将群嵌入有界非循环群

Fan Wu, Xiaolei Wu, Mengfei Zhao, Zixiang Zhou
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引用次数: 0

摘要

我们证明了带标记的汤普森群和扭曲的布林-汤普森群是有界非循环的。这使我们能够证明几个新的群嵌入结果。首先,每一个 $F_n$ 类型的群都准近似地嵌入到一个没有适当有限索引子群的 $F_n$ 类型的有界无循环群中。这改进了布里奇森(Bridson)的一个结果(cite{Br98})和福尼尔-法奇奥-莱奥-莫拉斯奇尼(Fournier-Facio-L "oh-Moraschini)的一个定理(cite[定理2]{FFCM21})。第二,每一个 $F_n$ 类型的群都准等距地嵌入到一个 $F_n$ 类型的 $5$均匀完美群中。第三,利用贝尔克--扎雷姆斯基对扭曲布林--汤普森群的构造,我们证明了每个有限生成的群都准近似地嵌入到一个有限生成的有界无环简单群中。
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Embedding groups into boundedly acyclic groups
We show that the labeled Thompson groups and the twisted Brin--Thompson groups are boundedly acyclic. This allows us to prove several new embedding results for groups. First, every group of type $F_n$ embeds quasi-isometrically into a boundedly acyclic group of type $F_n$ that has no proper finite index subgroups. This improves a result of Bridson \cite{Br98} and a theorem of Fournier-Facio--L\"oh--Moraschini \cite[Theorem 2]{FFCM21}. Second, every group of type $F_n$ embeds quasi-isometrically into a $5$-uniformly perfect group of type $F_n$. Third, using Belk--Zaremsky's construction of twisted Brin--Thompson groups, we show that every finitely generated group embeds quasi-isometrically into a finitely generated boundedly acyclic simple group.
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