SELF-SIMILAR STRUCTURE OF RESCALED EVOLUTION SETS OF CELLULAR AUTOMATA II
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Publication:5474186
DOI10.1142/S0218127401002511zbMath1090.37505MaRDI QIDQ5474186
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Publication date: 23 June 2006
Published in: International Journal of Bifurcation and Chaos (Search for Journal in Brave)
Related Items
Limit sets of automatic sequences., Scaling properties of generalized Carlitz sequences of polynomials, An analogue of Cobham’s theorem for fractals, RESCALED EVOLUTION SETS OF LINEAR CELLULAR AUTOMATA ON A CYLINDER, Random matrix products and applications to cellular automata, The self-affine property of \((U,r)\)-Carlitz sequences of polynomials deciphered in terms of graph directed IFS, SELF-SIMILAR STRUCTURE OF RESCALED EVOLUTION SETS OF CELLULAR AUTOMATA I
Cites Work
- Cellular automata can generate fractals
- Calculating growth rates and moments for additive cellular automata
- Automaticity of double sequences generated by one-dimensional linear cellular automata
- Linear cellular automata, finite automata and Pascal's triangle
- SELF-SIMILAR STRUCTURE OF RESCALED EVOLUTION SETS OF CELLULAR AUTOMATA I
- On the base-dependence of sets of numbers recognizable by finite automata
- Endomorphisms and automorphisms of the shift dynamical system
- Uniform tag sequences
