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Hauptverfasser: Sánchez-Rey, Bernardo, Mellado-Alcedo, David, Quintero, Niurka R.
Format: Preprint
Veröffentlicht: 2025
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2511.05142
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author Sánchez-Rey, Bernardo
Mellado-Alcedo, David
Quintero, Niurka R.
author_facet Sánchez-Rey, Bernardo
Mellado-Alcedo, David
Quintero, Niurka R.
contents The linear stability of two exact stationary solutions of the parametrically driven, damped nonlinear Dirac equation is investigated. Stability is ascertained through the resolution of the eigenvalue problem, which stems from the linearization of this equation around the exact solutions. On the one hand, it is proven that one of these solutions is always unstable, which confirms previous analysis based on a variational method. On the other hand, it is shown that sufficiently large dissipation guarantees the stability of the second solution. Specifically, we determine the stability curve that separates stable and unstable regions in the parameter space. The dependence of the stability diagram on the driven frequency is also studied, and it is shown that low-frequency solitons are stable across the entire parameter space. These results have been corroborated with extensive simulations of the parametrically driven and damped nonlinear Dirac equation by employing a novel and recently proposed numerical algorithm that minimizes discretization errors.
format Preprint
id arxiv_https___arxiv_org_abs_2511_05142
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Stability of parametrically driven, damped nonlinear Dirac solitons
Sánchez-Rey, Bernardo
Mellado-Alcedo, David
Quintero, Niurka R.
Pattern Formation and Solitons
The linear stability of two exact stationary solutions of the parametrically driven, damped nonlinear Dirac equation is investigated. Stability is ascertained through the resolution of the eigenvalue problem, which stems from the linearization of this equation around the exact solutions. On the one hand, it is proven that one of these solutions is always unstable, which confirms previous analysis based on a variational method. On the other hand, it is shown that sufficiently large dissipation guarantees the stability of the second solution. Specifically, we determine the stability curve that separates stable and unstable regions in the parameter space. The dependence of the stability diagram on the driven frequency is also studied, and it is shown that low-frequency solitons are stable across the entire parameter space. These results have been corroborated with extensive simulations of the parametrically driven and damped nonlinear Dirac equation by employing a novel and recently proposed numerical algorithm that minimizes discretization errors.
title Stability of parametrically driven, damped nonlinear Dirac solitons
topic Pattern Formation and Solitons
url https://arxiv.org/abs/2511.05142