Extremal statistics for stochastic resetting systems

TL;DR

This paper investigates the extreme value statistics of stochastic resetting systems, deriving exact formulas for the distribution of maxima and their occurrence times, with applications to various stochastic processes.

Contribution

It introduces a renewal formula linking maximum and arg-maximum distributions to the underlying process, advancing the understanding of extremal fluctuations in resetting systems.

Findings

Arg-maximum density becomes uniform at large times.

Results apply to diffusion, drift, Ornstein-Uhlenbeck, and acceleration processes.

Exact formulas derived for Markov processes, supported by numerical analysis.

Abstract

While averages and typical fluctuations often play a major role to understand the behavior of a non-equilibrium system, this nonetheless is not always true. Rare events and large fluctuations are also pivotal when a thorough analysis of the system is being done. In this context, the statistics of extreme fluctuations in contrast to the average plays an important role, as has been discussed in fields ranging from statistical and mathematical physics to climate, finance and ecology. Herein, we study Extreme Value Statistics (EVS) of stochastic resetting systems which have recently gained lot of interests due to its ubiquitous and enriching applications in physics, chemistry, queuing theory, search processes and computer science. We present a detailed analysis for the finite and large time statistics of extremals (maximum and arg-maximum i.e., the time when the maximum is reached) of the spatial displacement in such system. In particular, we derive an exact renewal formula that relates the joint distribution of maximum and arg-maximum of the reset process to the statistical measures of the underlying process. Benchmarking our results for the maximum of a reset-trajectory that pertain to the Gumbel class for large sample size, we show that the arg-maximum density attains to a uniform distribution regardless of the underlying process at a large observation time. This emerges as a manifestation of the renewal property of the resetting mechanism. The results are augmented with a wide spectrum of Markov and non-Markov stochastic processes under resetting namely simple diffusion, diffusion with drift, Ornstein-Uhlenbeck process and random acceleration process in one dimension. Rigorous results are presented for the first two set-ups while the latter two are supported with heuristic and numerical analysis.