Scalar Curvature And Transfer Maps In Spin And Spinc Bordism

Abstract

In 1992, Stolz proved that, among simply connected Spin-manifolds of dimension 5 or greater, the vanishing of a particular invariant α is necessary and sufficient for the existence of a metric of positive scalar curvature. More precisely, there is a map α* Spin ko (which may be realized as the index of a Dirac operator) which Hitchin established vanishes on bordism classes containing a manifold with a metric of positive scalar curvature. Stolz showed α is the image of a transfer map *-8 Spin BPSp(3)* Spin. In this paper we prove an analogous result for Spinc-manifolds and a related invariant αc: * Spinc ku. We show that αx is the sum of the image of Stolz's transfer *-8 Spin BPSp(3) * Spinc and an analogous map *-4 Spinc BSU(3) * Spinc. Finally, we expand on some details in Stolz's original paper and provide alternate proofs for some parts.