Stochastic resetting prevails over sharp restart for broad target distributions

Abstract

Resetting has been shown to reduce the completion time for a stochastic process, such as the first passage time for a diffusive searcher to find a target. The time between two consecutive resetting events is drawn from a waiting time distribution (t), which defines the resetting protocol. Previously, it has been shown that deterministic resetting process with a constant time period, referred to as sharp restart, can minimize the mean first passage time to a fixed target. Here we consider the more realistic problem of a target positioned at a random distance R from the resetting site, selected from a given target distribution PT(R). We introduce the notion of a conjugate target distribution to a given waiting time distribution. The conjugate target distribution, PT*(R), is that PT(R) for which (t) extremizes the mean time to locate the target. In the case of diffusion we derive an explicit expression for P*T(R) conjugate to a given (t) which holds in arbitrary spatial dimension. Our results show that stochastic resetting prevails over sharp restart for target distributions with exponential or heavier tails.

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