We consider the nonlinear Schrödinger equation on the one dimensional torus, with a defocusing polynomial nonlinearity and study the dynamics corresponding to initial data in a set of large measures with respect to the Gibbs measure. We prove that along the corresponding solutions the modulus of the Fourier coefficients is approximately constant for times of order β2+ζ, β being the inverse of the temperature and ζ a positive number (we prove ζ = 1/10). The proof is obtained by adapting to the context of Gibbs measure for PDEs some tools of Hamiltonian perturbation theory.
Bambusi, D., Maiocchi, A., Turri, L. (2019). A large probability averaging theorem for the defocusing NLS. NONLINEARITY, 32(10), 3661-3694 [10.1088/1361-6544/ab17e8].
A large probability averaging theorem for the defocusing NLS
Maiocchi A.;
2019
Abstract
We consider the nonlinear Schrödinger equation on the one dimensional torus, with a defocusing polynomial nonlinearity and study the dynamics corresponding to initial data in a set of large measures with respect to the Gibbs measure. We prove that along the corresponding solutions the modulus of the Fourier coefficients is approximately constant for times of order β2+ζ, β being the inverse of the temperature and ζ a positive number (we prove ζ = 1/10). The proof is obtained by adapting to the context of Gibbs measure for PDEs some tools of Hamiltonian perturbation theory.
| File | Dimensione | Formato | |
|---|---|---|---|
|
Bambusi-2019-Nonlinearity-VoR.pdf
Solo gestori archivio
Descrizione: Article
Tipologia di allegato:
Publisher’s Version (Version of Record, VoR)
Licenza:
Tutti i diritti riservati
Dimensione
2.26 MB
Formato
Adobe PDF
|
2.26 MB | Adobe PDF | Visualizza/Apri Richiedi una copia |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
