Noncrossing partitions, toggles, and homomesies

Author(s)

Einstein, David; Gunawan, Emily; Macauley, Matthew; Joseph, Michael; Propp, James; Rubinstein-Salzedo, Simon; Farber, Miriam; ... Show more Show less

Abstract

We introduce n(n-1)/2 natural involutions ("toggles") on the set S of non-crossing partitions π of size n, along with certain composite operations obtained by composing these involutions. We show that for many operations T of this kind, a surprisingly large family of functions f on S (including the function that sends π to the number of blocks of π) exhibits the homomesy phenomenon: the average of f over the elements of a T-orbit is the same for all T-orbits. We can apply our method of proof more broadly to toggle operations back on the collection of independent sets of certain graphs. We utilize this generalization to prove a theorem about toggling on a family of graphs called "2-cliquish." More generally, the philosophy of this "toggle-action," proposed by Striker, is a popular topic of current and future research in dynamic algebraic combinatorics.

Date issued

2016-09

URI

http://hdl.handle.net/1721.1/107421

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Electronic Journal of Combinatorics

Publisher

European Mathematical Information Service (EMIS)

Citation

Einstein, D., Farber, M., Gunawan, E., Joseph, M., Macauley, M., Propp, J., & Rubinstein-Salzedo, S. (2016). Noncrossing partitions, toggles, and homomesies. Electronic Journal of Combinatorics. ©2016 European Mathematical Information Service (EMIS)

Version: Final published version

ISSN

1077-8926

1097-1440