Binary cyclic group
In mathematics, the binary cyclic group of the n-gon is the cyclic group of order 2n, , thought of as an extension of the cyclic group 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 () under the 2:1 covering homomorphism
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 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:
See also
- binary dihedral group, ⟨2,2,n⟩, order 4n
- binary tetrahedral group, ⟨2,3,3⟩, order 24
- binary octahedral group, ⟨2,3,4⟩, order 48
- binary icosahedral group, ⟨2,3,5⟩, order 120
References
- Coxeter, H. S. M. (1959), "Symmetrical definitions for the binary polyhedral groups", Proc. Sympos. Pure Math., Vol. 1, Providence, R.I.: American Mathematical Society, pp. 64–87, MR 0116055.