This book presents some exceptional developments in chaotic attractor theory encompassing several new directions of research such as three-dimensional axiom A-diffeomorphisms, Shilnikov attractors, dendrites and finite graphs.
The theory of chaotic attractors has experienced exceptional development over the last fifty years since the revelation of chaos in mathematics (invented by James Yorke) and symbolized by the butterfly effect. Relevant new results have been collected in this book, including:
- Some remarks on minimal sets on dendrites and finite graphs and the study of recurrence and nonwandering sets of local dendrite maps.
- Ramified continua as global attractors of C1- smooth self-maps of a cylinder close to skew products
- Chaotic behaviour of countable products of homeomorphism groups and dynamics of three-dimensional axiom A-diffeomorphisms with two-dimensional attractors and repellers.
- The search for invariant sets of the generalized tent map and quasi-hyperbolic regime in a certain family of 2-D piecewise linear map.
- Shilnikov attractors of three-dimensional flows and maps, right fractional calculus to inverse-time chaotic maps and asymptotic stability analysis and diffeomorphisms with infinitely many Smale horseshoes.
The theory of chaotic attractor is also used as a core for evolutionary algorithms and metaheuristic optimizers in this volume.
This book will be of great value to students and researchers in mathematics, physics, engineering, and related disciplines seeking to deepen their understanding of chaotic dynamical systems and their applications.
The chapters in this book were originally published in Journal of Difference Equations and Applications.
This book presents some exceptional developments in chaotic attractor theory encompassing several new directions of research such as three-dimensional axiom A-diffeomorphisms, Shilnikov attractors, dendrites and finite graphs. The chapters in this book were originally published in Journal of Difference Equations and Applications.
Introduction: Recent Improvements in the Theory of Chaotic Attractors
1.
On the quasi-hyperbolic regime in a certain family of 2-D piecewise linear
maps
2. Right fractional calculus to inverse-time chaotic maps and asymptotic
stability analysis
3. Search for invariant sets of the generalized tent map
4. On Shilnikov attractors of three-dimensional flows and maps
5. Chaotic
attractors of discrete dynamical systems used in the core of evolutionary
algorithms: state of art and perspectives
6. Chaos in popular metaheuristic
optimizers a bibliographic analysis
7. Ramified continua as global
attractors of C1-smooth self-maps of a cylinder close to skew products
8.
Dynamics of three-dimensional A-diffeomorphisms with two-dimensional
attractors and repellers
9. Chaotic behaviour of countable products of
homeomorphism groups
10. Remarks on minimal sets on dendrites and finite
graphs
11. Recurrence and nonwandering sets of local dendrite maps
12.
Diffeomorphisms with infinitely many Smale horseshoes
René Lozi is Emeritus Professor at University Cote dAzur, France and Vice-President of the International Society of Difference Equations. His research areas include complexity and emergence theory, dynamical systems, bifurcations, control of chaos, cryptography based on chaos, and memristors
Lyudmila Efremova is Professor at Nizhny Novgorod State University and Moscow Institute of Physics and Technology, Russia. Her scientific interests include regular and chaotic properties of low-dimensional discrete dynamical systems.
Michal Pluhįek is Associate Professor at Tomas Bata University in Zlin. His research focus includes theory and applications of evolutionary computation, swarm intelligence, swarm robotics, and artificial intelligence in general.
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