The space of commuting elements in an exceptional Lie group and maps between classifying spaces

Abstract

Let π be a discrete group, and let G be a compact connected Lie group. Hom(π,G)0 denotes the null-component of the space of homomorphisms from π to G, and map*(Bπ,BG)0 denotes the null-component of the space of maps from Bπ to BG. Since the classifying space functor is continuous, there is a continuous map (π,G)0*(Bπ,BG)0. Atiyah and Bott studied this map when π is a surface group, and proved surjectivity in rational cohomology. In this paper, we obtain the condition that the map is surjective or not in rational cohomology when π is Zm for m≥ 3 and G is a compact connected Lie group.