Complex Analysis, 3/e
Complex Analysis, 3/e
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Go to cartISBN: 9789360335274
Bind: Paperback
Year: 2026
Pages: 458
Size: 8.5 x 11 Inch
Publisher: Jones & Bartlett Learning Special Priced Titles
Exclusive Distributors: Viva Books
Sales Territory: Indian Subcontinent
Description:
Complex Analysis is a truly accessible introduction to the fundamental principles and applications of complex analysis. Designed for the undergraduate student with a calculus background but no prior experience with complex analysis, this text discusses the theory of the most relevant mathematical topics in a student-friendly manner. With a clear and straightforward writing style, concepts are introduced through numerous examples, illustrations, and applications. Each section of the text contains an extensive exercise set containing a range of computational, conceptual, and geometric problems. In the text and exercises, students are guided and supported through numerous proofs providing them with a higher Level of mathematical insight and maturity. Each chapter contains a separate section devoted exclusively to the applications of complex analysis to science and engineering, providing students with the opportunity to develop a practical and clear understanding of complex analysis.
Features and Benefits:
- Clarity of exposition supported by numerous examples
- Extensive exercise sets with a mix of computational and conceptual problems
- Applications to science and engineering throughout the text
- New and revised problems and exercise sets throughout
- Portions of the text and examples have been revised or rewritten to help clarify the topics at hand
- The Mathematica syntax from the second edition has been updated to coincide with version 8 of the software.
Target Audience:
This book is helpful for all undergraduates of Mathematics.
Contents:
Preface
Chapter 1. Complex Numbers and the Complex Plane • Complex Numbers and Their Properties • Complex Plane • Polar Form of Complex Numbers • Powers and Roots • Sets of Points in the Complex Plane • Applications • Chapter 1 Review Quiz
Chapter 2. Complex Functions and Mappings • Complex Functions • Complex Functions as Mappings • Linear Mappings • Special Power Functions • The Power Function zn • The Power Function z1/n • Reciprocal Function • Applications • Chapter 2 Review Quiz
Chapter 3. Analytic Functions • Limits and Continuity • Limits • Continuity • Differentiability and Analyticity • Cauchy-Riemann Equations • Harmonic Functions • Applications • Chapter 3 Review Quiz
Chapter 4. Elementary Functions • Exponential and Logarithmic Functions • Complex Exponential Function • Complex Logarithmic Function • Complex Powers • Trigonometric and Hyperbolic Functions • Complex Trigonometric Functions • Complex Hyperbolic Functions • Inverse Trigonometric and Hyperbolic Functions • Applications • Chapter 4 Review Quiz
Chapter 5. Integration in the Complex Plane • Real Integrals • Complex Integrals • Cauchy-Goursat Theorem • Independence of Path • Cauchy’s Integral Formulas and Their Consequences • Cauchy’s Two Integral Formulas • Some Consequences of the Integral Formulas • Applications • Chapter 5 Review Quiz
Chapter 6. Series and Residues • Sequences and Series • Taylor Series • Laurent Series • Zeros and Poles • Residues and Residue Theorem • Some Consequences of the Residue Theorem • Evaluation of Real Trigonometric Integrals • Evaluation of Real Improper Integrals • Integration along a Branch Cut • The Argument Principle and Rouche’s Theorem • Summing Infinite Series • Applications • Chapter 6 Review Quiz
Chapter 7. Conformal Mappings • Conformal Mapping • Linear Fractional Transformations • Schwarz-Christoffel Transformations • Poisson Integral Formulas • Applications • Boundary-Value Problems • Fluid Flow • Chapter 7 Review Quiz
Appendixes:
I Proof of Theorem 3.1.1 APP- 1
II Proof of the Cauchy-Goursat Theorem APP- 3
III Table of Conformal Mappings APP- 7
Answers to Selected Odd-Numbered Problems ANS- 1
Symbol Index IND- 1
Word Index IND- 5
About the Authors:
Dennis G. Zill - Loyola Marymount University
Dennis Zill received a PhD in Applied Mathematics from Iowa State University, and is a former professor of Mathematics at Loyola Marymount University in Los Angeles, Loras College in Iowa, and California Polytechnic State University. He is also the former chair of the Mathematics department at Loyola Marymount University, where he currently holds a rank as Professor Emeritus of Mathematics. Zill holds interests in astronomy, modern literature, music, golf, and good wine, while his research interests include Special Functions, Differential Equations, Integral Transformations, and Complex Analysis.
Patrick D. Shanahan - Loyola Marymount University
Patrick Shanahan received his Ph.D. from the University of California, Santa Barbara, 1996; his M.A. from the University of California, Santa Barbara, 1992; and his B.A. from California State University, Long Beach, 1990. Currently Patrick’s research interests include Geometric topology, knot theory, hyperbolic geometry, and representation theory.
