反射分解与拟柯赛特元

IF 0.6 2区 数学 Q3 MATHEMATICS
Patrick Wegener, S. Yahiatene
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引用次数: 3

摘要

我们研究了有限仿射和任意Coxeter群中所谓的对偶Matsumoto性质或Hurwitz作用。特别是,我们想研究如何减少反射分解,以及相同元素的两个反射分解是如何相互关联的。我们的动机是Bessis提出的Coxeter群的双重方法,以及关于反射分解是否有一个众所周知的Matsumoto性质的类似问题。我们的目标是对赫维茨行动有实质性的了解。因此,我们统一地否定了Lewis和Reiner以及Baumeister, Gobet, Roberts和第一作者关于有限Coxeter群中的Hurwitz的结果。进一步证明了在任意Coxeter群中,经过简单反射的适当扩展后,同一元素的所有约简反射分解都出现在同一Hurwitz轨道上。由于抛物线类科塞特元在赫尔维茨作用的研究中起着突出的作用,我们的目的是表征这些元素。给出了任意Coxeter群中极大抛物型拟Coxeter元的刻画,以及仿射Coxeter群中所有抛物型拟Coxeter元的刻画。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Reflection factorizations and quasi-Coxeter elements
We investigate the so-called dual Matsumoto property or Hurwitz action in finite, affine and arbitrary Coxeter groups. In particular, we want to investigate how to reduce reflection factorizations and how two reflection factorizations of the same element are related to each other. We are motivated by the dual approach to Coxeter groups proposed by Bessis and the question whether there is an anlogue of the well known Matsumoto property for reflection factorizations. Our aim is a substantial understanding of the Hurwitz action. We therefore reprove uniformly results of Lewis and Reiner as well as Baumeister, Gobet, Roberts and the first author on the Hurwitz in finite Coxeter groups. Further we show that in an arbitrary Coxeter group all reduced reflection factorizations of the same element appear in the same Hurwitz orbit after a suitable extension by simple reflections. As parabolic quasi-Coxeter elements play an outstanding role in the study of the Hurwitz action, we aim to characterize these elements. We give characterizations of maximal parabolic quasi-Coxeter elements in arbitrary Coxeter groups as well as a characterization of all parabolic quasi-Coxeter elements in affine Coxeter groups.
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CiteScore
1.20
自引率
0.00%
发文量
9
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