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An Introduction to Complex Analysis, by O. Carruth McGehee
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Recent decades have seen profound changes in the way we understand complex analysis. This new work presents a much-needed modern treatment of the subject, incorporating the latest developments and providing a rigorous yet accessible introduction to the concepts and proofs of this fundamental branch of mathematics. With its thorough review of the prerequisites and well-balanced mix of theory and practice, this book will appeal both to readers interested in pursuing advanced topics as well as those wishing to explore the many applications of complex analysis to engineering and the physical sciences.
* Reviews the necessary calculus, bringing readers quickly up to speed on the material
* Illustrates the theory, techniques, and reasoning through the use of short proofs and many examples
* Demystifies complex versus real differentiability for functions from the plane to the plane
* Develops Cauchy's Theorem, presenting the powerful and easy-to-use winding-number version
* Contains over 100 sophisticated graphics to provide helpful examples and reinforce important concepts
- Sales Rank: #726285 in Books
- Published on: 2000-09-15
- Ingredients: Example Ingredients
- Original language: English
- Number of items: 1
- Dimensions: 9.53" h x 1.02" w x 6.28" l, 1.60 pounds
- Binding: Hardcover
- 456 pages
Review
“…well written ,very readable…stylish, up-to-date text…” (The Mathematical Gazette, July 2002)
McGehee discusses the basics of complex variables and a few applications to physics in a rigorous and understandable manner. He begins with motivation and the necessary background of the subject in chapter 1. Chapter 2 includes the fundamentals of the algebra, geometry, and calculus of complex numbers. The core topics (Cauchy's theorem and the residue calculus) of complex variable make up chapters 3 and 4. The author then applies the techniques of complex variables to various boundary value problems in chapter 5. A few of the more mathematically challenging results and their proofs are discussed in Chapter 6. McGehee includes more than 520 exercises (many with hints), nearly 100 detailed examples, and Mathematical-generated illustrations on approximately 20 percent of the pages. These features enable readers to deepen their geometric, computational, and theoretical understanding of the material. Upper-division undergraduates through professionals. (CHOICE, April 2001, Vol. 38, No. 8)
A versatile textbook offering all the material, at an appropriate level of treatment, for a first course...in complex analysis but also containing some more avanced material in the final chapter. A useful feature is that each chapter ends with not only a selection of exercises but also a "Hints on selected exercises" section. (Aslib Book Guide, May 2001, Vol 66, No 5)
"...sophisticated approach that stresses the geometry of complex mappings." (Journal of Natural Products American Mathematical Monthly, November 2001)
"...gives a solid introduction to function theory...emphasized by many pictures that help the student a lot to understand better they underlying concepts." (Zentralblatt MATH, Vol. 970, 2001/20)
"...deserves to join the list of classic texts that precede it..." (SIAM Review, Vol. 44, No. 1, March 2002)
"...stylish, up-to-date text...a very welcome addition to the literature." (The Mathematical Gazette, Vol. 86, No. 506, 2002)
From the Back Cover
Recent decades have seen profound changes in the way we understand complex analysis. This new work presents a much-needed modern treatment of the subject, incorporating the latest developments and providing a rigorous yet accessible introduction to the concepts and proofs of this fundamental branch of mathematics. With its thorough review of the prerequisites and well-balanced mix of theory and practice, this book will appeal both to readers interested in pursuing advanced topics as well as those wishing to explore the many applications of complex analysis to engineering and the physical sciences.
* Reviews the necessary calculus, bringing readers quickly up to speed on the material
* Illustrates the theory, techniques, and reasoning through the use of short proofs and many examples
* Demystifies complex versus real differentiability for functions from the plane to the plane
* Develops Cauchy's Theorem, presenting the powerful and easy-to-use winding-number version
* Contains over 100 sophisticated graphics to provide helpful examples and reinforce important concepts
Most helpful customer reviews
7 of 8 people found the following review helpful.
An excellent first course in complex analysis
By lim_bus
This book may seem just another introduction to this subject, oriented to physics or engineering studies, (where Churchill's Complex Variables and Applications and Polya-Latta's Complex Variables stand as models to follow). However, it excells in the mathematical front, offering rich and deep information here and there, but never looking snob. To avoid boredom, I will mention some points I have really appreciated : (1) A link (the missing link, by Felipe Acker) to prove Green's theorem ("Stokes in R^2") WITHOUT the continuity of the (exterior) derivative D_xQ-D_yP of (the 1-form) Pdx+Qdy. Then, you can obtain Goursat's theorem from this improved Green. It is a pity that Acker's proof is left just aside. (2) Dixon's, Czerny's and Runge's proofs of Cauchy's integral formula.(3) The complex inversion formula for the Laplace transform. (4) The use of the Poisson integral to solve Dirichlet problem (and then, I wonder, why not to prove the Riemann mapping theorem following Riemann's way?) (5) Riesz-Fejer proof of Riemann mapping theorem, combining a part of Koebe's constructive proof, and Ascoli-Arzelá theorem "instead of" Montel's one.(6) Caratheodory-Osgood-Taylor extension of Riemann mapping theorem to domains with boundary (very well covered too in Ash-Novinger's Complex Variables: Second Edition). Rewarding and revealing. Good illustrations, good exercices (without soutions, alas!) and a refined bibliography, (binding is gorgeous too). Things to include in a future second edition? more hints and solutions for the exercises and an introductory chapter on entire, meromorphic or Euler functions could add further utility to this book. Anyway, Mcgehee's compares well with some illustrious introductory books, like Levinson-Redheffer's Complex Variables + Solutions Manual, 2 Items, Nehari's jewell Introduction to complex Analysis second edition, or the more extensive Introduction to Complex Analysis (AMS Chelsea Publishing) by Nevalinna and Paatero. It is less wide than the omnipresent and influential Ahlfors' classic (which includes elliptic functions at the 3rd edition and introduces the Riemann surface and uniformization of a holomorphic function) or than Ash-Novinger's (that includes the Prime Number Theorem) but, after getting acquainted with Mcgehee's you can safely try more advanced and comprehensive works, like R.B. Burckel's An Introduction to Classical Complex Analysis, (Volume 1 - Birkhauser, Volume 2 - Ac. Press), Markushevich's Theory of Functions of a Complex Variable, Second Edition (3 vol. set), Remmert's Classical Topics in Complex Function Theory (Graduate Texts in Mathematics) or Einar Hille's two volume treatise Analytic Function Theory, Volume I (AMS Chelsea Publishing), Analytic Function Theory, Volume II (AMS Chelsea Publishing) (v. 2). Finally, let me suggest as further reading Siegel's master work Topics in Complex Function Theory, (three volumes), Interscience, Wiley. Also, a modern view of Riemann-Roch theorem and Abelian integrals is in P. Dolbeault's Analyse complexe (Collection Maitrise de Mathematiques Pures), Masson (1990);ISBN-10: 2225814252.
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