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Main Authors: Dragnev, Peter D., Orive, Ramon, Saff, Eduard B., Wielonsky, Franck
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2501.01208
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author Dragnev, Peter D.
Orive, Ramon
Saff, Eduard B.
Wielonsky, Franck
author_facet Dragnev, Peter D.
Orive, Ramon
Saff, Eduard B.
Wielonsky, Franck
contents We investigate the Riesz energy minimization problem on a $d$-dimensional ball in the presence of an external field created by a point charge above the ball in $\R^{d+1}$, $d\geq1$. Both cases of an attractive charge and a repulsive charge are considered. The notion of a signed equilibrium measure is one of the main tools in the present study. For the case of a positive (repulsive) charge, the determination of the support of the equilibrium measure is a nontrivial question. We solve it in the one-dimensional case by making use of iterated balayage, a method already applied in logarithmic potential theory. Here we use a modified version of it, in order to handle the phenomenon of mass loss, characteristic of the Riesz balayage of positive measures. Moreover, we also consider minimization of Coulomb energy on the ball in dimension $d\geq2$, and of logarithmic energy on the segment in dimension 1. Different techniques are used for these two cases.
format Preprint
id arxiv_https___arxiv_org_abs_2501_01208
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Riesz equilibrium on a ball in the external field of a point charge
Dragnev, Peter D.
Orive, Ramon
Saff, Eduard B.
Wielonsky, Franck
Classical Analysis and ODEs
We investigate the Riesz energy minimization problem on a $d$-dimensional ball in the presence of an external field created by a point charge above the ball in $\R^{d+1}$, $d\geq1$. Both cases of an attractive charge and a repulsive charge are considered. The notion of a signed equilibrium measure is one of the main tools in the present study. For the case of a positive (repulsive) charge, the determination of the support of the equilibrium measure is a nontrivial question. We solve it in the one-dimensional case by making use of iterated balayage, a method already applied in logarithmic potential theory. Here we use a modified version of it, in order to handle the phenomenon of mass loss, characteristic of the Riesz balayage of positive measures. Moreover, we also consider minimization of Coulomb energy on the ball in dimension $d\geq2$, and of logarithmic energy on the segment in dimension 1. Different techniques are used for these two cases.
title Riesz equilibrium on a ball in the external field of a point charge
topic Classical Analysis and ODEs
url https://arxiv.org/abs/2501.01208