The long-time asymptotic of the derivative nonlinear Schrodinger equation with step-like initial value
Abstract
Consideration in this present paper is the long-time asymptotic of solutions to the derivative nonlinear Schrodinger equation with the step-like initial value eqnarray q(x,0)=q0(x)=cases split A1eiφe2iBx, x<0,\\ A2e-2iBx, ~~ x>0. split cases eqnarray by Deift-Zhou method. The step-like initial problem described by a matrix Riemann-Hilbert problem. A crucial ingredient used in this paper is to introduce g-function mechanism for solving the problem of the entries of the jump matrix growing exponentially as t→∞. It is shown that the leading order term of the asymptotic solution of the DNLS equation expressed by the Theta function about the Riemann-surface of genus 3 and the subleading order term expressed by parabolic cylinder and Airy functions.
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