Two interacting Ising chains in relative motion
H.J. Hilhorst
TL;DR
This paper investigates the nonequilibrium steady states of two counter-rotating Ising chains with interactions, focusing on finite-size effects and fluctuations at infinite relative velocity, revealing detailed balance violations at higher orders.
Contribution
It provides a detailed analysis of finite-size corrections and fluctuations in a nonequilibrium Ising model with relative motion, extending previous infinite-size results.
Findings
Finite-size corrections violate detailed balance.
Explicit expressions for free energy, magnetization, and correlations.
Finite-size scaling functions are derived explicitly.
Abstract
We consider two parallel cyclic Ising chains counter-rotating at a relative velocity v, the motion actually being a succession of discrete steps. There is an in-chain interaction between nearest-neighbor spins and a cross-chain interaction between instantaneously opposite spins. For velocities v>0 the system, subject to a suitable markovian dynamics at a temperature T, can reach only a nonequilibrium steady state (NESS). This system was introduced by Hucht et al., who showed that for v=\infty it undergoes a para- to ferromagnetic transition, essentially due to the fact that each chain exerts an effective field on the other one. The present study of the v=\infty case determines the consequences of the fluctuations of this effective field when the system size N is finite. We show that whereas to leading order the system obeys detailed balancing with respect to an effective…
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