Promotion Sorting

Abstract

Sch\"utzenberger's promotion operator is an extensively-studied bijection that permutes the linear extensions of a finite poset. We introduce a natural extension ∂ of this operator that acts on all labelings of a poset. We prove several properties of ∂; in particular, we show that for every labeling L of an n-element poset P, the labeling ∂n-1(L) is a linear extension of P. Thus, we can view the dynamical system defined by ∂ as a sorting procedure that sorts labelings into linear extensions. For all 0≤ k≤ n-1, we characterize the n-element posets P that admit labelings that require at least n-k-1 iterations of ∂ in order to become linear extensions. The case in which k=0 concerns labelings that require the maximum possible number of iterations in order to be sorted; we call these labelings tangled. We explicitly enumerate tangled labelings for a large class of posets that we call inflated rooted forest posets. For an arbitrary finite poset, we show how to enumerate the sortable labelings, which are the labelings L such that ∂(L) is a linear extension.