Linear instability of breathers for the focusing nonlinear Schr{\"o}dinger equation

TL;DR

This paper investigates the linear instability of specific breather solutions in the focusing nonlinear Schrödinger equation using integrable systems techniques, including the Darboux transformation and spectral analysis.

Contribution

It provides a detailed spectral characterization of the Lax spectra for Kuznetsov-Ma and Akhmediev breathers, advancing understanding of their linear stability properties.

Findings

Full description of Lax spectra for the breathers

Construction of solutions from eigenfunctions of the Lax system

Analysis of eigenvalue multiplicities and spectral properties

Abstract

Relying upon tools from the theory of integrable systems, we discuss the linear instability of the Kuznetsov-Ma breathers and the Akhmediev breathers of the focusing nonlinear Schr{\"o}dinger equation. We use the Darboux transformation to construct simultaneously the breathers and the exact solutions of the Lax system associated with the breathers. We obtain a full description of the Lax spectra for the two breathers, including multiplicities of eigenvalues. Solutions of the linearized NLS equations are then obtained from the eigenfunctions and generalized eigenfunctions of the Lax system. While we do not attempt to prove completeness of eigenfunctions, we aim to determine the entire set of solutions of the linearized NLS equations generated by the Lax system in appropriate function spaces.