Conservation Laws and Invariant Measures in Surjective Cellular Automata
Publication date
2011-11-21
Authors
Kari, J.
Taati, S.
Editors
Advisors
Supervisors
Document Type
Part of book
Metadata
Show full item recordCollections
License
Abstract
We discuss a close link between two seemingly different topics studied in the cellular automata literature: additive conservation laws and invariant probability measures. We provide an elementary proof of a simple correspondence between invariant full-support Bernoulli measures and interaction-free conserved quantities in the case of onedimensional surjective cellular automata. We also discuss a generalization of this fact to Markov measures and higher-range conservation laws in arbitrary dimension. As a corollary, we show that the uniform Bernoulli measure is the only shift-invariant, full-support Markov measure that is invariant under a strongly transitive cellular automaton.
Keywords
Citation
Kari, J & Taati, S 2011, Conservation Laws and Invariant Measures in Surjective Cellular Automata. in Automata 2011 - 17th International Workshop on Cellular Automata and Discrete Complex Systems. Discrete Mathematics and Theoretical Computer Science, pp. 113-122. https://doi.org/10.46298/dmtcs.2968