Positive elliptic-elliptic rotopulsators on Clifford tori of nonconstant size project onto regular polygons

Abstract

Let q1,...,qn be the position vectors of the point masses of the curved n-body problem. Consider any positive elliptic-elliptic rotopulsator solution qiT=(r(θ+αi),r(θ+αi),(φ+βi),(φ+βi)), i∈\1,...,n\, where α1,...,αn,β1,...,βn∈ [0,2π) are constants, φ, θ, r and are twice-differentiable, continuous, nonconstant functions, r2+2=1, r≥ 0 and ≥ 0. We prove that the if the configuration of the point masses is of nonconstant size, the configuration of the vectors (r(θ+αi),r(θ+αi))T is a regular polygon, as is the configuration of the vectors ((φ+βi),(φ+βi))T, i∈\1,...,n\.