On a class of probabilistic cellular automata with size-3 neighbourhood and their applications in percolation games

Abstract

Different versions of percolation games on Z2, with parameters p and q that indicate, respectively, the probability with which a site in Z2 is labeled a trap and the probability with which it is labeled a target, are shown to have probability 0 of culminating in draws when p+q > 0. We show that, for fixed p and q, the probability of draw in each of these games is 0 if and only if a certain 1-dimensional probabilistic cellular automaton (PCA) Fp,q with a size-3 neighbourhood is ergodic. This allows us to conclude that Fp,q is ergodic whenever p+q > 0, thereby rigorously establishing ergodicity for a considerable class of PCAs.