Symmetric jump processes and their heat kernel estimates |
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| Authors: | Zhen-Qing Chen |
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| Affiliation: | (1) Department of Mathematics, University of Washington, Seattle, WA 98195, USA;(2) Department of Mathematics, Beijing Institute of Technology, Beijing, 100081, China |
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| Abstract: | We survey the recent development of the DeGiorgi-Nash-Moser-Aronson type theory for a class of symmetric jump processes (or equivalently, a class of symmetric integro-differential operators). We focus on the sharp two-sided estimates for the transition density functions (or heat kernels) of the processes, a priori Hölder estimate and parabolic Harnack inequalities for their parabolic functions. In contrast to the second order elliptic differential operator case, the methods to establish these properties for symmetric integro-differential operators are mainly probabilistic. |
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| Keywords: | symmetric jump process diffusion with jumps pseudo-differential operator Dirichlet form a prior H?lder estimates parabolic Harnack inequality global and Dirichlet heat kernel estimates Lévy system |
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