This book makes available a comprehensive, detailed, and organized treatment of the foundations of the theory of iteration of rational functions of a complex variable. The material covered extends from the original memoirs of Fatou and Julia to the recent and important results and methods of Sullivan and Shishikura. Many of the details of the proofs have not occurred in print before. The theory of of dynamical systems and chaos has recently undergone a rapid growth in popularity, in part due to the spectacular computer graphics of Julia sets, fractals, and the Mandelbrot set. This text focuses on the specialized area of complex analytic dynamics, a subject that dates back to 1916 and is currently a very active area in mathematics.
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Editorial Reviews
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A.F. Beardon
Iteration of Rational Functions
Complex Analytic Dynamical Systems
"This book makes available a comprehensive, detailed, and organized treatment of the foundations of the theory of iteration of rational functions of a complex variable. The material covered extends from the original memoirs of Fatou and Julia to the recent and important results and methods of Sullivan and Shishikura. Many of the details of the proofs have not occurred in print before."—ZENTRALBLATT MATH
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8 of 9 people found the following review helpful:
5.0 out of 5 stars
Pictures and math.,
By Palle E T Jorgensen "Palle Jorgensen" (Iowa City, Iowa United States) - See all my reviews (VINE VOICE) (REAL NAME)
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This review is from: Iteration of Rational Functions: Complex Analytic Dynamical Systems (Graduate Texts in Mathematics) (Hardcover)
Many people outside mathematics know of Julia sets, Mandelbrot sets, attractors, chaos, and fractals. They might have encountered them in color renditions as moving pictures that serve as computer screen savers. The book is about the underlying mathematics.The rational functions (i.e., quotients of polynomials) form a relatively simple class of functions of a single complex variable. One of the operations we do on functions f is substitution: Starting with a complex number z (i.e., a point in the plane), repeated application of f yields a sequence of complex numbers (points), z, f(z), f(f(z)), etc. The resulting sets have a surprisingly rich structure, and they serve as models for dynamics that arises in different subjects. They are the subject of this book. I will let the reader discover the precise definitions in the book: The sets are defined from some basic geometric and analytic properties of these sequences. The set of points z where the sequence has one of two exclusive analytic properties divides the plane into two parts, an `inside' and an `outside', if you like. Well, the mathematical definition is more complicated than that, but the idea is roughly as I said. The French mathematician Gaston Julia (1893-1978) was the first to make precise the sets that we now know from a host of fun computer experiments. And it is interesting that Julia invented the sets in 1919 without the benefit of computer programs. Indeed the subject stayed in the background in the mathematical fashions until it became possible to easily visualize the possibilities with simple computer experiments. As a result, the interest in Julia's work had a more renaissance, and its connections to exciting properties in non-linear dynamics turned into an exciting subject in pure and applied mathematics. This beautifully written book is primarily about the mathematical side of the subject, but it is full of hands-on-examples that illustrate the theory, and that are easy to follow for students. The exercises are lovely, and make the book eminently attractive for the teaching of the subject to students who will need very little more in the way of background than a familiarity with the complex numbers. Palle Jorgensen, October 2004.
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First Sentence:
This book is about the repeated application, or iteration, of a rational function, of a complex variable z. Read the first page Key Phrases - Statistically Improbable Phrases (SIPs): (learn more)
forward invariant component, rationally indifferent fixed point, rationally indifferent cycle, two completely invariant components, smooth covering map, indifferent cycles, indifferent fixed points, regular subdomains, infinite connectivity, attracting fixed point, wandering domain, repelling fixed point, finite critical point, backward invariant, attracting cycle, repelling cycles, complex dilatation, rational map, complete invariance, immediate basin, complex sphere, infinitely connected, parabolic component, universal covering surface, periodic points Key Phrases - Capitalized Phrases (CAPs): (learn more)
Chain Rule, Petal Theorem, Vitali's Theorem, Sullivan's Theorem, Monodromy Theorem, Hurwitz's Theorem, New York, Schwarz's Lemma, The Beauty of Fractals, Applying Theorem New!
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Front Cover | Table of Contents | First Pages | Index | Back Cover | Surprise Me!
This book is about the repeated application, or iteration, of a rational function, of a complex variable z. Read the first page Key Phrases - Statistically Improbable Phrases (SIPs): (learn more)
forward invariant component, rationally indifferent fixed point, rationally indifferent cycle, two completely invariant components, smooth covering map, indifferent cycles, indifferent fixed points, regular subdomains, infinite connectivity, attracting fixed point, wandering domain, repelling fixed point, finite critical point, backward invariant, attracting cycle, repelling cycles, complex dilatation, rational map, complete invariance, immediate basin, complex sphere, infinitely connected, parabolic component, universal covering surface, periodic points Key Phrases - Capitalized Phrases (CAPs): (learn more)
Chain Rule, Petal Theorem, Vitali's Theorem, Sullivan's Theorem, Monodromy Theorem, Hurwitz's Theorem, New York, Schwarz's Lemma, The Beauty of Fractals, Applying Theorem New!
Books on Related Topics | Concordance | Text Stats Browse Sample Pages:
Front Cover | Table of Contents | First Pages | Index | Back Cover | Surprise Me!
Citations (learn more)
This book cites 100
books:
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2
books
cite this book:
- Cyclotomic Fields (Graduate Texts in Mathematics) by S. Lang in Front Matter, and Back Matter
- Elliptic Curves: Diophantine Analysis (Grundlehren der mathematischen Wissenschaften) by S. Lang in Back Matter (1), and Back Matter (2)
- An Introduction to Algebraic Topology (Graduate Texts in Mathematics) by Joseph J. Rotman in Back Matter (1), and Back Matter (2)
- The Geometry of Discrete Groups (Graduate Texts in Mathematics) (v. 91) by Alan F. Beardon in Back Matter (1), and Back Matter (2)
- Algebraic Number Theory (Graduate Texts in Mathematics) by Serge Lang in Back Matter (1), and Back Matter (2)
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- Trading Chaos: Maximize Profits with Proven Technical Techniques (A Marketplace Book) by Justine Gregory-Williams in Back Matter
- Wavelets, Multiscale Systems and Hypercomplex Analysis (Operator Theory: Advances and Applications) by Daniel Alpay on page 123
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