BOUNDED COHOMOLOGY AND BINATE GROUPS

Pub Date : 2021-11-08 DOI:10.1017/S1446788722000106
Francesco Fournier-Facio, C. Loeh, M. Moraschini
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引用次数: 15

Abstract

Abstract A group is boundedly acyclic if its bounded cohomology with trivial real coefficients vanishes in all positive degrees. Amenable groups are boundedly acyclic, while the first nonamenable examples are the group of compactly supported homeomorphisms of $ {\mathbb {R}}^{n}$ (Matsumoto–Morita) and mitotic groups (Löh). We prove that binate (alias pseudo-mitotic) groups are boundedly acyclic, which provides a unifying approach to the aforementioned results. Moreover, we show that binate groups are universally boundedly acyclic. We obtain several new examples of boundedly acyclic groups as well as computations of the bounded cohomology of certain groups acting on the circle. In particular, we discuss how these results suggest that the bounded cohomology of the Thompson groups F, T, and V is as simple as possible.
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有界上同调与二合群
如果一个群具有平凡实系数的有界上同调在所有正次上都消失,则该群是有界无环的。可服从群是有界无环的,而第一个不可服从的例子是$ {\mathbb {R}}^{n}$ (Matsumoto-Morita)和有丝分裂群(Löh)的紧支持同胚群。我们证明了双联(别名伪有丝分裂)群是有界无环的,这为上述结果提供了一个统一的方法。此外,我们还证明了双环群是普遍有界无环的。我们得到了几个新的有界无环群的例子,以及一些作用于圆上的群的有界上同的计算。特别地,我们讨论了这些结果如何表明Thompson群F、T和V的有界上同调是尽可能简单的。
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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