Dynamical Systems: Stability, Symbolic Dynamics, And Chaos (Studies In Advanced Mathematics)-used

Dynamical Systems: Stability, Symbolic Dynamics, And Chaos (Studies In Advanced Mathematics)-used

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This New Text/Reference Treats Dynamical Systems From A Mathematical Perspective, Centering On Multidimensional Systems Of Real Variables. Background Material Is Carefully Reviewed As It Is Used Throughout The Book, And Ideas Are Introduced Through Examples. Numerous Exercises Help The Reader Understand Presented Theorems And Master The Techniques Of The Proofs And Topic Under Consideration.The Book Treats The Dynamics Of Both Iteration Of Functions And Solutions Of Ordinary Differential Equations. Many Concepts Are First Introduced For Iteration Of Functions Where The Geometry Is Simpler, But Results Are Interpreted For Differential Equations. A Proof Of The Existence And Continuity Of Solutions With Respect To Initial Conditions Is Included. Explicit Formulas For The Various Bifurcations Are Included, And A Treatment Of The H

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Frequently Asked Questions

  • Q: What is the main focus of 'Dynamical Systems: Stability, Symbolic Dynamics, and Chaos'? A: The book focuses on dynamical systems from a mathematical perspective, particularly multidimensional systems of real variables, including the dynamics of function iterations and ordinary differential equations.
  • Q: Who is the author of this book? A: The author of the book is Clark Robinson.
  • Q: What type of binding does this book have? A: This book is available in hardcover binding.
  • Q: How many pages are in 'Dynamical Systems: Stability, Symbolic Dynamics, and Chaos'? A: The book contains a total of 480 pages.
  • Q: When was this book published? A: The book was published on December 22, 1994.
  • Q: What topics are covered in the book? A: The book covers topics such as the existence and continuity of solutions, bifurcations, the Hénon map, and the Melnikov method, among others.
  • Q: Is this book suitable for beginners in dynamical systems? A: The book provides careful reviews of background material and introduces concepts through examples, making it suitable for readers with a foundational understanding of mathematics.
  • Q: Does this book include exercises for practice? A: Yes, the book includes numerous exercises that help readers understand theorems and master proof techniques.
  • Q: What condition is the book in? A: The book is listed as being in 'Good' condition.
  • Q: What category does this book fall under? A: The book is categorized under Differential Equations.