Star polygon

Two types of star pentagons

{5/2}

|5/2|
A regular star pentagon, {5/2}, has five corner vertices and intersecting edges, while concave decagon, |5/2|, has with ten edges and two sets of five vertices. The first are used in definitions of star polyhedra, while the second are used in planar tilings.

Small stellated dodecahedron

Tessellation

In geometry, a star polygon (not to be confused with a star-shaped polygon) is a concave polygon. Only the regular star polygons have been studied in any depth; star polygons in general appear not to have been formally defined.

Branko Grünbaum identified two primary definitions used by Kepler, one being the regular star polygons with intersecting edges that don't generate new vertices, and a second are simple isotoxal concave polygons.[1]

The first usage is included in polygrams which includes polygons like the pentagram but also compound figures like the hexagram.

Etymology

Star polygon names combine a numeral prefix, such as penta-, with the Greek suffix -gram (in this case generating the word pentagram). The prefix is normally a Greek cardinal, but synonyms using other prefixes exist. For example, a nine-pointed polygon or enneagram is also known as a nonagram, using the ordinal nona from Latin. The -gram suffix derives from γραμμή (grammḗ) meaning a line.[2]

Regular star polygon


{5/2}

{7/2}

{7/3}...

A "regular star polygon" is a self-intersecting, equilateral equiangular polygon, created by connecting one vertex of a simple, regular, p-sided polygon to another, non-adjacent vertex and continuing the process until the original vertex is reached again.[3] Alternatively for integers p and q, it can be considered as being constructed by connecting every qth point out of p points regularly spaced in a circular placement.[4] For instance, in a regular pentagon, a five-pointed star can be obtained by drawing a line from the first to the third vertex, from the third vertex to the fifth vertex, from the fifth vertex to the second vertex, from the second vertex to the fourth vertex, and from the fourth vertex to the first vertex.

A regular star polygon is denoted by its Schläfli symbol {p/q}, where p and q are relatively prime (they share no factors) and q ≥ 2.

The symmetry group of {n/k} is dihedral group Dn of order 2n, independent of k.

A regular star polygon can also be obtained as a sequence of stellations of a convex regular core polygon.

Regular star polygons were first studied systematically by Thomas Bradwardine, and later Kepler.[5]

Degenerate regular star polygons

If p and q are not coprime, a degenerate polygon will result with coinciding vertices and edges. For example {6/2} will appear as a triangle, but can be labeled with two sets of vertices 1-6. This should be seen not as two overlapping triangles, but a double-winding of a single unicursal hexagon.[6][7]

Simple isotoxal star polygons

When the intersecting lines are removed, the star polygons are no longer regular, but can be seen as simple concave isotoxal 2n-gons, alternating vertices at two different radii, which do not necessarily have to match the regular star polygon angles. Branko Grünbaum in Tilings and Patterns represents these stars as |n/d| that match the geometry of polygram {n/d} with a notation {nα} more generally, representing an n-sided star with each internal angle α<180°(1-2/n) degrees.[1] For |n/d|, the inner vertices have an exterior angle, β, as 360°(d-1)/n.

Simple isotoxal star examples
|n/d|
{nα}
 
{330°}
 
{630°}
|5/2|
{536°}
 
{445°}
|8/3|
{845°}
|6/2|
{660°}
 
{572°}
α 30° 36° 45° 60° 72°
β 150° 90° 72° 135° 90° 120° 144°
Isotoxal
star
Related
polygram
 
{n/d}

{12/5}

{5/2}

{8/3}

{6/2}

{10/3}

These polygons are often seen in tiling patterns. The parametric angle α (degrees or radians) can be chosen to match internal angles of neighboring polygons in a tessellation pattern. Johannes Kepler in his 1619 work Harmonices Mundi, including among other period tilings, nonperiodic tilings like that three regular pentagons, and a regular star pentagon (5.5.5.5/2) can fit around a vertex, and related to modern penrose tilings.[8]

Example tilings with isotoxal star polygons[9]
Star triangles Star squares Star hexagons Star octagons

(3.3*
α
.3.3**
α
)

(8.4*
π/4
.8.4*
π/4
)

(6.6*
π/3
.6.6*
π/3
)

(6.6*
π/3
.6.6*
π/3
)

Not edge-to-edge

Interiors of star polygons

The interior of a star polygon may be treated in different ways. Three such treatments are illustrated for a pentagram. Branko Grunbaum and Geoffrey Shephard consider two of them, as regular star polygons and concave isogonal 2n-gons.[8]

These include:

When the area of the polygon is calculated, each of these approaches yields a different answer.

Star polygons in art and culture

Star polygons feature prominently in art and culture. Such polygons may or may not be regular but they are always highly symmetrical. Examples include:


An {8/3} octagram constructed in a regular octagon

Seal of Solomon (with circle and dots)

See also

References

  1. 1 2 Grünbaum & Shephard 1987, section 2.5
  2. γραμμή, Henry George Liddell, Robert Scott, A Greek-English Lexicon, on Perseus
  3. Coxeter, Harold Scott Macdonald (1973). Regular polytopes. Courier Dover Publications. p. 93. ISBN 978-0-486-61480-9.
  4. Weisstein, Eric W., "Star Polygon", MathWorld.
  5. Coxeter, Introduction to Geometry, second edition, 2.8 Star polygons p.36-38
  6. Are Your Polyhedra he Same as My Polyhedra? Branko Grunbaum
  7. Coxeter, The Densities of the Regular polytopes I, p.43: If d is odd, the truncation of the polygon {p/q} is naturally {2n/d}. But if not, it consistents of two coincident {n/(d/2)}'s; two, because each side arises from an original side and once from an original vertex. Thus the density of a polygon is unaltered by truncation.
  8. 1 2 Branko Grunbaum and Geoffrey C. Shephard, Tilings by Regular Polygons, Mathematics Magazine 50 (1977), 227–247 and 51 (1978), 205–206]
  9. Tiling with Regular Star Polygons, Joseph Myers
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