Gradient estimates for scalar curvature

Abstract

A gradient estimate is a crucial tool used to control the rate of change of a function on a manifold, paving the way for deeper analysis of geometric properties. A celebrated result of Cheng and Yau gives gradient bounds on manifolds with Ricci curvature ≥ 0. The Cheng-Yau bound is not sharp, but there is a gradient sharp estimate. To explain this, a Green's function u on a manifold can be used to define a regularized distance b= u12-n to the pole. On Rn, the level sets of b are spheres and |∇ b|=1. If Ric ≥ 0, then [C3] proved the sharp gradient estimate |∇ b| ≤ 1. We show that the average of |∇ b| is ≤ 1 on a three manifold with nonnegative scalar curvature. The average is over any level set of b and if the average is one on even one level set, then M=R3.