http://de.evo-art.org/index.php?action=history&feed=atom&title=Hex_RosaHex Rosa - Versionsgeschichte2026-05-27T10:27:35ZVersionsgeschichte dieser Seite in de_evolutionary_art_orgMediaWiki 1.27.4http://de.evo-art.org/index.php?title=Hex_Rosa&diff=33094&oldid=prevGubachelier: Die Seite wurde neu angelegt: „ == Reference == Markus Rissanen: Hex Rosa. In: Bridges 2016, Pages 209–216. == DOI == == Abstract == This paper describes a system of rhombic ti…“2016-12-26T22:30:34Z<p>Die Seite wurde neu angelegt: „ == Reference == Markus Rissanen: <a href="/index.php?title=Hex_Rosa" title="Hex Rosa">Hex Rosa</a>. In: <a href="/index.php?title=Bridges_2016" title="Bridges 2016">Bridges 2016</a>, Pages 209–216. == DOI == == Abstract == This paper describes a system of rhombic ti…“</p>
<p><b>Neue Seite</b></p><div><br />
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== Reference ==<br />
Markus Rissanen: [[Hex Rosa]]. In: [[Bridges 2016]], Pages 209–216. <br />
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== DOI ==<br />
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== Abstract ==<br />
This paper describes a system of rhombic tilings with n-fold rotational symmetry for all n ! 3. A preference is given<br />
to the presentation of odd values. In addition to one centre of global rotational symmetry this system contains<br />
infinitely many relatively small evenly distributed circular patches with their own centres of n-fold local rotational<br />
symmetry. This system uses specific hexagonal modules and certain properties of them are also described.<br />
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== Extended Abstract ==<br />
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== Bibtex == <br />
@inproceedings{bridges2016:209,<br />
author = {Markus Rissanen},<br />
title = {Hex Rosa},<br />
pages = {209--216},<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=Hex_Rosa},<br />
note = {Available online at \url{http://archive.bridgesmathart.org/2016/bridges2016-209.html}}<br />
}<br />
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== Used References ==<br />
[1] Gardner, M.: Extraordinary nonperiodic tiling that enriches the theory of tiles. Scientific American<br />
236, pp. 110–121 (1977).<br />
<br />
[2] Grünbaum and Shephard: Tilings and Patterns, W. H. Freeman, New York (1987), pp. 519–548.<br />
<br />
[3] Alan H. Schoen at http://schoengeometry.com/b-fintil.html (read 2016-04-14).<br />
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[4] Chilton, B. L. and Coxeter, H. S. M.: Polar Zonohedra, Amer. Math. Monthly 70, pp. 946-951 (1963).<br />
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[5] Whittaker, E. J. and Whittaker, R. M.: Some Generalized Penrose Patterns from Projections of n-<br />
Dimensional Lattices, Acta Crystallographica, Vol. A44, Part 2, pp. 105–112 (1988).<br />
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[6] Kari, J. and Rissanen, M.: Sub Rosa, a System of Quasiperiodic Rhombic Substitution Tilings with n-<br />
Fold Rotational Symmetry, published first online 2016-04-04 in the Discrete & Computational<br />
Geometry at http://link.springer.com/article/10.1007/s00454-016-9779-1, a free pre-review version is<br />
available at http://arxiv.org/abs/1512.01402 (since 2015-12-04).<br />
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== Links ==<br />
=== Full Text === <br />
http://archive.bridgesmathart.org/2016/bridges2016-209.pdf<br />
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[[intern file]]<br />
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=== Sonstige Links ===<br />
http://archive.bridgesmathart.org/2016/bridges2016-209.html</div>Gubachelier