Commuting elements in central products of special unitary groups

Abstract

In this paper the space of commuting elements in the central product Gm,p of m copies of the special unitary group SU(p) is studied, where p is a prime number. In particular, a computation for the number of path connected components of these spaces is given and the geometry of the moduli space ( Zn, Gm,p) of flat principal Gm,p--bundles over the n--torus is completely described for all values of n, m and p.