Threshold solutions for cubic Schr\"odinger systems

Abstract

We consider the following Scr\"odinger system cases i∂t u + u +(|u|2+β |v|2) u= 0, \\ i∂t v + v +(|v|2+β |u|2) v = 0,cases with initial data (u0,v0) ∈ H1(R 3)× H1(R3) at the so-called mass-energy threshold, i.e., such that %ME(u0,v0) = 1. M(u0,v0)E(u0,v0) = M(φ,)E(φ,), where (φ,) is a ground state. For a suitable range of values of β>0, we show the existence of special solutions to this system, which converge to a standing wave solution in one time direction, and either blows up or scatters in the opposite direction. Moreover, we classify general solutions at the ground state, showing a rigidity result regarding the possible long-time behaviors that might occur. Our results do not rely on the uniqueness of the corresponding ground state: indeed, the main results hold even in the case where the Weinstein functional is known to have more than one optimizer.