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Darboux Inversions of the Kepler Problem

Abstract : While extending a famous problem asked and solved by Bertrand in 1873, Darboux found in 1877 a family of abstract surfaces of revolution, each endowed with a force function, with the striking property that all the orbits are periodic on open sets of the phase space. We give a description of this family which explains why they have this property: they are the Darboux inverses of the Kepler problem on constant curvature surfaces. What we call the Darboux inverse was briefly introduced by Darboux in 1889 as an alternative approach to the conformal maps that Goursat had just described.
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Contributor : Nathalie POTHIER Connect in order to contact the contributor
Submitted on : Sunday, July 10, 2022 - 11:23:15 AM
Last modification on : Tuesday, August 2, 2022 - 4:32:17 AM

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Alain Albouy, Lei Zhao. Darboux Inversions of the Kepler Problem. Regular and Chaotic Dynamics, 2022, 27, pp.253-280. ⟨10.1134/S1560354722030017⟩. ⟨insu-03718980⟩



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