Non-equilibrium Fluctuations of the Weakly Asymmetric Normalized Binary Contact Path Process

Abstract

This paper is a further investigation of the problem studied in xue2020hydrodynamics, where the authors proved a law of large numbers for the empirical measure of the weakly asymmetric normalized binary contact path process on Zd,\, d ≥ 3, and then conjectured that a central limit theorem should hold under a non-equilibrium initial condition. We prove that the aforesaid conjecture is true when the dimension d of the underlying lattice and the infection rate λ of the process are sufficiently large.