This note verifies a conjecture of Armitage and Goldstein that annular domains may be characterized as quadrature domains for harmonic functions with respect to a uniformly distributed measure on a sphere.12 month embargo - ACUpdate citation details at check date - H
Abstract. We describe nonnegative weights on T that are min-imal at a given point and are related to...
By applying a reflection principle we set up fully explicit representation formulas for the harmonic...
Abstract. The harmonic measure distribution function of a planar domain relates the geometry of the ...
This note verifies a conjecture of Armitage and Goldstein that annular domains may be characterized ...
In this thesis, which consists of five papers (A,B,C,D,E), we are interested in questions related to...
We introduce new classes of domains, i.e., semi-uniform domains and inner emi-uniform domains. Both ...
AbstractWe prove that any finitely connected domain in the plane can be distorted so that it becomes...
Abstract. We study the possibility of deforming quadrature domains into each other, and also discuss...
We prove two density theorems for quadrature domains in , . It is shown that quadrature domains are ...
We prove two density theorems for quadrature domains in , . It is shown that quadrature domains are ...
We prove two density theorems for quadrature domains in ℂ<sup>n</sup>, n ≥ 2. It is shown that qua...
AbstractIt is proved that if u is the solution of PDE Δu=f, that maps two annuli on the space R3, th...
This is a selection of facts, old and recent, about quadrature domains. The text, written in the for...
AbstractLet T be a distribution in Rn whose support is compact. A domain Ω in Rn is said to be a qua...
Abstract. We introduce new classes of domains, i.e., semi-uniform domains and inner semi-uniform dom...
Abstract. We describe nonnegative weights on T that are min-imal at a given point and are related to...
By applying a reflection principle we set up fully explicit representation formulas for the harmonic...
Abstract. The harmonic measure distribution function of a planar domain relates the geometry of the ...
This note verifies a conjecture of Armitage and Goldstein that annular domains may be characterized ...
In this thesis, which consists of five papers (A,B,C,D,E), we are interested in questions related to...
We introduce new classes of domains, i.e., semi-uniform domains and inner emi-uniform domains. Both ...
AbstractWe prove that any finitely connected domain in the plane can be distorted so that it becomes...
Abstract. We study the possibility of deforming quadrature domains into each other, and also discuss...
We prove two density theorems for quadrature domains in , . It is shown that quadrature domains are ...
We prove two density theorems for quadrature domains in , . It is shown that quadrature domains are ...
We prove two density theorems for quadrature domains in ℂ<sup>n</sup>, n ≥ 2. It is shown that qua...
AbstractIt is proved that if u is the solution of PDE Δu=f, that maps two annuli on the space R3, th...
This is a selection of facts, old and recent, about quadrature domains. The text, written in the for...
AbstractLet T be a distribution in Rn whose support is compact. A domain Ω in Rn is said to be a qua...
Abstract. We introduce new classes of domains, i.e., semi-uniform domains and inner semi-uniform dom...
Abstract. We describe nonnegative weights on T that are min-imal at a given point and are related to...
By applying a reflection principle we set up fully explicit representation formulas for the harmonic...
Abstract. The harmonic measure distribution function of a planar domain relates the geometry of the ...
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