Torsion in the space of commuting elements in a Lie group

Abstract

Let G be a compact connected Lie group, and let Hom(Zm,G) be the space of pairwise commuting m-tuples in G. We study the problem of which primes p Hom(Zm,G)1, the connected component of Hom(Zm,G) containing the element (1,…,1), has p-torsion in homology. We will prove that Hom(Zm,G)1 for m 2 has p-torsion in homology if and only if p divides the order of the Weyl group of G for G=SU(n) and some exceptional groups. We will also compute the top homology of Hom(Zm,G)1 and show that Hom(Zm,G)1 always has 2-torsion in homology whenever G is simply-connected and simple. Our computation is based on a new homotopy decomposition of Hom(Zm,G)1, which is of independent interest and enables us to connect torsion in homology to the combinatorics of the Weyl group.