Classification of wallpaper groups: Difference between revisions

Latest revision as of 12:21, 16 August 2025

Statement

This article completely classifies all the space groups in two dimensions, also called the wallpaper groups. The classification up to affine space type is the same as the classification up to crystallographic space type, and there are a total of seventeen types.

The seventeen types are as follows:

IUC name	Description of non-translation generators	Point group	Splits	Full automorphism group	Orientation-preserving
$p 1$	None	Trivial	Yes	No	Yes
$p g$	Glide reflection	Two-element group generated by reflection	No	No	No
$p m$	Reflection	Two-element group generated by reflection	Yes	No	No
$c m$	Reflection	Two-element group generated by reflection	Yes	No	No
$p 2$	Rotation by $π$	Two-element group generated by $π$ -rotation	Yes	Yes	Yes
$p m g$	Reflection and rotation by $π$ with rotation center off reflection axis	Klein four-group generated by two reflections	No	No	No
$c m m$	Two orthogonal reflections	Klein four-group generated by two reflections	Yes	Yes	No
$p m m$	Two orthogonal reflections	Klein four-group generated by two reflections	Yes	Yes	No
$p g g$	Rotation by $π$ , glide reflection	Klein four-group generated by two reflections	No	No	No
$p 4$	Rotation by $π / 2$	Four-element group generated by $π / 2$ -rotation	Yes	No	Yes
$p 4 m$	Rotation by $π / 2$ , reflection	Dihedral group of order eight	Yes	Yes	No
$p 4 g$	Rotation by $π / 2$ , glide reflection	Dihedral group of order eight	No	No	No
$p 3$	Rotation by $2 π / 3$	Three-element group generated by rotation	Yes	No	Yes
$p 3 m 1$	Rotation by $2 π / 3$ , reflection in the axis orthogonal to a shortest translation	Dihedral group of order six	Yes	No	No
$p 31 m$	Rotation by $2 π / 3$ , reflection in the axis parallel to a shortest translation	Dihedral group of order six	Yes	No	No
$p 6$	Rotation by $π / 3$	Six-element group generated by rotation	Yes	No	Yes
$p 6 m$	Rotation by $π / 3$ , reflection	Dihedral group:D12	Yes	Yes	No

Facts used

Crystallographic restriction: This is the main lemma used in the classification, and it states that if a lattice possesses a nontrivial rotational symmetry, then it is spanned by two shortest vectors of equal length at an angle of $π / 2, π / 3, 2 π / 3$ . Note that the case of $π / 3$ and $2 π / 3$ gives equivalent lattices.

@@ Line 10: / Line 10: @@
 | <math>p1</math> || None || Trivial || Yes || No || Yes
 |-
-| <math>pg</math> || Glide reflection || Two-element subgroup generated by reflection || No || No || No
+| <math>pg</math> || Glide reflection || [[Cyclic group:Z2|Two-element group]] generated by reflection || No || No || No
 |-
-| <math>pm</math> || Reflection || [[Cyclic group:Z2|Two-element]] subgroup generated by reflection || Yes || No || No
+| <math>pm</math> || Reflection || [[Cyclic group:Z2|Two-element group]] generated by reflection || Yes || No || No
 |-
-| <math>cm</math> || Reflection and glide reflection || [[Klein four-group]] generated by two reflections || No || No || No
+| <math>cm</math> || Reflection || [[Cyclic group:Z2|Two-element group]] generated by reflection || Yes || No || No
 |-
-| <math>p2</math> || Rotation by <math>\pi</math> || [[Cyclic group:Z2|Two-element]] subgroup generated by <math>\pi</math>-rotation || Yes || Yes || Yes
+| <math>p2</math> || Rotation by <math>\pi</math> || [[Cyclic group:Z2|Two-element group]] generated by <math>\pi</math>-rotation || Yes || Yes || Yes
 |-
-| <math>pmg</math> || Reflection and rotation by <math>\pi</math> || [[Klein four-group]] generated by two reflections || No || No || No
+| <math>pmg</math> || Reflection and rotation by <math>\pi</math> with rotation center off reflection axis|| [[Klein four-group]] generated by two reflections || No || No || No
 |-
-| <math>cmm</math> || Reflection, rotation by <math>\pi</math> with rotation center off reflection axis|| [[Klein four-group]] generated by two reflections || No || No || No
+| <math>cmm</math> || Two orthogonal reflections || [[Klein four-group]] generated by two reflections || Yes || Yes || No
 |-
 | <math>pmm</math> || Two orthogonal reflections || [[Klein four-group]] generated by two reflections || Yes || Yes || No
@@ Line 26: / Line 26: @@
 | <math>pgg</math> || Rotation by <math>\pi</math>, glide reflection || [[Klein four-group]] generated by two reflections || No || No || No
 |-
-| <math>p4</math> || Rotation by <math>\pi/2</math> || [[Cyclic group:Z4|Four-element]] subgroup generated by <math>\pi/2</math>-rotation || Yes || No || Yes
+| <math>p4</math> || Rotation by <math>\pi/2</math> || [[Cyclic group:Z4|Four-element group]] generated by <math>\pi/2</math>-rotation || Yes || No || Yes
 |-
-|- <math>p4m</math> || Rotation by <math>\pi/2</math>, Reflection || [[Dihedral group:D8|Dihedral group of order eight]] || Yes || Yes
+| <math>p4m</math> || Rotation by <math>\pi/2</math>, reflection || [[Dihedral group:D8|Dihedral group of order eight]] || Yes || Yes || No
 |-
-| <math>p4g</math> || Rotation by <math>\pi/2</math>, Reflection || [[Dihedral group:D8|Dihedral group of order eight]] || No || No || No
+| <math>p4g</math> || Rotation by <math>\pi/2</math>, glide reflection || [[Dihedral group:D8|Dihedral group of order eight]] || No || No || No
 |-
-| <math>p3</math> || Rotation by <math>2\pi/3</math> || [[Cyclic group:Z3|Three-element subgroup]] generated by rotation || Yes || No || Yes
+| <math>p3</math> || Rotation by <math>2\pi/3</math> || [[Cyclic group:Z3|Three-element group]] generated by rotation || Yes || No || Yes
 |-
-| <math>p3m1</math> || Rotation by <math>2\pi/3</math>, Reflection || [[Symmetric group:S3|Dihedral group of order six]] || Yes || No || No
+| <math>p3m1</math> || Rotation by <math>2\pi/3</math>, reflection in the axis orthogonal to a shortest translation || [[Symmetric group:S3|Dihedral group of order six]] || Yes || No || No
 |-
-| <math>p31m</math> || Rotation by <math>2\pi/3</math>, Reflection, with rotation center off reflection axis|| [[Symmetric group:S3|Dihedral group of order six]] || No || No || No
+| <math>p31m</math> || Rotation by <math>2\pi/3</math>, reflection in the axis parallel to a shortest translation || [[Symmetric group:S3|Dihedral group of order six]] || Yes || No || No
 |-
-| <math>p6</math> || Rotation by <math>\pi/3</math> || [[Cyclic group:Z6|Six-element]] subgroup generated by rotation || Yes || No
+| <math>p6</math> || Rotation by <math>\pi/3</math> || [[Cyclic group:Z6|Six-element group]] generated by rotation || Yes || No || Yes
 |-
-| <math>p6m</math> || Rotation by <math>\pi/3</math>, Reflection || [[Dihedral group:D12]] || Yes || Yes || No
+| <math>p6m</math> || Rotation by <math>\pi/3</math>, reflection || [[Dihedral group:D12]] || Yes || Yes || No
 |}