Concept
Construction de Wythoff
Concepts associés (22)
Diagramme de Coxeter-Dynkin
En géométrie, un diagramme de Coxeter-Dynkin est un graphe représentant un ensemble relationnel de miroirs (ou d'hyperplans de réflexion) dans l'espace pour une construction kaléidoscopique. En tant que graphe lui-même, le diagramme représente les groupes de Coxeter, chaque nœud du graphe représente un miroir (facette du domaine) et chaque branche du graphe représente l'ordre de l'angle diédral entre deux miroirs (sur une arête du domaine). En plus, les graphes ont des anneaux (cercles) autour des nœuds pour les miroirs actifs représentant un polytope précis.
Symbole de Wythoff
En géométrie, un symbole de Wythoff est une notation courte, créée par le mathématicien Willem Abraham Wythoff, pour nommer les polyèdres réguliers et semi-réguliers utilisant une construction kaléidoscopique, en les représentant comme des pavages sur la surface d'une sphère, sur un plan euclidien ou un plan hyperbolique. Le symbole de Wythoff donne 3 nombres p,q,r et une barre verticale positionnelle (|) qui sépare les nombres avant et après elle. Chaque nombre représente l'ordre des miroirs à un sommet du triangle fondamental.
Pavage carré
Le pavage carré est, en géométrie, un pavage du plan euclidien constitué de carrés. C'est l'un des trois pavages réguliers du plan euclidien, avec le pavage triangulaire et le pavage hexagonal. Le pavage carré possède un symbole de Schläfli de {4,4}, signifiant que chaque sommet est entouré par 4 carrés. Les symétries du pavage carré sont les symétries du carré, les translations, et leurs combinaisons. Elles forment un groupe de symétrie dénommé p4m. Les symétries du carré forment un sous-groupe, dénommé Groupe diédral d'ordre 8.
Uniform tiling
In geometry, a uniform tiling is a tessellation of the plane by regular polygon faces with the restriction of being vertex-transitive. Uniform tilings can exist in both the Euclidean plane and hyperbolic plane. Uniform tilings are related to the finite uniform polyhedra which can be considered uniform tilings of the sphere. Most uniform tilings can be made from a Wythoff construction starting with a symmetry group and a singular generator point inside of the fundamental domain.
Expansion (geometry)
In geometry, expansion is a polytope operation where facets are separated and moved radially apart, and new facets are formed at separated elements (vertices, edges, etc.). Equivalently this operation can be imagined by keeping facets in the same position but reducing their size. The expansion of a regular polytope creates a uniform polytope, but the operation can be applied to any convex polytope, as demonstrated for polyhedra in Conway polyhedron notation (which represents expansion with the letter e).
Pavage carré adouci
In geometry, the snub square tiling is a semiregular tiling of the Euclidean plane. There are three triangles and two squares on each vertex. Its Schläfli symbol is s{4,4}. Conway calls it a snub quadrille, constructed by a snub operation applied to a square tiling (quadrille). There are 3 regular and 8 semiregular tilings in the plane. There are two distinct uniform colorings of a snub square tiling. (Naming the colors by indices around a vertex (3.3.4.3.4): 11212, 11213.
Schwarz triangle
In geometry, a Schwarz triangle, named after Hermann Schwarz, is a spherical triangle that can be used to tile a sphere (spherical tiling), possibly overlapping, through reflections in its edges. They were classified in . These can be defined more generally as tessellations of the sphere, the Euclidean plane, or the hyperbolic plane. Each Schwarz triangle on a sphere defines a finite group, while on the Euclidean or hyperbolic plane they define an infinite group.
Omnitruncation
In geometry, an omnitruncation of a convex polytope is a simple polytope of the same dimension, having a vertex for each flag of the original polytope and a facet for each face of any dimension of the original polytope. Omnitruncation is the dual operation to barycentric subdivision. Because the barycentric subdivision of any polytope can be realized as another polytope, the same is true for the omnitruncation of any polytope.
Octagonal tiling
In geometry, the octagonal tiling is a regular tiling of the hyperbolic plane. It is represented by Schläfli symbol of {8,3}, having three regular octagons around each vertex. It also has a construction as a truncated order-8 square tiling, t{4,8}. Like the hexagonal tiling of the Euclidean plane, there are 3 uniform colorings of this hyperbolic tiling. The dual tiling V8.8.8 represents the fundamental domains of [(4,4,4)] symmetry. The regular map {8,3}2,0 can be seen as a 6-coloring of the {8,3} hyperbolic tiling.
Uniform polytope
In geometry, a uniform polytope of dimension three or higher is a vertex-transitive polytope bounded by uniform facets. The uniform polytopes in two dimensions are the regular polygons (the definition is different in 2 dimensions to exclude vertex-transitive even-sided polygons that alternate two different lengths of edges). This is a generalization of the older category of semiregular polytopes, but also includes the regular polytopes. Further, star regular faces and vertex figures (star polygons) are allowed, which greatly expand the possible solutions.