The Yang-Mills Gradient Flow and Loop Spaces of Compact Lie Groups

Abstract

We study the L2 gradient flow of the Yang--Mills functional on the space of connection 1-forms on a principal G-bundle over the sphere S2 from the perspective of Morse theory. The resulting Morse homology is compared to the heat flow homology of the space G of based loops in the compact Lie group G. An isomorphism between these two Morse homologies is obtained by coupling a perturbed version of the Yang--Mills gradient flow with the L2 gradient flow of the classical action functional on loops. Our result gives a positive answer to a question due to Atiyah.