Abimael Bengochea, Carlos García-Azpeitia, Ernesto Pérez-Chavela, Pablo Roldan
Published 2020-05-06Version 1
We prove that all non-degenerate relative equilibria of the planar Newtonian $n$--body problem can be continued to spaces of constant curvature $\kappa$, positive or negative, for small enough values of this parameter. We also compute the extension of some classical relative equilibria to curved spaces using numerical continuation. In particular, we extend Lagrange's triangle configuration with different masses to both positive and negative curvature spaces.
Symmetry, bifurcation and stacking of the central configurations of the planar 1+4 body problem
On the Uniqueness of Convex Central Configurations in the Planar $4$-Body Problem
Platonic Polyhedra, Topological Constraints and Periodic Solutions of the Classical $N$-Body Problem
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