基团和多面体

Proceedings of Symposia in Pure Mathematics Pub Date : 2016-11-06 DOI:10.1090/pspum/102/05

Stefan Friedl, W. Luck, Stephan Tillmann

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引用次数: 10

摘要

在一系列的论文中，作者提出了一个$L^2$-无环群$\Gamma$一个不变的$\mathcal{P}(\Gamma)$，它是向量空间$H_1(\Gamma;\Bbb{R})$中多交体的形式差分。对于大多数3流形群、大多数2-生成1-相关群和所有自由循环群，这个不变量是特别定义的。在上述大多数情况下，不变量可以看作是一个实际的多面体。在本文中，我们将回顾多面体不变量$\mathcal{P}(\Gamma)$的定义，并陈述其一些主要性质。最后，我们列出了一系列尚未解决的问题。

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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Groups and polytopes

In a series of papers the authors associated to an $L^2$-acyclic group $\Gamma$ an invariant $\mathcal{P}(\Gamma)$ that is a formal difference of polytopes in the vector space $H_1(\Gamma;\Bbb{R})$. This invariant is in particular defined for most 3-manifold groups, for most 2-generator 1-relator groups and for all free-by-cyclic groups. In most of the above cases the invariant can be viewed as an actual polytope. In this survey paper we will recall the definition of the polytope invariant $\mathcal{P}(\Gamma)$ and we state some of the main properties. We conclude with a list of open problems.

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