Continuity of Zero-Hitting Times of Bessel Processes and Welding Homeomorphisms of SLE_

Abstract

We consider a family of Bessel Processes that depend on the starting point x and dimension δ, but are driven by the same Brownian motion. Our main result is that almost surely the first time a process hits 0 is jointly continuous in x and δ, provided δ 0. As an application, we show that the SLE() welding homeomorphism is continuous in for ∈ [0,4]. Our motivation behind this is to study the well known problem of the continuity of SLE in . The main tool in our proofs is random walks with increments distributed as infinite mean Inverse-Gamma laws.