On the trajectories of O(1)-Kepler Problems
Abstract
The trajectories of the O(1)-Kepler problem at level n 2 are completely determined. It is found in particular that a non-colliding trajectory is an ellipse, a parabola or a branch of hyperbola according as the total energy is negative, zero or positive. Moreover, it is shown that the group GL(n, R)/O(1) acts transitively on both the set of oriented elliptic trajectories and the set of oriented parabolic trajectories. The method employed here is similar to the one used by Levi-Civita in the study of planar Kepler problem in 1920.
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