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Complex Analysis and Conformal Mapping

Complex Analysis and Conformal Mapping

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The driving force behind many of the applications of complex analysis is the remarkable connection between complex functions and harmonic functions of two variables, a.k.a. solu-tions of the planar Laplace equation. To wit, the real and imaginary parts of any complex analytic function are automatically harmonic.

  Applications, Mapping, Variable, Complex, Conformal, Conformal mapping

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