User:Jim.belk/Generalized Dihedral Group Draft

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This is a rough draft of a proposed article on generalized dihedral groups. Most of this content currently appears in the main dihedral groups article.

In mathematics, the generalized dihedral group Dih(H) associated to an abelian group H is the semidirect product of H and a cyclic group of order 2, the latter acting on the former by negation.

$0 \rightarrow H \rightarrow \mathrm{Dih}(H) \rightarrow \mathbb{Z}_2 \rightarrow 0$

Elements of Dih(H) can be written as pairs (h, ε), where h ∈ H and ε = ±1, with the following rule for multiplication:

$(h,\epsilon)(h^\prime,\epsilon^\prime) = (h + \epsilon h^\prime, \epsilon \epsilon^\prime)$

Note that each element of the form (h, –1) is its own inverse.

[edit] Examples

Dih(Z_n) is the dihedral group D_n.
Dih(Z) is the infinite dihedral group.
If S¹ denotes the circle group, then Dih(S¹) is the orthogonal group O(2).
More generally, Dih(SO(n)) is the orthogonal group O(n).
Dih(R) is the full isometry group of the line.
Dih(Rⁿ) is the point reflection group consisting of all translations and point reflections of Rⁿ.
If H is a lattice in Rⁿ, then Dih(H) the subgroup of elements of Dih(Rⁿ) that leave the lattice invariant.
- If H is a one-dimensional lattice in R², then Dih(H) is a frieze group of type ∞∞ or type 22∞.
- If H is a two-dimensional lattice in R², then Dih(H) is a wallpaper group type p1 and p2.
- If H is a three-dimensional lattice in R³, then Dih(H) is the space group of a triclinic crystal system.
If H has exponent 2, then Dih(H) ≅ H × Z₂.

User:Jim.belk/Generalized Dihedral Group Draft

From Wikipedia, the free encyclopedia

[edit] Examples

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