Li-Yau gradient bound for collapsing manifolds under integral curvature condition

Abstract

Let (n, gij) be a complete Riemammnian manifold. For some constants p,\ r>0, define k(p,r)=x∈ Mr2(B(x,r)|Ric-|p dV)1/p, where Ric- denotes the negative part of the Ricci curvature tensor. We prove that for any p>n2, when k(p,1) is small enough, certain Li-Yau type gradient bound holds for the positive solutions of the heat equation on geodesic balls B(O,r) in with 0<r≤ 1. Here the assumption that k(p,1) being small allows the situation where the manifolds is collapsing. Recall that in ZZ, certain Li-Yau gradient bounds was also obtained by the authors, assuming that |Ric-|∈ Lp() and the manifold is noncollaped. Therefore, to some extent, the results in this paper and in ZZ complete the picture of Li-Yau gradient bound for the heat equation on manifolds with |Ric-| being Lp integrable, modulo sharpness of constants.