English

$G$-complete reducibility and semisimple modules

Representation Theory 2011-03-29 v2 Group Theory

Abstract

Let GG be a connected reductive algebraic group defined over an algebraically closed field %kk of characteristic p>0p > 0. Our first aim in this note is to give concise and uniform proofs for two fundamental and deep results in the context of Serre's notion of GG-complete reducibility, at the cost of less favourable bounds. Here are some special cases of these results: Suppose that the index (H:H)(H:H^\circ) is prime to pp and that p>2dimV2p > 2\dim V-2 for some faithful GG-module VV. Then the following hold: (i) VV is a semisimple HH-module if and only if HH is GG-completely reducible; (ii) HH^\circ is reductive if and only if HH is GG-completely reducible. We also discuss two new related results: (i) if pdimVp \ge \dim V for some GG-module VV and HH is a GG-completely reducible subgroup of GG, then VV is a semisimple HH-module -- this generalizes Jantzen's semisimplicity theorem (which is the case H=GH = G); (ii) if HH acts semisimply on VVV \otimes V^* for some faithful GG-module VV, then HH is GG-completely reducible.

Keywords

Cite

@article{arxiv.1011.2012,
  title  = {$G$-complete reducibility and semisimple modules},
  author = {M. Bate and S. Herpel and B. Martin and G. Roehrle},
  journal= {arXiv preprint arXiv:1011.2012},
  year   = {2011}
}

Comments

9 pages

R2 v1 2026-06-21T16:40:59.791Z