Group actions and power maps for groups over non-Archimedean local fields

Abstract

We consider linear groups and Lie groups over a non-Archimedean local field F for which the power map x xk has a dense image or it is surjective. We prove that the group of F-points of such algebraic groups is a compact extension of unipotent groups with the order of the compact group being relatively prime to k. This in particular shows that the power map is surjective for all k is possible only when the group is unipotent or trivial depending on whether the characteristic of F is zero or positive. Similar results are proved for Lie groups via the adjoint representation. To a large extent, these results are extended to linear groups over local fields and global fields.