On the homotopy type of the space of metrics of positive scalar curvature

Abstract

Let Md be a simply connected spin manifold of dimension d ≥ 5 admitting Riemannian metrics of positive scalar curvature. Denote by R+(Md) the space of such metrics on Md. We show that R+(Md) is homotopy equivalent to R+(Sd), where Sd denotes the d-dimensional sphere with standard smooth structure. We also show a similar result for simply connected non-spin manifolds Md with d≥ 5 and d≠ 8. In this case let Wd be the total space of the non-trivial Sd-2-bundle with structure group SO(d-1) over S2. Then R+(Md) is homotopy equivalent to R+(Wd).