This article summarizes the classes of discrete symmetry groups of the Euclidean plane. The symmetry groups are named here by three naming schemes: International notation, orbifold notation, and Coxeter notation. There are three kinds of symmetry groups of the plane:

• 2 families of rosette groups – 2D point groups
• 7 frieze groups – 2D line groups
• 17 wallpaper groups – 2D space 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.

More information Family, Intl (orbifold) ...

Family	Intl (orbifold)	Schön.	Geo [1] Coxeter	Order	Examples
Cyclic symmetry	n (n•)	Cn	n [n]+	n	C1, [ ]+ (•)	C2, [2]+ (2•)	C3, [3]+ (3•)	C4, [4]+ (4•)	C5, [5]+ (5•)	C6, [6]+ (6•)
Dihedral symmetry	nm (*n•)	Dn	n [n]	2n	D1, [ ] (*•)	D2, [2] (*2•)	D3, [3] (*3•)	D4, [4] (*4•)	D5, [5] (*5•)	D6, [6] (*6•)

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The 7 frieze groups, the two-dimensional line groups, with a direction of periodicity are given with five notational names. The Schönflies notation is given as infinite limits of 7 dihedral groups. The yellow regions represent the infinite fundamental domain in each.

More information IUC (orbifold), Geo ...

[1,∞], IUC (orbifold) Geo Schönflies Coxeter Fundamental domain Example p1m1 (*∞•) p1 C∞v [1,∞] sidle p1 (∞•) p1 C∞ [1,∞]+ hop [2,∞+], IUC (orbifold) Geo Schönflies Coxeter Fundamental domain Example p11m (∞*) p. 1 C∞h [2,∞+] jump p11g (∞×) p.g1 S2∞ [2+,∞+] step

[2,∞], IUC (orbifold) Geo Schönflies Coxeter Fundamental domain Example p2mm (*22∞) p2 D∞h [2,∞] spinning jump p2mg (2*∞) p2g D∞d [2+,∞] spinning sidle p2 (22∞) p2 D∞ [2,∞]+ spinning hop

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The 17 wallpaper groups, with finite fundamental domains, are given by International notation, orbifold notation, and Coxeter notation, classified by the 5 Bravais lattices in the plane: square, oblique (parallelogrammatic), hexagonal (equilateral triangular), rectangular (centered rhombic), and rhombic (centered rectangular).

The p1 and p2 groups, with no reflectional symmetry, are repeated in all classes. The related pure reflectional Coxeter group are given with all classes except oblique.

More information IUC(Orb.) Geo, Coxeter ...

Square [4,4], IUC (Orb.) Geo Coxeter Domain Conway name p1 (°) p1 Monotropic p2 (2222) p2 [4,1+,4]+ [1+,4,4,1+]+ Ditropic pgg (22×) pg2g [4+,4+] Diglide pmm (*2222) p2 [4,1+,4] [1+,4,4,1+] Discopic cmm (2*22) c2 [(4,4,2+)] Dirhombic p4 (442) p4 [4,4]+ Tetratropic p4g (4*2) pg4 [4+,4] Tetragyro p4m (*442) p4 [4,4] Tetrascopic

Rectangular [∞h,2,∞v], IUC (Orb.) Geo Coxeter Domain Conway name p1 (°) p1 [∞+,2,∞+] Monotropic p2 (2222) p2 [∞,2,∞]+ Ditropic pg(h) (××) pg1 h: [∞+,(2,∞)+] Monoglide pg(v) (××) pg1 v: [(∞,2)+,∞+] Monoglide pgm (22*) pg2 h: [(∞,2)+,∞] Digyro pmg (22*) pg2 v: [∞,(2,∞)+] Digyro pm(h) (**) p1 h: [∞+,2,∞] Monoscopic pm(v) (**) p1 v: [∞,2,∞+] Monoscopic pmm (*2222) p2 [∞,2,∞] Discopic

Rhombic [∞h,2+,∞v], IUC (Orb.) Geo Coxeter Domain Conway name p1 (°) p1 [∞+,2+,∞+] Monotropic p2 (2222) p2 [∞,2+,∞]+ Ditropic cm(h) (*×) c1 h: [∞+,2+,∞] Monorhombic cm(v) (*×) c1 v: [∞,2+,∞+] Monorhombic pgg (22×) pg2g [((∞,2)+)[2]] Diglide cmm (2*22) c2 [∞,2+,∞] Dirhombic Parallelogrammatic (oblique) p1 (°) p1 Monotropic p2 (2222) p2 Ditropic

Hexagonal/Triangular [6,3], / [3[3]], IUC (Orb.) Geo Coxeter Domain Conway name p1 (°) p1 Monotropic p2 (2222) p2 [6,3]Δ Ditropic cmm (2*22) c2 [6,3]⅄ Dirhombic p3 (333) p3 [1+,6,3+] [3[3]]+ Tritropic p3m1 (*333) p3 [1+,6,3] [3[3]] Triscopic p31m (3*3) h3 [6,3+] Trigyro p6 (632) p6 [6,3]+ Hexatropic p6m (*632) p6 [6,3] Hexascopic

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• List of spherical symmetry groups
• Orbifold notation#Hyperbolic plane - Hyperbolic symmetry groups