
A standard source of information of functions of one complex variable, this text has retained its wide popularity in this field by being consistently rigorous without becoming needlessly concerned with advanced or overspecialized material. Difficult points have been clarified, the book has been reviewed for accuracy, and notations and terminology have been modernized. Chapter 2, Complex Functions, features a brief section on the change of length and area under conformal mapping, and much of Chapter 8, Global-Analytic Functions, has been rewritten in order to introduce readers to the terminology of germs and sheaves while still emphasizing that classical concepts are the backbone of the theory. Chapter 4, Complex Integration, now includes a new and simpler proof of the general form of Cauchy's theorem. There is a short section on the Riemann zeta function, showing the use of residues in a more exciting situation than in the computation of definite integrals.
This text serves as a foundational investigation into the theory of functions of one complex variable. Lars Valerian Ahlfors, a Fields Medalist and renowned mathematician, provides a rigorous yet accessible framework for understanding complex analysis. The book synthesizes classical mathematical concepts with modernized terminology to ensure clarity for students and researchers alike.
What You Will Find
Scope Limits
Experts and educators widely recognize this work as a standard, authoritative text for graduate-level mathematics. Readers frequently note the rigorous nature of the prose, which remains a primary resource for those seeking a deep understanding of classical complex analysis.
Page Count:
336
Publication Date:
1979-01-01
Publisher:
McGraw-Hill Education
ISBN-10:
0070006571
ISBN-13:
9780070006577
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