Iterative properties of birational rowmotion II: Rectangles and triangles

Author(s)

Grinberg, Darij; Roby, Tom

Abstract

Birational rowmotion — a birational map associated to any finite poset P — has been introduced by Einstein and Propp as a far-reaching generalization of the (well-studied) classical rowmotion map on the set of order ideals of P. Continuing our exploration of this birational rowmotion, we prove that it has order p + q on the (p,q)-rectangle poset (i.e., on the product of a p-element chain with a q-element chain); we also compute its orders on some triangle-shaped posets. In all cases mentioned, it turns out to have finite (and explicitly computable) order, a property it does not exhibit for general finite posets (unlike classical rowmotion, which is a permutation of a finite set). Our proof in the case of the rectangle poset uses an idea introduced by Volkov (arXiv:hep-th/0606094) to prove the AA case of the Zamolodchikov periodicity conjecture; in fact, the finite order of birational rowmotion on many posets can be considered an analogue to Zamolodchikov periodicity. We comment on suspected, but so far enigmatic, connections to the theory of root posets.

Date issued

2015

URI

http://hdl.handle.net/1721.1/100753

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Electronic Journal of Combinatorics

Publisher

European Mathematical Information Service (EMIS)

Citation

Grinberg, Darij, and Tom Roby. "Iterative properties of birational rowmotion II: Rectangles and triangles." Electronic Journal of Combinatorics 22(3) (2015).

Version: Final published version

ISSN

1077-8926