Asymptotic solutions are developed for the motion of a geocentric satellite in the equatorial plane due to gravitational perturbations such as nonsphericity (especially oblateness) of the primary body. Axisymmetric potentials are considered. A class of transformations is developed and the equations of motion are solved by the method of generalized multiple scales. Further it is shown that the equations of motion can be transformed into the required form to within any specified degree of accuracy. The transformations form an Abelian group of infinite order which leaves the differential equations of motion invariant. Solutions are developed in terms of elementary functions instead of elliptic or other higher transcendental functions and are shown to agree with known results.
[1]
Ali H. Nayfeh,et al.
A Perturbation Method for Treating Nonlinear Oscillation Problems
,
1965
.
[2]
W. T. Kyner.
A Mathematical Theory of the Orbits About an Oblate Planet
,
1965
.
[3]
G. Sandri,et al.
A generalized multiple scales approach to a class of linear differential equations
,
1969
.
[4]
Peter L. Balise,et al.
Nonlinear Differential Equations
,
1962
.
[5]
G. Sandri.
The foundations of nonequilibrium statistical mechanics, I☆
,
1963
.
[6]
Rudrapatna Ramnath,et al.
A MULTIPLE TIME SCALES APPROACH TO THE ANALYSIS OF LINEAR SYSTEMS
,
1968
.