Large deviations for the boundary local time of doubly reflected Brownian Motion

Abstract

We compute a closed-form expression for the moment generating function f(x;λ,α)=1λEx(eα Lτ), where Lt is the local time at zero for standard Brownian motion with reflecting barriers at 0 and b, and τ Exp(λ) is independent of W. By analyzing how and where f(x;·,α) blows up in λ, a large-time large deviation principle (LDP) for Lt/t is established using a Tauberian result and the G\"artner-Ellis Theorem.