Ergodicity of a generalized probabilistic cellular automaton with parity-based neighbourhoods
Abstract
We study a one-dimensional generalized probabilistic cellular automaton Ep, q with universe Z, alphabet A = \0, 1\, parameters p and q such that 0 < p+q ≤ 1 and two neighbourhoods N0 = \0, 1\ and N = \1, 2\. The state Ep, q η (x) of any x ∈ Z under the application of Ep, q is a random variable whose probability distribution depends on the states η(x + y) for y ∈ Ni where i has the same parity as x. We establish ergodicity of this GPCA for various ranges of values of p and q via its connection with a suitable percolation game on a two-dimensional lattice. For these same ranges of values of p and q, we show that the above-mentioned game has probability 0 of resulting in a draw.
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