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International Journal of Astronomy and Astrophysics 2016

Effect of Resonance on the Motion of Two Cylindrical Rigid Bodies

DOI: 10.4236/ijaa.2016.64040, PP. 555-574

M. R. Hassan, Baby Kumari, Md. Aminul Hassan, Payal Singh, B. K. Sharma

Keywords: Inertia Ellipsoid, Ellipsoids of Revolution, Symmetrical Bodies, Orientation of the Bodies, Principal Axes, Eulerian Angles, Critical Points, Perturbations, Averaging of Hamiltonian, Resonance

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Abstract:

The effect of resonance on the motion of two cylindrical rigid bodies has been studied in the light of Bhatnagar [1] [2] [3] and under some defined axiomatic restrictions. Here we have calculated variation in Eulerian angles due to resonance in terms of orbital elements and unperturbed Eulerian angles.

References

[1]	Bhatnagar, K.B. and Gupta, B. (1977) Resonance in the Restricted Problems of Three Bodies with Short Periodic Perturbations. Proceedings of the Indian National Science Academy, Vol. 43, 153-168.
[2]	Bhatnagar, K.B. and Gupta, B. (1977) Resonance in the Restricted Problems of Three Bodies with Short Periodic Perturbations in the Elliptic Case. Proceedings of the Indian National Science Academy, Vol. 43, 290-302.
[3]	Bhatnagar, K.B. (1978) Motion of Two Rigid Bodies under the Gravitational Influence of Each Other. Astronomy and Astrophysics, 62, 217-221.
[4]	Russel, H.N. (1928) On the Advance of Periastron in Eclipsing Binaries. Monthly Notices of Royal Astronomical Society, 88, 641-643. https://doi.org/10.1093/mnras/88.8.641
[5]	Kopal, Z. (1938) On the Motion of the Apsidal Line in Close Binary Systems. Monthly Notices of Royal Astronomical Society, 98, 448-458. https://doi.org/10.1093/mnras/98.6.448
[6]	Cowling, T.G. (1938) On the Motion of Apsidal Line in Close Binary Systems. Monthly Notices of Royal Astronomical Society, 98, 734-743. https://doi.org/10.1093/mnras/98.9.734
[7]	Sterne, T.E. (1938) Apsidal Motion in Binary Stars (II) Distributions of Density. Monthly Notices of Royal Astronomical Society, 99, 662-670. https://doi.org/10.1093/mnras/99.8.662
[8]	Brouwer, D. (1946) A Survey of the Dynamics of Close Binary Systems. The Astronomical Journal, 52, 57-62. https://doi.org/10.1086/105913
[9]	Johnson, D.B. and Kane, T.R. (1969) On a Restricted Problem of Two Rigid Spheroids. The Astronomical Journal, 14, 563-567. https://doi.org/10.1086/110835
[10]	Antonio, E. and Vallejo, M. (2001) On the Attitude Dynamics of Perturbed Triaxial Bodies. Celestial Mechanics and Dynamical Astronomy, 81, 1-2. https://doi.org/10.1023/A:1017437130947
[11]	Choudhary, R.K. and Mishra, P.K. (1974) Restricted Problem of a Rigid Spheroid and an Ellipsoid. Journal of Indian Mathematical Society, 38, 305-317.
[12]	Mercedes, A. and Elipe, A. (1993) Attitude Dynamics of a Rigid Body on a Keplerian Orbit-A Simplification. Celestial Mechanics and Dynamical Astronomy, 55, 243-247. https://doi.org/10.1007/BF00692512
[13]	Marjanov, M. (2007) Two Real Bodies Problem-Complex Harmony of Motions. Mechanics, Automatic Control and Robotics, 6, 65-73.
[14]	Brouwer, D. and Clemence, M. (1971) Methods of Celestial Mechanics. Academic Press, New York, London.
[15]	Brown, E.N. and Shook, C.A. (1933) Planetary Theory. Cambridge University Press, Cambridge, United Kingdom.

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