Universality in driven Potts models
Abstract
We study the stochastic dynamics of infinitely many globally interacting -state units on a ring that is externally driven. While repulsive interactions always lead to uniform occupations, attractive interactions give rise to much richer phenomena: We analytically characterize a Hopf bifurcation which separates a high-temperature regime of uniform occupations from a low-temperature one where all units coalesce into a single state. For odd below the critical temperature starts a synchronization regime which ends via a second phase transition at lower temperatures, while for even this intermediate phase disappears. We find that interactions have no effects except below critical temperature for attractive interactions. A thermodynamic analysis reveals that the dissipated work is reduced in this regime, whose temperature range is shown to decrease as increases. The -dependence of the power-efficiency trade-off is also analyzed.
Keywords
Cite
@article{arxiv.1811.05938,
title = {Universality in driven Potts models},
author = {Tim Herpich and Massimiliano Esposito},
journal= {arXiv preprint arXiv:1811.05938},
year = {2019}
}
Comments
8 pages, 5 figures