Brake orbits for Hamiltonian systems of the classical type via geodesics in singular Finsler metrics

Brake orbits for Hamiltonian systems of the classical type via geodesics in singular Finsler metrics

We consider Hamiltonian functions of the classical type, namely, even and convex with respect to the generalized momenta. A brake orbit is a periodic solution of Hamilton’s equations such that the generalized momenta are zero on two different points. Under mild assumptions, this paper reduces the mu...

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Veröffentlicht in:Advances in nonlinear analysis 2022-03, Vol.11 (1), p.1223-1248
Hauptverfasser: Corona, Dario, Giannoni, Fabio
Format: Artikel
Sprache:eng
Schlagworte:
53B40
58E10
70G75
70H05
70H12
brake orbits
Finsler metric
Hamiltonian systems
variational methods
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Zusammenfassung:We consider Hamiltonian functions of the classical type, namely, even and convex with respect to the generalized momenta. A brake orbit is a periodic solution of Hamilton’s equations such that the generalized momenta are zero on two different points. Under mild assumptions, this paper reduces the multiplicity problem of the brake orbits for a Hamiltonian function of the classical type to the multiplicity problem of orthogonal geodesic chords in a concave Finslerian manifold with boundary. This paper will be used for a generalization of a Seifert’s conjecture about the multiplicity of brake orbits to Hamiltonian functions of the classical type.
ISSN:2191-9496
2191-950X
DOI:10.1515/anona-2022-0222