Ergodicity of some classes of cellular automata subject to noise
Cellular automata (CA) are dynamical systems on symbolic configurations on the lattice. They are also used as models of massively parallel computers. As dynamical systems, one would like to understand the effect of small random perturbations on the dynamics of CA. As models of computation, they can...
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| Published in | arXiv.org |
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| Main Authors | , , |
| Format | Paper Journal Article |
| Language | English |
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Ithaca
Cornell University Library, arXiv.org
28.03.2019
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| ISSN | 2331-8422 |
| DOI | 10.48550/arxiv.1712.05500 |
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| Abstract | Cellular automata (CA) are dynamical systems on symbolic configurations on the lattice. They are also used as models of massively parallel computers. As dynamical systems, one would like to understand the effect of small random perturbations on the dynamics of CA. As models of computation, they can be used to study the reliability of computation against noise. We consider various families of CA (nilpotent, permutive, gliders, CA with a spreading symbol, surjective, algebraic) and prove that they are highly unstable against noise, meaning that they forget their initial conditions under slightest positive noise. This is manifested as the ergodicity of the resulting probabilistic CA. The proofs involve a collection of different techniques (couplings, entropy, Fourier analysis), depending on the dynamical properties of the underlying deterministic CA and the type of noise. |
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| AbstractList | Electronic Journal of Probability, Volume 24 (2019), paper no. 41,
44 pp Cellular automata (CA) are dynamical systems on symbolic configurations on
the lattice. They are also used as models of massively parallel computers. As
dynamical systems, one would like to understand the effect of small random
perturbations on the dynamics of CA. As models of computation, they can be used
to study the reliability of computation against noise.
We consider various families of CA (nilpotent, permutive, gliders, CA with a
spreading symbol, surjective, algebraic) and prove that they are highly
unstable against noise, meaning that they forget their initial conditions under
slightest positive noise. This is manifested as the ergodicity of the resulting
probabilistic CA. The proofs involve a collection of different techniques
(couplings, entropy, Fourier analysis), depending on the dynamical properties
of the underlying deterministic CA and the type of noise. Cellular automata (CA) are dynamical systems on symbolic configurations on the lattice. They are also used as models of massively parallel computers. As dynamical systems, one would like to understand the effect of small random perturbations on the dynamics of CA. As models of computation, they can be used to study the reliability of computation against noise. We consider various families of CA (nilpotent, permutive, gliders, CA with a spreading symbol, surjective, algebraic) and prove that they are highly unstable against noise, meaning that they forget their initial conditions under slightest positive noise. This is manifested as the ergodicity of the resulting probabilistic CA. The proofs involve a collection of different techniques (couplings, entropy, Fourier analysis), depending on the dynamical properties of the underlying deterministic CA and the type of noise. |
| Author | Taati, Siamak Marcovici, Irène Sablik, Mathieu |
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| BackLink | https://doi.org/10.48550/arXiv.1712.05500$$DView paper in arXiv https://doi.org/10.1214/19-EJP297$$DView published paper (Access to full text may be restricted) |
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| Snippet | Cellular automata (CA) are dynamical systems on symbolic configurations on the lattice. They are also used as models of massively parallel computers. As... Electronic Journal of Probability, Volume 24 (2019), paper no. 41, 44 pp Cellular automata (CA) are dynamical systems on symbolic configurations on the... |
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| SubjectTerms | Cellular automata Computation Computer Science - Distributed, Parallel, and Cluster Computing Computer simulation Couplings Dynamical systems Ergodic processes Fourier analysis Gliders Initial conditions Mathematical models Mathematics - Dynamical Systems Mathematics - Probability Noise Parallel computers Physics - Cellular Automata and Lattice Gases |
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| Title | Ergodicity of some classes of cellular automata subject to noise |
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