Birkhoff normal form for some nonlinear PDEs
In: Communications in mathematical physics, Jg. 234 (2003), Heft 2, S. 253-285
Online
academicJournal
- print, 20 ref
Zugriff:
We consider the problem of extending to PDEs Birkhoff normal form theorem on Hamiltonian systems close to nonresonant elliptic equilibria. As a model problem we take the nonlinear wave equation utt - uxx + g(x, u) = 0, (0.1) with Dirichlet boundary conditions on [0, π]; g is an analytic skewsymmetric function which vanishes for u = 0 and is periodic with period 2π in the x variable. We prove, under a nonresonance condition which is fulfilled for most g's, that for any integer M there exists a canonical transformation that puts the Hamiltonian in Birkhoff normal form up to a reminder of order M. The canonical transformation is well defined in a neighbourhood of the origin of a Sobolev type phase space of sufficiently high order. Some dynamical consequences are obtained. The technique of proof is applicable to quite general semilinear equations in one space dimension.
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Birkhoff normal form for some nonlinear PDEs
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Autor/in / Beteiligte Person: | BAMBUSI, Dario |
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Zeitschrift: | Communications in mathematical physics, Jg. 234 (2003), Heft 2, S. 253-285 |
Veröffentlichung: | Heidelberg: Springer, 2003 |
Medientyp: | academicJournal |
Umfang: | print, 20 ref |
ISSN: | 0010-3616 (print) |
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