English

Stability theorems for multiplicities in graded $S_n$-modules

Representation Theory 2024-06-19 v2 Combinatorics

Abstract

In this paper, we prove several stability theorems for multiplicities of naturally defined representations of symmetric groups. The first such theorem states that if we consider the diagonal action of the symmetric group Sm+rS_{m+r} on kk sets of m+rm+r variables, then the dimension of the invariants of degree mm is the same as the dimension of the invariants of degree mm for SmS_{m} acting on kk sets of mm variables. Building on this stability, the last section looks at the Hilbert series of coinvariants of the polynomial ring in kk sets of mm variables. We address a conjecture that the Hilbert series, in degrees no more than mm, can be computed by a truncated power series expression. Using some auxiliary results and manipulations of power series, we show that if this holds for kk and mm, then the truncation gives the correct Hilbert series up to degree mm for kk sets of nmn \geq m variables. This shows the validity of the conjecture up to certain degrees. We also provide a new equivalent conjecture regarding Gr\"{o}bner bases. The second type of stability result is for Weyl modules. We prove that the dimension of the Sm+rS_{m+r} invariants for a Weyl module m+rFλ{}_{m+r}F^{\lambda} (the Schur-Weyl dual of the SλS_{|\lambda|} module VλV^{\lambda}) with λm\left\vert \lambda \right\vert \leq m is of the same dimension as the space of SmS_{m} invariants for mFλ{}_{m}F^{\lambda}. Multigraded versions of the first type of result are given, as are multigraded generalizations to non-trivial modules of symmetric groups.

Keywords

Cite

@article{arxiv.2108.00036,
  title  = {Stability theorems for multiplicities in graded $S_n$-modules},
  author = {Marino Romero and Nolan Wallach},
  journal= {arXiv preprint arXiv:2108.00036},
  year   = {2024}
}
R2 v1 2026-06-24T04:42:09.044Z