Bifurcation of closed orbits from equilibria of Newtonian systems with Coriolis forces
Identificadores
URI: https://hdl.handle.net/10481/77295Metadatos
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Elsevier
Fecha
2021-08-30Referencia bibliográfica
Published version: Anna Gołȩbiewska... [et al.]. Bifurcation of closed orbits from equilibria of Newtonian systems with Coriolis forces, Journal of Differential Equations, Volume 338, 2022, Pages 441-473, ISSN 0022-0396, [https://doi.org/10.1016/j.jde.2022.08.004]
Resumen
We consider autonomous Newtonian systems with Coriolis forces in two
and three dimensions and study the existence of branches of periodic orbits
emanating from equilibria. We investigate both degenerate and nondegenerate
situations. While Lyapunov’s center theorem applies locally in the nondegen-
erate, nonresonant context, equivariant degree theory provides a global answer
which is significant also in some degenerate cases.
We apply our abstract results to a problem from Celestial Mechanics. More
precisely, in the three-dimensional version of the Restricted Triangular Four-
Body Problem with possibly different primaries our results show the existence
of at least seven branches of periodic orbits emanating from the stationary
points.