●Chapter 1Complex Numbers and Functions 1Complex Numbers 1.1Complex Number Field 1.2Complex Plane 1.3Modulus,Conjugation,Argument,and Polar Representation 1.4Powers and Roots of Complex Numbers 2Regions in the Complex Plane 2.1Some Basic Concepts 2.2Domain and Jordan Curve 3Functions of a Complex Variable 3.1The Concept of Functions of a Complex Variable 3.2Limits and Continuous 4The Extended Complex Plane and the Point at Infinity 4.1The Spherical Representation,and the Extended Complex Plane 4.2Some Concepts in the Extended Complex Plane Chapter 2Analytic Functions 1The Concept of the Analytic Function 1.1The Derivative of Functions of a Complex Variable 1.2Analytic Functions 2Cauchy-Riemann Equations 3Elementary Functions 3.1Exponential Functions 3.2Trigonometric Functions 3.3Hyperbolic Functions 4Multi-valued Functions 4.1Logarithmic Functions 4.2Complex Power Functions 4.3Inverse Trigonometric and Hyperbolic Functions Chapter 3Complex Integration 1The Concept of Contour Integral 1.1Integral of a Complex Function over a Real Interval 1.2Contour Integrals 2Cauchy-Goursat Theorem 2.1Cauchy-Goursat Theorem 2.2Cauchy Integral Formula 2.3Derivatives of Analytic Functions 2.4Liouville’s Theorem and the Fundamental Theorem of Algebra 3Harmonic Functions Chapter 4Series 1Basic Properties of Series 1.1Convergence of Sequences 1.2Convergence of Series 1.3Uniform Convergence 2Power Series 3Taylor Series 4Laurent Series 5Zeros of Analytic Functions and Uniquely Determined Analytic Functions 5.1Zeros of Analytic Functions 5.2Uniquely Determined Analytic Functions 5.3Maximum Modulus Principle 6Three Types of Isolated Singular Points at a Finite Point 7Three Types of Isolated Singular Points at an Infinite Point Chapter 5Calculus of Residues 1Residues 1.1Residues 1.2Cauchy’s Residue Theorem 1.3The Calculus of Residue 2Applications of Residue 2.1The Type of Definite Integral ∫2π0F(sinθ,cosθ)dθ 2.2The Type of Improper Integral ∫∞-∞p(x)q(x)dx 2.3The Type of Improper Integral ∫+∞-∞p(x)q(x)sinxdx or ∫+∞-∞p(x)q(x)cosxdx 3Argument Principle Chapter 6Conformal Mappings 1Analytic Transformation 1.1Preservation of Domains of Analytic Transformation 1.2Conformality of Analytic Transformation 2Rational Functions 2.1Polynomials 2.2Rational Functions 3Fractional Linear Transformations 4Elementary Conformal Mappings 5The Riemann Mapping Theorem
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復分析是研究復函數,特別是亞純函數和復解析函數的數學理論。復分析的應用領域較為廣泛,在其它數學分支和物理學中也起著重要的作用。包括數論、應用數學、流體力學、熱力學和電動力學。 復分析研究的主要內容包括:復數與復變函數、解析函數、復變函數的積分、級數、留數及其應用和共形映射等。 復分析研究的函數定義在復平面上,其值為復數,而且可微。研究中常用的理論、公式以及方法包括柯西積分定理、