Hierarchical hyperbolicity of admissible curve graphs and the boundary of marked strata

Aaron Calderon, Jacob Russell
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Abstract

We show that for any surface of genus at least 3 equipped with any choice of framing, the graph of non-separating curves with winding number 0 with respect to the framing is hierarchically hyperbolic but not Gromov hyperbolic. We also describe how to build analogues of the curve graph for marked strata of abelian differentials that capture the combinatorics of their boundaries, analogous to how the curve graph captures the combinatorics of the augmented Teichmueller space. These curve graph analogues are also shown to be hierarchically, but not Gromov, hyperbolic.
可容许曲线图的层次双曲性和标记层的边界
我们证明,对于任何至少 3 属的曲面,如果配备任意选择的边框,则与边框相关的缠绕数为 0 的非分离曲线图是层次双曲的,但不是格罗莫夫双曲的。我们还描述了如何为abeliandifferentials 的标记层建立曲线图的类似图,以捕捉其边界的组合学,类似于曲线图捕捉增强的 Teichmuellers 空间的组合学。这些曲线图类似物也被证明是层次双曲的,但不是格罗莫夫双曲的。
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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