Real adjoint orbits of the unipotent subgroup

Abstract

Let G be a linear Lie group that acts on it's Lie algebra g by the adjoint action: Ad(g)X=gXg-1. An element X∈ g is called AdG-real if -X = Ad(g)X for some g∈ G. An AdG-real element X is called strongly AdG -real if -X = Ad(τ) X for some involution τ∈ G. Let K=R, C or H. Let Un(K) be the group of unipotent upper-triangular matrices over K. Let un (K) be the Lie algebra of Un(K) that consists of n × n upper triangular matrices with 0 in all the diagonal entries. In this paper, we consider the Ad-reality of the Lie algebra un(K) that comes from the adjoint action of the Lie group Un(K) on un(K). We prove that there is no non-trivial Ad Un(K)-real element in un (K). We also consider the adjoint action of the extended group Un(K) that consists of all upper triangular matrices over K having diagonal elements as 1 or -1, and construct a large class of Ad Un( K) -real elements. As applications of these results, we recover related results concerning classical reality in these groups.