Motivated by the problem of long time stability vs. instability of KAM tori of the Nonlinear cubic Schrödinger equation (NLS) on the two dimensional torus T2:= (R/2πZ)2, we consider a quasi-periodically forced NLS equation on T2 arising from the linearization of the NLS at a KAM torus. We prove a reducibility result as well as long time stability of the origin. The main novelty is to obtain the precise asymptotic expansion of the frequencies which allows us to impose Melnikov conditions at arbitrary order.
Reducibility and nonlinear stability for a quasi-periodically forced NLS / Haus, E.; Langella, B.; Maspero, A.; Procesi, M.. - In: PURE AND APPLIED MATHEMATICS QUARTERLY. - ISSN 1558-8599. - 20:3 Special Issue(2024), pp. 1313-1370. [10.4310/PAMQ.2024.v20.n3.a8]
Reducibility and nonlinear stability for a quasi-periodically forced NLS
Langella B.;Maspero A.;
2024-01-01
Abstract
Motivated by the problem of long time stability vs. instability of KAM tori of the Nonlinear cubic Schrödinger equation (NLS) on the two dimensional torus T2:= (R/2πZ)2, we consider a quasi-periodically forced NLS equation on T2 arising from the linearization of the NLS at a KAM torus. We prove a reducibility result as well as long time stability of the origin. The main novelty is to obtain the precise asymptotic expansion of the frequencies which allows us to impose Melnikov conditions at arbitrary order.| File | Dimensione | Formato | |
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