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Result of symbol lookup:
Space group number: 201
Schoenflies symbol: Th^2
Hermann-Mauguin symbol: P n -3
Origin choice: 2
Hall symbol: -P 2ab 2bc 3
Input space group symbol: P n -3 :2
Convention: Default
Number of lattice translations: 1
Space group is centric.
Number of representative symmetry operations: 12
Total number of symmetry operations: 24
Parallelepiped containing an asymmetric unit:
0<=x<=1/4; 0<=y<=1/4; 0<=z<1
List of symmetry operations:
| Matrix
| Rotation-part type
| Axis direction
| Screw/glide component
| Origin shift
|
| x,y,z
| 1 | - | - | -
|
| -x+1/2,-y+1/2,z
| 2 | [0,0,1] | 0,0,0 | 1/4,1/4,0
|
| x,-y+1/2,-z+1/2
| 2 | [1,0,0] | 0,0,0 | 0,1/4,1/4
|
| -x+1/2,y,-z+1/2
| 2 | [0,1,0] | 0,0,0 | 1/4,0,1/4
|
| z,x,y
| 3^1 | [1,1,1] | 0,0,0 | 0,0,0
|
| -z+1/2,-x+1/2,y
| 3^-1 | [-1,1,1] | 0,0,0 | 1/2,0,0
|
| z,-x+1/2,-y+1/2
| 3^-1 | [1,-1,1] | 0,0,0 | 0,1/2,0
|
| -z+1/2,x,-y+1/2
| 3^1 | [-1,-1,1] | 0,0,0 | 1/2,1/2,0
|
| y,z,x
| 3^-1 | [1,1,1] | 0,0,0 | 0,0,0
|
| y,-z+1/2,-x+1/2
| 3^-1 | [-1,-1,1] | 0,0,0 | 1/2,1/2,0
|
| -y+1/2,z,-x+1/2
| 3^1 | [-1,1,1] | 0,0,0 | 1/2,0,0
|
| -y+1/2,-z+1/2,x
| 3^1 | [1,-1,1] | 0,0,0 | 0,1/2,0
|
| -x,-y,-z
| -1 | - | - | 0,0,0
|
| x-1/2,y-1/2,-z
| -2 | [0,0,1] | -1/2,-1/2,0 | 0,0,0
|
| -x,y-1/2,z-1/2
| -2 | [1,0,0] | 0,-1/2,-1/2 | 0,0,0
|
| x-1/2,-y,z-1/2
| -2 | [0,1,0] | -1/2,0,-1/2 | 0,0,0
|
| -z,-x,-y
| -3^1 | [1,1,1] | 0,0,0 | 0,0,0
|
| z-1/2,x-1/2,-y
| -3^-1 | [-1,1,1] | 0,0,0 | 0,-1/2,1/2
|
| -z,x-1/2,y-1/2
| -3^-1 | [1,-1,1] | 0,0,0 | 1/2,0,-1/2
|
| z-1/2,-x,y-1/2
| -3^1 | [-1,-1,1] | 0,0,0 | -1/2,1/2,0
|
| -y,-z,-x
| -3^-1 | [1,1,1] | 0,0,0 | 0,0,0
|
| -y,z-1/2,x-1/2
| -3^-1 | [-1,-1,1] | 0,0,0 | 1/2,-1/2,0
|
| y-1/2,-z,x-1/2
| -3^1 | [-1,1,1] | 0,0,0 | 0,1/2,-1/2
|
| y-1/2,z-1/2,-x
| -3^1 | [1,-1,1] | 0,0,0 | -1/2,0,1/2
|
List of Wyckoff positions:
| Wyckoff letter
| Multiplicity
| Site symmetry
point group type
| Representative special position operator
|
| h | 24 | 1 | x,y,z
|
| g | 12 | 2 | x,-1/4,1/4
|
| f | 12 | 2 | x,1/4,1/4
|
| e | 8 | 3 | x,x,x
|
| d | 6 | 222 | 1/4,-1/4,-1/4
|
| c | 4 | -3 | 1/2,1/2,1/2
|
| b | 4 | -3 | 0,0,0
|
| a | 2 | 23 | 1/4,1/4,1/4
|
Harker planes:
| Algebraic
| Normal vector
| A point in the plane
|
| 2*x+1/2,2*y+1/2,0 | [0,0,1] | 1/2,1/2,0
|
| 0,2*y+1/2,2*z+1/2 | [1,0,0] | 0,1/2,1/2
|
| 2*x+1/2,0,2*z+1/2 | [0,1,0] | 1/2,0,1/2
|
| x+z,-x-y,y-z | [1,1,1] | 0,0,0
|
| x+z+1/2,-x-y,-y+z+1/2 | [-1,-1,1] | 1/2,0,1/2
|
| x+y+1/2,y-z,x+z+1/2 | [-1,1,1] | 1/2,0,1/2
|
| x+y+1/2,y-z+1/2,-x-z | [1,-1,1] | 1/2,1/2,0
|
Additional generators of Euclidean normalizer:
Number of structure-seminvariant vectors and moduli: 1
Vector Modulus
(1, 1, 1) 2
Further generators:
| Matrix
| Rotation-part type
| Axis direction
| Screw/glide component
| Origin shift
|
| y,x,z
| -2 | [-1,1,0] | 0,0,0 | 0,0,0
|
Grid factors implied by symmetries:
Space group: (2, 2, 2)
Structure-seminvariant vectors and moduli: (2, 2, 2)
Euclidean normalizer: (2, 2, 2)
All points of a grid over the unit cell are mapped
exactly onto other grid points only if the factors
shown above are factors of the grid.
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