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Version vom 24. Oktober 2015, 22:50 Uhr
Inhaltsverzeichnis
Reference
Tom Verhoeff and Melle Stoel: Chains of Antiprisms. In: Bridges 2015. Pages 347–350
DOI
Abstract
We prove a property of antiprism chains and show some artwork based on this property.
Extended Abstract
Bibtex
@inproceedings{bridges2015:347, author = {Tom Verhoeff and Melle Stoel}, title = {Chains of Antiprisms}, pages = {347--350}, booktitle = {Proceedings of Bridges 2015: Mathematics, Music, Art, Architecture, Culture}, year = {2015}, editor = {Kelly Delp, Craig S. Kaplan, Douglas McKenna and Reza Sarhangi}, isbn = {978-1-938664-15-1}, issn = {1099-6702}, publisher = {Tessellations Publishing}, address = {Phoenix, Arizona}, note = {Available online at \url{http://archive.bridgesmathart.org/2015/bridges2015-347.html}} }
Used References
[1] Melle Stoel. Corkscrew. Bridges 2014 Art Exhibition. http://gallery.bridgesmathart.org/ exhibitions/2014-bridges-conference/mellestoel (accessed 15 Mar 2015).
[2] Melle Stoel. Closed Loops of Antiprisms. Proceedings of Bridges 2014: Mathematics, Music, Art, Architecture, Culture, pp.285–292.
[3] B. M. Stewart. Adventures Among the Toroids: A Study of Quasi-Convex, Aplanar, Tunneled Orientable Polyhedra of Positive Genus Having Regular Faces With Disjoint Interiors (2nd Ed.). Self-published, 1980.
[4] Wikipedia contributors. Antiprism— Wikipedia, The Free Encyclopedia. https://en.wikipedia. org/wiki/Antiprism (accessed 15 Mar 2015).
Links
Full Text
http://archive.bridgesmathart.org/2015/bridges2015-347.pdf