Current fluctuations in stochastically resetting particle systems

TL;DR

This paper investigates how stochastic resetting affects the distribution of particle current in non-interacting particle systems, revealing stationary states and phase transitions in the current distribution.

Contribution

It introduces analytical and numerical analysis of current fluctuations under resetting in two particle motion models, highlighting differences between annealed and quenched distributions.

Findings

Resetting induces a stationary current distribution at long times.

The annealed distribution approaches stationarity uniformly, while the quenched distribution shows a critical threshold.

The quenched distribution exhibits a third-order phase transition in its rate function.

Abstract

We consider a system of non-interacting particles on a line with initial positions distributed uniformly with density $\rho$ on the negative half-line. We consider two different models: (i) each particle performs independent Brownian motion with stochastic resetting to its initial position with rate $r$ and (ii) each particle performs run and tumble motion, and with rate $r$ its position gets reset to its initial value and simultaneously its velocity gets randomised. We study the effects of resetting on the distribution $P(Q,t)$ of the integrated particle current $Q$ up to time $t$ through the origin (from left to right). We study both the annealed and the quenched current distributions and in both cases, we find that resetting induces a stationary limiting distribution of the current at long times. However, we show that the approach to the stationary state of the current distribution in the annealed and the quenched cases are drastically different for both models. In the annealed case, the whole distribution $P_{\rm an}(Q,t)$ approaches its stationary limit uniformly for all $Q$. In contrast, the quenched distribution $P_{\rm qu}(Q,t)$ attains its stationary form for $Q<Q_{\rm crit}(t)$, while it remains time-dependent for $Q > Q_{\rm crit}(t)$. We show that $Q_{\rm crit}(t)$ increases linearly with $t$ for large $t$. On the scale where $Q \sim Q_{\rm crit}(t)$, we show that $P_{\rm qu}(Q,t)$ has an unusual large deviation form with a rate function that has a third-order phase transition at the critical point. We have computed the associated rate functions analytically for both models. Using an importance sampling method that allows to probe probabilities as tiny as $10^{-14000}$, we were able to compute numerically this non-analytic rate function for the resetting Brownian dynamics and found excellent agreement with our analytical prediction.