Rowmotion Orbits of Trapezoid Posets
Abstract
Rowmotion is an invertible operator on the order ideals of a poset which has been extensively studied and is well understood for the rectangle poset. In this paper, we show that rowmotion is equivariant with respect to a bijection of Hamaker, Patrias, Pechenik and Williams between order ideals of rectangle and trapezoid posets, thereby affirming a conjecture of Hopkins that the rectangle and trapezoid posets have the same rowmotion orbit structures. Our main tools in proving this are -jeu-de-taquin and (weak) -Knuth equivalence of increasing tableaux. We define as a family of tableaux naturally arising from order ideals and show for any , the almost minimal tableaux of shape are in different (weak) -Knuth equivalence classes. We also discuss and make some progress on related conjectures of Hopkins on down-degree homomesy.
Keywords
Cite
@article{arxiv.2002.04810,
title = {Rowmotion Orbits of Trapezoid Posets},
author = {Quang Vu Dao and Julian Wellman and Calvin Yost-Wolff and Sylvester W. Zhang},
journal= {arXiv preprint arXiv:2002.04810},
year = {2020}
}
Comments
31 pages