http://de.evo-art.org/index.php?action=history&feed=atom&title=Two_and_Three-Dimensional_Art_Inspired_by_PolynomiographyTwo and Three-Dimensional Art Inspired by Polynomiography - Versionsgeschichte2026-04-20T13:13:15ZVersionsgeschichte dieser Seite in de_evolutionary_art_orgMediaWiki 1.27.4http://de.evo-art.org/index.php?title=Two_and_Three-Dimensional_Art_Inspired_by_Polynomiography&diff=4174&oldid=prevGbachelier: Die Seite wurde neu angelegt: „ == Reference == Bahman Kalantari: Two and Three-Dimensional Art Inspired by Polynomiography. In: Bridges 2005. Pages 321–328 == DOI == == Abstra…“2015-01-31T10:40:28Z<p>Die Seite wurde neu angelegt: „ == Reference == Bahman Kalantari: <a href="/index.php?title=Two_and_Three-Dimensional_Art_Inspired_by_Polynomiography" title="Two and Three-Dimensional Art Inspired by Polynomiography">Two and Three-Dimensional Art Inspired by Polynomiography</a>. In: <a href="/index.php?title=Bridges_2005" title="Bridges 2005">Bridges 2005</a>. Pages 321–328 == DOI == == Abstra…“</p>
<p><b>Neue Seite</b></p><div><br />
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== Reference ==<br />
Bahman Kalantari: [[Two and Three-Dimensional Art Inspired by Polynomiography]]. In: [[Bridges 2005]]. Pages 321–328 <br />
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== DOI ==<br />
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== Abstract ==<br />
In several previous articles I have described polynomiography as the art and science of visualization in<br />
approximation of zeros of complex polynomials. Polynomiography amounts to a colorful two-dimensional image,<br />
called a polynomiograph, created via a prototype polynomiography software that could typically allow a great deal<br />
of human creativity and control. In this article I describe several types of 2D and 3D artwork that could be inspired<br />
by polynomiography. These include work of art as paintings, tapestry designs, carpet designs, animations,<br />
sculptures, neon light-like polynomiographs, and more. The realization of some of these applications as serious<br />
work of art takes coordinated effort, collaborations, and support. I will report on progress in the realization of<br />
some of the above-mentioned artwork.<br />
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== Extended Abstract ==<br />
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== Bibtex == <br />
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== Used References ==<br />
[1] C.P. Bruter, Mathematics and Art: Mathematical Visualization in Art and Education, Springer-<br />
Verlag, 2002.<br />
<br />
[2] M. Emmer, The Visual Mind: Art and Mathematics, MIT Press, 1993.<br />
<br />
[3] B. Kalantari, Polynomiography: The art and mathematics in visualization of polynomials, in<br />
Proceedings of ISAMA (International Society of Art, Mathematics, and Architecture), 2002.<br />
<br />
[4] B. Kalantari, Can Polynomiography be Useful in Computational Geometry?, DIMACS Workshop<br />
on Computational Geometry, New Brunswick, NJ, November, 2002. (http//dimacs.rutgers.edu/Workshop/CompGeom/abstracts/005.pdf).<br />
<br />
[5] B. Kalantari, Polynomiography and Applications in Art, Education, and Science, in Proceedings of<br />
SIGGRAPH 2003 on Education.<br />
<br />
[6] B. Kalantari, Summer, artwork and its description in Electronic Art and Animation Catalog, pp. 87,<br />
SIGGRAPH 2003.<br />
<br />
[7] B. Kalantari, The Art in Polynomiography of Special Polynomials, in Proceedings of<br />
ISAMA/BRIDGES Conference, pp. 173-180, 2003.<br />
<br />
[8] B. Kalantari , Polynomiography and application in art, education, and science, Computers &<br />
Graphics, 28, pp. 417-430. 2004.<br />
<br />
[9] B. Kalantari, A new medium for visual art: Polynomiography, Computer Graphics Quarterly, 38, pp.<br />
22-24. 2004.<br />
<br />
[10] B. Kalantari, I. Kalantari, F. Andreev, Animation of mathematical concepts using polynomiography,<br />
Proceedings of SIGGRAPH 2004 on Education.<br />
<br />
[11] B. Kalantari, Polynomiography in art and design, Mathematics & Design, Vol. 4, pp. 305-311.<br />
2004. Proceedings of Fourth International Conference of Mathematics & Design.<br />
<br />
[12] B. Kalantari, Polynomiography: From the Fundamental Theorem of Algebra to Art, to appear in<br />
LEONARDO, Volume 38. 2005.<br />
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[13] I. Peterson, Fragments of Infinity, A Kaleidoscope of Math and Art , Wiley, 2001.<br />
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== Links ==<br />
=== Full Text === <br />
http://archive.bridgesmathart.org/2005/bridges2005-321.pdf<br />
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[[intern file]]<br />
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=== Sonstige Links ===<br />
http://archive.bridgesmathart.org/2005/bridges2005-321.html</div>Gbachelier