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Auteurs principaux: Bahhi, Meriem, Lampart, Jonas, Klein, Christian, Nodari, Simona Rota
Format: Preprint
Publié: 2025
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Accès en ligne:https://arxiv.org/abs/2509.02236
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author Bahhi, Meriem
Lampart, Jonas
Klein, Christian
Nodari, Simona Rota
author_facet Bahhi, Meriem
Lampart, Jonas
Klein, Christian
Nodari, Simona Rota
contents We discuss the (in)stability of solitary waves for a quasi-linear Schr{ö}dinger equation. The equation contains a quasi-linear term, responsible for a saturation effect, as well as a power nonlinearity. For different exponents of the nonlinearity, we determine analytically the asymptotic behavior of the $L^2$-mass of the solution as a function of the frequency close to the critical frequencies, which leads to natural conjectures concerning their stability. Depending on the exponent and the dimension, we expect all solitary waves to be stable, or the emergence of both a stable and an unstable branch of solutions. We investigate our conjectures numerically, and find compatible results both for the mass-energy relation and the dynamics. We observe that perturbations of solitary waves on the unstable branch may converge dynamically to the stable solution of a similar mass, or disperse. More general initial conditions show a similar behavior.
format Preprint
id arxiv_https___arxiv_org_abs_2509_02236
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A numerical study of stability for solitary waves of a quasi-linear Schr{ö}dinger equation
Bahhi, Meriem
Lampart, Jonas
Klein, Christian
Nodari, Simona Rota
Analysis of PDEs
We discuss the (in)stability of solitary waves for a quasi-linear Schr{ö}dinger equation. The equation contains a quasi-linear term, responsible for a saturation effect, as well as a power nonlinearity. For different exponents of the nonlinearity, we determine analytically the asymptotic behavior of the $L^2$-mass of the solution as a function of the frequency close to the critical frequencies, which leads to natural conjectures concerning their stability. Depending on the exponent and the dimension, we expect all solitary waves to be stable, or the emergence of both a stable and an unstable branch of solutions. We investigate our conjectures numerically, and find compatible results both for the mass-energy relation and the dynamics. We observe that perturbations of solitary waves on the unstable branch may converge dynamically to the stable solution of a similar mass, or disperse. More general initial conditions show a similar behavior.
title A numerical study of stability for solitary waves of a quasi-linear Schr{ö}dinger equation
topic Analysis of PDEs
url https://arxiv.org/abs/2509.02236