English

Stable Centres I: Wreath Products

Representation Theory 2021-07-09 v1 Group Theory Rings and Algebras

Abstract

A result of Farahat and Higman shows that there is a ``universal'' algebra, FH\mathrm{FH}, interpolating the centres of symmetric group algebras, Z(ZSn)Z(\mathbb{Z}S_n). We explain that this algebra is isomorphic to RΛ\mathcal{R} \otimes \Lambda, where R\mathcal{R} is the ring of integer-valued polynomials and Λ\Lambda is the ring of symmetric functions. Moreover, the isomorphism is via ``evaluation at Jucys-Murphy elements'', which leads to character formulae for symmetric groups. Then, we generalise this result to wreath products ΓSn\Gamma \wr S_n of a fixed finite group Γ\Gamma. This involves constructing wreath-product versions RΓ\mathcal{R}_\Gamma and Λ(Γ)\Lambda(\Gamma_*) of R\mathcal{R} and Λ\Lambda, respectively, which are interesting in their own right (for example, both are Hopf algebras). We show that the universal algebra for wreath products, FHΓ\mathrm{FH}_\Gamma, is isomorphic to RΓΛ(Γ)\mathcal{R}_\Gamma \otimes \Lambda(\Gamma_*) and use this to compute the pp-blocks of wreath products.

Keywords

Cite

@article{arxiv.2107.03752,
  title  = {Stable Centres I: Wreath Products},
  author = {Christopher Ryba},
  journal= {arXiv preprint arXiv:2107.03752},
  year   = {2021}
}

Comments

38 pages

R2 v1 2026-06-24T03:59:45.566Z