Henri Poincare's neglected ideas: Issue for J. Scheurle (eds T. Hagen, A. Johann, H.-P. Kruse, F. Rupp, S. Walcher)

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Abstract

The purpose of this article is to discuss two basic ideas of Henri Poincaré in the theory of dynamical systems. The first one, the recurrence theorem, got at first a lot of attention but most scientists lost interest when finding out that long timescales were involved. We will show that recurrence can be a tool to find complex dynamics in resonance zones of Hamiltonian systems; this is related to the phenomenon of quasi-trapping. To demonstrate the use of recurrence phenomena we will explore the 2:2:3 Hamiltonian resonance near stable equilibrium. This will involve interaction of low and higher order resonance. A second useful idea is concerned with the characteristic exponents of periodic solutions of dynamical systems. If a periodic solution of a Hamiltonian system has more than two zero characteristic exponents, this points at the existence of an integral of motion besides the energy. We will apply this idea to examples of two and three degrees-of-freedom (dof), the Hénon-Heiles (or Braun's) family and the 1:2:2 resonance.
Original languageEnglish
Pages (from-to)1411-1427
Number of pages17
JournalDiscrete and Continuous Dynamical Systems - Series S
Volume13
Issue number4
DOIs
Publication statusPublished - Apr 2020

Keywords

  • Hamiltonian systems
  • recurrence
  • passage through resonance
  • periodic solutions
  • integrability

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