Gradient estimates for heat kernels and harmonic functions
Abstract
Let be a doubling metric measure space endowed with a Dirichlet form deriving from a "carr\'e du champ". Assume that supports a scale-invariant -Poincar\'e inequality. In this article, we study the following properties of harmonic functions, heat kernels and Riesz transforms for : (i) : -estimate for the gradient of the associated heat semigroup; (ii) : -reverse H\"older inequality for the gradients of harmonic functions; (iii) : -boundedness of the Riesz transform (); (iv) : a generalised Bakry-\'Emery condition. We show that, for , (i), (ii) (iii) are equivalent, while for , (i), (ii), (iv) are equivalent. Moreover, some of these equivalences still hold under weaker conditions than the -Poincar\'e inequality. Our result gives a characterisation of Li-Yau's gradient estimate of heat kernels for , while for it is a substantial improvement as well as a generalisation of earlier results by Auscher-Coulhon-Duong-Hofmann [7] and Auscher-Coulhon [6]. Applications to isoperimetric inequalities and Sobolev inequalities are given. Our results apply to Riemannian and sub-Riemannian manifolds as well as to non-smooth spaces, and to degenerate elliptic/parabolic equations in these settings.
Cite
@article{arxiv.1703.02152,
title = {Gradient estimates for heat kernels and harmonic functions},
author = {Thierry Coulhon and Renjin Jiang and Pekka Koskela and Adam Sikora},
journal= {arXiv preprint arXiv:1703.02152},
year = {2017}
}
Comments
59 pages