http://de.evo-art.org/index.php?action=history&feed=atom&title=Opt_Art%3A_Special_CasesOpt Art: Special Cases - Versionsgeschichte2026-05-17T00:26:33ZVersionsgeschichte dieser Seite in de_evolutionary_art_orgMediaWiki 1.27.4http://de.evo-art.org/index.php?title=Opt_Art:_Special_Cases&diff=4003&oldid=prevGbachelier: Die Seite wurde neu angelegt: „ == Reference == Robert Bosch: Opt Art: Special Cases. In: Bridges 2011. Pages 249–256 == DOI == == Abstract == We present special cases of edge-…“2015-01-29T15:02:55Z<p>Die Seite wurde neu angelegt: „ == Reference == Robert Bosch: <a href="/index.php?title=Opt_Art:_Special_Cases" title="Opt Art: Special Cases">Opt Art: Special Cases</a>. In: <a href="/index.php?title=Bridges_2011" title="Bridges 2011">Bridges 2011</a>. Pages 249–256 == DOI == == Abstract == We present special cases of edge-…“</p>
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== Reference ==<br />
Robert Bosch: [[Opt Art: Special Cases]]. In: [[Bridges 2011]]. Pages 249–256 <br />
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== DOI ==<br />
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== Abstract ==<br />
We present special cases of edge-matched mosaics, TSP Art, and map-colored mosaics that do not require integer<br />
programming. They can be solved very quickly.<br />
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== Extended Abstract ==<br />
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== Bibtex == <br />
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== Used References ==<br />
R. Bosch, “Opt Art,” Math Horizons, February 2006, 6-9.<br />
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R. Bosch. Edge-constrained tile mosaics. In Bridges Donostia: mathematical connections in art, music, and science, pages 351-360, 2007.<br />
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[3] R. Bosch. Connecting the dots: the ins and outs of TSP Art. In Bridges Leeuwarden: mathematical connections in art, music, and science, pages 235-242, 2008.<br />
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[4] R. Bosch. Simple-closed-curve sculptures of knots and links. Journal of Mathematics and the Arts. 4(2):57-71, 2010.<br />
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[5] R. Bosch and A. Herman. Continuous line drawings via the traveling salesman problem. Operations Research Letters. 32:302-302, 2004.<br />
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[6] R. Bosch and A. Pike. Map-colored mosaics. In Bridges Banff: mathematical connections in art, music, and science, pages 139-146, 2009.<br />
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[7] C. Browne. Duotone Truchet-like tilings. Journal of Mathematics and the Arts. 2(4):189-196, 2008.<br />
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[8] R.W. Floyd and L. Steinberg. An adaptive algorithm for spacial grey scale. Proceedings of the Society of Information Display. 17:75-77, 1976.<br />
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[9] C.S. Kaplan and R. Bosch. TSP Art. In Bridges Banff: mathematical connections in art, music, and science, pages 301-308, 2005.<br />
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[10] C.A. Pickover. Picturing randomness with Truchet tiles. Journal of Recreational Mathematics. 21:256-259, 1989.<br />
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[11] L. Wolsey, Integer Programming, Wiley-Interscience,” 1998.<br />
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== Links ==<br />
=== Full Text === <br />
http://archive.bridgesmathart.org/2011/bridges2011-249.pdf<br />
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[[intern file]]<br />
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=== Sonstige Links ===<br />
http://archive.bridgesmathart.org/2011/bridges2011-249.html</div>Gbachelier