Long time asymptotic behavior for the nonlocal mKdV equation in space-time solitonic regions-II

Abstract

We study the long time asymptotic behavior for the Cauchy problem of an integrable real nonlocal mKdV equation with nonzero initial data in the solitonic regions align* &qt(x,t)-6σ q(x,t)q(-x,-t)qx(x,t)+qxxx(x,t)=0, &q(x,0)=q0(x),\ \ x ∞ q0(x)=q, align* where |q|=1 and q+=δ q-, σδ=-1. In our previous article, we have obtained long time asymptotics for the nonlocal mKdV equation in the solitonic region -6<<6 with =xt. In this paper, we calculate the asymptotic expansion of the solution q(x,t) for other solitonic regions <-6 and >6. Based on the Riemann-Hilbert problem of the the Cauchy problem, further using the ∂ steepest descent method, we derive different long time asymptotic expansions of the solution q(x,t) in above two different space-time solitonic regions. In the region <-6, phase function θ(z) has four stationary phase points on the R. Correspondingly, q(x,t) can be characterized with an N()-soliton on discrete spectrum, the leading order term on continuous spectrum and an residual error term, which are affected by a function Im(ζi). In the region >6, phase function θ(z) has four stationary phase points on iR, the corresponding asymptotic approximations can be characterized with an N()-soliton with diverse residual error order O(t-1).