Circle actions and scalar curvature

Abstract

We construct metrics of positive scalar curvature on manifolds with circle actions. One of our main results is that there exist S1-invariant metrics of positive scalar curvature on every S1-manifold which has a fixed point component of codimension 2. As a consequence we can prove that there are non-invariant metrics of positive scalar curvature on many manifolds with circle actions. Results from equivariant bordism allow us to show that there is an invariant metric of positive scalar curvature on the connected sum of two copies of a simply connected semi-free S1-manifold M of dimension at least six provided that M is not spin or that M is spin and the S1-action is of odd type. If M is spin and the S1-action of even type then there is a k>0 such that the equivariant connected sum of 2k copies of M admits an invariant metric of positive scalar curvature if and only if a generalized A-genus of M/S1 vanishes.