Every cell of two-dimensional cellular automaton with eight-cell neighborhood takes three states: resting, excited and refractory, and updates excited to refractory and refractory to resting states unconditionally. A resting cell excites depending on number of excited and refractory neighbors. We made exhaustive study of spatio-temporal excitation dynamics for all rules of this type and selected several classes of rules. The classes supporting self-localizations are studied in details. We uncover basic types of mobile (gliders) and stationary localizations, and characterize their morphology and dynamics. © 2007 Elsevier Ltd. All rights reserved
(eng) Cellular automata are a formal model of locally interacting systems which is very simple but s...
We propose a Cellular Automata (CA) model in which three ubiquitous and relevant processes in nature...
Abstract — Cellular Automata (CAs) have been investigated extensively as abstract models of the dist...
Every cell of two-dimensional cellular automaton with eight-cell neighborhood takes three states: re...
We consider hexagonal cellular automata with immediate cell neighbourhood and three cell-states. Eve...
We study a binary-cell-state eight-cell neighborhood two-dimensional cellular automaton model of a q...
mcintosh @ unam. mx The dynamics of rule 54 one-dimensional two-state cellular automaton (CA) are a ...
We study two-dimensional cellular automata, each cell takes three states: rest-ing, excited and refr...
We study a binary-cell-state eight-cell neighborhood two-dimensional cellular automaton model of a q...
Gliders in one-dimensional cellular automata are compact groups of non-quiescent and non-ether patte...
We study a two-dimensional cellular automaton (CA), called Diffusion Rule (DR), which exhibits diffu...
Rule 22 elementary cellular automaton (ECA) has a three-cell neighborhood, binary cell state, where ...
"Glider" dynamics in cellular automata (CA), where coherent configurations emerge and inte...
A rule dynamical system is constructed using one-dimensional elementary cellular au-tomata, and the ...
Self-organization is ubiquitous in nature. Self-organizing systems are highly distributed, composed ...
(eng) Cellular automata are a formal model of locally interacting systems which is very simple but s...
We propose a Cellular Automata (CA) model in which three ubiquitous and relevant processes in nature...
Abstract — Cellular Automata (CAs) have been investigated extensively as abstract models of the dist...
Every cell of two-dimensional cellular automaton with eight-cell neighborhood takes three states: re...
We consider hexagonal cellular automata with immediate cell neighbourhood and three cell-states. Eve...
We study a binary-cell-state eight-cell neighborhood two-dimensional cellular automaton model of a q...
mcintosh @ unam. mx The dynamics of rule 54 one-dimensional two-state cellular automaton (CA) are a ...
We study two-dimensional cellular automata, each cell takes three states: rest-ing, excited and refr...
We study a binary-cell-state eight-cell neighborhood two-dimensional cellular automaton model of a q...
Gliders in one-dimensional cellular automata are compact groups of non-quiescent and non-ether patte...
We study a two-dimensional cellular automaton (CA), called Diffusion Rule (DR), which exhibits diffu...
Rule 22 elementary cellular automaton (ECA) has a three-cell neighborhood, binary cell state, where ...
"Glider" dynamics in cellular automata (CA), where coherent configurations emerge and inte...
A rule dynamical system is constructed using one-dimensional elementary cellular au-tomata, and the ...
Self-organization is ubiquitous in nature. Self-organizing systems are highly distributed, composed ...
(eng) Cellular automata are a formal model of locally interacting systems which is very simple but s...
We propose a Cellular Automata (CA) model in which three ubiquitous and relevant processes in nature...
Abstract — Cellular Automata (CAs) have been investigated extensively as abstract models of the dist...