A Sharp Li-Yau gradient bound on Compact Manifolds
Abstract
Let be a dimensional, complete ( compact or noncompact) Riemannian manifold whose Ricci curvature is bounded from below by a constant . Let be a positive solution of the heat equation on . The well known Li-Yau gradient bound states that The bound with is sharp if . If , the bound tends to infinity if . In over 30 years, several sharpening of the bounds have been obtained with replaced by several functions but not equal to . An open question (\cite{CLN}, \citeLX} etc) asks if a sharp bound can be reached. In this short note, we observe that for all complete compact manifolds one can take . Thus a sharp bound, up to computable constants, is found in the compact case. This result also seems to sharpen Theorem 1.4 in \cite{LY} for compact manifolds with convex boundaries. In the noncompact case one can not take even for the hyperbolic space. An example is also given, which shows that there does not exist an optimal function of time only for all noncompact manifolds with Ricci lower bound, giving a negative answer to the open question in the noncompact case.
Cite
@article{arxiv.2110.08933,
title = {A Sharp Li-Yau gradient bound on Compact Manifolds},
author = {Qi S. Zhang},
journal= {arXiv preprint arXiv:2110.08933},
year = {2024}
}
Comments
10 pages; An example is added, which shows that there does not exist an optimal function of time only $\alpha=\alpha(t)$ for all noncompact manifolds with Ricci lower bound, giving a negative answer to the open question in the noncompact case. to appear in Communications in Analysis and Geometry