Digon

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In geometry a digon is a degenerate polygon with two sides (edges) and two vertices.

A digon must be regular because its two edges are the same length. It has Schläfli symbol {2}.

Contents 1 In spherical tilings 2 In polyhedra 3 See also 4 References

[edit] In spherical tilings

In Euclidean geometry a digon is always degenerate. However, in spherical geometry a nondegenerate digon (with a nonzero interior area) can exist if the vertices are antipodal. The internal angle of the spherical digon vertex can be any angle between 0 and 180 degrees. Such a spherical polygon can also be called a lune.

One antipodal digon on the sphere.

Six antipodal digon faces on a hexagonal hosohedron tiling on the sphere.

[edit] In polyhedra

A digon is considered degenerate face of a polyhedron because it has no geometric area and overlapping edges, but it can sometimes have a useful topological existence in transforming polyhedra.

Any polyhedron can be topologically modified by replacing an edge with a digon. Such an operation adds one edge and one face to the polyhedron, although the result is geometrically identical. This transformation has no effect on the Euler characteristic (χ=V-E+F).

A digon face can also be created by geometrically collapsing a quadrilateral face by moving pairs of vertices to coincide in space. This digon can then be replaced by a single edge. It loses one face, two vertices, and three edges, again leaving the Euler characteristic unchanged.

Classes of polyhedra can be derived as degenerate forms of a primary polyhedron, with faces sometimes being degenerated into coinciding vertices. For example, this class of 7 uniform polyhedron with octahedral symmetry exist as degenerate forms of the great rhombicuboctahedron (4.6.8). This principle is used in the Wythoff construction.

4.4.4

3.8.8

3.4.3.4

4.6.6

3.3.3.3

3.4.4.4

4.6.8

[edit] See also

• Dihedron - a degenerate polyhedron with 2 faces.
• Hosohedron - a degenerate polyhedron with 2 vertices.

[edit] References

• Eric W. Weisstein, Digon at MathWorld.
• A.B. Ivanov (2001), “Digon”, in Hazewinkel, Michiel, Encyclopaedia of Mathematics, Kluwer Academic Publishers, ISBN 978-1556080104 

It has been suggested that this article or section be merged with Polygons. (Discuss)

v • d • e Polygons Listed by number of sides 1-10 sides Henagon (Monogon) · Digon · Triangle (Trigon) · Quadrilateral (Tetragon) · Pentagon · Hexagon  · Heptagon  · Octagon  · Nonagon (Enneagon)  · Decagon 11-20 sides Hendecagon  · Dodecagon  · Triskaidecagon  · Tetradecagon  · Pentadecagon  · Hexadecagon  · Heptadecagon  · Octadecagon  · Nonadecagon(Enneadecagon)  · Icosagon Other Chiliagon  · Myriagon