Order-infinite-3 triangular honeycomb: Difference between revisions

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Line 40: It is a part of a sequence of self-dual regular honeycombs: {''p'',∞,''p''}. {{-Clear}} === Order-infinite-4 triangular honeycomb=== Line 77: It has a second construction as a uniform honeycomb, [[Schläfli symbol]] {3,∞<sup>1,1</sup>}, Coxeter diagram, {{CDD\|node_1\|3\|node\|split1-ii\|nodes}}, with alternating types or colors of infinite-order triangular tiling cells. In [[Coxeter notation]] the half symmetry is [3,∞,4,1<sup>+</sup>] = [3,∞<sup>1,1</sup>]. {{-Clear}} === Order-infinite-5 triangular honeycomb=== Line 110: \|} {{-Clear}} ===Order-infinite-6 triangular honeycomb=== Line 142: \|[[File:H3_3i6_UHS_plane_at_infinity.png\|240px]]<BR>Ideal surface \|} {{-Clear}} ===Order-infinite-7 triangular honeycomb=== Line 174: \|[[File:H3_3i7_UHS_plane_at_infinity.png\|240px]]<BR>Ideal surface \|} {{-Clear}} ===Order-infinite-infinite triangular honeycomb=== Line 209: It has a second construction as a uniform honeycomb, [[Schläfli symbol]] {3,(∞,∞,∞)}, Coxeter diagram, {{CDD\|node_1\|3\|node\|infin\|node\|infin\|node_h0}} = {{CDD\|node_1\|3\|node\|split1-ii\|branch\|labelinfin}}, with alternating types or colors of infinite-order triangular tiling cells. In Coxeter notation the half symmetry is [3,∞,∞,1<sup>+</sup>] = [3,((∞,∞,∞))]. {{-Clear}} === Order-infinite-3 square honeycomb=== Line 305: \|} {{-Clear}} === Order-infinite-3 heptagonal honeycomb=== Line 338: \|} {{-Clear}} === Order-infinite-3 apeirogonal honeycomb=== Line 408: It has a second construction as a uniform honeycomb, [[Schläfli symbol]] {4,∞<sup>1,1</sup>}, Coxeter diagram, {{CDD\|node_1\|4\|node\|split1-ii\|nodes}}, with alternating types or colors of cells. In Coxeter notation the half symmetry is [4,∞,4,1<sup>+</sup>] = [4,∞<sup>1,1</sup>]. {{-Clear}} === Order-infinite-5 pentagonal honeycomb=== Line 440: {\| class=wikitable \|[[File:Hyperbolic honeycomb 5-i-5 poincare.png\|240px]]<BR>[[Poincaré disk model]] \|[[File:~~H3_555_UHS_plane_at_infinity~~H3_5i5_UHS_plane_at_infinity.png\|240px]]<BR>Ideal surface \|} {{-Clear}} === Order-infinite-6 hexagonal honeycomb=== Line 477: It has a second construction as a uniform honeycomb, [[Schläfli symbol]] {6,(∞,3,∞)}, Coxeter diagram, {{CDD\|node_1\|6\|node\|split1-ii\|branch}}, with alternating types or colors of cells. In Coxeter notation the half symmetry is [6,∞,6,1<sup>+</sup>] = [6,((∞,3,∞))]. {{-Clear}} === Order-infinite-7 heptagonal honeycomb=== Line 510: \|} {{-Clear}} === Order-infinite-infinite apeirogonal honeycomb === Line 552: {{reflist}} [[H. S. M. Coxeter\|Coxeter]], ''[[Regular Polytopes (book)\|Regular Polytopes]]'', 3rd. ed., Dover Publications, 1973. {{ISBN\|0-486-61480-8}}. (Tables I and II: Regular polytopes and honeycombs, pp. 294–296) ''The Beauty of Geometry: Twelve Essays'' (1999), Dover Publications, {{LCCN\|99035678}}, {{ISBN\|0-486-40919-8}} (Chapter 10, [http://www.mathunion.org/ICM/ICM1954.3/Main/icm1954.3.0155.0169.ocr.pdf Regular Honeycombs in Hyperbolic Space] {{Webarchive\|url=https://web.archive.org/web/20160610043106/http://www.mathunion.org/ICM/ICM1954.3/Main/icm1954.3.0155.0169.ocr.pdf \|date=2016-06-10 }}) Table III * [[Jeffrey Weeks (mathematician)\|Jeffrey R. Weeks]] ''The Shape of Space, 2nd edition'' {{ISBN\|0-8247-0709-5}} (Chapters 16–17: Geometries on Three-manifolds I, II) * George Maxwell, ''Sphere Packings and Hyperbolic Reflection Groups'', JOURNAL OF ALGEBRA 79,78-97 (1982) [http://www.sciencedirect.com/science/article/pii/0021869382903180] * Hao Chen, Jean-Philippe Labbé, ''Lorentzian Coxeter groups and Boyd-Maxwell ball packings'', (2013)[https://arxiv.org/abs/1310.8608] Line 561: * [https://www.youtube.com/watch?v=GRo_FQm2KRc Hyperbolic Catacombs Carousel: {3,∞,3} honeycomb] [[YouTube]], Roice Nelson [[John Baez]], ''Visual insights'': [http://blogs.ams.org/visualinsight/2014/08/01/733-honeycomb/ {7,3,3} Honeycomb] (2014/08/01) [http://blogs.ams.org/visualinsight/2014/08/14/733-honeycomb-meets-plane-at-infinity/ {7,3,3} Honeycomb Meets Plane at Infinity] (2014/08/14) [[Danny Calegari]], [http://lamington.wordpress.com/2014/03/04/kleinian-a-tool-for-visualizing-kleinian-groups/Kleinian Kleinian, a tool for visualizing Kleinian groups, Geometry and the Imagination] 4 March 2014. [https://web.archive.org/web/20161109004910/http://math.uchicago.edu/~dannyc/papers/kleinian_mtf_Feb_2014.pdf] [[Category:~~Honeycombs~~Regular ~~(geometry)~~3-honeycombs]]