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Hyperbolic Coxeter groups of minimal growth rates in higher dimensions

Published online by Cambridge University Press:  06 April 2022

Naomi Bredon*
Affiliation:
Department of Mathematics, University of Fribourg, CH-1700 Fribourg, Switzerland
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Abstract

The cusped hyperbolic n-orbifolds of minimal volume are well known for $n\leq 9$. Their fundamental groups are related to the Coxeter n-simplex groups $\Gamma _{n}$. In this work, we prove that $\Gamma _{n}$ has minimal growth rate among all non-cocompact Coxeter groups of finite covolume in $\textrm{Isom}\mathbb H^{n}$. In this way, we extend previous results of Floyd for $n=2$ and of Kellerhals for $n=3$, respectively. Our proof is a generalization of the methods developed together with Kellerhals for the cocompact case.

Information

Type
Article
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
© The Author(s), 2022. Published by Cambridge University Press on behalf of The Canadian Mathematical Society
Figure 0

Table 1 The hyperbolic Coxeter n-simplex group $\Gamma _{n}$.

Figure 1

Table 2 Connected affine Coxeter graphs of order $n+1$.

Figure 2

Figure 1 The Coxeter polyhedron $P_{0}\subset \mathbb H^{4}$.

Figure 3

Figure 2 Extensions of $\widetilde A_{2}$, $\widetilde C_{2}$, and $\widetilde G_{2}$.

Figure 4

Figure 3 Extensions of $\widetilde A_{3}$, $\widetilde B_{3}$, and $\widetilde C_{3}$.

Figure 5

Figure 4 An infinite volume $5$-simplex.

Figure 6

Figure 5 The Coxeter group $W_{0}=[\infty ,3,3]$.

Figure 7

Figure 6 The Coxeter groups $W_{1}=[3,\infty ,3]$ and $W_{2}=[\infty , 3^{1,1}]$.

Figure 8

Table 3 Reducible affine Coxeter graphs $\sigma _{\infty }$ with $n_{c}\geq 2$ components $\widetilde \sigma _{k}$ of order $k\geq 3$ such that $n=\text {order}(\sigma _{\infty })-n_{c}+1$.

Figure 9

Figure 7 The Coxeter groups $\Delta _{i}, i=1,\ldots ,4$.