Blow-up of the radially symmetric solutions for the quadratic nonlinear Schr\"odinger system without mass-resonance

Abstract

We consider the quadratic nonlinear Schr\"odinger system align* cases i∂t u + u =v u,\\ i∂t v + v =u2, cases on I × Rd, align* where 1≤ d ≤ 6 and >0. In the lower dimensional case d=1,2,3, it is known that the H1-solution is global in time. On the other hand, there are finite time blow-up solutions when d=4,5,6 and =1/2. The condition of =1/2 is called mass-resonance. In this paper, we prove finite time blow-up under radially symmetric assumption when d=5,6 and ≠ 1/2 and we show blow-up or grow-up when d=4.