Abstract :
We consider the nonlinear magnetic Schrödinger equation for , where is the magnetic potential, is the electric potential, and g=±u2u is the nonlinear term. We show that under suitable assumptions on the electric and magnetic potentials, if the initial data is small enough in H1, then the solution of the above equation decomposes uniquely into a standing wave part, which converges as t→∞ and a dispersive part, which scatters.
