Crossed homomorphisms and low dimensional representations of mapping class groups of surfaces

IF 1.2 2区数学 Q1 MATHEMATICS

Transactions of the American Mathematical Society Pub Date : 2023-10-11 DOI:10.1090/tran/9037

Yasushi Kasahara

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引用次数: 0

Abstract

We continue the study of low dimensional linear representations of mapping class groups of surfaces initiated by Franks–Handel [Proc. Amer. Math. So. 141 (2013), pp. 2951–2962] and Korkmaz [Low-dimensional linear representations of mapping class groups, preprint, arXiv:1104.4816v2 (2011)]. We consider ( 2 g + 1 ) (2g+1) -dimensional complex linear representations of the pure mapping class groups of compact orientable surfaces of genus g g . We give a complete classification of such representations for g ≥ 7 g \geq 7 up to conjugation, in terms of certain twisted 1 1 -cohomology groups of the mapping class groups. A new ingredient is to use the computation of a related twisted 1 1 -cohomology group by Morita [Ann. Inst. Fourier (Grenoble) 39 (1989), pp. 777–810]. The classification result implies in particular that there are no irreducible linear representations of dimension 2 g + 1 2g+1 for g ≥ 7 g \geq 7 , which marks a contrast with the case g = 2 g=2 .

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曲面映射类群的交叉同态和低维表示

我们继续研究由Franks-Handel发起的曲面映射类群的低维线性表示[Proc. Amer]。数学。So. 141 (2013)， pp. 2951-2962]和Korkmaz[映射类群的低维线性表示，预印本，arXiv:1104.4816v2(2011)]。考虑g属紧定向曲面纯映射类群的(2g+1) (2g+1)维复线性表示。我们给出了g≥7 g \geq 7直到共轭的这类表示的完全分类，它是由映射类群的某些扭曲11 -上同调群构成的。一种新的方法是利用Morita [Ann]对相关的扭曲11 -上同调群的计算。傅立叶研究所(格勒诺布尔)39 (1989)，pp. 777-810]。分类结果特别表明，当g≥7 g \geq 7时，不存在2g+1 g+1 g的不可约线性表示，这与g=2 g=2的情况形成了对比。

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来源期刊

Transactions of the American Mathematical Society 数学-数学

CiteScore

2.30

自引率

7.70%

发文量

171

审稿时长

3-6 weeks

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