Dihedron
[dahy-hee-druhn]
| Set of regular p-gonal dihedrons | |||
|---|---|---|---|
Example hexagonal dihedron on a sphere | |||
| Type | Regular polyhedron or spherical tiling | ||
| Faces | 2 p-gons | ||
| Edges | p | ||
| Vertices | p | ||
| Schläfli symbol | {p,2} | ||
| Vertex configuration | p2 | ||
| Coxeter–Dynkin diagram | - | Wythoff symbol | 2 | p 2 |
| Symmetry group | Dihedral (Dph) | ||
| Dual polyhedron | hosohedron | ||
Usually a regular dihedron is implied (two regular polygons) and this gives it a Schläfli symbol as {n, 2}.
The dual of a n-gonal dihedron is the n-gonal hosohedron, where n digon faces share two vertices.
As a polyhedron
A dihedron can be considered a degenerate prism consisting of two (planar) n-sided polygons connected "back-to-back", so that the resulting object has no depth.
From a Wythoff construction on dihedral symmetry, a truncation operation on a regular {n,2} dihedron transforms it into a 4.4.n n-prism.
As a tiling on a sphere
As a spherical tiling, a dihedron can exist as nondegenerate form, with two n-sided faces covering the sphere, each face being a hemisphere, and vertices around a great circle. (It is regular if the vertices are equally spaced.)The regular polyhedron {2,2} is self-dual, and is both a hosohedron and a dihedron.
Regular dihedron examples: (spherical tilings)
Ditopes
A ditope is an n-dimensional analogue of a dihedron, with Schläfli symbol {p,2,...,2}. It has two facets which share all ridges in common.
See also
References
- Coxeter, H.S.M; Regular Polytopes (third edition). Dover Publications Inc. ISBN 0-486-61480-8
This article is licensed under the GNU Free Documentation License.
Last updated on Wednesday July 23, 2008 at 19:41:14 PDT (GMT -0700)
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