Complex Analysis and Conformal Mapping
and hence (2.4) does indeed define a complex-valued solution to the Laplace equation. In most applications, we are searching for real solutions, and so our complex d’Alembert-type formula (2.4) is not entirely satisfactory. As we know, a complex number z= x+ iy is real if and only if it equals its own conjugate: z= z.
Number, Mapping, Complex, Conformal, Complex number, Conformal mapping
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