Lower bound on the number of periodic solutions for asymptotically linear planar Hamiltonian systems

Paolo Gidoni, Alessandro Margheri

Type: Article

Publication Date: 2018-10-31

Citations: 2

DOI: https://doi.org/10.3934/dcds.2019024

Abstract

In this work we prove the lower bound for the number of $T$-periodic solutions of an asymptotically linear planar Hamiltonian system. Precisely, we show that such a system, $T$-periodic in time, with $T$-Maslov indices $i_0,i_\infty$ at the origin and at infinity, has at least $|i_\infty-i_0|$ periodic solutions, and an additional one if $i_0$ is even. Our argument combines the Poincar\'e--Birkhoff Theorem with an application of topological degree. We illustrate the sharpness of our result, and extend it to the case of second orders ODEs with linear-like behaviour at zero and infinity.

Locations

Discrete and Continuous Dynamical Systems - View - PDF
arXiv (Cornell University) - View - PDF
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Works That Cite This (1)

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+	A topological degree theory for rotating solutions of planar systems	2021	Paolo Gidoni

Works Cited by This (1)

Action	Title	Year	Authors
+	Maslov index, Poincaré–Birkhoff Theorem and Periodic Solutions of Asymptotically Linear Planar Hamiltonian Systems	2002	Alessandro Margheri Carlota Rebelo Fabio Zanolin