Bender--Knuth Billiards in Coxeter Groups

Abstract

Let (W,S) be a Coxeter system, and write S=\si:i∈ I\, where I is a finite index set. Fix a nonempty convex subset L of W. If W is of type A, then L is the set of linear extensions of a poset, and there are important Bender--Knuth involutions BKiLL indexed by elements of I. For arbitrary W and for each i∈ I, we introduce an operator τi W W (depending on L) that we call a noninvertible Bender--Knuth toggle; this operator restricts to an involution on L that coincides with BKi in type A. Given a Coxeter element c=sin·s si1, we consider the operator Proc=τin·sτi1. We say W is futuristic if for every nonempty finite convex set L, every Coxeter element c, and every u∈ W, there exists an integer K≥ 0 such that ProcK(u)∈L. We prove that finite Coxeter groups, right-angled Coxeter groups, rank-3 Coxeter groups, affine Coxeter groups of types A and C, and Coxeter groups whose Coxeter graphs are complete are all futuristic. When W is finite, we actually prove that if siN·s si1 is a reduced expression for the long element of W, then τiN·sτi1(W)=L; this allows us to determine the smallest integer M(c) such that ProcM(c)(W)=L for all L. We also exhibit infinitely many non-futuristic Coxeter groups, including all irreducible affine Coxeter groups that are not of type A, C, or G2.