Point Groups in Two Dimensions - Discrete Groups

Discrete Groups

There are two families of discrete two-dimensional point groups, and they are specified with parameter n, which is the order of the group of the rotations in the group.

Intl refers to Hermann-Mauguin notation or international notation, often used in crystallography. In the infinite limit, these groups become the one-dimensional line groups.

If a group is a symmetry of a two-dimensional lattice or grid, then the crystallographic restriction theorem restricts the value of n to 1, 2, 3, 4, and 6 for both families. There are thus 10 two-dimensional crystallographic point groups:

C₁, C₂, C₃, C₄, C₆, D₁, D₂, D₃, D₄, D₆

The groups may be constructed as follows:

• C_n. Generated by an element also called C_n, which corresponds to a rotation by angle 2π/n. Its elements are E (the identity), C_n, C_n2, ..., C_nn-1, corresponding to rotation angles 0, 2π/n, 4π/n, ..., 2(n-1)π/n.
• D_n. Generated by element C_n and reflection σ. Its elements are the elements of group C_n, with elements σ, C_nσ, C_n2σ, ..., C_nn-1σ added. These additional ones correspond to reflections across lines with orientation angles 0, π/n, 2π/n, ..., (n-1)π/n. D_n is thus a semidirect product of C_n and the group (E,σ).

All of these groups have distinct abstract groups, except for C₂ and D₁, which share abstract group Z₂. All of the cyclic groups are abelian or commutative, but only two of the dihedral groups are: D₁ ~ Z₂ and D₂ ~ Z₂×Z₂. In fact, D₃ is the smallest nonabelian group.

For n even, the Hermann-Mauguin symbol nm is an abbreviation for the full symbol nmm, as explained below. The n in the H-M symbol denotes n-fold rotations, while the m denotes reflection or mirror planes.