Extremal statistics for a one-dimensional Brownian motion with a reflective boundary

Abstract

We investigate the extreme value statistics of a one-dimensional Brownian motion (with the diffusion constant D) during a time interval [0, t ] in the presence of a reflective boundary at the origin, starting from a positive position x0. By deriving the survival probability of the Brownian particle without hitting an absorbing boundary at x=M, we obtain the distribution P(M|x0,t) of the maximum displacement M and its expectation M . In the short-time limit, i.e., t td where td=x02/D is the diffusion time from the starting position x0 to the reflective boundary at the origin, the particle behaves like a free Brownian motion without any boundaries. In the long-time limit, t td, M grows with t as M t, which is similar to the free Brownian motion, but the prefactor is π/2 times of the free Brownian motion, embodying the effect of the reflective boundary. By solving the propagator and using a path decomposition technique, we obtain the joint distribution P(M,tm|x0,t) of M and the time tm at which this maximum is achieved, from which the marginal distribution P(tm|x0,t) is also obtained. For t td, P(tm|x0,t) looks like a U-shaped attributed to the arcsine law of free Brownian motion. For t equal to or larger than order of magnitude of tm, P(tm|x0,t) deviates from the U-shaped distribution and becomes asymmetric with respect to t/2. Moreover, we compute the expectation tm of tm, and find that tm /t is an increasing function of t. In two limiting cases, tm /t 1/2 for t td and tm /t (1+2G)/4 ≈ 0.708 for t td, where G≈0.916 is the Catalan's constant. All the theoretical results are validated by numerical simulations.