English

Weight modules over split Lie algebras

Representation Theory 2024-01-24 v1

Abstract

We study the structure of weight modules VV with restrictions neither on the dimension nor on the base field, over split Lie algebras LL. We show that if LL is perfect and VV satisfies LV=VLV=V and Z(V)=0{\mathcal Z}(V)=0, then L=iIIi and V=jJVj\hbox{$L =\bigoplus\limits_{i\in I} I_{i}$ and $V = \bigoplus\limits_{j \in J} V_{j}$} with any IiI_{i} an ideal of LL satisfying [Ii,Ik]=0[I_{i},I_{k}]=0 if iki \neq k, and any VjV_{j} a (weight) submodule of VV in such a way that for any jJj \in J there exists a unique iIi \in I such that IiVj0,I_iV_j \neq 0, being VjV_j a weight module over IiI_i. Under certain conditions, it is shown that the above decomposition of VV is by means of the family of its minimal submodules, each one being a simple (weight) submodule.

Keywords

Cite

@article{arxiv.2401.12906,
  title  = {Weight modules over split Lie algebras},
  author = {Antonio J. Calderón and José M. Sánchez},
  journal= {arXiv preprint arXiv:2401.12906},
  year   = {2024}
}
R2 v1 2026-06-28T14:24:57.048Z