Saari's homographic conjecture for planar equal-mass three-body problem under a strong force potential

Details Saari's homographic conjecture for planar equal-mass three-body problem under a strong force potential Saari's homographic conjecture for planar equal-mass three-body problem under a strong force potential

2011-07-12

arxiv.org/abs/1107.2178v2

2012 J. Phys. A: Math. Theor. 45 045208

Physics

Mathematical Physics

Scientific paper

10.1088/1751-8113/45/4/045208

Donald Saari conjectured that the $N$-body motion with constant configurational measure is a motion with fixed shape. Here, the configurational measure $\mu$ is a scale invariant product of the moment of inertia $I=\sum_k m_k |q_k|^2$ and the potential function $U=\sum_{i0$. Namely, $\mu = I^{\alpha/2}U$. We will show that this conjecture is true for planar equal-mass three-body problem under the strong force potential $\sum_{i

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