Complex Polynomial Mandalas and their Symmetries: Unterschied zwischen den Versionen
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[1] Z. Nehari. Conformal Mapping. Dover Books on Mathematics. Dover Publications, 1975. | [1] Z. Nehari. Conformal Mapping. Dover Books on Mathematics. Dover Publications, 1975. | ||
− | [2] H.A. Schwarz. Ueber einige Abbildungsaufgaben. Journal | + | [2] H.A. Schwarz. Ueber einige Abbildungsaufgaben. Journal für die reine und angewandte Mathematik, 70:105–120, 1869. |
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Aktuelle Version vom 27. Januar 2015, 21:08 Uhr
Inhaltsverzeichnis
Reference
Konstantin Poelke, Zoi Tokoutsi and Konrad Polthier: Complex Polynomial Mandalas and their Symmetries. In: Bridges 2014. Pages 433–436
DOI
Abstract
We present an application of the classical Schwarz reflection principle to create complex mandalas—symmetric shapes resulting from the transformation of simple curves by complex polynomials—and give various illustrations of how their symmetry relates to the polynomials’ set of zeros. Finally we use the winding numbers inside the segments enclosed by the transformed curves to obtain fully coloured patterns in the spirit of many mandalas found in real-life.
Extended Abstract
Bibtex
Used References
[1] Z. Nehari. Conformal Mapping. Dover Books on Mathematics. Dover Publications, 1975.
[2] H.A. Schwarz. Ueber einige Abbildungsaufgaben. Journal für die reine und angewandte Mathematik, 70:105–120, 1869.
Links
Full Text
http://archive.bridgesmathart.org/2014/bridges2014-433.pdf