New Curvature Conditions for the Bochner Technique

Abstract

We prove a vanishing and estimation theorem for the pth-Betti number of closed n-dimensional Riemannian manifolds with a lower bound on the average of the lowest n-p eigenvalues of the curvature operator. This generalizes results due to D. Meyer, Gallot-Meyer, and Gallot. For example, in dimensions n=5,6 we obtain vanishing of the Betti numbers provided that the curvature operator is 3-positive. As B\"ohm-Wilking observed, 3-positivity of the curvature operator is not preserved by the Ricci flow.