Potential theory of subordinate killed Brownian motion

Abstract

Let WD be a killed Brownian motion in a domain D⊂ Rd and S an independent subordinator with Laplace exponent φ. The process YD defined by YDt=WDSt is called a subordinate killed Brownian motion. It is a Hunt process with infinitesimal generator -φ(-|D), where |D is the Dirichlet Laplacian. In this paper we study the potential theory of YD under a weak scaling condition on the derivative of φ. We first show that non-negative harmonic functions of YD 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 YD. The first boundary Harnack principle deals with a C1,1 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 YD.