English

Generalised column removal for graded homomorphisms between Specht modules

Representation Theory 2016-08-08 v2

Abstract

Let nn be a positive integer, and let Hn\mathscr{H}_n denote the affine KLR algebra in type A. Kleshchev, Mathas and Ram have given a homogeneous presentation for graded column Specht modules Sλ\operatorname{S}_{\lambda} for Hn\mathscr{H}_n. Given two multipartitions λ\lambda and μ\mu, we define the notion of a \emph{dominated} homomorphism SλSμ\operatorname{S}_{\lambda}\to\operatorname{S}_{\mu}, and use the KMR presentation to prove a generalised column removal theorem for graded dominated homomorphisms between Specht modules. In the process, we prove some useful properties of Hn\mathscr{H}_n-homomorphisms between Specht modules which lead to an immediate corollary that, subject to a few demonstrably necessary conditions, every homomorphism SλSμ\operatorname{S}_{\lambda}\to\operatorname{S}_{\mu} is dominated, and in particular HomHn(Sλ,Sμ)=0\operatorname{Hom}_{\mathscr{H}_n}(\operatorname{S}_{\lambda},\operatorname{S}_{\mu})=0 unless λ\lambda dominates μ\mu. Brundan and Kleshchev show that certain cyclotomic quotients of Hn\mathscr{H}_n are isomorphic to (degenerate) cyclotomic Hecke algebras of type A. Via this isomorphism, our results can be seen as a broad generalisation of the column removal results of Fayers and Lyle and of Lyle and Mathas; generalising both into arbitrary level and into the graded setting.

Keywords

Cite

@article{arxiv.1404.4415,
  title  = {Generalised column removal for graded homomorphisms between Specht modules},
  author = {Matthew Fayers and Liron Speyer},
  journal= {arXiv preprint arXiv:1404.4415},
  year   = {2016}
}

Comments

34 pages

R2 v1 2026-06-22T03:52:43.119Z