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引用次数: 7
摘要
本文的目的是构造复平面的开单位圆盘D上在单位圆Γ的每一点上都具有某种边界行为的全纯函数的一个例子。在描述我们的例子之前,我们先介绍一些符号和术语,然后讨论与我们的工作密切相关的Kurt Meier的一些结果,以便将其置于适当的环境中。设/为定义域为D的亚纯函数,其值域为黎曼球Ω的一个子集。我们假定读者熟悉聚类集理论的一些基本概念(参见[5J])。因此,点ζ e Γ处/的聚类集用C(/, ζ)表示。如果X是C处的弦,则Cχ(f9c)表示/在C处对应的弦簇集。我们说/在ζ处有一个弦极限,只要在ζ处存在一个弦X和ω e Ω,使得Cχ(f, ζ)=α>;特别地,如果X是在C处的半径,那么α)就叫做/ at ζ的径向极限。我们假设读者知道当我们说/在点ζ e Γ有一个角极限是什么意思。我们定义/在点ζ e Γ处的弦主聚类集为集合
Chordal limits of holomorphic functions at Plessner points
The purpose of this paper is to construct an example of a holomorphic function in the open unit disk D of the complex plane that has a certain kind of boundary behavior at every point of the unit circle Γ. Before describing our example, we introduce some notation and terminology, and then discuss some results of Kurt Meier to which our work is closely related, in order to place it in its proper setting. Let / be a meromorphic function whose domain is D and whose range is a subset of the Riemann sphere Ω. We assume that the reader is familiar with some of the elementary notions of cluster set theory (see [5J). Thus, the cluster set of / at a point ζ e Γ is denoted by C(/, ζ). If X is a chord at C, then Cχ(f9 C) denotes the corresponding chordal cluster set of / at C We say that / has a chordal limit at ζ provided that there exists a chord X at ζ and a value ω e Ω such that Cχ(f, ζ)=α>; if, in particular, X is the radius at C, then α) is called the radial limit of / at ζ. We suppose that the reader knows what is meant when we say that / has an angular limit at a point ζ e Γ. We define the chordal principal cluster set of / at a point ζ e Γ as the set
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