Abstract
Gravity-gradient perturbations of the attitude motion of a tumbling tri-axial satellite are investigated. The satellite center of mass is considered to be in an elliptical orbit about a spherical planet and to be tumbling at a frequency much greater than orbital rate. In determining the unperturbed (free) motion of the satellite, a canonical form for the solution of the torque-free motion of a rigid body is obtained. By casting the gravity-gradient perturbing torque in terms of a perturbing Hamiltonian, the long-term changes in the rotational motion are derived. In particular, far from resonance, there are no long-period changes in the magnitude of the rotational angular momentum and rotational energy, and the rotational angular momentum vector precesses abound the orbital angular momentum vector.
At resonance, a low-order commensurability exists between the polhode frequency and tumbling frequency. Near resonance, there may be small long-period fluctuations in the rotational energy and angular momentum magnitude. Moreover, the precession of the rotational angular momentum vector about the orbital angular momentum vector now contains substantial long-period contributions superimposed on the non-resonant precession rate. By averaging certain long-period elliptic functions, the mean value near resonance for the precession of the rotational angular momentum vector is obtained in terms of initial conditions.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Breakwell, J. V. and Pringle, R., Jr.: 1965, ‘Nonlinear Resonance Affecting Gravity-Gradient Stability’,Proc. International Astronautical Congress, Athens, Greece, pp. 305–325.
Byrd, Paul F. and Friedman, Morris D.: 1954,Handbook of Elliptic Integrals for Engineers and Physicists, Springer-Verlag, Berlin.
Crenshaw, Jack W. and Fitzpatrick, Philip M.: 1968, ‘Gravity Effects on the Rotational Motion of a Uniaxial Artificial Satellite’,AIAA Journal 6, 2140–2145.
Deprit, André: 1967, ‘Free Rotation of a Rigid Body Studied in the Phase Plane’,Am. J. Phys. 35, 424–428.
Hitzl, D. L.: 1970, ‘Gravity-Gradient Attitude Perturbations of Symmetric and Tri-Axial Satellites Near Resonance’, Ph.D. Dissertation, Stanford University.
Holland, R. L. and Barkley, Matthew B.: 1967, ‘Theory and Observation of the Rotational Motion of the Pegasus Satellites’, AIAA Guidance, Control and Flight Dynamics Conference, Huntsville, Alabama.
Holland, R. L. and Sperling, Hans J.: 1969, ‘A First Order Theory for the Rotational Motion of a Tri-axial Rigid Body Orbiting an Oblate Primary’,Astron. J. 74, 490–496.
Kane, T. R. and Shippy, D. J.: 1963, ‘Attitude Stability of a Spinning Unsymmetrical Satellite in a Circular Orbit’,J. Astronaut. Sci. X, 114–119.
Meirovitch, L. and Wallace, F. B., Jr.: 1967, ‘Attitude Instability Regions of a Spinning Unsymmetrical Satellite in a Circular Orbit’,J. Astronaut. Sci. XIV, 123–133.
Tisserand, F.: 1891,Traité de Mécanique Céleste, Tome II, ‘Théorie de la figure des corps celestes et de leur mouvement de rotation’, Gauthier-Villars, Paris, pp. 388–393.
Torzhevskii, A. P.: 1968, ‘Rapid Spinning of an Artificial Satellite About its Center of Mass in Resonance’,Kosm. Issledov. 6, 47–58.
Whittaker, E. T.: 1960,Analytical Dynamics of Particles and Rigid Bodies, Cambridge University Press.
Zaroodny, Serge J.: 1961, ‘An Elementary Introduction to Elliptic Functions Based on the Theory of Nutation’,Am. Math. Monthly 68, 593–616.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Hitzl, D.L., Breakwell, J.V. Resonant and non-resonant gravity-gradient perturbations of a tumbling tri-axial satellite. Celestial Mechanics 3, 346–383 (1971). https://doi.org/10.1007/BF01231806
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01231806