The rational solutions of the mixed nonlinear Schr\"odinger equation

TL;DR

This paper derives rational solutions for the mixed nonlinear Schrödinger equation using Darboux transformations, revealing how parameters affect solution localization and introducing a new two-peak rational solution with variable height.

Contribution

It presents a determinant representation of Darboux transformations for MNLS, proves smoothness of generated solutions, and constructs novel rational solutions with variable parameters.

Findings

Increasing parameter b reduces solution localization.

A new two-peak rational solution with variable height is obtained.

Analytical and graphical analysis of parameter effects on solutions.

Abstract

The mixed nonlinear Schr\"odinger (MNLS) equation is a model for the propagation of the Alfv\'en wave in plasmas and the ultrashort light pulse in optical fibers with two nonlinear effects of self-steepening and self phase-modulation(SPM), which is also the first non-trivial flow of the integrable Wadati-Konno-Ichikawa(WKI) system. The determinant representation $T_n$ of a n-fold Darboux transformation(DT) for the MNLS equation is presented. The smoothness of the solution $q^{[2k]}$ generated by $T_{2k}$ is proved for the two cases ( non-degeneration and double-degeneration ) through the iteration and determinant representation. Starting from a periodic seed(plane wave), rational solutions with two parameters $a$ and $b$ of the MNLS equation are constructed by the DT and the Taylor expansion. Two parameters denote the contributions of two nonlinear effects in solutions. We show an unusual result: for a given value of $a$, the increasing value of $b$ can damage gradually the localization of the rational solution, by analytical forms and figures. A novel two-peak rational solution with variable height and a non-vanishing boundary is also obtained.