Reversible Hamiltonian Liapunov center theorem

Buzzi, Claudio A. [UNESP]; Lamb, Jeroen S.W.

Reversible Hamiltonian Liapunov center theorem

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2-s2.0-15844409937.pdf (65.58 KB)

Data

2005-02-01

Autores

Buzzi, Claudio A. [UNESP]

Lamb, Jeroen S.W.

Resumo

We study the existence of periodic solutions in the neighbourhood of symmetric (partially) elliptic equilibria in purely reversible Hamiltonian vector fields. These are Hamiltonian vector fields with an involutory reversing symmetry R. We contrast the cases where R acts symplectically and anti-symplectically. In case R acts anti-symplectically, generically purely imaginary eigenvalues are isolated, and the equilibrium is contained in a local two-dimensional invariant manifold containing symmetric periodic solutions encircling the equilibrium point. In case R acts symplectically, generically purely imaginary eigenvalues are doubly degenerate, and the equilibrium is contained in two two-dimensional invariant manifolds containing nonsymmetric periodic solutions encircling the equilibrium point. In addition, there exists a three-dimensional invariant surface containing a two-parameter family of symmetric periodic solutions.

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Liapunov center theorem, Time-reversal symmetry

Como citar

Discrete and Continuous Dynamical Systems - Series B, v. 5, n. 1, p. 51-66, 2005.

URI

http://hdl.handle.net/11449/68120

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Reversible Hamiltonian Liapunov center theorem

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