布朗-汤普森群和编织汤普森群的发散性质

IF 0.4 3区数学 Q4 MATHEMATICS Transformation Groups Pub Date : 2024-01-26 DOI:10.1007/s00031-023-09839-8

Xiaobing Sheng

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引用次数: 0

摘要

戈兰和萨皮尔证明汤普森群 F、T 和 V 具有线性发散性。在本文中，我们将重点研究汤普森群的几个广义群的发散性质。我们首先考虑了布朗-汤普森群（Brown-Thompson group）$F_n$、$T_n$ 和$V_n$（在其他语境中也称为布朗-希格曼-汤普森群），发现这些群也具有线性发散函数。然后，我们关注编织汤普森群 BF、$\widehat{BF}$和$\widehat{BV}$，并证明这些群具有线性发散。BV 的情况也由儿玉独立完成。

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Divergence Property of the Brown-Thompson Groups and Braided Thompson Groups

Golan and Sapir proved that Thompson’s groups F, T and V have linear divergence. In the current paper, we focus on the divergence property of several generalisations of the Thompson groups. We first consider the Brown-Thompson groups $F_n$, $T_n$ and $V_n$ (also called Brown-Higman-Thompson group in some other context) and find that these groups also have linear divergence functions. We then focus on the braided Thompson groups BF, $\widehat{BF}$ and $\widehat{BV}$ and prove that these groups have linear divergence. The case of BV has also been done independently by Kodama.

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来源期刊

Transformation Groups 数学-数学

CiteScore

1.60

自引率

0.00%

发文量

100

审稿时长

9 months

期刊介绍： Transformation Groups will only accept research articles containing new results, complete Proofs, and an abstract. Topics include: Lie groups and Lie algebras; Lie transformation groups and holomorphic transformation groups; Algebraic groups; Invariant theory; Geometry and topology of homogeneous spaces; Discrete subgroups of Lie groups; Quantum groups and enveloping algebras; Group aspects of conformal field theory; Kac-Moody groups and algebras; Lie supergroups and superalgebras.

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