Non-maximal Sensitivity to Synchronism in Periodic Elementary Cellular Automata: Exact Asymptotic Measures - Cellular Automata and Discrete Complex Systems
Conference Papers Year : 2020

Non-maximal Sensitivity to Synchronism in Periodic Elementary Cellular Automata: Exact Asymptotic Measures

Abstract

In  [10] and  [12] the authors showed that elementary cellular automata rules 0, 3, 8, 12, 15, 28, 32, 34, 44, 51, 60, 128, 136, 140, 160, 162, 170, 200 and 204 (and their conjugation, reflection, reflected-conjugation) are not maximum sensitive to synchronism, i.e., they do not have a different dynamics for each (non-equivalent) block-sequential update schedule (defined as ordered partitions of cell positions). In this work we present exact measurements of the sensitivity to synchronism for these rules, as functions of the size. These exhibit a surprising variety of values and associated proof methods, such as the special pairs of rule 128, and the connection to the bissection of Lucas numbers of rule 8.
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hal-03659470 , version 1 (05-05-2022)

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Pedro Paulo Balbi, Enrico Formenti, Kévin Perrot, Sara Riva, Eurico Ruivo. Non-maximal Sensitivity to Synchronism in Periodic Elementary Cellular Automata: Exact Asymptotic Measures. 26th International Workshop on Cellular Automata and Discrete Complex Systems (AUTOMATA), Aug 2020, Stockholm, Sweden. pp.14-28, ⟨10.1007/978-3-030-61588-8_2⟩. ⟨hal-03659470⟩
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