Abstract
Exploration of the Solar System has recently revealed the existence of a large number of asteroids with satellites, which has stimulated interest in studying the dynamics of such systems. This paper is dedicated to the analysis of the relative motion of a binary asteroid. The conditions of existence of such a system (i.e., when its components do not run away) are derived in the Introduction. Then it is assumed that the satellite has no significant effect on the motion of the main asteroid, the latter being modeled as a dumbbell-like precessing solid body. The equations of motion of this system are a two-parameter generalization of the corresponding equations of the restricted circular three-body problem. It is demonstrated that in the system under consideration there exist steady-state motions in which the small asteroid is equidistant from attracting centers at the ends of the dumbbell (an analog to triangle libration points). The conditions of existence of such motions are derived, and the positions with respect to the dumbbell are analyzed in detail. Examination of the stability of the triangle libration points is reduced to investigation of a characteristic equation of the sixth degree. The stability conditions are derived in the case when the main asteroid executes near-planar motion.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Collision Processes in the Solar System, Marov, M.Ya. and Rickman, H., Eds., Kluwer Academic, 2001.
Finkel’shtein, A.M., Rossiiskaya Akademiya Nauk mezhdu Marsom i Yupiterom (Russian Academy of Sciences between Mars and Jupiter), St. Petersburg: Nauka, 2001.
Lidov, M.L., Orbit Evolution of Artificial Planets under the Action of Perturbations from External Bodies, Iskusst. Sputniki Zemli, 1961, no. 8, pp. 5–45.
Lidov, M.L., Approximate Analysis of the Orbits of Artificial Satellites, in Problemy divizheniya iskusstvennykh nebesnykh tel (Issues of the Motion of Artificial Celestial Bodies), Moscow: Izd. AN SSSR, 1963, pp. 119–134.
Egorov, V.A., Prostranstvennaya zadacha dostizheniya Luny (Three-Dimensional Problem of Reaching the Moon), Moscow: Nauka, 1965.
Duboshin, G.N., G.N., Nebesnaya mekhanika. Osnovnye zadachi i metody (Celestial Mechanics: Basic Problems and Methods), 2nd ed., Moscow: Nauka, 1968.
Beletsky, V.V., Ocherki o dvizhenii kosmicheskikh tel (Essays on the Motion of Space Bodies), Moscow: Nauka, 1977.
Markeev, A.P., Tochki libratsii v nebesnoi mekhanike i kosmodinamike (Libration Points in Celestial Mechanics and Cosmodynamics), Moscow: Nauka, 1978.
Szebehely, V., Theory of Orbits: The Restricted Problem of Three Bodies, New York: Academic, 1967. Translated under the title Teoriya orbit. Ogranichennaya zadacha trekh tel, Moscow: Nauka, 1982.
Bryuno, A.D., Ogranichennaya zadacha trekh tel (Restricted Three-Body Problem), Moscow: Nauka, 1990.
Beletsky, V.V., Some Problems of Dynamics of Binary Asteroids, in Sovremennye problemy mekhaniki i fiziki kosmosa. K 70-letiyu so dnya rozhdeniya chl.-korr. RAN M.Ya. Marova (Present-day Problems of Mechanics and Physics of Space. To 70th Birthday of M.Ya. Marov, Corr. Member of Russ. Acad. Sci., Avduevsky, V.S. and Kolesnichenko, A.V., Eds., Moscow: Fizmatlit, 2003, pp. 27–40.
Author information
Authors and Affiliations
Corresponding author
Additional information
Original Russian Text © V.V. Beletsky, 2007, published in Kosmicheskie Issledovaniya, 2007, Vol. 45, No. 5, pp. 435–442.
Rights and permissions
About this article
Cite this article
Beletsky, V.V. Generalized restricted circular three-body problem as a model for dynamics of binary asteroids. Cosmic Res 45, 408–416 (2007). https://doi.org/10.1134/S001095250705005X
Received:
Issue Date:
DOI: https://doi.org/10.1134/S001095250705005X