Rowmotion and Echelonmotion
Abstract
Given a linear extension of a finite poset , we consider the permutation matrix indexing the Schubert cell containing the Cartan matrix of with respect to . This yields a bijection that we call echelonmotion; it is the inverse of the Coxeter permutation studied by Kl\'asz, Marczinzik, and Thomas. Those authors proved that echelonmotion agrees with rowmotion when is a distributive lattice. We generalize this result to semidistributive lattices. In addition, we prove that every trim lattice has a linear extension with respect to which echelonmotion agrees with rowmotion. We also show that echelonmotion on an Eulerian poset (with respect to any linear extension) is an involution. Finally, we initiate the study of echelon-independent posets, which are posets for which echelonmotion is independent of the chosen linear extension. We prove that a lattice is echelon-independent if and only if it is semidistributive. Moreover, we show that echelon-independent connected posets are bounded and have semidistributive MacNeille completions.
Cite
@article{arxiv.2507.18230,
title = {Rowmotion and Echelonmotion},
author = {Colin Defant and Yuhan Jiang and Rene Marczinzik and Adrien Segovia and David E Speyer and Hugh Thomas and Nathan Williams},
journal= {arXiv preprint arXiv:2507.18230},
year = {2025}
}
Comments
20 pages, 5 figures