CAT(0)立方配合物等距的中位数集及其应用

arXiv: Group Theory Pub Date : 2019-02-13 DOI:10.1307/MMJ/20195823

A. Genevois

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引用次数: 10

摘要

在本文中，我们将CAT(0)立方体复合体的等距与特定子空间联系起来，称为\emph{中位数集}，它与CAT(0)空间中半简单等距的最小化集起着类似的作用。本文推导了该理论的各种应用，包括中心化器的计算、分裂定理、映射类群中的Dehn扭曲对CAT(0)立方复形的每一个作用都必须是椭圆的证明、平环面定理的一个立方版本，以及关于作用于CAT(0)立方复形的多环群的一个结构定理。

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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Median Sets of Isometries in CAT(0) Cube Complexes and Some Applications

In this article, we associate to isometries of CAT(0) cube complexes specific subspaces, referred to as \emph{median sets}, which play a similar role as minimising sets of semisimple isometries in CAT(0) spaces. Various applications are deduced, including a cubulation of centralisers, a splitting theorem, a proof that Dehn twists in mapping class groups must be elliptic for every action on a CAT(0) cube complex, a cubical version of the flat torus theorem, and a structural theorem about polycyclic groups acting on CAT(0) cube complexes.

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arXiv: Group Theory

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