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Event

Xiangqiang Meng (University of Washington)

Thursday, October 31, 2024 11:30to12:30
Burnside Hall Room 719A, 805 rue Sherbrooke Ouest, Montreal, QC, H3A 0B9, CA

Title: Harnack inequality for weakly nonlocal systems.

Abstract: In this paper, we consider a weakly coupled system of nonlocal operators which contain both the diffusion part with uniformly elliptic diffusion matrices and bounded drift vectors and the jump part with relatively general jump kernels. We use the two-sided scale-invariant Green function estimation to prove the scale-invariant Harnack inequality for the weakly coupled nonlocal systems. In the case where the switching rate matrix is strictly irreducible, the scale-invariant full rank Harnack inequality is proved. Our approach is mainly probabilistic. This is a joint work with Zhen-Qing Chen.

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