This book offers a captivating exploration of the intersection between mathematics, chaos theory, and dynamical systems through the personal journeys of twelve renowned mathematicians and physicists from China, Europe, Russia, and the USA.
The first section of the book provides an intimate look into the formative experiences and early steps of these scientists. In these life stories, the names of other famous mathematicians arise, crisscrossing all the stories in unexpected ways. The second part of the book explores the practical applications of chaotic attractors in various fields. These include chaos-based encryption in cryptography, sensor and actuator placement in Chua circuits for control systems, and chaotic dynamics in remote sensing for crop modeling. It also highlights the role of chaos theory in the development of memristors following Leon Chua’s 1971 discovery, leading to advances in nonlinear dynamics, hyperchaos, and memristor-based systems. The chapters further examine how chaos theory addresses modern challenges such as modeling COVID-19 spread using SEIR models and optimizing mobile network design, demonstrating the wide-reaching impact of chaotic systems in real-world applications.
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.
This book includes a revised introduction and a new chapter. The remaining chapters were originally published in Journal of Difference Equations and Applications.
Introduction: Dynamical systems: Paths of Twelve Mathematicians and Physicists toward the Chaos and its applications 1. The paths of nine mathematicians to the realm of dynamical systems 2. Two more mathematicians and one physicist tell what motivated their careers and how they began 3. Optimal placement of sensor and actuator for controlling the piecewise linear Chua circuit via a discretized controller 4. Nonlinear dynamics and hyperchaos in a modified memristor-based Chua's circuit and its generalized discrete system 5. Memristor-based Gauss chaotic maps with hidden/self-exited dynamics 6. Enhanced design and hardware implementation of a chaos-based block cipher for image protection 7. On secure communication scheme-based mixed discrete-time hyperchaotic systems 8. On the use of chaotic dynamics for mobile network design and analysis: towards a trace data generator 9. The SEIR Covid-19 model described by fractional-order difference equations: analysis and application with real data in Brazil 10. Chaotic attractors captured from remote sensing time series for the dynamics of cereal crops 11. Nonlinear dynamic and chaos in a remanufacturing duopoly game with heterogeneous players and nonlinear inverse demand functions
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