Current fluctuations in periodically driven systems
Abstract
Small nonequelibrium systems driven by an external periodic protocol can be described by Markov processes with time-periodic transition rates. In general, current fluctuations in such small systems are large and may play a crucial role. We develop a theoretical formalism to evaluate the rate of such large deviations in periodically driven systems. We show that the scaled cumulant generating function that characterizes current fluctuations is given by a maximal Floquet exponent. Comparing deterministic protocols with stochastic protocols, we show that, with respect to large deviations, systems driven by a stochastic protocol with an infinitely large number of jumps are equivalent to systems driven by deterministic protocols. Our results are illustrated with three case studies: a two-state model for a heat engine, a three-state model for a molecular pump, and a biased random walk with a time-periodic affinity.
Cite
@article{arxiv.1802.09896,
title = {Current fluctuations in periodically driven systems},
author = {Andre C Barato and Raphael Chetrite},
journal= {arXiv preprint arXiv:1802.09896},
year = {2018}
}
Comments
18 pages, 4 figures