Elementary subgroups of isotropic reductive groups

Let G be a (possibly nonconnected) reductive linear algebraic group over an algebraically closed field k, and let N ∈ N. The group G acts on G N by simultaneous conjugation. Let H be a reductive subgroup of G. We prove that if k has nonzero characteristic then the natural map of quotient varieties H

Let G be a connected reductive group deÿned over an algebraically closed ÿeld k of characteristic p ¿ 0. The purpose of this paper is two-fold. First, when p is a good prime, we give a new proof of the "order formula" of Testerman for unipotent elements in G; moreover, we show that the same formula

We introduce the notion of a multiplicity-free subgroup of a reductive algebraic group in arbitrary characteristic. This concept already exists in the work of Kramer for compact connected Lie groups. We give a classification of reductive multiplicity-free subgroups, and as a consequence obtain a sim