Subharmonic Kernels and Energy Minimizing Measures, with Applications to the Flat Torus

Abstract

We study the minimization of the energy integral IK(μ) = ∫ ∫ K(x,y) dμ(x) dμ(y) over all Borel probability measures μ, where (,) is a compact connected metric space and K:2 [0,∞] is continuous in the extended sense. We focus on kernels K which are subharmonic, which we define so that the potential UKμ(x) = ∫ K(x,y) dμ(y) satisfies a maximum principle on suppμ. This extends the classical electrostatics minimization problem for logarithmic energy ∫∫(1||x-y||), which is used heavily as a tool in approximation theory. Using properties of minimizing measures, we show that if the singularities of the subharmonic kernel K are such that K is regular, then K is positive definite, and μ is a minimizing measure if and only if its potential is constant (outside of a small exceptional set).We then apply this result to group invariant kernels on compact homogeneous manifolds. In this case, the uniform measure σ has constant potential, so subharmonicity implies that this is the minimizing measure. Finally, we look at the case of the d-dimensional flat torus Td. We use our results to see that the Riesz kernel Ks(x,y) = sign(s)(x,y)-s is minimized by σ (and thus positive definite) when d > s ≥ d-2. Additionally, the positive definiteness gives us a condition which implies that the multivariate Fourier series of a function f:[0,π]d [0,∞] has nonnegative coefficients.

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