正规族与拟正则映射

Pub Date : 2023-10-23 DOI:10.1017/s0013091523000640
Alastair N. Fletcher, Daniel A. Nicks
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引用次数: 0

摘要

Beardon和Minda给出了局部一致Lipschitz条件下全纯函数和亚纯函数正规族的刻画。在这里,我们将这一观点推广到高维的映射族,这些映射族相对于给定的连续模是局部一致连续的。我们的主要应用是通过一个局部一致Hölder条件来讨论拟正则映射族的正态性。这为考虑拟正则映射族提供了一个统一的框架,既恢复了Miniowitz、Vuorinen等人的已知结果,又产生了新的结果。特别地,正规拟亚纯映射、Yosida拟正则映射和Bloch拟正则映射可以看作是一类拟正则映射,这些拟正则映射是通过考虑域和范围的各种度量空间而产生的。我们给出了这些类的几个特征,并得到了每一类增长率的上界。
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Normal Families and Quasiregular Mappings
Abstract Beardon and Minda gave a characterization of normal families of holomorphic and meromorphic functions in terms of a locally uniform Lipschitz condition. Here, we generalize this viewpoint to families of mappings in higher dimensions that are locally uniformly continuous with respect to a given modulus of continuity. Our main application is to the normality of families of quasiregular mappings through a locally uniform Hölder condition. This provides a unified framework in which to consider families of quasiregular mappings, both recovering known results of Miniowitz, Vuorinen and others and yielding new results. In particular, normal quasimeromorphic mappings, Yosida quasiregular mappings and Bloch quasiregular mappings can be viewed as classes of quasiregular mappings which arise through consideration of various metric spaces for the domain and range. We give several characterizations of these classes and obtain upper bounds on the rate of growth in each class.
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