English

On involutions in Weyl groups

Combinatorics 2016-11-11 v2 Group Theory

Abstract

Let (W,S)(W,S) be a Coxeter system and \ast be an automorphism of WW with order 2\leq 2 such that sSs^{\ast}\in S for any sSs\in S. Let II_{\ast} be the set of twisted involutions relative to \ast in WW. In this paper we consider the case when =id\ast=\text{id} and study the braid II_\ast-transformations between the reduced II_\ast-expressions of involutions. If WW is the Weyl group of type BnB_n or DnD_n, we explicitly describe a finite set of basic braid II_\ast-transformations for all nn simultaneously, and show that any two reduced II_\ast-expressions for a given involution can be transformed into each other through a series of basic braid II_\ast-transformations. In both cases, these basic braid II_\ast-transformations consist of the usual basic braid transformations plus some natural "right end transformations" and plus exactly one extra transformation. The main result generalizes our previous work for the Weyl group of type AnA_{n}.

Keywords

Cite

@article{arxiv.1609.08494,
  title  = {On involutions in Weyl groups},
  author = {Jun Hu and Jing Zhang},
  journal= {arXiv preprint arXiv:1609.08494},
  year   = {2016}
}

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Big revisions are made

R2 v1 2026-06-22T16:02:57.760Z