Koji Nuida
Published 2012-01-08, updated 2012-09-13Version 2
It has been known that the centralizer $Z_W(W_I)$ of a parabolic subgroup $W_I$ of a Coxeter group $W$ is a split extension of a naturally defined reflection subgroup by a subgroup defined by a 2-cell complex $\mathcal{Y}$. In this paper, we study the structure of $Z_W(W_I)$ further and show that, if $I$ has no irreducible components of type $A_n$ with $2 \leq n < \infty$, then every element of finite irreducible components of the inner factor is fixed by a natural action of the fundamental group of $\mathcal{Y}$. This property has an application to the isomorphism problem in Coxeter groups.
Comments: 44 pages, 4 figures, 19 tables, separated from Section 7 of arXiv:math/0501061v4 [math.GR] with improvements; (v2) 43 pages, 5 figures, 16 tables, the size of counterexample is reduced, some parts are slightly revised
Journal: Tsukuba Journal of Mathematics, vol.36, no.2 (2012).235-294
A Note on Parabolic Subgroups of a Coxeter Group
On the rank of Coxeter groups
Ultra-Low elements and Join Irreducible gates in Coxeter groups
![QR code for arXiv:1201.1610 [math.GR]](http://oss.arxitics.com/images/favicon.svg)