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arxiv: 1206.5925 · v2 · pith:CXKJAA73new · submitted 2012-06-26 · 🧮 math.DS

About a low complexity class of Cellular Automata

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keywords measureautomatacellularinvariantmeasuresergodicshiftautomaton
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Extending to all probability measures the notion of m-equicontinuous cellular automata introduced for Bernoulli measures by Gilman, we show that the entropy is null if m is an invariant measure and that the sequence of image measures of a shift ergodic measure by iterations of such automata converges in Cesaro mean to an invariant measure mc. Moreover this cellular automaton is still mc-equicontinuous and the set of periodic points is dense in the topological support of the measure mc. The last property is also true when m is invariant and shift ergodic.

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