English

Generically free representations I: large representations

Representation Theory 2020-08-05 v3 Group Theory

Abstract

For a simple linear algebraic group GG acting faithfully on a vector space VV and under mild assumptions, we show: if VV is large enough, then the Lie algebra of GG acts generically freely on VV. That is, the stabilizer in the Lie algebra of GG of a generic vector in VV is zero. The bound on dimV\dim V grows like (rankG)2(\mathrm{rank} G)^2 and holds with only mild hypotheses on the characteristic of the underlying field. The proof relies on results on generation of Lie algebras by conjugates of an element that may be of independent interest. We use the bound in subsequent works to determine which irreducible faithful representations are generically free, with no hypothesis on the characteristic of the field. This in turn has applications to the question of which representations have a stabilizer in general position as well as the determination of the invariants of the representation.

Keywords

Cite

@article{arxiv.1711.05502,
  title  = {Generically free representations I: large representations},
  author = {Skip Garibaldi and Robert M. Guralnick},
  journal= {arXiv preprint arXiv:1711.05502},
  year   = {2020}
}

Comments

v3: some reorganization of sections; v2: very minor updates to the text to align it better with part III

R2 v1 2026-06-22T22:46:37.854Z