Hamiltonian systems with widely separated frequencies
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Publication date
2001-01-01
Authors
Tuwankotta, J.M.
Verhulst, F.
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Document Type
Preprint
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Abstract
In this paper we study two degree of freedom Hamiltonian systems and applica-
tions to nonlinear wave equations. Near the origin, we assume that near the linearized
system has purely imaginary eigenvalues: ±iw1 and ±iw2, with 0 < w2/w1 << 1 or
w2/w1 >> 1, which is interpreted as a perturbation of a problem with double zero
eigenvalues. Using the averaging method, we compute the normal form and show
that the dynamics differs from the usual one for Hamiltonian systems at higher order
resonances. Under certain conditions, the normal form is degenerate which forces us
to normalize to higher degree. The asymptotic character of the normal form and the
corresponding invariant tori is validated using KAM theorem. This analysis is then
applied to widely separated mode-interaction in a family of nonlinear wave equations
containing various degeneracies.
Keywords
Hamiltonian mechanics, resonance, normal forms, widely separated frequencies