We consider a one-parameter family of beam equations with Hamiltonian non-linearity in one space dimension under periodic boundary conditions. In a unified functional framework we study the long time evolution of initial data in two categories of differentiability: (i) a subspace of Sobolev regularity, (ii) a subspace of infinitely many differentiable functions which is strictly contained in the Sobolev space but which strictly contains the Gevrey one. In both cases we prove exponential type times of stability. The result holds for almost all mass parameters and it is obtained by combining normal form techniques with a suitable Diophantine condition weaker than the one proposed by Bourgain. This is the first result of this kind in Sobolev regularity for a degenerate equation, where only one parameter is used to tune the linear frequencies of oscillations. (c) 2023 Elsevier Inc. All rights reserved.

Feola, R., Massetti, J.e. (2023). Sub-exponential stability for the beam equation. JOURNAL OF DIFFERENTIAL EQUATIONS, 356, 188-242 [10.1016/j.jde.2023.01.038].

Sub-exponential stability for the beam equation

Jessica Elisa Massetti
2023-01-01

Abstract

We consider a one-parameter family of beam equations with Hamiltonian non-linearity in one space dimension under periodic boundary conditions. In a unified functional framework we study the long time evolution of initial data in two categories of differentiability: (i) a subspace of Sobolev regularity, (ii) a subspace of infinitely many differentiable functions which is strictly contained in the Sobolev space but which strictly contains the Gevrey one. In both cases we prove exponential type times of stability. The result holds for almost all mass parameters and it is obtained by combining normal form techniques with a suitable Diophantine condition weaker than the one proposed by Bourgain. This is the first result of this kind in Sobolev regularity for a degenerate equation, where only one parameter is used to tune the linear frequencies of oscillations. (c) 2023 Elsevier Inc. All rights reserved.
2023
Pubblicato
Rilevanza internazionale
Articolo
Esperti anonimi
Settore MAT/05
English
Con Impact Factor ISI
Feola, R., Massetti, J.e. (2023). Sub-exponential stability for the beam equation. JOURNAL OF DIFFERENTIAL EQUATIONS, 356, 188-242 [10.1016/j.jde.2023.01.038].
Feola, R; Massetti, Je
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2108/360744
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