English

Central Configurations and Mutual Differences

Dynamical Systems 2017-04-03 v4

Abstract

Central configurations are solutions of the equations λmjqj=Uqj\lambda m_j\boldsymbol{q}_j = \frac{\partial U}{\partial \boldsymbol{q}_j}, where UU denotes the potential function and each qj\boldsymbol{q}_j is a point in the dd-dimensional Euclidean space ERdE\cong {\mathbb R}^d, for j=1,,nj=1,\ldots, n. We show that the vector of the mutual differences qij=qiqj\boldsymbol{q}_{ij} = \boldsymbol{q}_i - \boldsymbol{q}_j satisfies the equation λαq=Pm(Ψ(q))-\frac{\lambda}{\alpha} \boldsymbol{q} = P_m(\Psi(\boldsymbol{q})), where PmP_m is the orthogonal projection over the spaces of 11-cocycles and Ψ(q)=qqα+2\Psi(\boldsymbol{q}) = \frac{\boldsymbol{q}}{|\boldsymbol{q}|^{\alpha+2}}. It is shown that differences qij\boldsymbol{q}_{ij} of central configurations are critical points of an analogue of UU, defined on the space of 11-cochains in the Euclidean space EE, and restricted to the subspace of 11-cocycles. Some generalizations of well known facts follow almost immediately from this approach.

Keywords

Cite

@article{arxiv.1608.00480,
  title  = {Central Configurations and Mutual Differences},
  author = {D. L. Ferrario},
  journal= {arXiv preprint arXiv:1608.00480},
  year   = {2017}
}
R2 v1 2026-06-22T15:09:13.921Z