Energy, Polarization, and Separation of Greedy Sequences for Riesz and Green Kernels

Abstract

We investigate the asymptotic behavior of greedy s-Riesz and Green energy sequences \xn\n=1∞ on the unit sphere Sd ⊂ Rd+1, where each point xn is defined as the minimizer of the discrete potential generated by the preceding points x1, x2, ..., xn-1. We show that the greedy sequence attains optimal growth behavior for the second-order term of the Green and Riesz s-energies when d-2 ≤ s < d. The main idea is to establish the bounds on polarization using well-separation properties of the greedy configurations.