Asymptotic stability of small solitary waves for nonlinear Schr\"odinger equations with electromagnetic potential in R3

Abstract

We consider the nonlinear magnetic Schr\"odinger equation for u: R3 × R C , \[ iut = (i ∇ + A)2 u + V u + g(u), u(x,0) = u0(x),\] where A :R3 R3 is the magnetic potential, V : R3 R is the electric potential, and g = | u |2 u 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.