http://de.evo-art.org/index.php?action=history&feed=atom&title=Point_Symmetry_Patterns_on_a_Regular_Hexagonal_TessellationPoint Symmetry Patterns on a Regular Hexagonal Tessellation - Versionsgeschichte2026-04-05T18:24:52ZVersionsgeschichte dieser Seite in de_evolutionary_art_orgMediaWiki 1.27.4http://de.evo-art.org/index.php?title=Point_Symmetry_Patterns_on_a_Regular_Hexagonal_Tessellation&diff=3992&oldid=prevGbachelier: Die Seite wurde neu angelegt: „ == Reference == David A. Reimann: Point Symmetry Patterns on a Regular Hexagonal Tessellation. In: Bridges 2012. Pages 365–368 == DOI == == Abst…“2015-01-29T11:43:01Z<p>Die Seite wurde neu angelegt: „ == Reference == David A. Reimann: <a href="/index.php?title=Point_Symmetry_Patterns_on_a_Regular_Hexagonal_Tessellation" title="Point Symmetry Patterns on a Regular Hexagonal Tessellation">Point Symmetry Patterns on a Regular Hexagonal Tessellation</a>. In: <a href="/index.php?title=Bridges_2012" title="Bridges 2012">Bridges 2012</a>. Pages 365–368 == DOI == == Abst…“</p>
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== Reference ==<br />
David A. Reimann: [[Point Symmetry Patterns on a Regular Hexagonal Tessellation]]. In: [[Bridges 2012]]. Pages 365–368 <br />
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== DOI ==<br />
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== Abstract ==<br />
An investigation of point symmetry patterns on the regular hexagonal tessellation is presented. This tessellation has<br />
three point symmetry groups. However, the restriction to the hexagonal tessellation causes some symmetry subgroups<br />
to be repeated in ways that are geometrically unique and others that are geometrically equivalent, resulting in a total<br />
of 14 geometrically distinct symmetry groups. Each symmetry group requires a particular set of motif symmetries to<br />
allow its construction. Examples of symmetric patterns are shown for several simple motif families.<br />
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== Extended Abstract ==<br />
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== Bibtex == <br />
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== Used References ==<br />
[1] J.H. Conway, H. Burgiel, and C. Goodman-Strauss. The Symmetries of Things. AK Peters Wellesley, MA, 2008.<br />
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[2] J.A. Gallian. Contemporary Abstract Algebra. Brooks/Cole, 2009.<br />
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[3] David A. Reimann. Patterns from Archimedean tilings using generalized Truchet tiles decorated with simple B ́ezier curves. Bridges P ́ecs: Mathematics, Music, Art, Culture, George W. Hart and Reza Sarhangi, editors, pages 427–430, P ́ecs, Hungary, 24–28 July 2010.<br />
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== Links ==<br />
=== Full Text === <br />
http://archive.bridgesmathart.org/2012/bridges2012-365.pdf<br />
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[[intern file]]<br />
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=== Sonstige Links ===<br />
http://archive.bridgesmathart.org/2012/bridges2012-365.html</div>Gbachelier