Binary cyclic group explained

In mathematics, the binary cyclic group of the n-gon is the cyclic group of order 2n,

C_2n

, thought of as an extension of the cyclic group

C_n

by a cyclic group of order 2. Coxeter writes the binary cyclic group with angle-brackets, ⟨n⟩, and the index 2 subgroup as (n) or [''n'']⁺.

It is the binary polyhedral group corresponding to the cyclic group.^[1]

In terms of binary polyhedral groups, the binary cyclic group is the preimage of the cyclic group of rotations (

C_n<\operatorname{SO}(3)

) under the 2:1 covering homomorphism

\operatorname{Spin}(3)\to\operatorname{SO}(3)

of the special orthogonal group by the spin group.

As a subgroup of the spin group, the binary cyclic group can be described concretely as a discrete subgroup of the unit quaternions, under the isomorphism

\operatorname{Spin}(3)\cong\operatorname{Sp}(1)

where Sp(1) is the multiplicative group of unit quaternions. (For a description of this homomorphism see the article on quaternions and spatial rotations.)

Presentation

The binary cyclic group can be defined as the set of

^th roots of unity—that is, the set

	k
\left\{\omega
	n

| k\in\{0,1,2,...,2n-1\}\right\}

, where

\omega_n=e^i\pi/n=\cos

	\pi
	n

+i\sin

	\pi
	n

using multiplication as the group operation.

Binary cyclic group explained

Presentation

See also

Notes and References