Semisimplification for Subgroups of Reductive Algebraic Groups
Abstract
Let be a reductive algebraic group---possibly non-connected---over a field and let be a subgroup of . If then there is a degeneration process for obtaining from a completely reducible subgroup of ; one takes a limit of along a cocharacter of in an appropriate sense. We generalise this idea to arbitrary reductive using the notion of -complete reducibility and results from geometric invariant theory over non-algebraically closed fields due to the authors and Herpel. Our construction produces a -completely reducible subgroup of , unique up to -conjugacy, which we call a -semisimplification of . This gives a single unifying construction which extends various special cases in the literature (in particular, it agrees with the usual notion for and with Serre's "-analogue" of semisimplification for subgroups of ). We also show that under some extra hypotheses, one can pick in a more canonical way using the Tits Centre Conjecture for spherical buildings and/or the theory of optimal destabilising cocharacters introduced by Hesselink, Kempf and Rousseau.
Cite
@article{arxiv.2004.08105,
title = {Semisimplification for Subgroups of Reductive Algebraic Groups},
author = {Michael Bate and Benjamin Martin and Gerhard Roehrle},
journal= {arXiv preprint arXiv:2004.08105},
year = {2020}
}
Comments
13 pages; v2 update in one reference; v3 minor changes and improved exposition in various parts; v4 further changes according to referee's comments, update of references; final version to appear in Forum Math. Sigma; v5 small changes to coincide with published version