Spiderweb central configurations

Abstract

In this paper we study spiderweb central configurations for the N-body problem, i.e configurations given by N=n × +1 masses located at the intersection points of concurrent equidistributed half-lines with n circles and a central mass m0, under the hypothesis that the masses on the i-th circle are equal to a positive constant mi; we allow the particular case m0=0. We focus on constructive proofs of the existence of spiderweb central configurations, which allow numerical implementation. Additionally, we prove the uniqueness of such central configurations when ∈ \2,…,9\ and arbitrary n and mi; under the constraint m1≥ m2≥ … ≥ mn we also prove uniqueness for ∈ \10,…,18\ and n not too large. We also give an algorithm providing a rigorous proof of the existence and local unicity of such central configurations when given as input a choice of n, and m0, . . . ,mn. Finally, our numerical simulations highlight some interesting properties of the mass distribution.