On the surjectivity of the power maps of a class of solvable groups

Abstract

Let G be a group containing a nilpotent normal subgroup N with central series \Nj\, such that each Nj/Nj+1 is a F-vector space over a field F and the action of G on Nj/Nj+1 induced by the conjugation action is F-linear. For k∈ N we describe a necessary and sufficient condition for all elements from any coset xN, x∈ G, to admit k-th roots in G, in terms of the action of x on the quotients Nj/Nj+1. This yields in particular a condition for surjectivity of the power maps, generalising various results known in special cases. For F-algebraic groups we also characterise the property in terms of centralizers of elements. For a class of Lie groups, it is shown that surjectivity of the k-th power map, k∈ N, implies the same for the restriction of the map to the solvable radical of the group. The results are applied in particular to the study of exponentiality of Lie groups.