Core dictionary version 3.0.14
_space_group.name_Schoenflies
Name:_space_group.name_Schoenflies
Definition:
The Schoenflies symbol as listed in International Tables for
Crystallography Volume A denoting the proper affine class (i.e.
orientation-preserving affine class) of space groups
(space-group type) to which the space group belongs. This
symbol defines the space-group type independently of the
coordinate system in which the space group is expressed.
The symbol is given with a period, '.', separating the
Schoenflies point group and the superscript.
Ref: International Tables for Crystallography (2002). Volume A,
Space-group symmetry, edited by Th. Hahn, 5th ed.
Dordrecht: Kluwer Academic Publishers.
Example:| C2h.5 | Schoenflies symbol for space group No. 14 |
Type: Code
The data value must be one of the following:
|
C1.1 |
|
Ci.1 |
|
C2.1 |
|
C2.2 |
|
C2.3 |
|
Cs.1 |
|
Cs.2 |
|
Cs.3 |
|
Cs.4 |
|
C2h.1 |
|
C2h.2 |
|
C2h.3 |
|
C2h.4 |
|
C2h.5 |
|
C2h.6 |
|
D2.1 |
|
D2.2 |
|
D2.3 |
|
D2.4 |
|
D2.5 |
|
D2.6 |
|
D2.7 |
|
D2.8 |
|
D2.9 |
|
C2v.1 |
|
C2v.2 |
|
C2v.3 |
|
C2v.4 |
|
C2v.5 |
|
C2v.6 |
|
C2v.7 |
|
C2v.8 |
|
C2v.9 |
|
C2v.10 |
|
C2v.11 |
|
C2v.12 |
|
C2v.13 |
|
C2v.14 |
|
C2v.15 |
|
C2v.16 |
|
C2v.17 |
|
C2v.18 |
|
C2v.19 |
|
C2v.20 |
|
C2v.21 |
|
C2v.22 |
|
D2h.1 |
|
D2h.2 |
|
D2h.3 |
|
D2h.4 |
|
D2h.5 |
|
D2h.6 |
|
D2h.7 |
|
D2h.8 |
|
D2h.9 |
|
D2h.10 |
|
D2h.11 |
|
D2h.12 |
|
D2h.13 |
|
D2h.14 |
|
D2h.15 |
|
D2h.16 |
|
D2h.17 |
|
D2h.18 |
|
D2h.19 |
|
D2h.20 |
|
D2h.21 |
|
D2h.22 |
|
D2h.23 |
|
D2h.24 |
|
D2h.25 |
|
D2h.26 |
|
D2h.27 |
|
D2h.28 |
|
C4.1 |
|
C4.2 |
|
C4.3 |
|
C4.4 |
|
C4.5 |
|
C4.6 |
|
S4.1 |
|
S4.2 |
|
C4h.1 |
|
C4h.2 |
|
C4h.3 |
|
C4h.4 |
|
C4h.5 |
|
C4h.6 |
|
D4.1 |
|
D4.2 |
|
D4.3 |
|
D4.4 |
|
D4.5 |
|
D4.6 |
|
D4.7 |
|
D4.8 |
|
D4.9 |
|
D4.10 |
|
C4v.1 |
|
C4v.2 |
|
C4v.3 |
|
C4v.4 |
|
C4v.5 |
|
C4v.6 |
|
C4v.7 |
|
C4v.8 |
|
C4v.9 |
|
C4v.10 |
|
C4v.11 |
|
C4v.12 |
|
D2d.1 |
|
D2d.2 |
|
D2d.3 |
|
D2d.4 |
|
D2d.5 |
|
D2d.6 |
|
D2d.7 |
|
D2d.8 |
|
D2d.9 |
|
D2d.10 |
|
D2d.11 |
|
D2d.12 |
|
D4h.1 |
|
D4h.2 |
|
D4h.3 |
|
D4h.4 |
|
D4h.5 |
|
D4h.6 |
|
D4h.7 |
|
D4h.8 |
|
D4h.9 |
|
D4h.10 |
|
D4h.11 |
|
D4h.12 |
|
D4h.13 |
|
D4h.14 |
|
D4h.15 |
|
D4h.16 |
|
D4h.17 |
|
D4h.18 |
|
D4h.19 |
|
D4h.20 |
|
C3.1 |
|
C3.2 |
|
C3.3 |
|
C3.4 |
|
C3i.1 |
|
C3i.2 |
|
D3.1 |
|
D3.2 |
|
D3.3 |
|
D3.4 |
|
D3.5 |
|
D3.6 |
|
D3.7 |
|
C3v.1 |
|
C3v.2 |
|
C3v.3 |
|
C3v.4 |
|
C3v.5 |
|
C3v.6 |
|
D3d.1 |
|
D3d.2 |
|
D3d.3 |
|
D3d.4 |
|
D3d.5 |
|
D3d.6 |
|
C6.1 |
|
C6.2 |
|
C6.3 |
|
C6.4 |
|
C6.5 |
|
C6.6 |
|
C3h.1 |
|
C6h.1 |
|
C6h.2 |
|
D6.1 |
|
D6.2 |
|
D6.3 |
|
D6.4 |
|
D6.5 |
|
D6.6 |
|
C6v.1 |
|
C6v.2 |
|
C6v.3 |
|
C6v.4 |
|
D3h.1 |
|
D3h.2 |
|
D3h.3 |
|
D3h.4 |
|
D6h.1 |
|
D6h.2 |
|
D6h.3 |
|
D6h.4 |
|
T.1 |
|
T.2 |
|
T.3 |
|
T.4 |
|
T.5 |
|
Th.1 |
|
Th.2 |
|
Th.3 |
|
Th.4 |
|
Th.5 |
|
Th.6 |
|
Th.7 |
|
O.1 |
|
O.2 |
|
O.3 |
|
O.4 |
|
O.5 |
|
O.6 |
|
O.7 |
|
O.8 |
|
Td.1 |
|
Td.2 |
|
Td.3 |
|
Td.4 |
|
Td.5 |
|
Td.6 |
|
Oh.1 |
|
Oh.2 |
|
Oh.3 |
|
Oh.4 |
|
Oh.5 |
|
Oh.6 |
|
Oh.7 |
|
Oh.8 |
|
Oh.9 |
|
Oh.10 |
Category:
space_group


![[CIF home page] [CIF logo]](https://www.iucr.org/__data/assets/image/0015/131037/CIF_white.png)