The one-parameter two-dimensional cellular automaton with the Margolus neighbourhood is analyzed based on considering the projection of the stochastic movements of a single particle. Introducing the auxiliary random variable associated with the direction of the movement, we reduce the problem under consideration to the study of a two-dimensional Markov chain. The master equation for the probability distribution is derived and solved exactly using the probability-generating function method. The probability distribution is expressed analytically in terms of Jacobi polynomials. The moments of the obtained solution allowed us to derive the exact analytical formula for the parametric dependence of the diffusion coefficient in the two-dimensional...
Cellular automata are usually associated with synchronous deterministic dynamics, and their asynchro...
Lattice 250x250 with periodic boundary. Only every 10 steps are shown, total 1000 frames, correspond...
Many diffusion processes in nature and society were found to be anomalous, in the sense of being fun...
In this paper, a cellular automaton for population diffusion was introduced. A group of discrete par...
Abstract: The simplest cellular automata for the basic model of mathematical physics su...
In this paper we describe a numerical method of cellular automaton type to study the diffusion proce...
A cellular automaton (CA) is a discrete microscopic dynamical system widely used to investigate and ...
Smooth concentration fields and balance equations for systems of random walkers are obtained by usin...
286-290Class of cellular automata (CA) for modeling reaction diffusion systems has been presented. ...
Cellular automata are usually associated with synchronous deterministic dynamics, and their asynchro...
We make a stochastic analysis of both deterministic and stochastic cellular automata. The theory use...
Many diffusion processes in nature and society were found to be anomalous, in the sense of being fun...
Files defining 8-state cellular automaton emulating diffusion in 2 dimensions. Rule definition is in...
We introduce a class of cellular automata (CA) to model reaction-diffusion systems in a quantitative...
ABSTRACT: The Cellular Automata method has been used to simulate the pattern formation of the Schlög...
Cellular automata are usually associated with synchronous deterministic dynamics, and their asynchro...
Lattice 250x250 with periodic boundary. Only every 10 steps are shown, total 1000 frames, correspond...
Many diffusion processes in nature and society were found to be anomalous, in the sense of being fun...
In this paper, a cellular automaton for population diffusion was introduced. A group of discrete par...
Abstract: The simplest cellular automata for the basic model of mathematical physics su...
In this paper we describe a numerical method of cellular automaton type to study the diffusion proce...
A cellular automaton (CA) is a discrete microscopic dynamical system widely used to investigate and ...
Smooth concentration fields and balance equations for systems of random walkers are obtained by usin...
286-290Class of cellular automata (CA) for modeling reaction diffusion systems has been presented. ...
Cellular automata are usually associated with synchronous deterministic dynamics, and their asynchro...
We make a stochastic analysis of both deterministic and stochastic cellular automata. The theory use...
Many diffusion processes in nature and society were found to be anomalous, in the sense of being fun...
Files defining 8-state cellular automaton emulating diffusion in 2 dimensions. Rule definition is in...
We introduce a class of cellular automata (CA) to model reaction-diffusion systems in a quantitative...
ABSTRACT: The Cellular Automata method has been used to simulate the pattern formation of the Schlög...
Cellular automata are usually associated with synchronous deterministic dynamics, and their asynchro...
Lattice 250x250 with periodic boundary. Only every 10 steps are shown, total 1000 frames, correspond...
Many diffusion processes in nature and society were found to be anomalous, in the sense of being fun...