Infinite dihedral group

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p1m1, (*∞∞)	p2, (22∞)	p2mg, (2*∞)
In 2-dimensions three frieze groups p1m1, p2, and p2mg are isomorphic to the Dih∞ group. They all have 2 generators. The first has two parallel reflection lines, the second two 2-fold gyrations, and the last has one mirror and one 2-fold gyration.

In mathematics, the infinite dihedral group Dih_∞ is an infinite group with properties analogous to those of the finite dihedral groups.

In two-dimensional geometry, the infinite dihedral group represents the frieze group symmetry, p1m1, seen as an infinite set of parallel reflections along an axis.

Every dihedral group is generated by a rotation r and a reflection; if the rotation is a rational multiple of a full rotation, then there is some integer n such that rⁿ is the identity, and we have a finite dihedral group of order 2n. If the rotation is not a rational multiple of a full rotation, then there is no such n and the resulting group has infinitely many elements and is called Dih_∞. It has presentations

${\displaystyle \langle r,s\mid s^{2}=1,srs=r^{-1}\rangle \,\!}$

${\displaystyle \langle x,y\mid x^{2}=y^{2}=1\rangle \,\!}$^[1]

and is isomorphic to a semidirect product of Z and Z/2, and to the free product Z/2 * Z/2. It is the automorphism group of the graph consisting of a path infinite to both sides. Correspondingly, it is the isometry group of Z (see also symmetry groups in one dimension), the group of permutations α: Z → Z satisfying |i − j| = |α(i) − α(j)|, for all i', j in Z.^[2]

The infinite dihedral group can also be defined as the holomorph of the infinite cyclic group.

An example of infinite dihedral symmetry is in aliasing of real-valued signals.

When sampling a function at frequency f_s (intervals 1/f_s), the following functions yield identical sets of samples: {sin(2π( f + Nf_s) t + φ), N = 0, ±1, ±2, ±3, . . . }. Thus, the detected value of frequency f is periodic, which gives the translation element r = f_s. The functions and their frequencies are said to be aliases of each other. Noting the trigonometric identity:

${\displaystyle \sin(2\pi (f+Nf_{s})t+\varphi )={\begin{cases}+\sin(2\pi (f+Nf_{s})t+\varphi ),&f+Nf_{s}\geq 0,\\[4pt]-\sin(2\pi |f+Nf_{s}|t-\varphi ),&f+Nf_{s}<0,\end{cases}}}$

we can write all the alias frequencies as positive values: ${\textstyle |f+Nf_{s}|}$. This gives the reflection (f) element, namely f ↦ −f.  For example, with f = 0.6f_s  and  N = −1,  f + Nf_s = −0.4f_s  reflects to  0.4f_s, resulting in the two left-most black dots in the figure.^{[note 1]}  The other two dots correspond to N = −2  and  N = 1. As the figure depicts, there are reflection symmetries, at 0.5f_s,  f_s,  1.5f_s,  etc.  Formally, the quotient under aliasing is the orbifold [0, 0.5f_s], with a Z/2 action at the endpoints (the orbifold points), corresponding to reflection.

• The orthogonal group O(2), another infinite generalization of the finite dihedral groups
• The affine symmetric group, a family of groups including the infinite dihedral group