Brownian motion between two random trajectories

Abstract

Consider the first exit time of one-dimensional Brownian motion \Bs\s≥ 0 from a random passageway. We discuss a Brownian motion with two time-dependent random boundaries in quenched sense. Let \Ws\s≥ 0 be an other one-dimensional Brownian motion independent of \Bs\s≥ 0 and let (·|W) represent the conditional probability depending on the realization of \Ws\s≥ 0. We show that -t-1x(∀s∈[0,t]a+β Ws≤ Bs≤ b+β Ws|W) converges to a finite positive constant γ(β)(b-a)-2 almost surely and in Lp~ (p≥ 1) if a<B0=x<b and W0=0. When β=1, a+b=2x, it is equivalent to the random small ball probability problem in the sense of equiditribution, which has been investigated in DL2005. We also find some properties of the function γ(β). An important moment estimation has also been obtained, which can be applied to discuss the small deviation of random walk with random environment in time (see [12]).