Abstract
We consider thermodynamically consistent autonomous Markov jump processes displaying a macroscopic limit in which the logarithm of the probability distribution is proportional to a scale-independent rate function (i.e. a large deviations principle is satisfied). In order to provide an explicit expression for the probability distribution valid away from equilibrium, we propose a linear response theory performed at the level of the rate function. We show that the first order non-equilibrium contribution to the steady state rate function, g( x ), satisfies where the vector field u ( x ) defines the macroscopic deterministic dynamics, and the scalar field equals the rate at which work is performed on the system in a given state x . This equation provides a practical way to determine g( x ), significantly outperforms standard linear response theory applied at the level of the probability distribution, and approximates the rate function surprisingly well in some far-from-equilibrium conditions. The method applies to a wealth of physical and chemical systems, that we exemplify by two analytically tractable models—an electrical circuit and an autocatalytic chemical reaction network—both undergoing a non-equilibrium transition from a monostable phase to a bistable phase. Our approach can be easily generalized to transient probabilities and non-autonomous dynamics. Moreover, its recursive application generates a virtual flow in the probability space which allows to determine the steady state rate function arbitrarily far from equilibrium.
Highlights
Equilibrium statistical mechanics provides the probability distribution over the states of a system in terms of their energy
The second research line is based on Freidlin–Wentzell large deviations (LDs) theory [13], which states that the logarithm of the stationary distribution of systems with weak noise is proportional to a rate function, called the quasi-potential
For thermodynamically consistent stochastic systems displaying a macroscopic limit in which the stationary distribution fulfills a LDs principle, we have shown how to compute the correction to the rate function, or quasi-potential, to first order in the forces taking the system out of thermal equilibrium
Summary
Complex Systems and Statistical Mechanics, Department of Physics and Materials Science, University of Luxembourg, L-1511 Luxembourg, Luxembourg Keywords: large deviations theory, linear response, stochastic thermodynamics, non-equilibrium steady states Original content from this work may be used under the terms of the Creative Commons Attribution 4.0 licence. Any further distribution of this work must maintain attribution to the author(s) and the title of the work, journal citation and DOI.
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