Brownian motion and Random Walk above Quenched Random Wall

Abstract

We study the persistence exponent for the first passage time of a random walk below the trajectory of another random walk. More precisely, let \Bn\ and \Wn\ be two centered, weakly dependent random walks. We establish that P(∀n≤ N Bn ≥ Wn|W) = N-γ + o(1) for a non-random γ≥ 1/2. In the classical setting, Wn 0, it is well-known that γ = 1/2. We prove that for any non-trivial W one has γ>1/2 and the exponent γ depends only on Var(B1)/Var(W1). Our result holds also in the continuous setting, when B and W are independent and possibly perturbed Brownian motions or Ornstein-Uhlenbeck processes. In the latter case the probability decays at exponential rate.