Powers in finite unitary groups

Abstract

Let U(n,Fq2) denote the subgroup of unitary matrices of the general linear group GL(n,Fq2) which fixes a Hermitian form and M≥ 2 an integer. This is a companion paper to the previous works where the elements of the groups GL(n,Fq), Sp(2n,Fq), O(2n,Fq) and O(2n+1,Fq) which has an M-th root in the concerned group, have been described. Here we will describe the M-th powers in unitary groups for the regular semisimple, semisimple and cyclic elements. Our methods are parallel to those of the Memoir ``A generating function approach to the enumeration of matrices in classical groups over finite fields" by Fulman, Neumann and Praeger.