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Directional Dynamics along Arbitrary Curves in Cellular Automata
This paper studies directional dynamics in cellular automata, a formalism previously introduced by the third author. The central idea is to study the dynamical behaviour of a cellular automaton through the conjoint action of its global rule (temporal action) and the shift map (spacial action): quali...
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| Published in: | arXiv.org 2010-08 |
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| Language: | English |
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| creator | Delacourt, Martin Poupet, Victor Sablik, Mathieu Theyssier, Guillaume |
| description | This paper studies directional dynamics in cellular automata, a formalism previously introduced by the third author. The central idea is to study the dynamical behaviour of a cellular automaton through the conjoint action of its global rule (temporal action) and the shift map (spacial action): qualitative behaviours inherited from topological dynamics (equicontinuity, sensitivity, expansivity) are thus considered along arbitrary curves in space-time. The main contributions of the paper concern equicontinuous dynamics which can be connected to the notion of consequences of a word. We show that there is a cellular automaton with an equicontinuous dynamics along a parabola, but which is sensitive along any linear direction. We also show that real numbers that occur as the slope of a limit linear direction with equicontinuous dynamics in some cellular automaton are exactly the computably enumerable numbers. |
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| identifier | EISSN: 2331-8422 |
| ispartof | arXiv.org, 2010-08 |
| issn | 2331-8422 |
| language | eng |
| recordid | cdi_proquest_journals_2087174834 |
| source | Publicly Available Content Database |
| subjects | Cellular automata Dynamics Real numbers |
| title | Directional Dynamics along Arbitrary Curves in Cellular Automata |
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