Numerical study of the stability of the Peregrine solution
| Affiliation auteurs | Affiliation ok |
| Titre | Numerical study of the stability of the Peregrine solution |
| Type de publication | Journal Article |
| Year of Publication | 2017 |
| Auteurs | Klein C, Haragus M |
| Journal | ANNALS OF MATHEMATICAL SCIENCES AND APPLICATIONS |
| Volume | 2 |
| Pagination | 217-239 |
| Type of Article | Article |
| ISSN | 2380-288X |
| Mots-clés | Nonlinear Schrodinger equation, Peregrine solution, rogue waves |
| Résumé | The Peregrine solution to the nonlinear Schrodinger equations is widely discussed as a model for rogue waves in deep water. We present here a detailed fully nonlinear numerical study of high accuracy of perturbations of the Peregrine solution as a solution to the nonlinear Schrodinger (NLS) equations. We study localized and nonlocalized perturbations of the Peregrine solution in the linear and fully nonlinear setting. It is shown that the solution is unstable against all considered perturbations. |
| DOI | 10.4310/AMSA.2017.v2.n2.a1 |