A family of one-dimensional finite linear cellular automata with reflective boundary condition over the field $Z_p$ is defined. The generalizations are the radius and the field that states take values. Here, we establish a connection between reversibility of cellular automata and the rule matrix of the cellular automata with radius three. Also, we prove that the reverse CA of this family again falls into this family
AbstractCellular automata are used to model dynamical phenomena by focusing on their local behavior ...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
AbstractThis paper reports characterization of one dimensional 3-neighborhood periodic boundary cell...
Discrete dynamical systems such as cellular automata are of increasing interest to scientists in a v...
The aim of this work is to completely solve the reversibility problem for symmetric linear cellular...
7 pagesInternational audienceReversibility and number-conservation are widely studied physics-like c...
Even though cellular automata (CA) is a discrete model, the behaviors at many iterative times can be...
In this paper, we consider two-dimensional cellular automata (CA) with the von Neumann neighborhood....
AbstractIt is shown that the set of hybrid one-dimensional reversible cellular automata (CA) with th...
AbstractThe reversibility problem for 90150 cellular automata (both null and periodic boundary) is t...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
Part 2: Regular PapersInternational audienceReversibility is the property of very special cellular a...
In this article, we dispute about the characterization of Cellular automata with restricted vertical...
An arbitrary d-dimensional cellular automaton can be constructively embedded in areversible one havi...
AbstractCellular automata are used to model dynamical phenomena by focusing on their local behavior ...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
AbstractThis paper reports characterization of one dimensional 3-neighborhood periodic boundary cell...
Discrete dynamical systems such as cellular automata are of increasing interest to scientists in a v...
The aim of this work is to completely solve the reversibility problem for symmetric linear cellular...
7 pagesInternational audienceReversibility and number-conservation are widely studied physics-like c...
Even though cellular automata (CA) is a discrete model, the behaviors at many iterative times can be...
In this paper, we consider two-dimensional cellular automata (CA) with the von Neumann neighborhood....
AbstractIt is shown that the set of hybrid one-dimensional reversible cellular automata (CA) with th...
AbstractThe reversibility problem for 90150 cellular automata (both null and periodic boundary) is t...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
Part 2: Regular PapersInternational audienceReversibility is the property of very special cellular a...
In this article, we dispute about the characterization of Cellular automata with restricted vertical...
An arbitrary d-dimensional cellular automaton can be constructively embedded in areversible one havi...
AbstractCellular automata are used to model dynamical phenomena by focusing on their local behavior ...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...
This paper deals with one-dimensional finite cellular automata with a triplet local transition rule ...