Doctoral Thesis
DOI
https://doi.org/10.11606/T.43.2006.tde-24032007-174511
Document
Author
Full name
Dariel Mazzoni Maranhão
E-mail
Institute/School/College
Knowledge Area
Date of Defense
Published
São Paulo, 2006
Supervisor
Committee
Sartorelli, Jose Carlos (President)
Aguiar, Marcus Aloizio Martinez de
Caldas, Ibere Luiz
Gallas, Jason Alfredo Carlson
Malta, Coraci Pereira
Aguiar, Marcus Aloizio Martinez de
Caldas, Ibere Luiz
Gallas, Jason Alfredo Carlson
Malta, Coraci Pereira
Title in Portuguese
Estudo topológico de órbitas periódicas no circuito experimental de Chua
Keywords in Portuguese
caracterização topológica
circuito de Chua
dinâmica simbólica
molde topológico
órbitas periódicas
circuito de Chua
dinâmica simbólica
molde topológico
órbitas periódicas
Abstract in Portuguese
Estudamos o comportamento dinâmico de séries temporais experimentais obtidas de um circuito de Chua quando dois parâmetros de controle, $Delta R_1$ e $Delta R_2$, são variados.Investigamos os comportamentos caótico e periódico, analisando as séries temporais ao redor e no interior de duas janelas periódicas presentes no espaço de parâmetros $(Delta R_1,Delta R_2)$ do circuito.
Na vizinhança da janela de período três, analisamos como a dinâmica simbólica se altera quando construída em diferentes seções de Poincaré de um mesmo atrator, e investigamos a dimensão dos mapas de retorno, uni ou bidimensional, para diferentes atratores caóticos presentes nessa região do espaço de parâmetros. Ainda nessa vizinhança, empregamos técnicas de caracterização topológica para confirmar a existência de fibras caóticas, que são curvas de codimensão um no espaço de parâmetros onde as propriedades caóticas dos atratores são preservadas.Ao redor da janela de período quatro, investigamos a transição entre os três comportamentos caóticos para os quais construímos os respectivos moldes topológicos. Propusemos também um molde topológico para o regime caótico após a crise por fusão ocorrer no circuito. Finalizando, investigamos as bifurcações e a estrutura topológica das órbitas periódicas que formam as janelas de período três e de período quatro, construindo um espaço de parâmetros topológico, baseado em um mapa bi-modal, para descrever as duas janela periódicas.
Title in English
Topological studies of periodic orbits in the experimental Chua's circuit
Keywords in English
Chua's circuit
periodic orbits
symbolic dynamics
template
topological characterization
periodic orbits
symbolic dynamics
template
topological characterization
Abstract in English
We have studied the dynamical behavior of experimental time series obtained from a Chua's circuit by variation of two parameter control, $Delta R_1$ and $Delta R_2$. We investigated the chaotic and periodic behaviors of the circuit, analyzing temporal series around and inside of two periodic windows in the two-parameter space $(Delta R_1,Delta R_2)$.
In the period-three window neighborhood, we analyzed how the symbolic dynamics changes when it is built by different Poincaré sections of an attractor, and we studied the dimension of return map, one- or two-dimensional, for many chaotic attractors in this region of the parameter space. In this neighborhood, we also applied topological techniques to confirm the existence of chaotic fibers: codimension one curves where the chaotic properties of the attractors remain unchanged in the two-parameter space.Around the period-four window, we investigated, by template analysis, the transition between three chaotic attractors found in the Chua's circuit. We proposed a template for chaotic regime of the circuit after merge-crisis. Finally, we investigated the bifurcations and topological structure of periodic orbits in period-three and period-four windows and also proposed a topological parameter space, based in a bimodal map model, that describe these two periodic windows.
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Tese_final.pdf (9.55 Mbytes)
Publishing Date
2007-03-26
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