Potential theory of subordinate killed Brownian motion

Kim, Panki; Song, Renming; Vondraček, Zoran

doi:10.1090/tran/7358

Potential theory of subordinate killed Brownian motion
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Trans. Amer. Math. Soc. 371 (2019), 3917-3969 Request permission

Abstract:

Let $W^D$ be a killed Brownian motion in a domain $D\subset \mathbb {R}^d$ and $S$ an independent subordinator with Laplace exponent $\phi$. The process $Y^D$ defined by $Y^D_t=W^D_{S_t}$ is called a subordinate killed Brownian motion. It is a Hunt process with infinitesimal generator $-\phi (-\Delta |_D)$, where $\Delta |_D$ is the Dirichlet Laplacian. In this paper we study the potential theory of $Y^D$ under a weak scaling condition on the derivative of $\phi$. We first show that non-negative harmonic functions of $Y^D$ satisfy the scale invariant Harnack inequality. Subsequently we prove two types of scale invariant boundary Harnack principles with explicit decay rates for non-negative harmonic functions of $Y^D$. The first boundary Harnack principle deals with a $C^{1,1}$ domain $D$ and non-negative functions which are harmonic near the boundary of $D$, while the second one is for a more general domain $D$ and non-negative functions which are harmonic near the boundary of an interior open subset of $D$. The obtained decay rates are not the same, reflecting different boundary and interior behaviors of $Y^D$.

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