We prove the existence of a number of smooth periodic motions u* of the classical Newtonian N-body problem which, up to a relabeling of the N particles, are invariant under the rotation group R of one of the five Platonic polyhedra. The number N coincides with the order {pipe}R{pipe} of R and the particles have all the same mass. Our approach is variational and u* is a minimizer of the Lagrangian action A on a suitable subset K of the H~1T-periodic maps u:?→?~(3N). The set K is a cone and is determined by imposing on u both topological and symmetry constraints which are defined in terms of the rotation group R. There exist infinitely many such cones K, all with the property that A{pipe}_K is coercive. For a certain number of them, using level estimates and local deformations, we show that minimizers are free of collisions and therefore classical solutions of the N-body problem with a rich geometric-kinematic structure.
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机译:我们证明了经典牛顿N体问题的许多光滑周期运动u *的存在,直到重新标记N粒子,在五个柏拉图多面体之一的旋转群R下都是不变的。数N与R的{pipe} R {pipe}的阶数重合,并且粒子的质量相同。我们的方法是变分的,u *是H〜1T周期图u:?→?〜(3N)的合适子集K上的拉格朗日行动A的极小值。集合K是一个圆锥体,它是通过将u和拓扑约束施加到u上来确定的,这些约束是根据旋转组R定义的。存在无限多个这样的圆锥体K,所有圆锥体都具有A {pipe} _K是强制性的。对于其中的某些数量,使用级别估计和局部变形,我们表明最小化器没有碰撞,因此具有丰富的几何运动结构的N体问题的经典解。
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