Coxeter systems, left inversion sets, and higher dimensional cubes
Abstract
Let (W,S) be a Coxeter system. We investigate the equation w(x) = y where w,x,y∈ W and x, y denote the left inversion sets of x and y. We then define a commutative square diagram called a Coxeter square which describes the relationship between 4 non-identity elements of the Coxeter group W and the equation w(x) = y. Coxeter squares were first introduced by Dyer, Wang in dyer2011groupoids2 and dyer2019characterization. Coxeter squares can be glued" together by compatible edges to form commutative diagrams in the shape of higher dimensional cubes called Coxeter n-cubes, which were first defined by Dyer in Example 12.5 of dyer2011groupoids2. When |W| < ∞ and |S| = n, we show that Coxeter n-cubes must exist within (W,S). We then prove results about Coxeter n-cubes in the An Coxeter system. We establish an explicit bijection between Coxeter n-cubes (modulo orientation) in An and binary trees with n+1 leaves. We also show that an element x of An appears as the edge of some Coxeter n-cube if and only if x is a bigrassmannian permutation.
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