Henry Segerman's webpages
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|Mathematical and typographical art "of various kinds and dimensions." See, in particular, Segerman's 3D printed sculpture, book covers and posters, diamond Go, ambigrams, autologlyphs, autological words, Escher's Printgallery, and math-art t-shirts available from the Math-Art-Create shop. Papers and preprints on geometry, topology, mathematical art, and recreational mathematics include "Triangulations of hyperbolic 3-manifolds admitting strict angle structures," "Incompressible surfaces in handlebodies and boundary compressible 3-manifolds," "Detection of incompressible surfaces in hyperbolic punctured torus bundles," "Sculptures in S³," "Fractal graphs by iterated substitution," and "The sunflower spiral and the Fibonacci metric"; talks include "The Mathfest 2009 Poster Image, Mathematical Art, Design and Education in Second Life" and "When is a knot not a knot?" A research fellow at the University of Melbourne, Segerman studies 3-dimensional geometry and topology, particularly involving ideal triangulations.|
|Levels:||High School (9-12), College, Research|
|Resource Types:||Games, Manipulatives, Articles, Recreations|
|Math Topics:||Fractals, Geometry, Topology, Art, Linguistics|
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