Abstract
A form of planetary perturbation theory based on canonical equations of motion, rather than on the use of osculating orbital elements, is developed and applied to several problems of interest. It is proved that, with appropriately selected initial conditions on the orbital elements, the two forms of perturbation theory give rise to identical predictions for the observable coordinates and velocities, while the orbital elements themselves may be strikingly different. Differences between the canonical form of perturbation theory and the classical Lagrange planetary perturbation equations are discussed. The canonical form of perturbation theory in some cases has advantages when the perturbing forces are velocity-dependent, but the two forms of perturbation theory are equivalent if the perturbing forces are dependent only on position and not on velocity. The canonical form of the planetary perturbation equations are derived and applied to the Lense Thirring precession of a test body in a Keplerian orbit around a rotating mass source.
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References
Ashby, N.: 1986, inRelativity in Celestial Mechanics and Astronomy (J. Kovalesky and V. Brumberg, Eds.), D. Reidel, Dordrecht, p. 41.
Brouwer, D. and Clemence, G.M.: 1961,Methods in Celestial Mechanics, Academic Press, New York.
Brumberg, V.A.: 1991,Essential Relativistic Celestial Mechanics, Adam Hilger, Bristol.
Danby, J.: 1962,Fundamentals of Celestial Mechanics, The Macmillan Co., New York.
Fitzpatrick, P.M.: 1970,Principles of Celestial Mechanics, Academic Press, New York.
Garfinkel, B.: 1944,Astron. J. 51, 44.
Goldstein, H.: 1980,Classical Mechanics, 2nd Ed., Addison-Wesley, Reading, MA.
Lense, J. and Thirring, H.: 1918,Phys. Z. 19, 156.
Klinkerfues, E.: 1912,Theoretische Astronomie (W. Buchholtz, Ed.), Friedr. Vieweg & Sons, Braunschweig.
Mashoon, B., Hehl, F. and Theiss, D.: 1984,Gen. Relativ. Gravit. 16, 727.
Misner, C., Thorne, K. and Wheeler, J.: 1971,Gravitation, W.H. Freeman and Company, San Francisco.
Moulton, F.R.: 1923,An Introduction to Celestial Mechanics, 2nd Ed., The MacMillan Co., New York.
Poincaré, H.: 1905–1910,Leçons de Méchanique Céleste. Gauthier-Villars, Paris.
Pollard, H.: 1966,Mathematical Introduction to Celestial Mechanics, Prentice-Hall, Englewood Cliffs, NJ.
Seidelmann, P.K. and Kovalevsky, J. (Eds.): 1989,Applications of Computer Technology to Dynamical Astronomy, Proc. IAU Colloq. 109, Gaithersburg, MD, July 27–29, 1988, Kluwer Academic Publishers, Dordrecht.
Sternberg, S.: 1969,Celestical Mechanics, Part II, W.A. Benjamin, New York.
Sterne, Theodore E.: 1960,An Introduction to Celestial Mechanics, Interscience Publishers, New York.
Taff, Laurence G.: 1985,Celestial Mechanics, John Wiley & Sons, New York.
Tapley, B.D. and Szebehely, V. (Eds.): 1973,Recent Advances in Dynamical Astronomy, D. Reidel, Dordrecht.
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Ashby, N., Allison, T. Canonical planetary perturbation equations for velocity-dependent forces, and the Lense-Thirring precession. Celestial Mech Dyn Astr 57, 537–585 (1993). https://doi.org/10.1007/BF00691937
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DOI: https://doi.org/10.1007/BF00691937