(International Tables) Space group 201, origin choice 1

Pn-3	T_h²	m-3	Cubic
No. 201	P2/n-3	Patterson symmetry Pm-3
ORIGIN CHOICE 1

symmetry group diagram

Origin at 2 3, at -1/4, -1/4, -1/4 from centre (-3)

Asymmetric unit

0 ≤ x ≤ 1; 0 ≤ y ≤ 1/2; 0 ≤ z ≤ 1/2; y ≤ min(x, 1 - x); z ≤ y

Vertices

0, 0, 0

1, 0, 0

1/2, 1/2, 0

1/2, 1/2, 1/2

Symmetry operations

(1) 1	(2) 2 0, 0, z	(3) 2 0, y, 0	(4) 2 x, 0, 0
(5) 3⁺ x, x, x	(6) 3⁺ -x, x, -x	(7) 3⁺ x, -x, -x	(8) 3⁺ -x, -x, x
(9) 3^- x, x, x	(10) 3^- x, -x, -x	(11) 3^- -x, -x, x	(12) 3^- -x, x, -x
(13) -1 1/4, 1/4, 1/4	(14) n(1/2, 1/2, 0) x, y, 1/4	(15) n(1/2, 0, 1/2) x, 1/4, z	(16) n(0, 1/2, 1/2) 1/4, y, z
(17) -3⁺ x, x, x; 1/4, 1/4, 1/4	(18) -3⁺ -x - 1, x + 1, -x; -1/4, 1/4, 3/4	(19) -3⁺ x, -x + 1, -x; 1/4, 3/4, -1/4	(20) -3⁺ -x + 1, -x, x; 3/4, -1/4, 1/4
(21) -3^- x, x, x; 1/4, 1/4, 1/4	(22) -3^- x + 1, -x - 1, -x; 1/4, -1/4, 3/4	(23) -3^- -x, -x + 1, x; -1/4, 3/4, 1/4	(24) -3^- -x + 1, x, -x; 3/4, 1/4, -1/4

Generators selected (1); t(1, 0, 0); t(0, 1, 0); t(0, 0, 1); (2); (3); (5); (13)

Positions

Multiplicity, Wyckoff letter,
Site symmetry

Coordinates

Reflection conditions

h, k, l cyclically permutable
General:

(1) x, y, z	(2) -x, -y, z	(3) -x, y, -z	(4) x, -y, -z
(5) z, x, y	(6) z, -x, -y	(7) -z, -x, y	(8) -z, x, -y
(9) y, z, x	(10) -y, z, -x	(11) y, -z, -x	(12) -y, -z, x
(13) -x + 1/2, -y + 1/2, -z + 1/2	(14) x + 1/2, y + 1/2, -z + 1/2	(15) x + 1/2, -y + 1/2, z + 1/2	(16) -x + 1/2, y + 1/2, z + 1/2
(17) -z + 1/2, -x + 1/2, -y + 1/2	(18) -z + 1/2, x + 1/2, y + 1/2	(19) z + 1/2, x + 1/2, -y + 1/2	(20) z + 1/2, -x + 1/2, y + 1/2
(21) -y + 1/2, -z + 1/2, -x + 1/2	(22) y + 1/2, -z + 1/2, x + 1/2	(23) -y + 1/2, z + 1/2, x + 1/2	(24) y + 1/2, z + 1/2, -x + 1/2

0kl : k + l = 2n
h00 : h = 2n

Special: as above, plus

2 . .

x, 1/2, 0	-x, 1/2, 0	0, x, 1/2	0, -x, 1/2	1/2, 0, x	1/2, 0, -x
-x + 1/2, 0, 1/2	x + 1/2, 0, 1/2	1/2, -x + 1/2, 0	1/2, x + 1/2, 0	0, 1/2, -x + 1/2	0, 1/2, x + 1/2

hkl : h + k + l = 2n

2 . .

x, 0, 0	-x, 0, 0	0, x, 0	0, -x, 0	0, 0, x	0, 0, -x
-x + 1/2, 1/2, 1/2	x + 1/2, 1/2, 1/2	1/2, -x + 1/2, 1/2	1/2, x + 1/2, 1/2	1/2, 1/2, -x + 1/2	1/2, 1/2, x + 1/2

hkl : h + k + l = 2n

. 3 .

x, x, x	-x, -x, x
-x, x, -x	x, -x, -x
-x + 1/2, -x + 1/2, -x + 1/2	x + 1/2, x + 1/2, -x + 1/2
x + 1/2, -x + 1/2, x + 1/2	-x + 1/2, x + 1/2, x + 1/2

no extra conditions

2 2 2 . .

0, 1/2, 1/2

1/2, 0, 1/2

1/2, 1/2, 0

1/2, 0, 0

0, 1/2, 0

0, 0, 1/2

hkl : h + k + l = 2n

. -3 .

3/4, 3/4, 3/4

1/4, 1/4, 3/4

1/4, 3/4, 1/4

3/4, 1/4, 1/4

hkl : h + k, h + l, k + l = 2n

. -3 .

1/4, 1/4, 1/4

3/4, 3/4, 1/4

3/4, 1/4, 3/4

1/4, 3/4, 3/4

hkl : h + k, h + l, k + l = 2n

2 3 .

0, 0, 0

1/2, 1/2, 1/2

hkl : h + k + l = 2n

Symmetry of special projections

Along [001] c2mm
a' = a b' = b
Origin at 0, 0, z

Along [111] p6
a' = 1/3(2a - b - c) b' = 1/3(-a + 2b - c)
Origin at x, x, x

Along [110] p2mm
a' = 1/2(-a + b) b' = c
Origin at x, x, 1/4

Maximal non-isomorphic subgroups

[2] P23 (195)

1; 2; 3; 4; 5; 6; 7; 8; 9; 10; 11; 12

[3] Pn1 (Pnnn, 48)

1; 2; 3; 4; 13; 14; 15; 16

		[4] P1-3 (R-3, 148)	1; 5; 9; 13; 17; 21
		[4] P1-3 (R-3, 148)	1; 6; 12; 13; 18; 24
		[4] P1-3 (R-3, 148)	1; 7; 10; 13; 19; 22
		[4] P1-3 (R-3, 148)	1; 8; 11; 13; 20; 23

IIa

none

IIb

[2] Fd-3 (a' = 2a, b' = 2b, c' = 2c) (203)

Maximal isomorphic subgroups of lowest index

IIc

[27] Pn-3 (a' = 3a, b' = 3b, c' = 3c) (201)

Minimal non-isomorphic supergroups

I	[2] Pn-3n (222); [2] Pn-3m (224)

II	[2] Im-3 (204); [4] Fm-3 (202)

International Tables for Crystallography (2006). Vol. A, ch. 7.1, Space group 201, origin choice 1.