Title
Applied And Computational Complex Analysis Vol 1: Power Series, Integration, Conformal Mapping, Location Of Zeros,Used
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Presents Applications As Well As The Basic Theory Of Analytic Functions Of One Or Several Complex Variables. The First Volume Discusses Applications And Basic Theory Of Conformal Mapping And The Solution Of Algebraic And Transcendental Equations. Volume Two Covers Topics Broadly Connected With Ordinary Differental Equations: Special Functions, Integral Transforms, Asymptotics And Continued Fractions. Volume Three Details Discrete Fourier Analysis, Cauchy Integrals, Construction Of Conformal Maps, Univalent Functions, Potential Theory In The Plane And Polynomial Expansions.
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- Q: How many pages does this book have? A: This book has seven hundred pages. It's a comprehensive volume that covers various aspects of complex analysis.
- Q: What is the binding type of this book? A: The binding type is hardcover. This provides durability and a professional appearance for your bookshelf.
- Q: Who is the author of this book? A: The author is Peter Henrici. He is known for his expertise in applied mathematics and complex analysis.
- Q: What topics are covered in this book? A: The book covers power series, integration, and conformal mapping in applied mathematics. It also includes discussions on potential theory and univalent functions.
- Q: Is this book suitable for beginners? A: Yes, it is accessible to non-specialists. The content is presented at a mathematical level that beginners can understand.
- Q: How is this book structured? A: The book is structured as the first volume of a three-volume series. It builds on concepts introduced in previous volumes.
- Q: What are the main features of this book? A: The main features include an introduction to Cauchy integrals and applications in potential theory. It offers practical methods in complex analysis.
- Q: Does this book include numerical methods? A: Yes, it discusses numerical evaluation of Hilbert transforms and methods for numerical conformal mapping. These topics provide practical applications of theory.
- Q: Can this book help with advanced topics in mathematics? A: Yes, it presents advanced topics like de Branges' proof of the Bieberbach conjecture. This makes it valuable for deeper mathematical study.
- Q: Is this book recommended for academic use? A: Yes, it is highly recommended for academic use. It serves as a valuable resource for students and professionals in applied mathematics.
- Q: What is the ISBN for this book? A: The ISBN is typically available on the publisher's website or in the book itself. It helps you locate this specific edition.
- Q: Is this book part of a series? A: Yes, it is part of a three-volume series on applied and computational complex analysis. Each volume builds on the previous ones.
- Q: What level of mathematics is required to understand this book? A: A basic understanding of complex analysis is recommended. The book is designed to be accessible yet comprehensive.
- Q: Is this book useful for practical applications? A: Yes, it includes practical applications of complex analysis in various fields. This makes it relevant for applied mathematicians.
- Q: What publisher released this book? A: The publisher is Wiley-Blackwell. They are known for publishing high-quality academic and professional texts.