Saari's homographic conjecture for planar equal-mass three-body problem in Newton gravity

Abstract

Saari's homographic conjecture in N-body problem under the Newton gravity is the following; configurational measure μ=IU, which is the product of square root of the moment of inertia I=(Σ mk)-1Σ mi mj rij2 and the potential function U=Σ mi mj/rij, is constant if and only if the motion is homographic. Where mk represents mass of body k and rij represents distance between bodies i and j. We prove this conjecture for planar equal-mass three-body problem. In this work, we use three sets of shape variables. In the first step, we use ζ=3q3/(2(q2-q1)) where qk ∈ C represents position of body k. Using r1=r23/r12 and r2=r31/r12 in intermediate step, we finally use μ itself and =I3/2/(r12r23r31). The shape variables μ and make our proof simple.