On the Bernoulli Automorphism of Reversible Linear Cellular Automata
Abstract
This investigation studies the ergodic properties of reversible linear cellular automata over Zm for m ∈ N. We show that a reversible linear cellular automaton is either a Bernoulli automorphism or non-ergodic. This gives an affirmative answer to an open problem proposed in [Pivato, Ergodc theory of cellular automata, Encyclopedia of Complexity and Systems Science, 2009, pp.~2980-3015] for the case of reversible linear cellular automata.
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