Invariants of Centralisers in Positive Characteristic

Abstract

Let be a simple algebraic group of type A or C over a field of good positive characteristic. We show for any x ∈ =(Q) that the invariant algebra S(x)x is generated by the pth power subalgebra and the mod p reduction of the characteristic zero invariant algebra. The latter algebra is known to be polynomial PPY and we show that it remains so after reduction. Using a theory of symmetrisation in positive characteristic we prove the analogue of this result in the enveloping algebra, where the p-centre plays the role of the pth power subalgebra. In Zassenhaus' foundational work Zas, the invariant theory and representation theory of modular Lie algebras were shown to be explicitly intertwined. We exploit his theory to give a precise upper bound for the dimensions of simple x-modules. When is of type A and = is a symmetric decomposition of orthogonal type we use similar methods to show that for every nilpotent e ∈ the invariant algebra S(e)e is generated by the pth power subalgebra and S(e)Ke which is also shown to be polynomial.