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Hyperbolic triangle
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#	Item
1	HYPERSEEING The Publication of the International Society of the Arts, Mathematics, and Architecture June 2007 www.isama.org Add to Reading List Source URL: isama.org Language: English - Date: 2007-06-29 15:03:31 Geometry Mathematics Space Paper folding Recreational mathematics Hyperbolic geometry Origami Regular icosahedron Triangle Differential geometry of surfaces Knot theory Mbius strip
2	Indextriangle, 190, triangle, theorem, 96, triangle, 190, 233 Add to Reading List Source URL: www.math.washington.edu Language: English - Date: 2016-01-13 17:41:47 Elementary geometry Triangle geometry Quadrilaterals Polygons Triangles Absolute geometry Triangle Hyperbolic geometry Angle Perpendicular Rectangle Euclidean geometry
3	International Fall Workshop on Geometry and Physics, Burgos, August 30 to Sept 1 Spaces: A perspective Mariano Santander Add to Reading List Source URL: www3.ubu.es Language: English - Date: 2012-09-12 12:27:38 Elementary geometry Triangle geometry Quadrilaterals Geometry Hyperbolic geometry Non-Euclidean geometry Parallel postulate Sum of angles of a triangle Saccheri quadrilateral Spherical geometry Giovanni Girolamo Saccheri Euclidean geometry
4	V.BulatovBending Hyperbolic Kaleidoscopes Add to Reading List Source URL: bulatov.org Language: English - Date: 2011-08-15 22:43:14 Tessellation Geometry Polyhedra Hyperbolic geometry Hyperbolic triangle Rectangle Order-4 pentagonal tiling Wythoff symbol Uniform tilings in hyperbolic plane
5	Divisible Tilings in the Hyperbolic Plane S. Allen Broughton, Dawn M. Haney∗ , Lori T. McKeough∗ , and Brandy M. Smith∗ Abstract. We consider triangle-quadrilateral pairs in the hyperbolic plane which “kaleidosco Add to Reading List Source URL: tilings.org Language: English - Date: 2001-02-18 00:58:53
6	Divisible Tilings in the Hyperbolic Plane S. Allen Broughton, Dawn M. Haney∗ , Lori T. McKeough∗ , and Brandy M. Smith∗ Abstract. We consider triangle-quadrilateral pairs in the hyperbolic plane which “kaleidosco Add to Reading List Source URL: www.tilings.org Language: English - Date: 2001-02-18 00:58:53
7	Unfaithful complex hyperbolic triangle groups II: Higher order re ections Julien Paupert John R. Parker Department of Mathematics Department of Mathematical Sciences, Add to Reading List Source URL: maths.dur.ac.uk Language: English - Date: 2007-11-28 04:59:00
8	NON-DISCRETE COMPLEX HYPERBOLIC TRIANGLE GROUPS OF TYPE (n, n, ∞; k) SHIGEYASU KAMIYA, JOHN R. PARKER AND JAMES M. THOMPSON Abstract. A complex hyperbolic triangle group is a group generated by three involutions fixing Add to Reading List Source URL: maths.dur.ac.uk Language: English - Date: 2009-11-11 10:43:15
9	Unfaithful complex hyperbolic triangle groups I: Involutions John R. Parker Department of Mathematical Sciences, University of Durham, South Road, Add to Reading List Source URL: maths.dur.ac.uk Language: English - Date: 2008-06-19 04:04:07
10	COMPLEX HYPERBOLIC (3, 3, n) TRIANGLE GROUPS JOHN R PARKER, JIEYAN WANG AND BAOHUA XIE Abstract. Let p, q, r be positive integers. Complex hyperbolic (p, q, r) triangle groups are representations of the hyperbolic (p, q, Add to Reading List Source URL: maths.dur.ac.uk Language: English - Date: 2015-06-18 09:31:06

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