On the density of images of the power maps in Lie groups

Abstract

Let G be a connected Lie group. In this paper, we study the density of the images of individual power maps Pk:G G:g gk. We give criteria for the density of Pk(G) in terms of regular elements, as well as Cartan subgroups. In fact, we prove that if Reg(G) is the set of regular elements of G, then Pk(G) Reg(G) is closed in Reg(G). On the other hand, the weak exponentiality of G turns out to be equivalent to the density of all the power maps Pk. In linear Lie groups, weak exponentiality reduces to the density of P2(G). We also prove that the density of the image of Pk for G implies the same for any connected full rank subgroup.