http://de.evo-art.org/index.php?action=history&feed=atom&title=The_Fourth_Dimension_in_Mathematics_and_ArtThe Fourth Dimension in Mathematics and Art - Versionsgeschichte2026-05-27T12:58:56ZVersionsgeschichte dieser Seite in de_evolutionary_art_orgMediaWiki 1.27.4http://de.evo-art.org/index.php?title=The_Fourth_Dimension_in_Mathematics_and_Art&diff=33121&oldid=prevGubachelier: Die Seite wurde neu angelegt: „ == Reference == Jean Constant: The Fourth Dimension in Mathematics and Art. In: Bridges 2016, Pages 541–544. == DOI == == Abstract == The fourth…“2016-12-27T10:51:40Z<p>Die Seite wurde neu angelegt: „ == Reference == Jean Constant: <a href="/index.php?title=The_Fourth_Dimension_in_Mathematics_and_Art" title="The Fourth Dimension in Mathematics and Art">The Fourth Dimension in Mathematics and Art</a>. In: <a href="/index.php?title=Bridges_2016" title="Bridges 2016">Bridges 2016</a>, Pages 541–544. == DOI == == Abstract == The fourth…“</p>
<p><b>Neue Seite</b></p><div><br />
<br />
== Reference ==<br />
Jean Constant: [[The Fourth Dimension in Mathematics and Art]]. In: [[Bridges 2016]], Pages 541–544. <br />
<br />
== DOI ==<br />
<br />
== Abstract ==<br />
The fourth dimension is a complex concept that deals with abstract reasoning, our sense of perception, and our<br />
imagination. This paper gives a brief overview of the background that leads to the study of the fourth dimension<br />
and focuses on the specifics of mathematics and visual imaging to illustrate the challenges and benefit of<br />
interdisciplinary collaboration to create a sound outcome.<br />
<br />
== Extended Abstract ==<br />
<br />
== Bibtex == <br />
@inproceedings{bridges2016:541,<br />
author = {Jean Constant},<br />
title = {The Fourth Dimension in Mathematics and Art},<br />
pages = {541--544},<br />
booktitle = {Proceedings of Bridges 2016: Mathematics, Music, Art, Architecture, Education, Culture},<br />
year = {2016},<br />
editor = {Eve Torrence, Bruce Torrence, Carlo S\'equin, Douglas McKenna, Krist\'of Fenyvesi and Reza Sarhangi},<br />
isbn = {978-1-938664-19-9},<br />
issn = {1099-6702},<br />
publisher = {Tessellations Publishing},<br />
address = {Phoenix, Arizona},<br />
url = {http://de.evo-art.org/index.php?title=The_Fourth_Dimension_in_Mathematics_and_Art },<br />
note = {Available online at \url{http://archive.bridgesmathart.org/2016/bridges2016-541.html}}<br />
}<br />
<br />
<br />
== Used References ==<br />
[1] Wallace, David F., (2003). Everything and More: A Compact History of Infinity. W. W. Norton &<br />
Company, p. 23<br />
<br />
[2] Asscher, S.; Widger, D., (2008). “Plato - The Republic.” Project Gutenberg. Retrieved 12, 2015 from<br />
https://www.gutenberg.org/files/1497/1497-h/1497-h.htm.<br />
<br />
[3] Milnor, John W., (1982). ‘Hyperbolic geometry: The first 150 years.’ Bull. Amer. Math. Soc. 6. 9-24.<br />
<br />
[4] Henderson, Linda Dalrymple, (1983). The Fourth Dimension and Non-Euclidean Geometry in<br />
Modern Art. Princeton University Press.<br />
<br />
[5] Reitzel, Erik ,(1984). “Le Cube ouvert.” International conference on tall buildings. Singapore.<br />
<br />
[6] Weeks, Jeff, (2016). “4D Draw.” Retrieved 12, 2015 from<br />
http://geometrygames.org/Draw4D/index.html<br />
<br />
[7] Reas, C., & Fry, B. (2007). Processing: A Programming Handbook for Visual Designers and Artists.<br />
The MIT Press.<br />
<br />
[8] Weisstein, Eric W. "24-Cell.” MathWorld. Retrieved 12, 2015 from.<br />
http://mathworld.wolfram.com/24-Cell.html<br />
<br />
[9] Bourke, P. (1990). “Hyperspace User Manual.” Retrieved 12, 2015, from<br />
http://paulbourke.net/geometry/hyperspace/<br />
<br />
[10] Coxeter, H. S. M. (1973). Regular Polytopes. 3rd ed. New York: Dover.<br />
<br />
<br />
== Links ==<br />
=== Full Text === <br />
http://archive.bridgesmathart.org/2016/bridges2016-541.pdf<br />
<br />
[[intern file]]<br />
<br />
=== Sonstige Links ===<br />
http://archive.bridgesmathart.org/2016/bridges2016-541.html</div>Gubachelier