English

The Multiset Partition Algebra

Representation Theory 2022-07-26 v5 Combinatorics

Abstract

We introduce the multiset partition algebra MPk(ξ)\mathcal{MP}_k(\xi) over F[ξ]F[\xi], where FF is a field of characteristic 00 and kk is a positive integer. When ξ\xi is specialized to a positive integer nn, we establish the Schur-Weyl duality between the actions of resulting algebra MPk(n)\mathcal{MP}_k(n) and the symmetric group SnS_n on Symk(Fn)\text{Sym}^k(F^n). The construction of MPk(ξ)\mathcal{MP}_k(\xi) generalizes to any vector λ\lambda of non-negative integers yielding the algebra MPλ(ξ)\mathcal{MP}_{\lambda}(\xi) over F[ξ]F[\xi] so that there is Schur-Weyl duality between the actions of MPλ(n)\mathcal{MP}_{\lambda}(n) and SnS_n on Symλ(Fn)\text{Sym}^{\lambda}(F^n). We find the generating function for the multiplicity of each irreducible representation of SnS_n in Symλ(Fn)\text{Sym}^\lambda(F^n), as λ\lambda varies, in terms of a plethysm of Schur functions. As consequences we obtain an indexing set for the irreducible representations of MPk(n)\mathcal{MP}_k(n), and the generating function for the multiplicity of an irreducible polynomial representation of GLn(F)GL_n(F) when restricted to SnS_n. We show that MPλ(ξ)\mathcal{MP}_\lambda(\xi) embeds inside the partition algebra Pλ(ξ)\mathcal{P}_{|\lambda|}(\xi). Using this embedding, over FF, we prove that MPλ(ξ)\mathcal{MP}_{\lambda}(\xi) is a cellular algebra, and MPλ(ξ)\mathcal{MP}_{\lambda}(\xi) is semisimple when ξ\xi is not an integer or ξ\xi is an integer such that ξ2λ1\xi\geq 2|\lambda|-1. We give an insertion algorithm based on Robinson-Schensted-Knuth correspondence realizing the decomposition of MPλ(n)\mathcal{MP}_{\lambda}(n) as MPλ(n)×MPλ(n)\mathcal{MP}_{\lambda}(n)\times \mathcal{MP}_{\lambda}(n)-module.

Keywords

Cite

@article{arxiv.1903.10809,
  title  = {The Multiset Partition Algebra},
  author = {Sridhar Narayanan and Digjoy Paul and Shraddha Srivastava},
  journal= {arXiv preprint arXiv:1903.10809},
  year   = {2022}
}

Comments

Many changes, final version. To appear in Israel J. Math

R2 v1 2026-06-23T08:19:20.842Z