Differential Harnack Inequalities on Path Space
Abstract
Recall that if satisfies , then the Li-Yau Differential Harnack Inequality tells us for each nonnegative , with its heat flow, that Our main result will be to generalize this to path space of the manifold. A key point is that instead of considering infinite dimensional gradients and Laplacians on we will consider a family of finite dimensional gradients and Laplace operators. Namely, for each -function we will define the -gradient and the -Laplacian , where is the Markovian Hessian and both the gradient and the -trace are induced by vector fields naturally associated to under stochastic parallel translation. Now let satisfy , then for each nonnegative we will show the inequality for each , where denotes the expectation with respect to the Wiener measure on . By applying this to the simplest functions on path space, namely cylinder functions of one variable , we will see we recover the classical Li-Yau Harnack inequality exactly. We have similar estimates for Einstein manifolds, with errors depending only on the Einstein constant, as well as for general manifolds, with errors depending on the curvature. Finally, we derive generalizations of Hamilton's Matrix Harnack inequality on path space . It is our understanding that these estimates are new even on the path space of .
Cite
@article{arxiv.2004.07065,
title = {Differential Harnack Inequalities on Path Space},
author = {Robert Haslhofer and Eva Kopfer and Aaron Naber},
journal= {arXiv preprint arXiv:2004.07065},
year = {2020}
}
Comments
43 pages