Dihedral group


In mathematics, a dihedral group is the group of symmetries of a regular polygon, which includes rotations and reflections. Dihedral groups are among the simplest examples of finite groups, and they play an important role in group theory, geometry, and chemistry.
The notation for the dihedral group differs in geometry and abstract algebra. In geometry, or refers to the symmetries of the n-gon, a group of order. In abstract algebra, refers to this same dihedral group. The geometric convention is used in this article.

Definition

Elements

A regular polygon with sides has different symmetries: rotational symmetries and reflection symmetries. Usually, we take here. The associated rotations and reflections make up the dihedral group. If is odd, each axis of symmetry connects the midpoint of one side to the opposite vertex. If is even, there are axes of symmetry connecting the midpoints of opposite sides and axes of symmetry connecting opposite vertices. In either case, there are axes of symmetry and elements in the symmetry group. Reflecting in one axis of symmetry followed by reflecting in another axis of symmetry produces a rotation through twice the angle between the axes.
The following picture shows the effect of the sixteen elements of on a stop sign:
The first row shows the effect of the eight rotations, and the second row shows the effect of the eight reflections, in each case acting on the stop sign with the orientation as shown at the top left.

Group structure

As with any geometric object, the composition of two symmetries of a regular polygon is again a symmetry of this object. With composition of symmetries to produce another as the binary operation, this gives the symmetries of a polygon the algebraic structure of a finite group.
The following Cayley table shows the effect of composition in the group D3. r0 denotes the identity; r1 and r2 denote counterclockwise rotations by 120° and 240° respectively, and s0, s1 and s2 denote reflections across the three lines shown in the adjacent picture.
r0r1r2s0s1s2-
r0r0r1r2s0s1s2
r1r1r2r0s1s2s0
r2r2r0r1s2s0s1
s0s0s2s1r0r2r1
s1s1s0s2r1r0r2
s2s2s1s0r2r1r0

For example,, because the reflection s1 followed by the reflection s2 results in a rotation of 120°. The order of elements denoting the composition is right to left, reflecting the convention that the element acts on the expression to its right. The composition operation is not commutative.
In general, the group Dn has elements r0,..., rn−1 and s0,..., sn−1, with composition given by the following formulae:
In all cases, addition and subtraction of subscripts are to be performed using modular arithmetic with modulus n.

Matrix representation

If we center the regular polygon at the origin, then elements of the dihedral group act as linear transformations of the plane. This lets us represent elements of Dn as matrices, with composition being matrix multiplication.
This is an example of a group representation.
For example, the elements of the group D4 can be represented by the following eight matrices:
In general, the matrices for elements of Dn have the following form:
rk is a rotation matrix, expressing a counterclockwise rotation through an angle of . sk is a reflection across a line that makes an angle of with the x-axis.

Other definitions

Further equivalent definitions of are:

Small dihedral groups

is isomorphic to, the cyclic group of order 2.
is isomorphic to, the Klein four-group.
and are exceptional in that:
The cycle graphs of dihedral groups consist of an n-element cycle and n 2-element cycles. The dark vertex in the cycle graphs below of various dihedral groups represents the identity element, and the other vertices are the other elements of the group. A cycle consists of successive powers of either of the elements connected to the identity element.
D1 = Z2D2 = Z22 = K4D3D4D5
D D × ZDD8D9D D × Z

D3 = S3D4

The dihedral group as symmetry group in 2D and rotation group in 3D

An example of abstract group, and a common way to visualize it, is the group of Euclidean plane isometries which keep the origin fixed. These groups form one of the two series of discrete point groups in two dimensions. consists of rotations of multiples of about the origin, and reflections across lines through the origin, making angles of multiples of with each other. This is the symmetry group of a regular polygon with sides.
is generated by a rotation of order and a reflection of order 2 such that
In geometric terms: in the mirror a rotation looks like an inverse rotation.
In terms of complex numbers: multiplication by and complex conjugation.
In matrix form, by setting
and defining and for we can write the product rules for Dn as
The dihedral group D2 is generated by the rotation r of 180 degrees, and the reflection s across the x-axis. The elements of D2 can then be represented as, where e is the identity or null transformation and rs is the reflection across the y-axis.
D2 is isomorphic to the Klein four-group.
For n > 2 the operations of rotation and reflection in general do not commute and Dn is not abelian; for example, in D4, a rotation of 90 degrees followed by a reflection yields a different result from a reflection followed by a rotation of 90 degrees.
Thus, beyond their obvious application to problems of symmetry in the plane, these groups are among the simplest examples of non-abelian groups, and as such arise frequently as easy counterexamples to theorems which are restricted to abelian groups.
The elements of can be written as,,,...,,,,,..., . The first listed elements are rotations and the remaining elements are axis-reflections. The product of two rotations or two reflections is a rotation; the product of a rotation and a reflection is a reflection.
So far, we have considered to be a subgroup of orthogonal group|, i.e. the group of rotations and reflections of the plane. However, notation is also used for a subgroup of SO which is also of abstract group type : the proper symmetry group of a regular polygon embedded in three-dimensional space. Such a figure may be considered as a degenerate regular solid with its face counted twice. Therefore, it is also called a dihedron, which explains the name dihedral group.

Examples of 2D dihedral symmetry

Properties

The properties of the dihedral groups with depend on whether is even or odd. For example, the center of consists only of the identity if n is odd, but if n is even the center has two elements, namely the identity and the element rn/2.
In the case of 2D isometries, this corresponds to adding inversion, giving rotations and mirrors in between the existing ones.
For n twice an odd number, the abstract group is isomorphic with the direct product of and.
Generally, if m divides n, then has n/m subgroups of type, and one subgroup ℤm. Therefore, the total number of subgroups of , is equal to d + σ, where d is the number of positive divisors of n and σ is the sum of the positive divisors of n. See list of small groups for the cases n ≤ 8.
The dihedral group of order 8 is the smallest example of a group that is not a T-group. Any of its two Klein four-group subgroups has as normal subgroup order-2 subgroups generated by a reflection in D4, but these subgroups are not normal in D4.

Conjugacy classes of reflections

All the reflections are conjugate to each other in case n is odd, but they fall into two conjugacy classes if n is even. If we think of the isometries of a regular n-gon: for odd n there are rotations in the group between every pair of mirrors, while for even n only half of the mirrors can be reached from one by these rotations. Geometrically, in an odd polygon every axis of symmetry passes through a vertex and a side, while in an even polygon there are two sets of axes, each corresponding to a conjugacy class: those that pass through two vertices and those that pass through two sides.
Algebraically, this is an instance of the conjugate Sylow theorem : for n odd, each reflection, together with the identity, form a subgroup of order 2, which is a Sylow 2-subgroup, while for n even, these order 2 subgroups are not Sylow subgroups because 4 divides the order of the group.
For n even there is instead an outer automorphism interchanging the two types of reflections.

Automorphism group

The automorphism group of is isomorphic to the holomorph of ℤ/nℤ, i.e., to and has order , where ϕ is Euler's totient function, the number of k in coprime to n.
It can be understood in terms of the generators of a reflection and an elementary rotation ; which automorphisms are inner and outer depends on the parity of n.
has 18 inner automorphisms. As 2D isometry group D9, the group has mirrors at 20° intervals. The 18 inner automorphisms provide rotation of the mirrors by multiples of 20°, and reflections. As isometry group these are all automorphisms. As abstract group there are in addition to these, 36 outer automorphisms; e.g., multiplying angles of rotation by 2.
has 10 inner automorphisms. As 2D isometry group D10, the group has mirrors at 18° intervals. The 10 inner automorphisms provide rotation of the mirrors by multiples of 36°, and reflections. As isometry group there are 10 more automorphisms; they are conjugates by isometries outside the group, rotating the mirrors 18° with respect to the inner automorphisms. As abstract group there are in addition to these 10 inner and 10 outer automorphisms, 20 more outer automorphisms; e.g., multiplying rotations by 3.
Compare the values 6 and 4 for Euler's totient function, the multiplicative group of integers modulo n for n = 9 and 10, respectively. This triples and doubles the number of automorphisms compared with the two automorphisms as isometries.
The only values of n for which φ = 2 are 3, 4, and 6, and consequently, there are only three dihedral groups that are isomorphic to their own automorphism groups, namely , , and .

Inner automorphism group

The inner automorphism group of is isomorphic to:
There are several important generalizations of the dihedral groups: