English

A minimum principle for potentials with application to Chebyshev constants

Classical Analysis and ODEs 2016-07-26 v1

Abstract

For "Riesz-like" kernels K(x,y)=f(xy)K(x,y)=f(|x-y|) on A×AA\times A, where AA is a compact dd-regular set ARpA\subset \mathbb{R}^p, we prove a minimum principle for potentials UKμ=K(x,y)dμ(x)U_K^\mu=\int K(x,y)d\mu(x), where μ\mu is a Borel measure supported on AA. Setting PK(μ)=infyAUμ(y)P_K(\mu)=\inf_{y\in A}U^\mu(y), the KK-polarization of μ\mu, the principle is used to show that if {νN}\{\nu_N\} is a sequence of measures on AA that converges in the weak-star sense to the measure ν\nu, then PK(νN)PK(ν)P_K(\nu_N)\to P_K(\nu) as NN\to \infty. The continuous Chebyshev (polarization) problem concerns maximizing PK(μ)P_K(\mu) over all probability measures μ\mu supported on AA, while the NN-point discrete Chebyshev problem maximizes PK(μ)P_K(\mu) only over normalized counting measures for NN-point multisets on AA. We prove for such kernels and sets AA, that if {νN}\{\nu_N\} is a sequence of NN-point measures solving the discrete problem, then every weak-star limit measure of νN\nu_N as NN \to \infty is a solution to the continuous problem.

Cite

@article{arxiv.1607.07283,
  title  = {A minimum principle for potentials with application to Chebyshev constants},
  author = {A. Reznikov and E. B. Saff and O. V. Vlasiuk},
  journal= {arXiv preprint arXiv:1607.07283},
  year   = {2016}
}
R2 v1 2026-06-22T15:03:30.477Z