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Chaos and order in the Rotational Motion

Published online by Cambridge University Press:  12 April 2016

Andrzej J. Maciejewski
Andrzej J. Maciejewski*
Affiliation:
Institute of Astronomy, Nicolaus Copernicus University, 87-100 Torun, ul. Chopina 12/18, Poland

Abstract

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It was proved that the problem of perturbed planar oscillations of a rigid-body in a circular orbit is nonitegrable. Two types of perturbations were considered: solar radiations pressure and the third body torques. In the second part of the paper example of chaotic rotations of a symmetric rigid body in a circular orbit was given. It was shown numerically that the phase space is divided into two separate regions of chaotic and ordered motions.

Type
Part I Chaos
Information
International Astronomical Union Colloquium , Volume 132: Instability, Chaos and Predictability in Celestial Mechanics and Stellar Dynamics , 1993 , pp. 23 - 38
Copyright
Copyright © Nova Science Publishers 1993

References

[1] Beletskii, V.V., 1965, ‘The motion of an artificial satellite around a center of mass’, Nauka, Moscow (in Russian).Google Scholar
[2] Beletskii, V.V., Starostin, E.L., 1990, ‘Planar librations of a satellite under influence of gravity and solar radiation torques’, Kosm. Issled., 28, No. 4, 496505.Google Scholar
[3] Bolotin, S.V., 1986, ‘Liouville non-integrability conditions for Hamiltonian systems’, Vestnik Moscow, Univ. Ser. Mat. Mech., No.3, 5864.Google Scholar
[4] Burov, A.A., 1984, ‘Nonitegrability of planar oscillations of a satellite in an elliptic orbit’, Vestnik Moskov. Univ. Ser.Mat, Mech., No.1, 7173.Google Scholar
[5] Burov, A.A., 1984, ‘About oscillations of a satellite in an elliptic orbit’, Kossm. Issled., 22, No.1, 133134.Google Scholar
[6] Churkina, N.I., 1988, ‘The separatrices splitting and initiation of isolated periodic solutions in the problem of plane periodic motion of a satellite relatively to the mass center in a collinear libration point’s vicinity’, Kosm. Issled., 26, No.3, 472474.Google Scholar
[7] Holmes, P., 1989, ‘Nonlinear oscillations and the Smale horseshoe map’, in Chaos and Fractals, (eds. Devaney, R.L., Keen, L.), AMS, Vol.39.Google Scholar
[8] Kozlov, V.V., 1983, ‘Integrability and non-integrability in Hamiltonian mechancs’, Uspekhi Mat. Nauk, 38, NO . 1, 367, (translation in Russian Math. Surveys, 1983, 38, No.1, 1-76).Google Scholar
[9] Maciejewski, A.J., 1990, ‘Transcendent cases of stability and hypotheses of Sokolsky’, submitted to Celestial Mechanics.Google Scholar
[10] Maciejewski, A.J., 1990, ‘Nonintegrability of perturbed planar oscillations of a satellite’, in preparation.Google Scholar
[11] Melnikov, V.K., 1963, ‘On the stability of the center for time periodic perturbations’ Trudy Moskov. Mat .Obshch, 12, 352 (translation in Trans.Moscow Math. Soc., 1983, 12, 1-57),Google Scholar
[12] Poincaré, H., 1972, ‘Collected Works’, Vol.I, II Nauka, Moscow (in Russian).Google Scholar
[13] Przytycki, F., 1982, ‘Examples of conservative diffeomorphisms of the two dimensional torus with coexistence of elliptic and stochastic behavior’, Ergod.Th. and Dynam. Sys., 2, 439463.Google Scholar
[14] Rybnikova, T.A., Bulatskaya, T.F., Rodnikova, A.V., 1988, ‘On stabilization of rotation of heliocentric satellite with solar sale’, Kosm. Issled., 26, NO.4, 625628.Google Scholar
[15] Rybnikova, T.A., Treshchev, D.V., 1990, ‘Existence of invariant tori in the problem of satellite with solar sale motion’ Kosm. Issled, 28, No.2, 309312.Google Scholar
[16] Sokolsky, A.G., 1980, ‘Problem of regular precessions stability of a symmetrical satellite’, Kosm Issled., 17, No.5, 698706.Google Scholar
[17] Strelcyn, J.M., 1989, ‘The“coexistence problem”for conservative dynamical systems a review’, preprint No. 89-13, Universite Paris Nord.Google Scholar
[18] Wisdom, J., Peale, S.J., Mignard, F., 1984, ‘The chaotic rotation of Hyperion’, Icarus, 58, 137152.Google Scholar
[19] Ziglin, S.L., 1980, ‘Splitting of the separatrices, branching of solutions, and non-existence of an integral in the dynamics of a solid body’, Trudy Moskov. Mat. Obshch., 41, 287303 (translation in Trans.Moscow Math. Soc., 1983, 41, 283-298).Google Scholar
[20] Ziglin, S.L., 1987, ‘Splitting of the separatrices and non-existence of an integral in a system of differential equations of Hamiltonian type with two degree of freedom’, Izv. Akad. Nauk SSSR Ser .Mat., 51, 10381103.Google Scholar