Mathematics
Scientific paper
Sep 1994
adsabs.harvard.edu/cgi-bin/nph-data_query?bibcode=1994cemda..60...99b&link_type=abstract
Celestial Mechanics and Dynamical Astronomy, vol. 60, no. 1, p. 99-129
Mathematics
23
Branching (Mathematics), Elliptical Orbits, Kepler Laws, Systems Stability, Three Body Problem, Computerized Simulation, Elliptic Functions, Equations Of Motion, Hamiltonian Functions, Hyperbolic Trajectories
Scientific paper
In this paper we deal with the circular Sitnikov problem as a subsystem of the three-dimensional circular restricted three-body problem. It has a first analytical part where by using elliptic functions we give the analytical expressions for the solutions of the circular Sitnikov problem and for the period function of its family of periodic orbits. We also analyze the qualitative and quantitative behavior of the period function. In the second numerical part, we study the linear stability of the family of periodic orbits of the Sitnikov problem, and of the families of periodic orbits of the three-dimensional circular restricted three-body problem which bifurcate from them; and we follow these bifurcated families until they end in families of periodic orbits of the planar circular restricted three-body problem. We compare our results with the previous ones of other authors on this problem. Finally, the characteristic curves of some bifurcated families obtained for the mass parameter close to 1/2 are also described.
Belbruno Edward
Llibre Jaume
Ollé Mercè
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