The surface of a sphere may be divided by line segments into bounded regions, to form a spherical
tiling or 'spherical polyhedron'. Much of the theory of symmetrical
polyhedra is most conveniently derived in this way.
Spherical polyhedra have a long and respectable history:
★ The first known man-made polyhedra are spherical polyhedra carved in stone. Many have been found in
Scotland, and appear to date from the
neolithic period (the New Stone Age).
★ Two hundred years ago, at the start of the
19th Century,
Poinsot used spherical polyhedra to discover the four
regular star polyhedra.
★ In the middle of the
20th Century,
Coxeter used them to enumerate all but one of the
uniform polyhedra, through the construction of kaleidoscopes (
Wythoff construction).
Some polyhedra, such as the '
hosohedra' and their
duals the '
dihedra', exist as spherical polyhedra but have no flat-faced analogue. In the examples below, {2, 6} is a hosohedron and {6, 2} is the dual dihedron.
Examples
All the
regular and
semiregular polyhedra can be projected onto the sphere as tilings. Given by their
Schläfli symbol {p, q} or
vertex figure (a.b.c. ...):
{| class="wikitable"
|-
|Tetrahedral
(3 3 2)
|
{3,3}
|
(3.6.6)
|
(3.3.3.3)
|
(3.6.6)
|
{3,3}
|
(3.4.3.4)
|
(4.6.6)
|-
|Octahedral
(4 3 2)
|
{4,3}
|
(3.8.8)
|
(3.4.3.4)
|
(4.6.6)
|
{3,4}
|
(3.4.4.4)
|
(4.6.8)
|-
|Icosahedral
(5 3 2)
|
{5,3}
|
(3.10.10)
|
(3.5.3.5)
|
(5.6.6)
|
{3,5}
|
(3.4.5.4)
|
(4.6.10)
|-
|Dihedral
(6 2 2)
example
|
{6,2}
|
|
|
|
{2,6}
|
|}
See also
★
Spherical geometry
★
Spherical trigonometry
★
Polyhedra
References
★
L. Poinsot, Memoire sur les polygones et polyèdres. ''J. de l'École Polytechnique'' '9', (1810), pp. 16-48.
★
H.S.M. Coxeter, M.S. Longuet-Higgins, J.C.P. Miller, Uniform polyhedra, ''Phil. Trans.'' '246 A', (1954), pp. 401-50.
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