Dynamics of Particles on a Curve with Pairwise Hyper-singular Repulsion
Abstract
We investigate the large time behavior of N particles restricted to a smooth closed curve in Rd and subject to a gradient flow with respect to Euclidean hyper-singular repulsive Riesz s-energy with s>1. We show that regardless of their initial positions, for all N and time t large, their normalized Riesz s-energy will be close to the N-point minimal possible. Furthermore, the distribution of such particles will be close to uniform with respect to arclength measure along the curve.
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