English

A descent basis for the Garsia-Procesi module

Representation Theory 2024-03-26 v1 Combinatorics

Abstract

We assign to each Young diagram λ\lambda a subset Bλ\mathcal{B}_{\lambda'} of the collection of Garsia-Stanton descent monomials, and prove that it determines a basis of the Garsia-Procesi module RλR_\lambda, whose graded character is the Hall-Littlewood polynomial H~λ[X;t]\tilde{H}_{\lambda}[X;t]. This basis is a major index analogue of the basis BλRλ\mathcal{B}_\lambda \subset R_\lambda defined by certain recursions in due to Garsia and Procesi, in the same way that the descent basis is related to the Artin basis of the coinvariant algebra RnR_n, which in fact corresponds to the case when λ=1n\lambda=1^n. By anti-symmetrizing a subset of this basis with respect to the corresponding Young subgroup under the Springer action, we obtain a basis in the parabolic case, as well as a corresponding formula for the expansion of H~λ[X;t]\tilde{H}_{\lambda}[X;t]. Despite a similar appearance, it does not appear obvious how to connect these formulas appear to the specialization of the modified Macdonald formula of Haglund, Haiman and Loehr at q=0q=0.

Cite

@article{arxiv.2403.16278,
  title  = {A descent basis for the Garsia-Procesi module},
  author = {Erik Carlsson and Raymond Chou},
  journal= {arXiv preprint arXiv:2403.16278},
  year   = {2024}
}

Comments

29 pages

R2 v1 2026-06-28T15:31:54.141Z