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|Title:||Numerical conformal mapping onto a rectangle with applications to the solution of Laplacian problems|
|Keywords:||Conformal mapping;conformal module;Laplacian problems|
|Citation:||Maths Technical Papers (Brunel University). September 1988, pp 1-32|
|Abstract:||Let F be the function which maps conformally a simple-connected domain onto a rectangle R, so that four specified points on are mapped Ω∂respectively onto the four vertices of R. In this paper we consider the problem of approximating the conformal map F, and present a survey of the available numerical methods. We also illustrate the practical significance of the conformal map, by presenting a number of applications involving the solution of Laplacian boundary value problems.|
|Appears in Collections:||Mathematical Science|
Dept of Mathematics Research Papers
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