The Real Fatou Conjecture. (AM-144), Volume 144 /

The Real Fatou Conjecture. (AM-144), Volume 144 / / Grzegorz Swiatek, Jacek Graczyk.

In 1920, Pierre Fatou expressed the conjecture that--except for special cases--all critical points of a rational map of the Riemann sphere tend to periodic orbits under iteration. This conjecture remains the main open problem in the dynamics of iterated maps. For the logistic family x- ax(1-x), it c...

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Superior document:Title is part of eBook package: De Gruyter Princeton Annals of Mathematics eBook-Package 1940-2020
VerfasserIn:
Graczyk, Jacek,
Swiatek, Grzegorz,
Place / Publishing House:Princeton, NJ : : Princeton University Press, , [2014]
©1999
Year of Publication:2014
Language:English
Series:Annals of Mathematics Studies ; 144
Online Access:
Physical Description:1 online resource (148 p.) :; 8 illus.
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245 1 4 |a The Real Fatou Conjecture. (AM-144), Volume 144 /  |c Grzegorz Swiatek, Jacek Graczyk. 
264 1 |a Princeton, NJ :   |b Princeton University Press,   |c [2014] 
264 4 |c ©1999 
300 |a 1 online resource (148 p.) :  |b 8 illus. 
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490 0 |a Annals of Mathematics Studies ;  |v 144 
505 0 0 |t Frontmatter --   |t Contents --   |t Chapter 1. Review of Concepts --   |t Chapter 2. Quasiconformal Gluing --   |t Chapter 3. Polynomial-Like Property --   |t Chapter 4. Linear Growth of Moduli --   |t Chapter 5. Quasi conformal Techniques --   |t Bibliography --   |t Index 
506 0 |a restricted access  |u http://purl.org/coar/access_right/c_16ec  |f online access with authorization  |2 star 
520 |a In 1920, Pierre Fatou expressed the conjecture that--except for special cases--all critical points of a rational map of the Riemann sphere tend to periodic orbits under iteration. This conjecture remains the main open problem in the dynamics of iterated maps. For the logistic family x- ax(1-x), it can be interpreted to mean that for a dense set of parameters "a," an attracting periodic orbit exists. The same question appears naturally in science, where the logistic family is used to construct models in physics, ecology, and economics. In this book, Jacek Graczyk and Grzegorz Swiatek provide a rigorous proof of the Real Fatou Conjecture. In spite of the apparently elementary nature of the problem, its solution requires advanced tools of complex analysis. The authors have written a self-contained and complete version of the argument, accessible to someone with no knowledge of complex dynamics and only basic familiarity with interval maps. The book will thus be useful to specialists in real dynamics as well as to graduate students. 
530 |a Issued also in print. 
538 |a Mode of access: Internet via World Wide Web. 
546 |a In English. 
588 0 |a Description based on online resource; title from PDF title page (publisher's Web site, viewed 31. Jan 2022) 
650 7 |a MATHEMATICS / Geometry / Non-Euclidean.  |2 bisacsh 
653 |a Absolute value. 
653 |a Affine transformation. 
653 |a Algebraic function. 
653 |a Analytic continuation. 
653 |a Analytic function. 
653 |a Arithmetic. 
653 |a Automorphism. 
653 |a Big O notation. 
653 |a Bounded set (topological vector space). 
653 |a C0. 
653 |a Calculation. 
653 |a Canonical map. 
653 |a Change of variables. 
653 |a Chebyshev polynomials. 
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653 |a Complex quadratic polynomial. 
653 |a Conformal map. 
653 |a Conjecture. 
653 |a Conjugacy class. 
653 |a Conjugate points. 
653 |a Connected component (graph theory). 
653 |a Connected space. 
653 |a Continuous function. 
653 |a Corollary. 
653 |a Covering space. 
653 |a Critical point (mathematics). 
653 |a Dense set. 
653 |a Derivative. 
653 |a Diffeomorphism. 
653 |a Dimension. 
653 |a Disjoint sets. 
653 |a Disjoint union. 
653 |a Disk (mathematics). 
653 |a Equicontinuity. 
653 |a Estimation. 
653 |a Existential quantification. 
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653 |a Generalization. 
653 |a Great-circle distance. 
653 |a Hausdorff distance. 
653 |a Holomorphic function. 
653 |a Homeomorphism. 
653 |a Homotopy. 
653 |a Hyperbolic function. 
653 |a Imaginary number. 
653 |a Implicit function theorem. 
653 |a Injective function. 
653 |a Integer. 
653 |a Intermediate value theorem. 
653 |a Interval (mathematics). 
653 |a Inverse function. 
653 |a Irreducible polynomial. 
653 |a Iteration. 
653 |a Jordan curve theorem. 
653 |a Julia set. 
653 |a Limit of a sequence. 
653 |a Linear map. 
653 |a Local diffeomorphism. 
653 |a Mathematical induction. 
653 |a Mathematical proof. 
653 |a Maxima and minima. 
653 |a Meromorphic function. 
653 |a Moduli (physics). 
653 |a Monomial. 
653 |a Monotonic function. 
653 |a Natural number. 
653 |a Neighbourhood (mathematics). 
653 |a Open set. 
653 |a Parameter. 
653 |a Periodic function. 
653 |a Periodic point. 
653 |a Phase space. 
653 |a Point at infinity. 
653 |a Polynomial. 
653 |a Projection (mathematics). 
653 |a Quadratic function. 
653 |a Quadratic. 
653 |a Quasiconformal mapping. 
653 |a Renormalization. 
653 |a Riemann sphere. 
653 |a Riemann surface. 
653 |a Schwarzian derivative. 
653 |a Scientific notation. 
653 |a Subsequence. 
653 |a Theorem. 
653 |a Theory. 
653 |a Topological conjugacy. 
653 |a Topological entropy. 
653 |a Topology. 
653 |a Union (set theory). 
653 |a Unit circle. 
653 |a Unit disk. 
653 |a Upper and lower bounds. 
653 |a Upper half-plane. 
653 |a Z0. 
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