References
Robert McNeel & Associates, Rhinoceros, http://www.rhino3d.com/.
Autodesk, 3ds max, http://usa.autodesk.com/3ds-max/.
Autodesk, Maya, http://usa.autodesk.com/maya/.
Vladimir Bulatov, Bulatov abstract creations, http://bulatov.org/.
ISTI CNR, MeshLab, http://meshlab.sourceforge.net/.
Blender Foundation, Blender, http://www.blender.org/.
Bathsheba Grossman, Bathsheba sculpture, http://www.bathsheba.com.
George W. Hart, The (10, 3)-a network, http://www.georgehart.com/rp/10-3.html.
George W. Hart, Creating a mathematical museum on your desk, Mathematical Intelligencer 27 (2005), no. 4, 14–17.
George W. Hart, Procedural generation of sculptural forms, Proceedings of the Bridges Conference, also available at http://www.georgehart.com/ProceduralGeneration/Bridges08-Hart10pages.pdf, 2008.
Jesse Louis-Rosenberg and Jessica Rosenkrantz, Nervous system, http://n-e-r-v-o-u-s.com/.
Burkard Polster and Marty Ross, Print your own socks, Column in The Age, also available at http://education.theage.com.au/cmspage.php?intid=147&intversion=78, February 2011.
Saul Schleimer and Henry Segerman, Sculptures in S 3, Proceedings of the Bridges Conference 2012; also available at http://arxiv.org/abs/1204.4952.
Carlo Séquin, http://www.cs.berkeley.edu/~sequin/.
Wolfram Research, Inc., Mathematica, http://www.wolfram.com/mathematica/.
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This column is a place for those bits of contagious mathematics that travel from person to person in the community, because they are so elegant, surprising, or appealing that one has an urge to pass them on.
Contributions are most welcome.
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Segerman, H. 3D Printing for Mathematical Visualisation. Math Intelligencer 34, 56–62 (2012). https://doi.org/10.1007/s00283-012-9319-7
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DOI: https://doi.org/10.1007/s00283-012-9319-7