Ordered set partitions, Garsia-Procesi modules, and rank varieties
Abstract
We introduce a family of ideals in for a partition of and an integer . This family contains both the Tanisaki ideals and the ideals of Haglund-Rhoades-Shimozono as special cases. We study the corresponding quotient rings as symmetric group modules. When and is arbitrary, we recover the Garsia-Procesi modules, and when and , we recover the generalized coinvariant algebras of Haglund-Rhoades-Shimozono. We give a monomial basis for , unifying the monomial bases studied by Garsia-Procesi and Haglund-Rhoades-Shimozono, and realize the -module structure of in terms of an action on -ordered set partitions. We also prove formulas for the Hilbert series and graded Frobenius characteristic of . 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.
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