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Complex Analysis and Conformal Mapping

Complex Analysis and Conformal Mappingby Peter J. OlverUniversity of MinnesotaContents1. Introduction.. 22. Complex functions .. 2 Examples of Complex functions .. 53. Complex Differentiation.. 9 Power Series and Analyticity .. 124. Harmonic functions .. 15 Applications to Fluid Mechanics .. 205. Conformal Mapping .. 27 Analytic Maps .. 27 Conformality .. 33 Composition and the Riemann Mapping Theorem .. 38 Annular Domains .. 426. Applications of Conformal Mapping .. 44 Applications to Harmonic functions and Laplace s Equation.. 44 Applications to Fluid Flow .. 48 Poisson s Equation and the Green s Function ..537. Complex Integration.. 56 Cauchy s Theorem .. 61 Circulation and Lift .. 65 Cauchy s Integral Formula .. 71 Derivatives by Integration.

rational functions, exponentials, trigonometric functions, logarithms, and many more — have natural complex extensions. For example, complex polynomials p(z) = anzn+ a n−1 z n−1 + ···+ a 1 z+a0 (2.2) are complex linearcombinations (meaning thatthe coefficients akareallowed tobe complex numbers) of the basic monomial functions zk= (x+ ...

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