Hitting Probabilities of a Brownian flow with Radial Drift

Abstract

We consider a stochastic flow φt(x,ω) in Rn with initial point φ0(x,ω)=x, driven by a single n-dimensional Brownian motion, and with an outward radial drift of magnitude F(\|φt(x)\|)\|φt(x)\|, with F nonnegative, bounded and Lipschitz. We consider initial points x lying in a set of positive distance from the origin. We show that there exist constants C*,c*>0 not depending on n, such that if F>C*n then the image of the initial set under the flow has probability 0 of hitting the origin. If 0≤ F ≤ c*n3/4, and if the initial set has nonempty interior, then the image of the set has positive probability of hitting the origin.