English

EL-Shellability and Noncrossing Partitions Associated with Well-Generated Complex Reflection Groups

Combinatorics 2016-07-27 v5

Abstract

In this article we prove that the lattice of noncrossing partitions is EL-shellable when associated with the well-generated complex reflection group of type G(d,d,n)G(d,d,n), for d,n3d,n\geq 3, or with the exceptional well-generated complex reflection groups which are no real reflection groups. This result was previously established for the real reflection groups and it can be extended to the well-generated complex reflection group of type G(d,1,n)G(d,1,n), for d,n3d,n\geq 3, as well as to three exceptional groups, namely G25,G26G_{25},G_{26} and G32G_{32}, using a braid group argument. We thus conclude that the lattice of noncrossing partitions of any well-generated complex reflection group is EL-shellable. Using this result and a construction by Armstrong and Thomas, we conclude further that the poset of mm-divisible noncrossing partitions is EL-shellable for every well-generated complex reflection group. Finally, we derive results on the M\"obius function of these posets previously conjectured by Armstrong, Krattenthaler and Tomie.

Keywords

Cite

@article{arxiv.1111.7172,
  title  = {EL-Shellability and Noncrossing Partitions Associated with Well-Generated Complex Reflection Groups},
  author = {Henri Mühle},
  journal= {arXiv preprint arXiv:1111.7172},
  year   = {2016}
}

Comments

37 pages, 4 figures. Moved the technical details of the proof of the EL-shellability of $NC_{G(d,d,n)}$ to the appendix. More references added

R2 v1 2026-06-21T19:44:00.250Z