Complex Analysis: A Modern First Course in Function TheoryISBN: 9781118705223
280 pages
May 2015

Description
A thorough introduction to the theory of complex functions emphasizing the beauty, power, and counterintuitive nature of the subject
Written with a readerfriendly approach, Complex Analysis: A Modern First Course in Function Theory features a selfcontained, concise development of the fundamental principles of complex analysis. After laying groundwork on complex numbers and the calculus and geometric mapping properties of functions of a complex variable, the author uses power series as a unifying theme to define and study the many rich and occasionally surprising properties of analytic functions, including the Cauchy theory and residue theorem. The book concludes with a treatment of harmonic functions and an epilogue on the Riemann mapping theorem.
Thoroughly classroom tested at multiple universities, Complex Analysis: A Modern First Course in Function Theory features:
 Plentiful exercises, both computational and theoretical, of varying levels of difficulty, including several that could be used for student projects
 Numerous figures to illustrate geometric concepts and constructions used in proofs
 Remarks at the conclusion of each section that place the main concepts in context, compare and contrast results with the calculus of real functions, and provide historical notes
 Appendices on the basics of sets and functions and a handful of useful results from advanced calculus
Table of Contents
Preface ix
1 The Complex Numbers 1
1.1 Why? 1
1.2 The Algebra of Complex Numbers 3
1.3 The Geometry of the Complex Plane 7
1.4 The Topology of the Complex Plane 9
1.5 The Extended Complex Plane 16
1.6 Complex Sequences 18
1.7 Complex Series 24
2 Complex Functions and Mappings 29
2.1 Continuous Functions 29
2.2 Uniform Convergence 34
2.3 Power Series 38
2.4 Elementary Functions and Euler’s Formula 43
2.5 Continuous Functions as Mappings 50
2.6 Linear Fractional Transformations 53
2.7 Derivatives 64
2.8 The Calculus of Real Variable Functions 70
2.9 Contour Integrals 75
3 Analytic Functions 87
3.1 The Principle of Analyticity 87
3.2 Differentiable Functions are Analytic 89
3.3 Consequences of Goursat’s Theorem 100
3.4 The Zeros of Analytic Functions 104
3.5 The Open Mapping Theorem and Maximum Principle 108
3.6 The Cauchy–Riemann Equations 113
3.7 Conformal Mapping and Local Univalence 117
4 Cauchy’s Integral Theory 127
4.1 The Index of a Closed Contour 127
4.2 The Cauchy Integral Formula 133
4.3 Cauchy’s Theorem 139
5 The Residue Theorem 145
5.1 Laurent Series 145
5.2 Classification of Singularities 152
5.3 Residues 158
5.4 Evaluation of Real Integrals 165
5.5 The Laplace Transform 174
6 Harmonic Functions and Fourier Series 183
6.1 Harmonic Functions 183
6.2 The Poisson Integral Formula 191
6.3 Further Connections to Analytic Functions 201
6.4 Fourier Series 210
Epilogue 227
A Sets and Functions 239
B Topics from Advanced Calculus 247
References 255
Index 257