Long-time asymptotics for the integrable nonlocal focusing nonlinear Schr\"odinger equation for a family of step-like initial data

Abstract

We study the Cauchy problem for the integrable nonlocal focusing nonlinear Schr\"odinger (NNLS) equation iqt(x,t)+qxx(x,t)+2 q2(x,t)q(-x,t)=0 with the step-like initial data close to the ``shifted step function'' R(x)=AH(x-R), where H(x) is the Heaviside step function, and A>0 and R>0 are arbitrary constants. Our main aim is to study the large-t behavior of the solution of this problem. We show that for R∈((2n-1)π2A,(2n+1)π2A), n=1,2,…, the (x,t) plane splits into 4n+2 sectors exhibiting different asymptotic behavior. Namely, there are 2n+1 sectors where the solution decays to 0, whereas in the other 2n+1 sectors (alternating with the sectors with decay), the solution approaches (different) constants along each ray x/t=const. Our main technical tool is the representation of the solution of the Cauchy problem in terms of the solution of an associated matrix Riemann-Hilbert problem and its subsequent asymptotic analysis following the ideas of nonlinear steepest descent method.