Stack-Sorting for Coxeter Groups

Abstract

Given an essential semilattice congruence on the left weak order of a Coxeter group W, we define the Coxeter stack-sorting operator S:W W by S(w)=w(π(w))-1, where π(w) is the unique minimal element of the congruence class of containing w. When is the sylvester congruence on the symmetric group Sn, the operator S is West's stack-sorting map. When is the descent congruence on Sn, the operator S is the pop-stack-sorting map. We establish several general results about Coxeter stack-sorting operators, especially those acting on symmetric groups. For example, we prove that if is an essential lattice congruence on Sn, then every permutation in the image of S has at most 2(n-1)3 right descents; we also show that this bound is tight. We then introduce analogues of permutree congruences in types B and A and use them to isolate Coxeter stack-sorting operators sB and .05cms that serve as canonical type-B and type- A counterparts of West's stack-sorting map. We prove analogues of many known results about West's stack-sorting map for the new operators sB and .05cms. For example, in type A, we obtain an analogue of Zeilberger's classical formula for the number of 2-stack-sortable permutations in Sn.