On One-Sided, D-Chaotic CA Without Fixed Points, Having Continuum of Periodic Points With Period 2 and Topological Entropy log(p) for Any Prime p

On One-Sided, D-Chaotic CA Without Fixed Points, Having Continuum of Periodic Points With Period 2 and Topological Entropy log(p) for Any Prime p

A method is known by which any integer \(\, n\geq2\,\) in a metric Cantor space of right-infinite words \(\,\tilde{A}_{n}^{\,\mathbb N}\,\) gives a construction of a non-injective cellular automaton \(\,(\tilde{A}_{n}^{\,\mathbb N},\,\tilde{F}_{n}),\,\) which is chaotic in Devaney sense, has a radi...

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Bibliographic Details
Main Authors:	Wit Forys, Janusz Matyja
Format:	Article
Language:	English
Published:	MDPI AG 2014-10-01
Series:	Entropy
Subjects:	one-sided cellular automata D-chaotic E-chaotic fixed points topological entropy
Online Access:	http://www.mdpi.com/1099-4300/16/11/5601

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