On unique extension of time changed reflecting Brownian motions

Abstract

Let D be an unbounded domain in d with d≥ 3. We show that if D contains an unbounded uniform domain, then the symmetric reflecting Brownian motion (RBM) on D is transient. Next assume that RBM X on D is transient and let Y be its time change by Revuz measure 1D(x) m(x)dx for a strictly positive continuous integrable function m on D. We further show that if there is some r>0 so that D B(0, r) is an unbounded uniform domain, then Y admits one and only one symmetric diffusion that genuinely extends it and admits no killings. In other words, in this case X (or equivalently, Y) has a unique Martin boundary point at infinity.