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A remark on the multiplicity of monotone periodic orbits

Published online by Cambridge University Press:  10 December 2009

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Abstract

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We give a new proof of the fact that an area-preserving monotone twist map of the annulus with one p/q-periodic orbit on which the map preserves the ordering on the angular coordinate (i.e. Birkhoff or monotone periodic orbits) actually has a second such orbit distinct from the first.

Type
Research Article
Information
Ergodic Theory and Dynamical Systems , Volume 8 , Volume 8: Charles Conley Memorial Issue , December 1988 , pp. 109 - 118
Copyright
Copyright © Cambridge University Press 1988

References

REFERENCES

Abraham, R. & Robbin, J.. Transversal Mappings and Flows. Benjamin, New York, Amsterdam (1967).Google Scholar
Asimov, D. & Franks, J.. Unremovable periodic orbits. Preprint.Google Scholar
Aubry, S. & Le Daeron, P. Y.. The discrete Frenkel-Kontrova model and its extensions I. Physica 8D (1983), 381422.Google Scholar
Birkhoff, G.. Proof of Poincaré's last geometric theorem. Trans. AMS 14 (1913).Google Scholar
Also: Birkhoff, G.. Collected Mathematical Papers 1. Dover, New York (1968), 673.Google Scholar
Birkhoff, G.. An extension of Poincaré's last geometric theorem. Acta Math. 47 (1925).Google Scholar
Also: Birkhoff, G.. Collected Mathematical Papers 2. Dover, New York (1968), 252.Google Scholar
Conley, C.. Isolated Invariant Sets and the Morse Index. CBMS 38. AMS, Providence (1978).Google Scholar
Conley, C. & Zehnder, E.. The Birkhoff-Lewis fixed point theorem and a conjecture of V. I. Arnol'd. Invent. Math. 73 (1983), 3349.Google Scholar
Hall, G.. A topological version of a theorem of Mather on twist maps. Ergod. Th. & Dynam. Sys. 4 (1984), 585603.Google Scholar
Herman, M. R.. Sur les courbes invariantes par les difféomorphismes de l'anneau. Asterisque 1 (1983), 103104.Google Scholar
Katok, A.. Some remarks on Birkhoff and Mather twist map theorems. Ergod. Th. & Dynam. Sys. 2 (1982), 185192.Google Scholar
Mather, J.. Existence of quasi-periodic orbits for twist homeomorphisms. Topology 21 (1982), 457467.Google Scholar
Moser, J.. Monotone twist mappings and the calculus of variations. Preprint.Google Scholar