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Basic complex dynamics
A computational approach
Mark McClure
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Front Matter
Preface
1
Introduction
Images of complex dynamics
Surprise in Newton's method
Exercises
2
The basics of real iteration
Basic notions
Experimentation
Graphical analysis
The classification of fixed points
Classification of periodic orbits
Parametrized families of functions
A closer look at the bifurcation diagram
The doubling map and chaos
Conjugacy
Tent maps and Cantor sets
A few notes on computation
Exercises
3
The complex quadratic family
An illustrative example
The filled Julia set
An algorithm for the filled Julia set
Another look at conjugacy
The critical orbit
The Mandelbrot set
The components of the Mandelbrot set
Exercises
4
The iteration of complex polynomials
A general escape time algorithm
Critical orbits for polynomials
The cubic bifurcation locus
Exercises
5
Local theory of periodic orbits
Linearization near an attractive fixed point
Linearization near a repelling fixed point
Conjugation near a super-attractive fixed point
Neutral points
Infinity as a super-attractive fixed point
Exercises
Authored in PreTeXt
Basic complex dynamics
A computational approach
Mark McClure
Department of Mathematics
University of North Carolina at Asheville
mcmcclur@unca.edu
April 3, 2019
Preface
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