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Bibliographic Details
Main Authors: Graven, Andrew J., Makarov, Nikolai G.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2509.03777
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author Graven, Andrew J.
Makarov, Nikolai G.
author_facet Graven, Andrew J.
Makarov, Nikolai G.
contents We present a framework for reconstructing any simply connected, bounded or unbounded, quadrature domain $Ω$ from its quadrature function $h$. Using the Faber transform, we derive formulae directly relating $h$ to the Riemann map for $Ω$. Through this approach, we obtain a complete classification of one point quadrature domains with complex charge. We proceed to develop a theory of weighted quadrature domains with respect to weights of the form $ρ_a(w)=|w|^{2(a-1)}$ when $a > 0$ ("power-weighted" quadrature domains) and the limiting case of when $a=0$ ("log-weighted" quadrature domains). Furthermore, we obtain Faber transform formulae for reconstructing weighted quadrature domains from their respective quadrature functions. Several examples are presented throughout to illustrate this approach both in the simply connected setting and in the presence of rotational symmetry.
format Preprint
id arxiv_https___arxiv_org_abs_2509_03777
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Quadrature Domains and the Faber Transform
Graven, Andrew J.
Makarov, Nikolai G.
Complex Variables
Mathematical Physics
Analysis of PDEs
31A25 (Primary) 30E25, 30C20, 31A15 (Secondary)
We present a framework for reconstructing any simply connected, bounded or unbounded, quadrature domain $Ω$ from its quadrature function $h$. Using the Faber transform, we derive formulae directly relating $h$ to the Riemann map for $Ω$. Through this approach, we obtain a complete classification of one point quadrature domains with complex charge. We proceed to develop a theory of weighted quadrature domains with respect to weights of the form $ρ_a(w)=|w|^{2(a-1)}$ when $a > 0$ ("power-weighted" quadrature domains) and the limiting case of when $a=0$ ("log-weighted" quadrature domains). Furthermore, we obtain Faber transform formulae for reconstructing weighted quadrature domains from their respective quadrature functions. Several examples are presented throughout to illustrate this approach both in the simply connected setting and in the presence of rotational symmetry.
title Quadrature Domains and the Faber Transform
topic Complex Variables
Mathematical Physics
Analysis of PDEs
31A25 (Primary) 30E25, 30C20, 31A15 (Secondary)
url https://arxiv.org/abs/2509.03777