A direct method of solution for the Fokas-Lenells derivative nonlinear Schr\"odinger equation: II. Dark soliton solutions

TL;DR

This paper develops a systematic method to derive dark soliton solutions of the Fokas-Lenells equation with nonvanishing boundary conditions, including multi-soliton solutions and their asymptotic behaviors.

Contribution

It introduces a novel approach to construct dark N-soliton solutions for the FL equation with nonzero background, extending previous work on bright solitons.

Findings

Derived the general dark N-soliton solution

Analyzed properties of one-soliton solutions, including algebraic limits

Performed asymptotic analysis revealing soliton dynamics

Abstract

In a previous study (Matsuno Y, J. Phys. A: Math. Theor. 45(2012)23202), we have developed a systematic method for obtaining the bright soliton solutions of the Fokas-Lenells derivative nonlinear Schr\"odinger equation (FL equation shortly) under vanishing boundary condition. In this paper, we apply the method to the FL equation with nonvanishing boundary condition. In particular, we deal with a more sophisticated problem on the dark soliton solutions with a plane wave boundary condition. We first derive the novel system of bilinear equations which is reduced from the FL equation through a dependent variable transformation and then construct the general dark $N$-soliton solution of the system, where $N$ is an arbitrary positive integer. In the process, a trilinear equation derived from the system of bilinear equations plays an important role. As a byproduct, this equation gives the dark $N$-soliton solution of the derivative nonlinear Schr\"odinger equation on the background of a plane wave. We then investigate the properties of the one-soliton solutions in detail, showing that both the dark and bright solitons appear on the nonzero background which reduce to algebraic solitons in specific limits. Last, we perform the asymptotic analysis of the two- and $N$-soliton solutions for large time and clarify their structure and dynamics.