Conformal Mapping

Conformal mapping is a method from classical mathematical physics for solving Laplace’s equation. It is readily shown that an analytic function w = ξ + iη = f(z), where z = x + iy, transforms Laplace’s equation in the xyplane into Laplace’s equation in the ξη-plane. The objective here is to choose a mapping so that the solution is easier to obtain in the new domain.