Repeated minimizers of p-frame energies

Abstract

For a collection of N unit vectors X=\xi\i=1N, define the p-frame energy of X as the quantity Σi≠ j | xi,xj |p. In this paper, we connect the problem of minimizing this value to another optimization problem, so giving new lower bounds for such energies. In particular, for p<2, we prove that this energy is at least 2(N-d) p- p 2 (2-p) p-2 2 which is sharp for d≤ N≤ 2d and p=1. We prove that for 1≤ m<d, a repeated orthonormal basis construction of N=d+m vectors minimizes the energy over an interval, p∈[1,pm], and demonstrate an analogous result for all N in the case d=2. Finally, in connection, we give conjectures on these and other energies.