A minimum principle for potentials with application to Chebyshev constants
Classical Analysis and ODEs
2016-07-26 v1
Abstract
For "Riesz-like" kernels on , where is a compact -regular set , we prove a minimum principle for potentials , where is a Borel measure supported on . Setting , the -polarization of , the principle is used to show that if is a sequence of measures on that converges in the weak-star sense to the measure , then as . The continuous Chebyshev (polarization) problem concerns maximizing over all probability measures supported on , while the -point discrete Chebyshev problem maximizes only over normalized counting measures for -point multisets on . We prove for such kernels and sets , that if is a sequence of -point measures solving the discrete problem, then every weak-star limit measure of as 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}
}