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140122  eng 
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a 9789401009201

100 
1 

a Goles, E.
e [editor]

245 
0 
0 
a Complex Systems
h Elektronische Ressource
c edited by E. Goles, Servet Martínez

250 


a 1st ed. 2001

260 


a Dordrecht
b Springer Netherlands
c 2001, 2001

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a VIII, 301 p
b online resource

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0 

a Recoding Sturmian Sequences on a Subshift of Finite Type Chaos from Order: A Worked out Example  Lyapunov Exponents and Synchronization of Cellular Automata  Dynamical Systems and Biological Regulations  Cellular Automata and Artificial Life  Why Kolmogorov Complexity?  Cutoff for Markov Chains: Some Examples and Applications

653 


a Complex Systems

653 


a Computer science

653 


a Computer science / Mathematics

653 


a Discrete Mathematics in Computer Science

653 


a Statistics

653 


a Control theory

653 


a Systems Theory, Control

653 


a System theory

653 


a Mathematical Modeling and Industrial Mathematics

653 


a Discrete mathematics

653 


a Theory of Computation

653 


a Statistics

653 


a Mathematical models

700 
1 

a Martínez, Servet
e [editor]

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0 
7 
a eng
2 ISO 6392

989 


b SBA
a Springer Book Archives 2004

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0 

a Nonlinear Phenomena and Complex Systems

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5 
0 
a 10.1007/9789401009201

856 
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u https://doi.org/10.1007/9789401009201?nosfx=y
x Verlag
3 Volltext

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0 

a 003.3

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a This volume contains the courses given at the Sixth Summer School on Complex Systems held at Facultad de Ciencias Fisicas y Maternaticas, Universidad de Chile at Santiago, Chile, from 14th to 18th December 1998. This school was addressed to graduate students and researchers working on areas related with recent trends in Complex Systems, including dynamical systems, cellular automata, complexity and cutoff in Markov chains. Each contribution is devoted to one of these subjects. In some cases they are structured as surveys, presenting at the same time an original point of view and showing mostly new results. The paper of Pierre Arnoux investigates the relation between low complex systems and chaotic systems, showing that they can be put into relation by some re normalization operations. The case of quasicrystals is fully studied, in particular the Sturmian quasicrystals. The paper of Franco Bagnoli and Raul Rechtman establishes relations be tween Lyapunov exponents and synchronization processes in cellular automata. The principal goal is to associate tools, usually used in physical problems, to an important problem in cellularautomata and computer science, the synchronization problem. The paper of Jacques Demongeot and colleagues gives a presentation of at tractors of dynamical systems appearing in biological situations. For instance, the relation between positive or negative loops and regulation systems
