Density decay and growth of correlations in the Game of Life

Abstract

We study the Game of Life as a statistical system on an L× L square lattice with periodic boundary conditions. Starting from a random initial configuration of density in=0.3 we investigate the relaxation of the density as well as the growth with time of spatial correlations. The asymptotic density relaxation is exponential with a characteristic time τL whose system size dependence follows a power law τL Lz with z=1.66 0.05 before saturating at large system sizes to a constant τ∞. The correlation growth is characterized by a time dependent correlation length t that follows a power law t t1/z with z close to z before saturating at large times to a constant ∞. We discuss the difficulty of determining the correlation length ∞ in the final "quiescent" state of the system. The decay time t q towards the quiescent state is a random variable, we present simulational evidence as well as a heuristic argument indicating that for large L its distribution peaks at a value t q*(L) 2τ∞ L.