Coxeter systems, left inversion sets, and higher dimensional cubes
Abstract
Let be a Coxeter system. We investigate the equation where and , denote the left inversion sets of and . We then define a commutative square diagram called a Coxeter square which describes the relationship between 4 non-identity elements of the Coxeter group and the equation . Coxeter squares were first introduced by Dyer, Wang in \cite{dyer2011groupoids2} and \cite{dyer2019characterization}. Coxeter squares can be \textquotedblleft glued" together by compatible edges to form commutative diagrams in the shape of higher dimensional cubes called Coxeter -cubes, which were first defined by Dyer in Example 12.5 of \cite{dyer2011groupoids2}. When and , we show that Coxeter -cubes must exist within . We then prove results about Coxeter -cubes in the Coxeter system. We establish an explicit bijection between Coxeter -cubes (modulo orientation) in and binary trees with leaves. We also show that an element of appears as the edge of some Coxeter -cube if and only if is a bigrassmannian permutation.
Keywords
Cite
@article{arxiv.2504.03911,
title = {Coxeter systems, left inversion sets, and higher dimensional cubes},
author = {Harrison Gimenez},
journal= {arXiv preprint arXiv:2504.03911},
year = {2025}
}