Asymptotics of greedy energy sequences on the unit circle and the sphere

Abstract

For a parameter λ>0, we investigate greedy λ-energy sequences (an)n=0∞ on the unit sphere Sd⊂Rd+1, d≥ 1, satisfying the defining property that each an, n≥ 1, is a point where the potential Σk=0n-1|x-ak|λ attains its maximum value on Sd. We show that these sequences satisfy the symmetry property a2k+1=-a2k for every k≥ 0. The asymptotic distribution of the sequence undergoes a sharp transition at the value λ=2, from uniform distribution (λ<2) to concentration on two antipodal points (λ>2). We investigate first-order and second-order asymptotics of the λ-energy of the first N points of the sequence, as well as the asymptotic behavior of the extremal values Σk=0n-1|an-ak|λ. The second-order asymptotics is analyzed on the unit circle. It is shown that this asymptotic behavior differs significantly from that of N equally spaced points on the unit circle, and a transition in the behavior takes place at λ=1.