English

Ordered set partitions, Garsia-Procesi modules, and rank varieties

Combinatorics 2021-07-27 v2 Commutative Algebra

Abstract

We introduce a family of ideals In,λ,sI_{n,\lambda,s} in Q[x1,,xn]\mathbb{Q}[x_1,\dots,x_n] for λ\lambda a partition of knk\leq n and an integer s(λ)s \geq \ell(\lambda). This family contains both the Tanisaki ideals IλI_\lambda and the ideals In,kI_{n,k} of Haglund-Rhoades-Shimozono as special cases. We study the corresponding quotient rings Rn,λ,sR_{n,\lambda,s} as symmetric group modules. When n=kn=k and ss is arbitrary, we recover the Garsia-Procesi modules, and when λ=(1k)\lambda=(1^k) and s=ks=k, we recover the generalized coinvariant algebras of Haglund-Rhoades-Shimozono. We give a monomial basis for Rn,λ,sR_{n,\lambda,s}, unifying the monomial bases studied by Garsia-Procesi and Haglund-Rhoades-Shimozono, and realize the SnS_n-module structure of Rn,λ,sR_{n,\lambda,s} in terms of an action on (n,λ,s)(n,\lambda,s)-ordered set partitions. We also prove formulas for the Hilbert series and graded Frobenius characteristic of Rn,λ,sR_{n,\lambda,s}. We then connect our work with Eisenbud-Saltman rank varieties using results of Weyman. As an application of our work, we give a monomial basis, Hilbert series formula, and graded Frobenius characteristic formula for the coordinate ring of the scheme-theoretic intersection of a rank variety with diagonal matrices.

Keywords

Cite

@article{arxiv.2004.00788,
  title  = {Ordered set partitions, Garsia-Procesi modules, and rank varieties},
  author = {Sean T. Griffin},
  journal= {arXiv preprint arXiv:2004.00788},
  year   = {2021}
}

Comments

51 pages. Example 3.15, Figure 6, and Example 4.11 have been added for clarity. Full version of extended abstract in the proceedings of FPSAC 2020

R2 v1 2026-06-23T14:36:14.049Z