Etale representations for reductive algebraic groups with one-dimensional center
Abstract
A complex vector space is a prehomogeneous -module if acts rationally on with a Zariski-open orbit. The module is called etale if . We study etale modules for reductive algebraic groups with one-dimensional center. For such , even though every etale module is a regular prehomogeneous module, its irreducible submodules have to be non-regular. For these non-regular prehomogeneous modules, we determine some strong constraints on the ranks of their simple factors. This allows us to show that there do not exist etale modules for , with simple.
Cite
@article{arxiv.1606.01643,
title = {Etale representations for reductive algebraic groups with one-dimensional center},
author = {Dietrich Burde and Wolfgang Globke},
journal= {arXiv preprint arXiv:1606.01643},
year = {2018}
}
Comments
original version of this paper has been split up; the current version contains an extension of the structural part, see arxiv:1610.07005 for the classification results second update: fixed some mistakes in the introduction; Theorem B from the previous version now attributed to a previous paper by Baues; additional references