AbstractCellular automata are used to model dynamical phenomena by focusing on their local behavior which depends on the neighboring cells in order to express their global behavior. The geometrical structure of the models suggests the algebraic structure of cellular automata. After modeling the dynamical phenomena, it is sometimes an important problem to be able to move backwards in order to understand it better. This is only possible if cellular automata is reversible. In this paper, 2D finite cellular automata defined by local rules based on hexagonal cell structure are studied. Rule matrix of the hexagonal finite cellular automaton is obtained. The rank of rule matrices representing the 2D hexagonal finite cellular automata via an algori...
This volume of the Encyclopedia of Complexity and Systems Science, Second Edition, provides an autho...
A cellular automaton (CA) is a set of rules which determines the state of individual cells on a grid...
In this paper, we consider two-dimensional cellular automata (CA) with the von Neumann neighborhood....
AbstractCellular automata are used to model dynamical phenomena by focusing on their local behavior ...
We present counterexamples illustrating that the characterization of the reversibility of hexagonal ...
We describe two algorithms for calculating reversible one-dimensional cellular automata of neighborh...
We created two dimensional hexagonal cellular automata to obtain complexity. Considering the game of...
The problem of deciding if a given cellular automaton (CA) is reversible (or, equivalently, if its g...
Cellular automata are models for massively parallel computation. A cellular automaton consists of ce...
Discrete dynamical systems such as cellular automata are of increasing interest to scientists in a v...
We apply local structure theory calculations 7 to the study of cellular automata on the two-dimens...
M.Sc. (Computer Science)Astudy of one- and two-dimensional cellular automata was made. Two research ...
Reversible cellular automata are discrete dynamical systems based on local interactions which are ab...
Reversible cellular automata are invertible dynamical systems characterized by discreteness, determi...
In previous works, hexagonal cellular automata (CA) have been studied as a variation of the famous G...
This volume of the Encyclopedia of Complexity and Systems Science, Second Edition, provides an autho...
A cellular automaton (CA) is a set of rules which determines the state of individual cells on a grid...
In this paper, we consider two-dimensional cellular automata (CA) with the von Neumann neighborhood....
AbstractCellular automata are used to model dynamical phenomena by focusing on their local behavior ...
We present counterexamples illustrating that the characterization of the reversibility of hexagonal ...
We describe two algorithms for calculating reversible one-dimensional cellular automata of neighborh...
We created two dimensional hexagonal cellular automata to obtain complexity. Considering the game of...
The problem of deciding if a given cellular automaton (CA) is reversible (or, equivalently, if its g...
Cellular automata are models for massively parallel computation. A cellular automaton consists of ce...
Discrete dynamical systems such as cellular automata are of increasing interest to scientists in a v...
We apply local structure theory calculations 7 to the study of cellular automata on the two-dimens...
M.Sc. (Computer Science)Astudy of one- and two-dimensional cellular automata was made. Two research ...
Reversible cellular automata are discrete dynamical systems based on local interactions which are ab...
Reversible cellular automata are invertible dynamical systems characterized by discreteness, determi...
In previous works, hexagonal cellular automata (CA) have been studied as a variation of the famous G...
This volume of the Encyclopedia of Complexity and Systems Science, Second Edition, provides an autho...
A cellular automaton (CA) is a set of rules which determines the state of individual cells on a grid...
In this paper, we consider two-dimensional cellular automata (CA) with the von Neumann neighborhood....