Extremal statistics for a resetting Brownian motion before its first-passage time

TL;DR

This paper investigates the extremal statistics of a resetting Brownian motion, deriving distributions and moments of maximum displacement and its timing, revealing nonmonotonic behavior and optimal resetting rates.

Contribution

The study provides new analytical results for the maximum displacement and its timing in resetting Brownian motion, including explicit distributions and moments, validated by simulations.

Findings

Expected maximum displacement decreases with increasing resetting rate.

Expected time of maximum has a nonmonotonic dependence on resetting rate.

Optimal resetting rate minimizes the expected time of maximum.

Abstract

We study the extreme value statistics of a one-dimensional resetting Brownian motion (RBM) till its first passage through the origin starting from the position $x_0$ ($>0$). By deriving the exit probability of RBM in an interval $\left[0, M \right] $ from the origin, we obtain the distribution $P_r(M|x_0)$ of the maximum displacement $M$ and thus gives the expected value $\langle M \rangle$ of $M$ as functions of the resetting rate $r$ and $x_0$. We find that $\langle M \rangle$ decreases monotonically as $r$ increases, and tends to $2 x_0$ as $r \to \infty$. In the opposite limit, $\langle M \rangle$ diverges logarithmically as $r \to 0$. Moreover, we derive the propagator of RBM in the Laplace domain in the presence of both absorbing ends, and then leads to the joint distribution $P_r(M,t_m|x_0)$ of $M$ and the time $t_m$ at which this maximum is achieved in the Lapalce domain by using a path decomposition technique, from which the expected value $\langle t_m \rangle$ of $t_m$ is obtained explicitly. Interestingly, $\langle t_m \rangle$ shows a nonmonotonic dependence on $r$, and attains its minimum at an optimal $r^{*} \approx 2.71691 D/x_0^2$, where $D$ is the diffusion coefficient. Finally, we perform extensive simulations to validate our theoretical results.