Higher-order asymptotics for the energy of greedy sequences on the unit circle

Abstract

For the Riesz and logarithmic energies, we consider a greedy sequence (an)n=0∞ of points on the unit circle S1 constructed in such a way that for every integer N≥ 2, the energy of the configuration (a0,…,aN-2,x) attains its optimal value (say EN) at x=aN-1. We derive an asymptotic expansion for EN in terms of certain bounded, oscillatory sequences HN, KN, and RN with a doubling periodicity property. In particular, we recover the results of LopMc1,LopWag showing that after a proper translation and scaling of EN, one is left with a sequence TN that is bounded and divergent. We show that the limit points of the sequence TN fill a closed interval. This follows from our asymptotic formulae and an analogous density result for the limit points of the sequences HN, KN, and RN. We also give a new, simpler proof of density results obtained in LopMin for the optimal values of the potential generated by a greedy sequence.