Scattering for a mass critical NLS system below the ground state with and without mass-resonance condition

Abstract

We consider a mass-critical system of nonlinear Sch\"odinger equations align* cases i∂t u + u =uv,\\ i∂t v + v =u2, cases (t,x)∈ R× R4, align* where (u,v) is a C2-valued unknown function and >0 is a constant. If =1/2, we say the equation satisfies mass-resonance condition. We are interested in the scattering problem of this equation under the condition M(u,v)<M(φ ,), where M(u,v) denotes the mass and (φ ,) is a ground state. In the mass-resonance case, we prove scattering by the argument of Dodson MR3406535. Scattering is also obtained without mass-resonance condition under the restriction that (u,v) is radially symmetric.