On the absence of time-translation symmetry breaking in some non-reversible interacting particle systems

TL;DR

This paper proves that certain non-reversible interacting particle systems in one and two dimensions cannot exhibit time-periodic behavior if they have a product measure as a stationary state, advancing understanding of time-translation symmetry breaking.

Contribution

It demonstrates that non-reversible particle systems with a product stationary measure in low dimensions cannot break time-translation symmetry, a novel result for such systems.

Findings

No time-periodic behavior in 1D and 2D systems with positive rates and product stationary measures.

First proof for non-reversible dynamics in two dimensions.

Supports the conjecture that short-range interactions do not lead to time-translation symmetry breaking.

Abstract

The conditions under which stochastic systems of infinitely many interacting particles can maintain sufficient spatial order to move coherently along a time-periodic orbit, thereby breaking the time-translation invariance of the underlying dynamical equation, have been an elusive issue. Via a free energy technique, we prove that if a non-reversible interacting particle system on $\mathbb{Z}^d$, $d=1,2$, with strictly positive rates admits a product measure as a stationary measure, then it cannot exhibit time-periodic behaviour. This provides a first step towards a general conjecture that time-periodic behaviour cannot occur in one- and two-dimensional systems with short-range interactions and constitutes the first result for non-reversible dynamics in dimension two.