Commuting Involution Graphs in Classical Affine Weyl Groups

Sarah Hart; Amal Sbeiti Clarke

Commuting Involution Graphs in Classical Affine Weyl Groups

Group Theory 2018-09-14 v1

Authors: Sarah Hart , Amal Sbeiti Clarke

Abstract

In this paper we investigate commuting involution graphs in classical affine Weyl groups. Let $W$ be a classical Weyl group of rank $n$ , with $\tilde W$ its corresponding affine Weyl group. Our main result is that if $X$ is a conjugacy class of involutions in $\tilde W$ , then the commuting involution graph $\mathcal{C}(\tilde W, X)$ is either disconnected or has diameter at most $n+2$ . This bound is known to hold for types $\tilde A_n$ and $\tilde C_n$ , so the main work of this paper is to prove the theorem for types $\tilde B_n$ and $\tilde D_n$ .

Keywords

weyl groups and algebras weyl group representations cayley graphs

Cite

@article{arxiv.1809.04832,
  title  = {Commuting Involution Graphs in Classical Affine Weyl Groups},
  author = {Sarah Hart and Amal Sbeiti Clarke},
  journal= {arXiv preprint arXiv:1809.04832},
  year   = {2018}
}

Commuting Involution Graphs in Classical Affine Weyl Groups

Abstract

Keywords

Cite

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