English

On integral $\mathrm{Ext^2}$ between certain Weyl modules of $\mathrm{GLn}$

Representation Theory 2024-11-04 v1

Abstract

Consider partitions of the form λ=(a,1b)\lambda=(a,1^b) and μ=(a+1,b1)\mu=(a+1,b-1),\\ where a+1>b1a+1>b-1. In this paper, we determine the extension groups ExtA2(KλF,KμF)\mathrm{Ext}_A^2(K_{\lambda}F,K_{\mu}F), where FF is a free Z\mathbb{Z}-module of finite rank nn, KλFK_{\lambda}F and KμFK_{\mu}F are the Weyl modules of the general linear group GLn(Z)GL_n(\mathbb{Z}) corresponding to λ\lambda and μ\mu, respectively, A=SZ(n,r)A=S_\mathbb{Z}(n,r) is the integral Schur algebra and r=a+br=a+b.

Keywords

Cite

@article{arxiv.2411.00675,
  title  = {On integral $\mathrm{Ext^2}$ between certain Weyl modules of $\mathrm{GLn}$},
  author = {Maria Metzaki},
  journal= {arXiv preprint arXiv:2411.00675},
  year   = {2024}
}
R2 v1 2026-06-28T19:44:24.733Z