Embedding groups into boundedly acyclic groups

Abstract

We show that the φ-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 Fn embeds quasi-isometrically into a boundedly acyclic group of type Fn that has no proper finite index subgroups. This improves a result of Bridson and a theorem of Fournier-Facio--L\"oh--Moraschini. Second, every group of type Fn embeds quasi-isometrically into a 5-uniformly perfect group of type Fn. 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. We also partially answer some questions of Brothier and Tanushevski regarding the finiteness property of φ-labeled Thompson group Vφ(G) and Fφ(G).

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