论文信息 - Coorbital Periodic Orbits in the Three Body Problem

Coorbital Periodic Orbits in the Three Body Problem

We consider the dynamics of coorbital motion of two small moons about a large planet which have nearly circular orbits with almost equal radii. These moons avoid collision because they switch orbits during each close encounter. We approach the problem as a perturbation of decoupled Kepler problems as in Poincare's periodic orbits of the first kind. The perturbation is large but only in a small region in the phase space. We discuss the relationship required among the small quantities (radial separation, mass, and minimum angular separation). Persistence of the orbits is discussed.

Josep M. Cors | Glen R. Hall | J. M. Cors | G. R. Hall

[1] Kenneth R. Meyer,et al. Symmetries and Integrals in Mechanics , 1973 .

[2] C. Murray,et al. Solar System Dynamics: Expansion of the Disturbing Function , 1999 .

[3] C. F. Yoder,et al. New observations of Saturn's coorbital satellites , 1992 .

[4] K. Aksnes. The Tiny Satellites of Jupiter and Saturn and their Interactions with the Rings , 1985 .

[5] Henri Poincaré,et al. New methods of celestial mechanics , 1967 .

[6] B. Khushalani. Periodic Solutions of an N-Body Problem , 2004 .

[7] J. Waldvogel,et al. The Three-Body Problem with Two Small Masses: A Singular-Perturbation Approach to the Problem of Saturn’s Coorbiting Satellites , 1985 .

[8] Kenneth R. Meyer,et al. Introduction to Hamiltonian Dynamical Systems and the N-Body Problem , 1991 .

[9] J. Llibre,et al. The motion of Saturn coorbital satellites in the restricted three-body problem , 2001 .

[10] C. F. Yoder,et al. The dynamics of coorbital satellite systems , 1988 .

[11] Chaotic Motions of F-Ring Shepherds , 2002, astro-ph/0205330.