Complex Variables and Applications
By: James Ward Brown and others
Contributor(s): BROWN (James Ward) | CHURCHILL (Ruel V)Material type: 
TextPublisher: Chennai McGraw Hill Education India Private Limited 2022Edition: 9Description: xvi,461 p. PB 22.5x15 cmISBN: 9789354600364Subject(s): Functions of Complex VariablesDDC classification: 519.5 Summary: A thoroughly revised Complex Variables and Applications, in its Ninth Edition, still preserves the basic content and style of the earlier editions and continues to be a popular textbook on introductory course in the theory and application of functions of a complex variable. The text is designed to develop those parts of the theory that are prominent in applications of the subject and also to furnish an introduction to applications of residues and conformal mapping. To accommodate the different calculus backgrounds of students, footnotes are given with references to other texts that contain proofs and discussions of the more delicate results from calculus and advanced calculus. Improvements in the text
include extended explanations of theorems, greater detail in arguments, many new examples and the separation of topics into their own sections.
Key Features
• The treatment of the extended form of the Cauchy integral formula for derivatives has been completely rewritten, with special attention to its immediate consequences.
• Improvements include more details in arguments involving mathematical induction, greater emphasis on rules for using complex exponents, some discussion of residues at infinity, and a clearer exposition of real improper integrals and their Cauchy principal values.
• Important material is presented in a more focused way by placing it in separate sections. For instance, the discussion of upper bounds of moduli of contour integrals is now entirely in one section, and there is a separate section devoted to the definition of isolated singular points.
TABLE OF CONTANTS
Chapter 1. Complex Numbers
Chapter 2. Analytic Functions
Chapter 3. Elementary Functions
Chapter 4. Integrals
Chapter 5. Series
Chapter 6. Residues and Poles
Chapter 7. Applications of Residues
Chapter 8. Mapping by Elementary Functions
Chapter 9. Conformal Mapping
Chapter 10. Applications of Conformed Mapping
Chapter 11. The Schwarz-Christoffel Transformation
Chapter 12. Integral Formulas of the Poisson Type
Appendixes
| Item type | Current location | Collection | Call number | Status | Date due | Barcode | Item holds |
|---|---|---|---|---|---|---|---|
Book
|
St Aloysius College (Autonomous) | Mathematics | 519.5 BROC (Browse shelf) | Available | 076345 |
A thoroughly revised Complex Variables and Applications, in its Ninth Edition, still preserves the basic content and style of the earlier editions and continues to be a popular textbook on introductory course in the theory and application of functions of a complex variable. The text is designed to develop those parts of the theory that are prominent in applications of the subject and also to furnish an introduction to applications of residues and conformal mapping. To accommodate the different calculus backgrounds of students, footnotes are given with references to other texts that contain proofs and discussions of the more delicate results from calculus and advanced calculus. Improvements in the text
include extended explanations of theorems, greater detail in arguments, many new examples and the separation of topics into their own sections.
Key Features
• The treatment of the extended form of the Cauchy integral formula for derivatives has been completely rewritten, with special attention to its immediate consequences.
• Improvements include more details in arguments involving mathematical induction, greater emphasis on rules for using complex exponents, some discussion of residues at infinity, and a clearer exposition of real improper integrals and their Cauchy principal values.
• Important material is presented in a more focused way by placing it in separate sections. For instance, the discussion of upper bounds of moduli of contour integrals is now entirely in one section, and there is a separate section devoted to the definition of isolated singular points.
TABLE OF CONTANTS
Chapter 1. Complex Numbers
Chapter 2. Analytic Functions
Chapter 3. Elementary Functions
Chapter 4. Integrals
Chapter 5. Series
Chapter 6. Residues and Poles
Chapter 7. Applications of Residues
Chapter 8. Mapping by Elementary Functions
Chapter 9. Conformal Mapping
Chapter 10. Applications of Conformed Mapping
Chapter 11. The Schwarz-Christoffel Transformation
Chapter 12. Integral Formulas of the Poisson Type
Appendixes
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