离散共形几何的收敛与均匀化映射的计算

Pub Date : 2019-01-01 DOI:10.4310/AJM.2019.V23.N1.A2

D. Gu, F. Luo, Tianqi Wu

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引用次数: 37

摘要

庞加莱和柯比的经典均匀化定理指出，任何具有黎曼度规的单连通曲面都与黎曼球、复平面或单位盘共形微分同态。利用guu - luo - sun - wu[9]在多面体曲面的离散共形几何上的工作，我们证明了单连通黎曼曲面的均匀化映射是可计算的。

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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Convergence of discrete conformal geometry and computation of uniformization maps

The classical uniformization theorem of Poincaré and Koebe states that any simply connected surface with a Riemannian metric is conformally diffeomorphic to the Riemann sphere, or the complex plane or the unit disk. Using the work by Gu-Luo-Sun-Wu [9] on discrete conformal geometry for polyhedral surfaces, we show that the uniformization maps for simply connected Riemann surfaces are computable.

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