Surgery stable curvature conditions

Abstract

We give a simple criterion for a pointwise curvature condition to be stable under surgery. Namely, a curvature condition C, which is understood to be an open, convex, O(n)-invariant cone in the space of algebraic curvature operators, is stable under surgeries of codimension at least c provided it contains the curvature operator corresponding to Sc-1 × n-c+1, c ≥ 3. This is used to generalize the well-known classification result of positive scalar curvature in the simply-connected case in the following way: Any simply-connected manifold Mn, n ≥ 5, which is either spin with vanishing α-invariant or else is non-spin admits for any ε > 0 a metric such that the curvature operator satisfies R > - ε R.