Nilpotent n-tuples in SU(2)

Abstract

We describe the connected components of the space Hom(,SU(2)) of homomorphisms for a discrete nilpotent group . The connected components arising from homomorphisms with non-abelian image turn out to be homeomorphic to RP3. We give explicit calculations when is a finitely generated free nilpotent group. In the second part of the paper we study the filtration BcomSU(2) = B(2,SU(2))⊂·s ⊂ B(q,SU(2))⊂·s of the classifying space BSU(2) (introduced by Adem, Cohen and Torres-Giese), showing that for every q≥2, the inclusions induce a homology isomorphism with coefficients over a ring in which 2 is invertible. Most of the computations are done for SO(3) and U(2) as well.