English

Parking Structures: Fuss Analogs

Combinatorics 2015-03-20 v2

Abstract

For any irreducible real reflection group WW with Coxeter number hh, Armstrong, Reiner, and the author introduced a pair of W×\ZZhW \times \ZZ_h-modules which deserve to be called {\sf WW-parking spaces} which generalize the type A notion of parking functions and conjectured a relationship between them. In this paper we give a Fuss analog of their constructions. For a Fuss parameter k1k \geq 1, we define a pair of W×\ZZkhW \times \ZZ_{kh}-modules which deserve to be called {\sf kk-WW-parking spaces} and conjecture a relationship between them. We prove the weakest version of our conjectures for each of the infinite families ABCDI of finite reflection groups, together with proofs of stronger versions in special cases. Whenever our weakest conjecture holds for WW, we have the following corollaries. First, there is a simple formula for the character of either kk-WW-parking space. Second, we recover a cyclic sieving result due to Krattenthaler and M\"uller which gives the cycle structure of a generalized rotation action on kk-WW-noncrossing partitions. Finally, when WW is crystallographic, the restriction of either kk-WW-parking space to WW isomorphic to the action of WW on the finite torus Q/(kh+1)QQ / (kh+1)Q, where QQ is the root lattice.

Keywords

Cite

@article{arxiv.1205.4293,
  title  = {Parking Structures: Fuss Analogs},
  author = {Brendon Rhoades},
  journal= {arXiv preprint arXiv:1205.4293},
  year   = {2015}
}

Comments

46 pages, 10 figures

R2 v1 2026-06-21T21:06:33.614Z