Betti numbers and the curvature operator of the second kind

Abstract

We show that compact, n-dimensional Riemannian manifolds with n+22-nonnegative curvature operators of the second kind are either rational homology spheres or flat. More generally, we obtain vanishing of the p-th Betti number provided that the curvature operator of the second kind is C(p,n)-positive. Our curvature conditions become weaker as p increases. For p=n2 we have C(p,n)= 3n2 n+2n+4 , and for 5 ≤ p ≤ n2 we exhibit a C(p,n)-positive algebraic curvature operator of the second kind with negative Ricci curvatures.