Add to ORKGThere are many types of dynamical system for which quite simple topological hy potheses imply very complicated behaviour. A well-known example is 'period 3 implies chaos' for continuous maps of an interval. A diverse range of more sophisticated examples has been produced by; many researchers and is reviewed here. The relevance to physical applications - like mixing in fluid flows. chaotic motion of mechanical linkages, and fast dynamos - is explored
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
Examples of various types of chaos are described in some physical systems: (1) Subshifts of second...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...
We investigate the presence of complex behaviors for the solutions of two different dynamical system...
A new approach to understanding nonlinear dynamics and strange attractors. The behavior of a physica...
The delicate interplay between knot theory and dynamical systems is surveyed. Numerous bridges betwe...
We confront existing definitions of chaos with the state of the art in topological dynamics. The art...
The book is concerned with the concepts of chaos and fractals, which are within the scopes of dynami...
The behavior of systems such as periodicity, fixed points, and most importantly chaos has evolved as...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Dynamical systems as a mathematical discipline goes back to Poincaré, who de-veloped a qualitative ...
Dynamical systems, even simple ones, can be unpredictable. These unpredictable dynamical systems are...
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
Examples of various types of chaos are described in some physical systems: (1) Subshifts of second...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...
We investigate the presence of complex behaviors for the solutions of two different dynamical system...
A new approach to understanding nonlinear dynamics and strange attractors. The behavior of a physica...
The delicate interplay between knot theory and dynamical systems is surveyed. Numerous bridges betwe...
We confront existing definitions of chaos with the state of the art in topological dynamics. The art...
The book is concerned with the concepts of chaos and fractals, which are within the scopes of dynami...
The behavior of systems such as periodicity, fixed points, and most importantly chaos has evolved as...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Dynamical systems as a mathematical discipline goes back to Poincaré, who de-veloped a qualitative ...
Dynamical systems, even simple ones, can be unpredictable. These unpredictable dynamical systems are...
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
Examples of various types of chaos are described in some physical systems: (1) Subshifts of second...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...