Variance sum rule: proofs and solvable models
Abstract
We derive, in more general conditions, a recently introduced variance sum rule (VSR) [I. Di Terlizzi et al., 2024 Science 383 971] involving variances of displacement and force impulse for overdamped Langevin systems in a nonequilibrium steady state (NESS). This formula allows visualising the effect of nonequilibrium as a deviation of the sum of variances from normal diffusion , with the diffusion constant and the time. From the VSR, we also derive formulas for the entropy production rate that, differently from previous results, involve second-order time derivatives of position correlation functions. This novel feature gives a criterion for discriminating strong nonequilibrium regimes without measuring forces. We then apply and discuss our results to three analytically solved models: a stochastic switching trap, a Brownian vortex, and a Brownian gyrator. Finally, we compare the advantages and limitations of known and novel formulas for in an overdamped NESS.
Cite
@article{arxiv.2403.10442,
title = {Variance sum rule: proofs and solvable models},
author = {Ivan Di Terlizzi and Marco Baiesi and Felix Ritort},
journal= {arXiv preprint arXiv:2403.10442},
year = {2024}
}