English

Complete reducibility for Lie subalgebras and semisimplification

Group Theory 2024-04-24 v2 Representation Theory

Abstract

Let GG be a connected reductive linear algebraic group over a field kk. Using ideas from geometric invariant theory, we study the notion of GG-complete reducibility over kk for a Lie subalgebra h\mathfrak h of the Lie algebra g=Lie(G)\mathfrak g = Lie(G) of GG and prove some results when h\mathfrak h is solvable or char(k)=0char(k)= 0. We introduce the concept of a kk-semisimplification h\mathfrak h' of h\mathfrak h; h\mathfrak h' is a Lie subalgebra of g\mathfrak g associated to h\mathfrak h which is GG-completely reducible over kk. This is the Lie algebra counterpart of the analogous notion for subgroups studied earlier by the first, third and fourth authors. As in the subgroup case, we show that h\mathfrak h' is unique up to Ad(G(k))Ad(G(k))-conjugacy in g\mathfrak g. Moreover, we prove that the two concepts are compatible: for HH a closed subgroup of GG and HH' a kk-semisimplification of HH, the Lie algebra Lie(H)Lie(H') is a kk-semisimplification of Lie(H)Lie(H).

Keywords

Cite

@article{arxiv.2305.00841,
  title  = {Complete reducibility for Lie subalgebras and semisimplification},
  author = {Michael Bate and Sören Böhm and Benjamin Martin and Gerhard Roehrle and Laura Voggesberger},
  journal= {arXiv preprint arXiv:2305.00841},
  year   = {2024}
}

Comments

22 pages; v2 25 pages, several improvements; to appear in the European Journal of Mathematics

R2 v1 2026-06-28T10:22:31.073Z