The restricted two-body problem in constant curvature spaces
Abstract
We perform the bifurcation analysis of the Kepler problem on S3 and L3. An analogue of the Delaunay variables is introduced. We investigate the motion of a point mass in the field of the Newtonian center moving along a geodesic on S2 and L2 (the restricted two-body problem). When the curvature is small, the pericenter shift is computed using the perturbation theory. We also present the results of the numerical analysis based on the analogy with the motion of rigid body.
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