Guowei Yu
Published 2024-05-28Version 1
In the $N$-body problem, a motion is called hyperbolic, when the mutual distances between the bodies go to infinity with non-zero limiting velocities as time goes to infinity. For Newtonian potential, in \cite{MV20} Maderna and Venturelli proved that starting from any initial position there is a hyperbolic motion with any prescribed limiting velocities at infinity. Recently based on a different approach, Liu, Yan and Zhou \cite{LYZ21} generalized this result to a larger class of $N$-body problem. As the proof in \cite{LYZ21} is quite long and technical, we give a simplified proof for homogeneous potentials following the approach given in the latter paper.
Comments: Accepted by DCDS-A with minor revision
Chazy-Type Asymptotics and Hyperbolic Scattering for the $n$-Body Problem
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
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