Heat kernels for reflected diffusions with jumps on inner uniform domains
Abstract
In this paper, we study sharp two-sided heat kernel estimates for a large class of symmetric reflected diffusions with jumps on the closure of an inner uniform domain in a length metric space. The length metric is the intrinsic metric of a strongly local Dirichlet form. When is an inner uniform domain in the Euclidean space, a prototype for a special case of the processes under consideration are symmetric reflected diffusions with jumps on , whose infinitesimal generators are non-local (pseudo-differential) operators on of the form satisfying "Neumann boundary condition". Here, is the length metric on , is a measurable matrix-valued function on that is uniformly elliptic and bounded, and where is a finite measure on , is an increasing function on with for some , and is a jointly measurable function that is bounded between two positive constants and is symmetric in .
Cite
@article{arxiv.2103.03381,
title = {Heat kernels for reflected diffusions with jumps on inner uniform domains},
author = {Zhen-Qing Chen and Panki Kim and Takashi Kumagai and Jian Wang},
journal= {arXiv preprint arXiv:2103.03381},
year = {2021}
}
Comments
38 pages