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Reaction-Diffusion Automata: Phenomenology, Localisations, ComputationMutualistic Excitation

Reaction-Diffusion Automata: Phenomenology, Localisations, Computation: Mutualistic Excitation [In a classical Greenberg-Hasting model of excitation a resting cell excites depending on number of its excited neighbours. What if the process of being excited depends also on refractory states? Let every cell x of an automaton imitating mutualistic excitation take three states: resting ·, excited ∙, refractory ∘. and updates its state by the rule] http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png

Reaction-Diffusion Automata: Phenomenology, Localisations, ComputationMutualistic Excitation

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Publisher
Springer Berlin Heidelberg
Copyright
© Springer-Verlag Berlin Heidelberg 2013
ISBN
978-3-642-31077-5
Pages
67 –95
DOI
10.1007/978-3-642-31078-2_4
Publisher site
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Abstract

[In a classical Greenberg-Hasting model of excitation a resting cell excites depending on number of its excited neighbours. What if the process of being excited depends also on refractory states? Let every cell x of an automaton imitating mutualistic excitation take three states: resting ·, excited ∙, refractory ∘. and updates its state by the rule]

Published: Jan 1, 2013

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