Riemann-Hilbert approach and N-soliton formula for the N-component Fokas-Lenells equations

Abstract

In this work, the generalized N-component Fokas-Lenells(FL) equations, which have been studied by Guo and Ling (2012 J. Math. Phys. 53 (7) 073506) for N=2, are first investigated via Riemann-Hilbert(RH) approach. The main purpose of this is to study the soliton solutions of the coupled Fokas-Lenells(FL) equations for any positive integer N, which have more complex linear relationship than the analogues reported before. We first analyze the spectral analysis of the Lax pair associated with a (N+1)× (N+1) matrix spectral problem for the N-component FL equations. Then, a kind of RH problem is successfully formulated. By introducing the special conditions of irregularity and reflectionless case, the N-soliton solution formula of the equations are derived through solving the corresponding RH problem. Furthermore, take N=2,3 and 4 for examples, the localized structures and dynamic propagation behavior of their soliton solutions and their interactions are discussed by some graphical analysis.