Green's Functions for Multiply Connected Domains via Conformal Mapping

Green's Functions for Multiply Connected Domains via Conformal Mapping

A method is described for the computation of the Green's function in the complex plane corresponding to a set of K symmetrically placed polygons along the real axis. An important special case is a set of K real intervals. The method is based on a Schwarz-Christoffel conformal map of the part of...

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Veröffentlicht in:SIAM review 1999-12, Vol.41 (4), p.745-761
Hauptverfasser: Embree, Mark, Trefethen, Lloyd N.
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
Approximations and expansions
Conformal mapping
Exact sciences and technology
Functions of a complex variable
Greens function
Interpolation
Level curves
Mathematical analysis
Mathematical functions
Mathematics
Numerical analysis
Numerical analysis. Scientific computation
Numerical linear algebra
Polygons
Polynomials
Potential theory
Problems and Techniques
Sciences and techniques of general use
Symmetry
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Beschreibung
Zusammenfassung:A method is described for the computation of the Green's function in the complex plane corresponding to a set of K symmetrically placed polygons along the real axis. An important special case is a set of K real intervals. The method is based on a Schwarz-Christoffel conformal map of the part of the upper half-plane exterior to the problem domain onto a semi-infinite strip whose end contains K - 1 slits. From the Green's function one can obtain a great deal of information about polynomial approximations, with applications in digital filters and matrix iterations. By making the end of the strip jagged, the method can be generalized to weighted Green's functions and weighted approximations.
ISSN:0036-1445
1095-7200
DOI:10.1137/s0036144598349277