Ricci curvature integrals, local functionals, and the Ricci flow

Abstract

Consider a Riemannian manifold (Mm, g) whose volume is the same as the standard sphere (Sm, ground). If p>m2 and ∫M \ Rc-(m-1)g\-p dv is sufficiently small, we show that the normalized Ricci flow initiated from (Mm, g) will exist immortally and converge to the standard sphere. The choice of p is optimal.