有限生成群的定量诺依曼定理

Pub Date : 2024-04-24 DOI:10.1007/s11856-024-2617-x

Elia Gorokhovsky, Nicolás Matte Bon, Omer Tamuz

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引用次数: 0

摘要

我们研究了一个无限有限生成群的余集覆盖函数ℭ(r)：覆盖半径为 r 的球所需的无限索引子群的余集数。我们证明了ℭ(r)对于所有群都至少是 \(s\qrt{r}\)阶。此外，我们还证明了ℭ(r)对于一类可合并群（包括几乎无穷群和多环群）来说是线性的，而对于性质（T）群来说是指数级的。

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A quantitative Neumann lemma for finitely generated groups

We study the coset covering function ℭ(r) of an infinite, finitely generated group: the number of cosets of infinite index subgroups needed to cover the ball of radius r. We show that ℭ(r) is of order at least \(\sqrt{r}\) for all groups. Moreover, we show that ℭ(r) is linear for a class of amenable groups including virtually nilpotent and polycyclic groups, and that it is exponential for property (T) groups.

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