Promotion, Tangled Labelings, and Sorting Generating Functions
Abstract
We study Defant and Kravitz's generalization of Sch\"utzenberger's promotion operator to arbitrary labelings of finite posets in two directions. Defant and Kravitz showed that applying the promotion operator times to a labeling of a poset on elements always gives a natural labeling of the poset and called a labeling tangled if it requires the full promotions to reach a natural labeling. They also conjectured that there are at most tangled labelings for any poset on elements. In the first direction, we propose a further strengthening of their conjecture by partitioning tangled labelings according to the element labeled and prove that this stronger conjecture holds for inflated rooted forest posets and a new class of posets called shoelace posets. In the second direction, we introduce sorting generating functions and cumulative generating functions for the number of labelings that require applications of the promotion operator to give a natural labeling. We prove that the coefficients of the cumulative generating function of the ordinal sum of antichains are log-concave and obtain a refinement of the weak order on the symmetric group.
Cite
@article{arxiv.2411.12034,
title = {Promotion, Tangled Labelings, and Sorting Generating Functions},
author = {Margaret Bayer and Herman Chau and Mark Denker and Owen Goff and Jamie Kimble and Yi-Lin Lee and Jinting Liang},
journal= {arXiv preprint arXiv:2411.12034},
year = {2026}
}
Comments
24 pages, 11 figures