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Entry and exit sets in the dynamics of area preserving Hénon map

✍ Scribed by Emilia Petrisor

Publisher
Elsevier Science
Year
2003
Tongue
English
Weight
150 KB
Volume
17
Category
Article
ISSN
0960-0779

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✦ Synopsis

In this paper we study dynamical properties of the area preserving H e enon map, as a discrete version of open Hamiltonian systems, that can exhibit chaotic scattering. Exploiting its geometric properties we locate the exit and entry sets, i.e. regions through which any forward, respectively backward, unbounded orbit escapes to infinity. In order to get the boundaries of these sets we prove that the right branch of the unstable manifold of the hyperbolic fixed point is the graph of a function, which is the uniform limit of a sequence of functions whose graphs are arcs of the symmetry lines of the H e enon map, as a reversible map.

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