Brownian hitting distributions in space-time of bounded sets and the expected volume of Wiener sausage for Brownian bridges

Abstract

The space-time distribution, QA(x,dt d) say, of Brownian hitting of a bounded Borel set A of the d-dimensional Euclidian space is studied. We derive the asymptotic form of the leading term of the time-derivative QA(x, dtd)/dt for each d =2, 3, ..., valid uniformly with respect to the starting point x of the Brownian motion, which result extends significantly the classical results for QA(x, dt d) itself by Hunt (d=2), Joffe and Spitzer (d= 3, 4,...). The results are applied to find the asymptotic form of the expected volume of Wiener sausage for the Brownian bridge joining the origin to a distant point.