Abstract
A method is described to compute solar perturbations of a natural or artificial satellite, with the aid of computerized series expansions. The method has been implemented on the Univac — 1108 computer. A worked example is described in detail in the present article.
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References
R.A. Broucke, "Iterative Perturbations in Rectangular Coordinates," Celestial Mechanics, Vol. 1, no. 1, pages 110–126, 1969.
R.A. Broucke and K. Garthwaite, "A Programming System for Analytical Series Expansions on a Computer," Celestial Mechanics, Vol. 2, no. 2, pages 9–20, 1970.
R.A. Broucke, "How to Assemble a Keplerian Processor?" Celestial Mechanics, Vol. 2, no. 1, pages 9–20, 1970.
R.A. Broucke, "On the Matrizant of the Two-Body Problem," Astronomy and Astrophysics, Vol. 6, pages 173–182, 1970.
R.A. Broucke, "Construction of Rational and Negative Powers of a Series," Comm. of Assoc. of Comp. Machines, pages 32–35, January 1971.
R.A. Broucke, "Properties of the Equinoctial Orbit Elements," Celestial Mechanics, Vol. 5, no. 1, January 1972.
R.A. Broucke and G. Smith, "Expansion of the Planetary Disturbing Function," Celestial Mechanics, Vol. 4, pages 490–499, 1971.
J. Kovalevsky, "Introduction to Celestial Mechanics." Springer-Verlag, New York, 1967.
D. Brouwer and G. Clemence, "Methods of Celestial Mechanics," Academic Press, New York, 1961.
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© 1974 Springer-Verlag
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Broucke, R. (1974). Computation of solar perturbations with poisson series. In: Bettis, D.G. (eds) Proceedings of the Conference on the Numerical Solution of Ordinary Differential Equations. Lecture Notes in Mathematics, vol 362. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0066594
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DOI: https://doi.org/10.1007/BFb0066594
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