u be a global solution to the focusing mass-critical nonlinear Schr\"odinger equation iut+ u=-|u| 4du with spherically symmetric Hx1 initial data and mass equal to that of the ground state Q. We prove that if u does not scatter then, up to phase rotation and scaling, u is the solitary wave eitQ. Combining this result with that of Merle merle2, we obtain that in dimensions d≥ 4, the only spherically symmetric minimal-mass blowup solutions are, up to phase rotation and scaling, the pseudo-conformal ground state and the solitary wave.