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Preface | |
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Complex Numbers | |
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Sums and Products | |
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Algebraic Properties | |
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Moduli and Conjugates | |
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Triangle Inequality | |
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Polar Coordinates and Euler's Formula | |
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Products and Quotients in Exponential Form | |
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Roots of Complex Numbers | |
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Regions in the Complex Plane | |
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Analytic Functions | |
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Functions of a Complex Variable | |
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Mappings | |
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Limits | |
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Theorems on Limits | |
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Limits Involving the Point at Infinity | |
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Continuity | |
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Derivatives | |
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Differential Formulas | |
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Cauchy-Riemann Equations | |
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Sufficient Conditions for Differentiability | |
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Polar Coordinates | |
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Analytic Functions | |
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Reflection Principle | |
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Harmonic Functions | |
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Elementary Functions | |
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The Exponential Function | |
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Trigonometric Functions | |
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Hyperbolic Functions | |
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The Logarithmic Function and Its Branches | |
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Some Identities Involving Logarithms | |
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Complex Exponents | |
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Inverse Trigonometric and Hyperbolic Functions | |
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Integrals | |
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Complex-Valued Functions w(t) | |
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Contours | |
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Contour Integrals | |
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Examples | |
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Antiderivatives | |
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Examples | |
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Cauchy-Goursat Theorem | |
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Proof of the Theorem | |
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Simply and Multiply Connected Domains | |
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Cauchy Integral Formula | |
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Derivatives of Analytic Functions | |
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Liouville's Theorem and the Fundamental Theorem of Algebra | |
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Maximum Moduli of Functions | |
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Series | |
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Convergence of Sequences and Series | |
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Taylor Series | |
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Examples | |
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Laurent Series | |
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Examples | |
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Absolute and Uniform Convergence of Power Series | |
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Integration and Differentiation of Power Series | |
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Uniqueness of Series Representations | |
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Multiplication and Division of Power Series | |
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Analytic Continuation | |
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Residues and Poles | |
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Residues | |
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Residue Theorems | |
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The Three Types of Isolated Singular Points | |
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Residues at Poles | |
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Zeros and Poles of Order m | |
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Conditions under Which f (z) = 0 | |
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Behavior of f Near Removable and Essential Singular Points | |
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Applications of Residues | |
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Evaluation of Improper Integrals | |
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Improper Integrals Involving Sines and Cosines | |
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Definite Integrals Involving Sines and Cosines | |
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Indented Paths | |
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Integration along a Branch Cut | |
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Argument Principle and Rouche's Theorem | |
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Inverse Laplace Transforms | |
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Examples | |
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Mapping by Elementary Functions | |
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Linear Transformations | |
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The Transformation w = 1/z | |
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Linear Fractional Transformations | |
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An Implicit Form | |
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Mapping of the Upper Half Plane | |
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Exponential and Logarithmic Transformations | |
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The Transformation w = sin z | |
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Mappings by Branches of z 1/2 | |
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Square Roots of Polynomials | |
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Riemann Surfaces | |
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Surfaces for Related Functions | |
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Conformal Mapping | |
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Preservation of Angles | |
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Further Properties | |
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Harmonic Conjugates | |
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Transformations of Harmonic Functions | |
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Transformations of Boundary Conditions | |
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Applications of Conformal Mapping | |
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Steady Temperatures | |
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Steady Temperatures in a Half Plane | |
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A Related Problem | |
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Temperatures in a Quadrant | |
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Electrostatic Potential | |
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Potential in a Cylindrical Space | |
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Two-Dimensional Fluid Flow | |
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The Stream Function | |
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Flows around a Corner and around a Cylinder | |
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The Schwartz-Christoffel Transformation | |
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Mapping the Real Axis onto a Polygon | |
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Schwarz-Christoffel Transformation | |
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Triangles and Rectangles | |
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Degenerate Polygons | |
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Fluid Flow in a Channel through a Slit | |
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Flow in a Channel with an Offset | |
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Electrostatic Potential about an Edge of a Conducting Plate | |
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Integral Formulas of the Poisson Type | |
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Poisson Integral Formula | |
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Dirichlet Problem for a Disk | |
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Related Boundary Value Problems | |
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Schwarz Integral Formula | |
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Dirichlet Problem for a Half Plane | |
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Neumann Problem for a Disk | |
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Neumann Problem for a Half Plane | |
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Appendixes | |
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Bibliography | |
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Table of Transformations of Regions | |
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Index | |