Fixed point indices of central configurations

Abstract

Central configurations of n point particles in E≈ Rd with respect to a potential function U are shown to be the same as the fixed points of the normalized gradient map F=-∇M U / ∇M U M, which is an SO(d)-equivariant self-map defined on the intertia ellipsoid. We show that the SO(d)-orbits of fixed points of F are all fixed points of the map induced on the quotient by SO(d), and give a formula relating their indices (as fixed points) with their Morse indices (as critical points). At the end, we give an example of a non-planar relative equilibrium which is not a central configuration.