Daftar grup simetri bola hingga

Grup titik dalam tiga dimensi

Simetri involusi
Cs, (*)
[ ] =

Simetri siklik
Cnv, (*nn)
[n] =

Simetri dihedral
Dnh, (*n22)
[n,2] =
Grup polihedral, [n,3], (*n32)

Simetri tetrahedral
Td, (*332)
[3,3] =

Simetri oktahedral
Oh, (*432)
[4,3] =

Simetri ikosahedral
Ih, (*532)
[5,3] =

Kelompok simetri bola hingga disebut juga kelompok titik dalam tiga dimensi. Terdapat lima kelas simetri fundamental yang memiliki domain fundamental segitiga: simetri dihedral, siklik, tetrahedral, oktahedral, dan ikosahedral.

Simetri konstitusional

Intl Geo
[1]
Orb. Schön. Con. Cox. Ord. Dom.
dasar
1 1 11 C1 C1 ][
[ ]+
1  
2 2 22 D1
= C2
D2
= C2
[2]+ 2  
1 22 × Ci
= S2
CC2 [2+,2+] 2  
2
= m
1 * Cs
= C1v
= C1h
±C1
= CD2
[ ] 2  

Simetri siklik

Intl Geo
Orb. Schön. Con. Cox. Ord. Dom.
dasar
4 42 S4 CC4 [2+,4+] 4  
2/m 22 2* C2h
= D1d
±C2
= ±D2
[2,2+]
[2+,2]
4  
Intl Geo
Orb. Schön. Con. Cox. Ord. Dom.
dasar
2
3
4
5
6
n
2
3
4
5
6
n
22
33
44
55
66
nn
C2
C3
C4
C5
C6
Cn
C2
C3
C4
C5
C6
Cn
[2]+
[3]+
[4]+
[5]+
[6]+
[n]+
2
3
4
5
6
n
 
2mm
3m
4mm
5m
6mm
nm (n is odd)
nmm (n is even)
2
3
4
5
6
n
*22
*33
*44
*55
*66
*nn
C2v
C3v
C4v
C5v
C6v
Cnv
CD4
CD6
CD8
CD10
CD12
CD2n
[2]
[3]
[4]
[5]
[6]
[n]
4
6
8
10
12
2n
 
3
8
5
12
-
62
82
10.2
12.2
2n.2




S6
S8
S10
S12
S2n
±C3
CC8
±C5
CC12
CC2n / ±Cn
[2+,6+]
[2+,8+]
[2+,10+]
[2+,12+]
[2+,2n+]
6
8
10
12
2n
 
3/m=6
4/m
5/m=10
6/m
n/m
32
42
52
62
n2
3*
4*
5*
6*
n*
C3h
C4h
C5h
C6h
Cnh
CC6
±C4
CC10
±C6
±Cn / CC2n
[2,3+]
[2,4+]
[2,5+]
[2,6+]
[2,n+]
6
8
10
12
2n
 
  1. ^ The Crystallographic Space groups in Geometric algebra, D. Hestenes and J. Holt, Journal of Mathematical Physics. 48, 023514 (2007) (22 pages) PDF [1]