The defocusing NLS equation with nonzero background: Large-time asymptotics in the solitonless region

Abstract

We consider the Cauchy problem for the defocusing Schrodinger (NLS) equation with a nonzero background align &iqt+qxx-2(|q|2-1)q=0, \\ &q(x,0)=q0(x), x ∞q0(x)= 1. align Recently, for the space-time region |x/(2t)|<1 which is a solitonic region without stationary phase points on the jump contour, Cuccagna and Jenkins presented the asymptotic stability of the N-soliton solutions for the NLS equation by using the ∂ generalization of the Deift-Zhou nonlinear steepest descent method. Their large-time asymptotic expansion takes the form align q(x,t)= T(∞)-2 qsol,N(x,t) + O(t-1 ),res1 align whose leading term is N-soliton and the second term O(t-1) is a residual error from a ∂-equation. In this paper, we are interested in the large-time asymptotics in the space-time region |x/(2t)|>1 which is outside the soliton region, but there will be two stationary points appearing on the jump contour R. We found a asymptotic expansion that is different from (res1) align q(x,t)= e-iα(∞) (1 +t-1/2 h(x,t) )+O(t-3/4),res2 align whose leading term is a nonzero background, the second t-1/2 order term is from continuous spectrum and the third term O(t-3/4) is a residual error from a ∂-equation.The above two asymptotic results (res1) and (res2) imply that the region |x/(2t)|<1 considered by Cuccagna and Jenkins is a fast decaying soliton solution region, while the region |x/(2t)|>1 considered by us is a slow decaying nonzero background region.