Bounds on energy and potentials of discrete measures on the sphere

Abstract

We establish upper and lower universal bounds for potentials of weighted designs on the sphere Sn-1 that depend only on quadrature nodes and weights derived from the design structure. Our bounds hold for a large class of potentials that includes absolutely monotone functions. The classes of spherical designs attaining these bounds are characterized. Additionally, we study the problem of constrained energy minimization for Borel probability measures on Sn-1 and apply it to optimal distribution of charge supported at a given number of points on the sphere. In particular, our results apply to p-frame energy.

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