English

Bender--Knuth Billiards in Coxeter Groups

Combinatorics 2025-05-06 v3 Dynamical Systems Group Theory

Abstract

Let (W,S)(W,S) be a Coxeter system, and write S={si:iI}S=\{s_i:i\in I\}, where II is a finite index set. Fix a nonempty convex subset L\mathscr{L} of WW. If WW is of type AA, then L\mathscr{L} is the set of linear extensions of a poset, and there are important Bender--Knuth involutions BKi ⁣:LL\mathrm{BK}_i\colon\mathscr{L}\to\mathscr{L} indexed by elements of II. For arbitrary WW and for each iIi\in I, we introduce an operator τi ⁣:WW\tau_i\colon W\to W (depending on L\mathscr{L}) that we call a noninvertible Bender--Knuth toggle; this operator restricts to an involution on L\mathscr{L} that coincides with BKi\mathrm{BK}_i in type AA. Given a Coxeter element c=sinsi1c=s_{i_n}\cdots s_{i_1}, we consider the operator Proc=τinτi1\mathrm{Pro}_c=\tau_{i_n}\cdots\tau_{i_1}. We say WW is futuristic if for every nonempty finite convex set L\mathscr{L}, every Coxeter element cc, and every uWu\in W, there exists an integer K0K\geq 0 such that ProcK(u)L\mathrm{Pro}_c^K(u)\in\mathscr{L}. We prove that finite Coxeter groups, right-angled Coxeter groups, rank-3 Coxeter groups, affine Coxeter groups of types A~\widetilde A and C~\widetilde C, and Coxeter groups whose Coxeter graphs are complete are all futuristic. When WW is finite, we actually prove that if siNsi1s_{i_N}\cdots s_{i_1} is a reduced expression for the long element of WW, then τiNτi1(W)=L\tau_{i_N}\cdots\tau_{i_1}(W)=\mathscr{L}; this allows us to determine the smallest integer M(c)\mathrm{M}(c) such that ProcM(c)(W)=L\mathrm{Pro}_c^{{\mathrm{M}}(c)}(W)=\mathscr{L} for all L\mathscr{L}. We also exhibit infinitely many non-futuristic Coxeter groups, including all irreducible affine Coxeter groups that are not of type A~\widetilde A, C~\widetilde C, or G~2\widetilde G_2.

Keywords

Cite

@article{arxiv.2401.17360,
  title  = {Bender--Knuth Billiards in Coxeter Groups},
  author = {Grant Barkley and Colin Defant and Eliot Hodges and Noah Kravitz and Mitchell Lee},
  journal= {arXiv preprint arXiv:2401.17360},
  year   = {2025}
}

Comments

52 pages, 13 figures

R2 v1 2026-06-28T14:32:22.033Z