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When statistical methods began to be applied to the evolution of cellular automata, it was understood that there was a difference between periodic configurations for the automaton and periodicities in the statistical behavior of the automaton.
The long time behavior of a single configuration is one thing; it may repeat sooner or later exhibiting periodic behavior, although if the evolution consists of a neverending transient, it may still have convergent statistical properties. But it is another thing to examine statistical behavior averaged over all configurations, or all the members of a class of configurations. It has generally been expected that those averages would converge, and there was even an article published arguing to that effect. Shortly thereafter Hugues Chaté and Paul Manneville [71,59] discovered some automata which, although they didn't exactly follow the return map of iteration theory, didn't tend toward a long term average either. The most prominent of them, discovered shortly after their original announcement by Jan Hemmingsson, was only three dimensional and followed a period of three in the density.