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Quasiconformal surgery in holomorphic dynamics / Bodil Branner and Nuria Fagella ; with contributions by Xavier Buff & Christian Henriksen, Shaun Bullett, Adam L. Epstein & Michael Yampolsky, Peter Hayssinsky, Carsten L. Petersen and Kevin M. Pilgrim & Tan Lei.

By: Branner, Bodil [author.].
Contributor(s): Fagella, Nuria [author.].
Material type: TextTextSeries: Cambridge studies in advanced mathematics ;v 141.Publisher: UK Cambridge University Press c2014Description: xvii, 413 pages : UKP 65.00 illustrations (some color) ; 24 cm.ISBN: 9781107042919 (hardback).Subject(s): Holomorphic mappings | Differentiable dynamical systems | Kleinian groups | MATHEMATICS / Mathematical AnalysisDDC classification: 515/.98 Other classification: MAT034000 Online resources: Cover image
Contents:
Machine generated contents note: Preface; Introduction; 1. Quasiconformal geometry; 2. Extensions and interpolations; 3. Preliminaries on dynamical systems and actions of Kleinian groups; 4. Introduction to surgery and first occurrences; 5. General principles of surgery; 6. Soft surgeries with a contribution by X. Buff and C. Henriksen; 7. Cut and paste surgeries with contributions by K. M. Pilgrim, Tan Lei and S. Bullett; 8. Cut and paste surgeries with sectors with a contribution by A. L. Epstein and M. Yampolsky; 9. Trans-quasiconformal surgery with contributions by C. L. Petersen and P. Hai;ssinsky; Bibliography; Symbol index; Index.
Summary: "Since its introduction in the early 1980s quasiconformal surgery has become a major tool in the development of the theory of holomorphic dynamics, and it is essential background knowledge for any researcher in the field. In this comprehensive introduction the authors begin with the foundations and a general description of surgery techniques before turning their attention to a wide variety of applications. They demonstrate the different types of surgeries that lie behind many important results in holomorphic dynamics, dealing in particular with Julia sets and the Mandelbrot set. Two of these surgeries go beyond the classical realm of quasiconformal surgery and use trans-quasiconformal surgery. Another deals with holomorphic correspondences, a natural generalization of holomorphic maps. The book is ideal for graduate students and researchers requiring a self-contained text including a variety of applications. It particularly emphasises the geometrical ideas behind the proofs, with many helpful illustrations seldom found in the literature"--

Includes bibliographical references (pages 400-407) and index.

Machine generated contents note: Preface; Introduction; 1. Quasiconformal geometry; 2. Extensions and interpolations; 3. Preliminaries on dynamical systems and actions of Kleinian groups; 4. Introduction to surgery and first occurrences; 5. General principles of surgery; 6. Soft surgeries with a contribution by X. Buff and C. Henriksen; 7. Cut and paste surgeries with contributions by K. M. Pilgrim, Tan Lei and S. Bullett; 8. Cut and paste surgeries with sectors with a contribution by A. L. Epstein and M. Yampolsky; 9. Trans-quasiconformal surgery with contributions by C. L. Petersen and P. Hai;ssinsky; Bibliography; Symbol index; Index.

"Since its introduction in the early 1980s quasiconformal surgery has become a major tool in the development of the theory of holomorphic dynamics, and it is essential background knowledge for any researcher in the field. In this comprehensive introduction the authors begin with the foundations and a general description of surgery techniques before turning their attention to a wide variety of applications. They demonstrate the different types of surgeries that lie behind many important results in holomorphic dynamics, dealing in particular with Julia sets and the Mandelbrot set. Two of these surgeries go beyond the classical realm of quasiconformal surgery and use trans-quasiconformal surgery. Another deals with holomorphic correspondences, a natural generalization of holomorphic maps. The book is ideal for graduate students and researchers requiring a self-contained text including a variety of applications. It particularly emphasises the geometrical ideas behind the proofs, with many helpful illustrations seldom found in the literature"--