The Gromoll filtration, KO-characteristic classes and metrics of positive scalar curvature

Abstract

Let X be a closed m-dimensional spin manifold which admits a metric of positive scalar curvature and let Pos(X) be the space of all such metrics. For any g in Pos(X), Hitchin used the KO-valued alpha-invariant to define a homomorphism An-1 from πn-1(Pos(X) to KOm+n. He then showed that A0 is not 0 if m = 8k or 8k+1 and that A1 is not 0 if m = 8k-1 or 8$. In this paper we use Hitchin's methods and extend these results by proving that A8j+1-m is not 0 whenever m>6 and 8j - m >= 0. The new input are elements with non-trivial alpha-invariant deep down in the Gromoll filtration of the group n+1 = π0((Dn, )). We show that α(8j+28j-5) is not 0 for j>0. This information about elements existing deep in the Gromoll filtration is the second main new result of this note.