DocumentCode
1849472
Title
Complex Symbolic Dynamics of Bernoulli Shift Cellular Automata Rule
Author
Chen, Lin ; Chen, Fangyue ; Chen, FangFang ; Jin, Weifeng
Author_Institution
Dept. of Math., Zhejiang Normal Univ., Jinhua
fYear
2008
fDate
18-21 Nov. 2008
Firstpage
2868
Lastpage
2873
Abstract
In this paper, the complex dynamical behaviors of one dimensional cellular automata rule 11, which is a Bernoulli sigmatau-shift rule, are investigated from the viewpoint of symbolic dynamics. Based on the dynamical properties of subshift of finite type and the relationship between subshift and quasi-subshift, it is strictly proved that rule 11 is topologically mixing on its two subsystems. At the same time, the topological entropies of rule 11 are calculated on the two subsystems, respectively. Conclusively, rule 11 holds rich and complicated dynamical behaviors. For example, it is chaotic in the sense of Li-Yorke and Devaney.
Keywords
cellular automata; Bernoulli shift cellular automata rule; Bernoulli sigmatau-shift rule; complex dynamical behaviors; complex symbolic dynamics; one dimensional cellular automata rule; Binary sequences; Boundary conditions; Chaos; Computer simulation; Entropy; Lattices; Mathematical analysis; Mathematics; Bernoulli; Cellular automata; chaos; symbolic dynamics; topologically mixing;
fLanguage
English
Publisher
ieee
Conference_Titel
Young Computer Scientists, 2008. ICYCS 2008. The 9th International Conference for
Conference_Location
Hunan
Print_ISBN
978-0-7695-3398-8
Electronic_ISBN
978-0-7695-3398-8
Type
conf
DOI
10.1109/ICYCS.2008.192
Filename
4709437
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