This is a textbook for an introductory course in complex analysis. It has been used for our undergraduate complex analysis course here at Georgia Tech and at a few other places that I know of.
I owe a special debt of gratitude to Professor Matthias Beck who used the book in his class at SUNY Binghamton and found many errors and made many good suggestions for changes and additions to the book. I thank him very much.
Many thanks also to Professor Serban Raianu of California State University Dominguez Hills whose many helpful suggestions have considerably improved the book.
I am also grateful to Professor Pawel Hitczenko of Drexel University, who prepared the nice supplement to Chapter 10 on applications of the Residue Theorem to real integration.The notes are available as Adobe Acrobat documents. If you do not have an Adobe Acrobat Reader, you may down-load a copy, free of charge, from Adobe.
Title page and Table of Contents
Chapter One - Complex Numbers
1.1 Introduction
1.2 Geometry
1.3 Polar coordinates
Chapter Two - Complex Functions
2.1 Functions of a real variable
2.2 Functions of a complex variable
2.3 Derivatives
Chapter Three - Elementary Functions
3.1 Introduction
3.2 The exponential function
3.3 Trigonometric functions
3.4 Logarithms and complex exponents
Chapter Four - Integration
4.1 Introduction
4.2 Evaluating integrals
4.3 Antiderivative
Chapter Five - Cauchy's Theorem
5.1 Homotopy
5.2 Cauchy's Theorem
Chapter Six - More Integration
6.1 Cauchy's Integral Formula
6.2 Functions defined by integrals
6.3 Liouville's Theorem
6.4 Maximum moduli
Chapter Seven - Harmonic Functions
7.1 The Laplace equation
7.2 Harmonic functions
7.3 Poisson's integral formula
Chapter Eight - Series
8.1 Sequences
8.2 Series
8.3 Power series
8.4 Integration of power series
8.5 Differentiation of power series
Chapter Nine - Taylor and Laurent Series
9.1 Taylor series
9.2 Laurent series
Chapter Ten - Poles, Residues, and All That
10.1 Residues
10.2 Poles and other singularities
Applications of the Residue Theorem to Real Integrals-Supplementary Material by Pawel Hitczenko
Chapter Eleven - Argument Principle
11.1 Argument principle
11.2 Rouche's Theorem