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Complex Analysis and Conformal Mapping

Complex Analysis and Conformal Mapping

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1/7/22 5 c 2022 Peter J. Olver. Figure 2. Real and Imaginary Parts of ez. of complex polynomials provide a large variety of harmonic functions. The simplest case is 1 z = x x2 + y2 − i y x2 + y2, (2.11) whose real and imaginary parts are graphed in Figure 1. Note that these functions have

  Mapping, Conformal, Peter, Conformal mapping

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