复分析·第4版(英文版)
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内容提要:
The present book is meant as a text for a course on complex analysis at the advanced undergraduate level, or first-year graduate level. The first half, more or less, can be used for a one-semester course addressed to undergraduates. The second half can be used for a second semester, at either level. Somewhat more material has been included than can be covered at leisure in one or two terms, to give opportunities for the instructor to exercise individual taste, and to lead the course in whatever directions strikes the instructor's fancy at the time as well as extra reading material for students on their own. A large number of routine exercises are included for the more standard portions, and a few harder exercises of striking theoretical interest are also included, but may be omitted in courses addressed to less advanced students.
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编辑推荐:
The present book is meant as a text for a course on complex analysis at the advanced undergraduate level, or first-year graduate level. The first half, more or less, can be used for a one-semester course addressed to undergraduates. The second half can be used for a second semester, at either level. Somewhat more material has been included than can be covered at leisure in one or two terms, to give opportunities for the instructor to exercise individual taste, and to lead the course in whatever directions strikes the instructor's fancy at the time as well as extra reading material for students on their own. A large number of routine exercises are included for the more standard portions, and a few harder exercises of striking theoretical interest are also included, but may be omitted in courses addressed to less advanced students.
此书为英文版! 目录:
Foreword
Prerequisites PART ONE Basic Theory CHAPTER Ⅰ Complex Numbers and Functions 1. Definition 2. Polar Form 3. Complex Valued Functions 4. Limits and Compact Sets 5. Complex Differentiability 6. The Cauchy-Riemann Equations 7. Angles Under Holomorphic Maps CHAPTER Ⅱ Power Series 1. Formal Power Series 2. Convergent Power Series 3. Relations Between Formal and Convergent Series 4. Analytic Functions 5. Differentiation of Power Series 6. The Inverse and Open Mapping Theorems 7. The Local Maximum Modulus Principle CHAPTER Ⅲ Cauchy's Theorem,First Part 1. Holomorphic Functions on Connected Sets 2. Integrals Over Paths 3. Local Primitive for a Holomorphic Function 4. Local Primitive for a Holomorphic Function 5. The Homotopy Form of Cauchy's Theorem 6. Existence of Global Primitives.Definition of the Logarithm 7. The Local Cauchy Formula CHAPTER Ⅳ Winding Numbers and Cauchy's Theorem CHAPTER Ⅴ Applications of Cauchy's Integral Formula CHAPTER Ⅵ Calculus of Residues CHAPTER Ⅶ Conformal Mappings CHAPTER Ⅷ Harmonic Functions PART TWO Geometric Function Theory CHAPTER Ⅸ Schwarz Reflection CHAPTER Ⅹ The Riemann Mapping Theorem CHAPTER Ⅺ Analytic Continuation Along Curves PART THREE Various Analytic Topics CHAPTER Ⅻ Applications of the Maximum Modulus Principle and Jensen's Formula CHAPTER ⅩⅢ Entire and Meromorphic Functions CHAPTER ⅩⅣ Elliptic Functions CHAPTER ⅩⅤ The Gamma and Zeta Functions CHAPTER ⅩⅥ The Prime Number Theorem Appendix Bibliography Index |
