Equal masses Eulerian relative equilibria on a rotating meridian of S2

Abstract

Relative equilibria on a rotating meridian on S2 in equal-mass three-body problem under the cotangent potential are determined. We show the existence of scalene and isosceles relative equilibria. Almost all isosceles triangles, including equilateral, can form a relative equilibrium, except for the two equal arc angles θ = π/2. For θ∈ (0,2π/3) \π/2\, the mid mass must be on the rotation axis, in our case, at the north or south pole of S2. For θ∈ (2π/3,π), the mid mass must be on the equator. For θ=2π/3, we obtain the equilateral triangle, where the position of the masses is arbitrary. When the largest arc angle a is in a∈ (π/2,ac), with ac=1.8124..., two scalene configurations exist for given a.