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• E9_honeycomb abstract "In geometry, an E9 honeycomb is a tessellation of uniform polytopes in hyperbolic 9-dimensional space. , also (E10) is a noncompact hyperbolic group, so either facets or vertex figures will not be bounded. E10 is last of the series of Coxeter groups with a bifurcated Coxeter-Dynkin diagram of lengths 6,2,1. There are 1023 unique E10 honeycombs by all combinations of its Coxeter-Dynkin diagram. There are no regular honeycombs in the family since its Coxeter diagram a nonlinear graph, but there are three simplest ones, with a single ring at the end of its 3 branches: 621, 261, 162.".
• E9_honeycomb thumbnail Cross_graph_9_Nodes_highlighted.svg?width=300.
• E9_honeycomb wikiPageExternalLink product.asp?ProdCode=2205.
• E9_honeycomb wikiPageExternalLink productCd-0471010030.html.
• E9_honeycomb wikiPageID "31821232".
• E9_honeycomb wikiPageRevisionID "550119634".
• E9_honeycomb hasPhotoCollection E9_honeycomb.
• E9_honeycomb subject Category:10-polytopes.
• E9_honeycomb comment "In geometry, an E9 honeycomb is a tessellation of uniform polytopes in hyperbolic 9-dimensional space. , also (E10) is a noncompact hyperbolic group, so either facets or vertex figures will not be bounded. E10 is last of the series of Coxeter groups with a bifurcated Coxeter-Dynkin diagram of lengths 6,2,1. There are 1023 unique E10 honeycombs by all combinations of its Coxeter-Dynkin diagram.".
• E9_honeycomb label "E9 honeycomb".
• E9_honeycomb sameAs m.0gmcjm7.
• E9_honeycomb sameAs Q5322463.
• E9_honeycomb sameAs Q5322463.
• E9_honeycomb wasDerivedFrom E9_honeycomb?oldid=550119634.
• E9_honeycomb depiction Cross_graph_9_Nodes_highlighted.svg.
• E9_honeycomb isPrimaryTopicOf E9_honeycomb.