Add to ORKGEste trabalho tem como objetivo a determinação analítica da ocorrência de um tipo de caos (irregularidade) determinístico denominado Caos Homoclínico em algumas aplicações da Ciência da Engenharia como, por exemplo, a Robótica e a Teoria de Controle (Controle de Bifurcações e Caótico). Para isto, faz-se uso da chamada Teoria de Poincaré - Mel?nikov que fornece uma forma analítica para a determinação do tipo de comportamento do sistema (regular ou irregular)This work make the analytical determination of the occurrence of a type of deterministic chaos (irregularity) called Homoclinic Chaos in some applications of the Science of Engineering and mechanics as, for example, the Robotics and the Theory of Control (Chaotic Control of Bifurcations s...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Chaos theory is a branch of mathematics focusing on nonlinear dynamic systems. As a relatively new ...
We explore the multifractal, self-similar organization of heteroclinic and homoclinic bifurcations o...
In this thesis is to describe the use of the Poincaré-Melnikov method in the detection of homoclinic...
Nesta tese analisamos o comportamento dinâmico, no espaço elos parâmetros, ele duas versões elo circ...
Orientador: Ricardo Miranda MartinsTese (doutorado) - Universidade Estadual de Campinas, Instituto ...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
In this work, the occurrence of chaos (homoclinic scene) is verified in a robotic system with two de...
he mathematical theory of bifurcation originated in the semi-nal work of Henri Poincaré on systems o...
In the present paper we prove distributional chaos for the Poincaré map in the perturbed equation [f...
summary:For several specific mappings we show their chaotic behaviour by detecting the existence of ...
Neste trabalho define-se inicialmente o que é caos e mostram-se as principais particularidades dos s...
This is a textbook on chaos and nonlinear dynamics, written by applied mathematicians for applied ma...
The book is concerned with the concepts of chaos and fractals, which are within the scopes of dynami...
This work presents an historical-logical analysis of the notion of Chaos in relation to the problem ...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Chaos theory is a branch of mathematics focusing on nonlinear dynamic systems. As a relatively new ...
We explore the multifractal, self-similar organization of heteroclinic and homoclinic bifurcations o...
In this thesis is to describe the use of the Poincaré-Melnikov method in the detection of homoclinic...
Nesta tese analisamos o comportamento dinâmico, no espaço elos parâmetros, ele duas versões elo circ...
Orientador: Ricardo Miranda MartinsTese (doutorado) - Universidade Estadual de Campinas, Instituto ...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
In this work, the occurrence of chaos (homoclinic scene) is verified in a robotic system with two de...
he mathematical theory of bifurcation originated in the semi-nal work of Henri Poincaré on systems o...
In the present paper we prove distributional chaos for the Poincaré map in the perturbed equation [f...
summary:For several specific mappings we show their chaotic behaviour by detecting the existence of ...
Neste trabalho define-se inicialmente o que é caos e mostram-se as principais particularidades dos s...
This is a textbook on chaos and nonlinear dynamics, written by applied mathematicians for applied ma...
The book is concerned with the concepts of chaos and fractals, which are within the scopes of dynami...
This work presents an historical-logical analysis of the notion of Chaos in relation to the problem ...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Chaos theory is a branch of mathematics focusing on nonlinear dynamic systems. As a relatively new ...
We explore the multifractal, self-similar organization of heteroclinic and homoclinic bifurcations o...