An extension of the Schwarz‐Christoffel transformation is described to formally map polygons which contain curved boundaries. The curved boundaries are divided into small ‘curved elements’ and each element is approximated by a second degree polynomial (higher degree polynomials can also be used). The iterative algorithm of evaluating the unknown constants of the basic S‐C transformation described in a companion paper is applied to the extended S‐C transformation to compute its unknown constants, including the coefficients of the polynomials. Excellent results are achieved as far as accuracy and convergence are concerned. Examples including a practical application, are provided. The mapping of curved polygons is important because they provide a better model of a physical device.
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1 February 1992
Review Article|
February 01 1992
AN EXTENDED SCHWARZ‐CHRISTOFFEL TRANSFORMATION FOR NUMERICAL MAPPING OF POLYGONS WITH CURVED SEGMENTS Available to Purchase
Maqsood A. CHAUDHRY
Maqsood A. CHAUDHRY
Department of Electrical Engineering, California State University, Fullerton, CA 92634, U.S.A. Presently Visiting Researcher in the Department of Electrical and Computer Engineering, University of California, Irvine, CA 92717, U.S.A.
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Publisher: Emerald Publishing
Online ISSN: 2054-5606
Print ISSN: 0332-1649
© MCB UP Limited
1992
COMPEL (1992) 11 (2): 277–293.
Citation
CHAUDHRY MA (1992), "AN EXTENDED SCHWARZ‐CHRISTOFFEL TRANSFORMATION FOR NUMERICAL MAPPING OF POLYGONS WITH CURVED SEGMENTS". COMPEL, Vol. 11 No. 2 pp. 277–293, doi: https://doi.org/10.1108/eb010092
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