Long time asymptotics behavior of the focusing nonlinear Kundu-Eckhaus equation

Abstract

We study the Cauchy problem for the focusing nonlinear Kundu-Eckhaus equation and construct long time asymptotic expansion of its solution in fixed space-time cone with C(x1,x2,v1,v2)=\(x,t)∈2:x=x0+vt x0∈[x1,x2],v∈[v1,v2] \. By using the inverse scattering transform, Riemann-Hilbert approach and ∂ steepest descent method we obtain the lone time asymptotic behavior of the solution, at the same time we obtain the solitons in the cone compare with the all N-soliton the residual error up to order O(t-3/4).