封闭双曲 3 轨道的门格尔曲线和球面 CR 均匀化

Pub Date : 2024-06-17 DOI:10.1007/s10711-024-00934-y

Jiming Ma, Baohua Xie

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引用次数: 0

摘要

让 \(G_{6,3}\) 是一个边界为门格尔曲线的双曲多边形群。Granier （Groupes discrets en géométrie hyperbolique-aspects effectifs, Université de Fribourg, 2015）构造了一个离散、凸cocompact和忠实的表示 \(\rho \) of \(G_{6,3}\) into \(\textbf{PU}(2,1)\).我们证明了\(\rho (G_{6,3})\)的无穷远处的3-orbifold是一个封闭的双曲3-orbifold，它的底层空间是3球，奇点位置是\({\mathbb {Z}}_3\)-coned chain-link \(C(6,-2)\)。这回答了卡波维奇猜想 10.6 的第二部分（见卡波维奇 (in. Kapovich) 的论文）：In the tradition of thurston II.Geometry and groups, Springer, Cham, 2022）中的猜想 10.6 的第二部分，同时也是继施瓦茨（Invent Math 151(2):221-295, 2003）中的第一个例子之后，第二个明确的闭双曲 3-orbifold 的例子。

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The Menger curve and spherical CR uniformization of a closed hyperbolic 3-orbifold

Let \(G_{6,3}\) be a hyperbolic polygon-group with boundary the Menger curve. Granier (Groupes discrets en géométrie hyperbolique—aspects effectifs, Université de Fribourg, 2015) constructed a discrete, convex cocompact and faithful representation \(\rho \) of \(G_{6,3}\) into \(\textbf{PU}(2,1)\). We show the 3-orbifold at infinity of \(\rho (G_{6,3})\) is a closed hyperbolic 3-orbifold, with underlying space the 3-sphere and singular locus the \({\mathbb {Z}}_3\)-coned chain-link \(C(6,-2)\). This answers the second part of Kapovich’s Conjecture 10.6 in Kapovich (in: In the tradition of thurston II. Geometry and groups, Springer, Cham, 2022), and it also provides the second explicit example of a closed hyperbolic 3-orbifold that admits a uniformizable spherical CR-structure after Schwartz’s first example in Schwartz (Invent Math 151(2):221–295, 2003).

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