权值与边界距离有关的一致域的保角变换

Pub Date : 2022-01-01 DOI:10.1515/agms-2022-0141

Ryan Gibara, N. Shanmugalingam

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引用次数: 2

摘要

球化过程将欧几里德空间转化为紧致球体。在本文中，我们利用仅依赖于度量空间边界距离的共形变形，对局部紧化、可纠偏路径连通、非完全无界度量空间提出了这个过程的一个变体。这种变形在其边界附近局部是对原域的双lipschitz，但将空间转化为有界域。我们将证明，如果原始度量空间对于它的补全是一个一致的域，那么变换后的空间也是一个一致的域。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Conformal Transformation of Uniform Domains Under Weights That Depend on Distance to The Boundary

Abstract The sphericalization procedure converts a Euclidean space into a compact sphere. In this note we propose a variant of this procedure for locally compact, rectifiably path-connected, non-complete, unbounded metric spaces by using conformal deformations that depend only on the distance to the boundary of the metric space. This deformation is locally bi-Lipschitz to the original domain near its boundary, but transforms the space into a bounded domain. We will show that if the original metric space is a uniform domain with respect to its completion, then the transformed space is also a uniform domain.

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