Regular skew apeirohedron geometry , a regular skew apeirohedron is an infinite regular skew polyhedron , with either skew regular faces or skew regular vertex figures .History According to Coxeter , in 1926 John Flinders Petrie generalized the concept of regular skew polygons to finite regular skew polyhedra in 4-dimensions, and infinite regular skew apeirohedra in 3-dimensions.planar faces and skew vertex figures, two are complements of each other. They are all named with a modified Schläfli symbol , where there are l -gonal faces, m faces around each vertex, with holes identified as n -gonal missing faces.Schläfli symbol for these figures, with implying the vertex figure , m l-gons around a vertex, and n -gonal holes. Their vertex figures are skew polygons, zig-zagging between two planes.skew polyhedra , represented by, follow this equation:John Conway named them mucube, muoctahedron, and mutetrahedron respectively for multiple cube , octahedron, and tetrahedron .Mucube : : 6 squares on a vertex Muoctahedron : : 4 hexagons on a vertex Mutetrahedron : : 6 hexagons on a vertex extended chiral symmetry + ] which he says is isomorphic to his abstract group . The related honeycomb has the extended symmetry Regular skew apeirohedra in [hyperbolic 3-space regular skew polygon vertex figures, found in a similar search to the 3 above from Euclidean space .hyperbolic space , constructed from the symmetry of a subset of linear and cyclic Coxeter groups graphs of the form regular skew polyhedra and dual. For the special case of linear graph groups r = 2, this represents the Coxeter group . It generates regular skews and. All of these exist as a subset of faces of the convex uniform honeycombs in hyperbolic space .shares the same antiprism vertex figure with the honeycomb, but only the zig-zag edge faces of the vertex figure are realized , while the other faces make "holes".Coxeter Apeirohedron Face Hole Honeycomb Vertex Apeirohedron Face Hole Honeycomb Vertex 0,3 0,3
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