| viXra.org > Mathematical Physics > viXra:1302.0132 |
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| viXra.org > Mathematical Physics > viXra:1302.0132 |
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Mathematical Physics |
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Authors: Zhanqiang Bai, Guowu Meng, Erxiao Wang
It is demonstrated that, for the recently introduced classical magnetized Kepler problems in dimension $2k+1$, the non-colliding orbits in the ``external configuration space" $\mathbb R^{2k+1}\setminus\{\mathbf 0\}$ are all conics, moreover, a conic orbit is an ellipse, a parabola, and a branch of a hyperbola according as the total energy is negative, zero, and positive. It is also demonstrated that the Lie group ${\mr {SO}}^+(1,2k+1)\times {\bb R}_+$ acts transitively on both the set of oriented elliptic orbits and the set of oriented parabolic orbits.
Comments: 13 Pages.
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[v1] 2013-02-19 21:26:30
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