D. L. Ferrario
Published 2020-07-03Version 1
Central configurations play an important role in the dynamics of the $n$-body problem: they occur as relative equilibria and as asymptotic configurations in colliding trajectories. We illustrate how they can be found as projective fixed points of self-maps defined on the shape space, and some results on the inverse problem in dimension $1$, i.e. finding (positive or real) masses which make a given collinear configuration central. This survey article introduces readers to the recent results of the author, also unpublished, showing an application of the fixed point theory.
Symmetry, bifurcation and stacking of the central configurations of the planar 1+4 body problem
Hyperbolic motions in the $N$-body problem with homogeneous potentials
Branches and bifurcations of ejection-collision orbits in the planar circular restricted three body problem
![QR code for arXiv:2007.01741 [math.DS]](http://oss.arxitics.com/images/favicon.svg)