Complex Analysis

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This unusual and lively textbook offers a clear and intuitive approach to the classical and beautiful theory of complex variables. With very little dependence on advanced concepts from several-variable calculus and topology, the text focuses on the authentic complex-variable ideas and techniques. Notable additions to "Complex Analysis, Third Edition," include: • The solution of the cubic equation and Newton’s method for approximating the zeroes of any polynomial; • Expanded treatments of the Schwarz reflection principle and of the mapping properties of analytic functions on closed domains; • An introduction to Schwarz-Christoffel transformations and to Dirichlet series; • A streamlined proof of the prime number theorem, and more. Accessible to students at their early stages of mathematical study, this full first year course in complex analysis offers new and interesting motivations for classical results and introduces related topics stressing motivation and technique. Numerous illustrations, examples, and now 300 exercises, enrich the text. Students who master this textbook will emerge with an excellent grounding in complex analysis, and a solid understanding of its wide applicability.

Author(s): Joseph Bak, Donald J. Newman (auth.)
Series: Undergraduate Texts in Mathematics 0
Edition: 3
Publisher: Springer-Verlag New York
Year: 2010

Language: English
Pages: 328
Tags: Analysis

Front Matter....Pages 1-12
The Complex Numbers....Pages 1-20
Functions of the Complex Variable z....Pages 21-34
Analytic Functions....Pages 35-43
Line Integrals and Entire Functions....Pages 45-57
Properties of Entire Functions....Pages 59-75
Properties of Analytic Functions....Pages 77-91
Further Properties of Analytic Functions....Pages 93-105
Simply Connected Domains....Pages 107-116
Isolated Singularities of an Analytic Function....Pages 117-128
The Residue Theorem....Pages 129-142
Applications of the Residue Theorem to the Evaluation of Integrals and Sums....Pages 143-160
Further Contour Integral Techniques....Pages 161-168
Introduction to Conformal Mapping....Pages 169-194
The Riemann Mapping Theorem....Pages 195-214
Maximum-Modulus Theorems for Unbounded Domains....Pages 215-223
Harmonic Functions....Pages 225-239
Different Forms of Analytic Functions....Pages 241-256
Analytic Continuation; The Gamma and Zeta Functions....Pages 257-272
Applications to Other Areas of Mathematics....Pages 273-290
Back Matter....Pages 291-328