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Symmetry operations of the Double Space Group F4132 (No. 210)


N Shorthand
notation		 Matrix presentation Seitz symbol
(0,0,0)+set
1x,y,z
s+,s-
(
   1   0   0      0
   0   1   0      0
   0   0   1      0
)
(
 1 0
 0 1
)
{1|0,0,0}
2-x,1/2-y,1/2+z
-is+,is-
(
  -1   0   0      0
   0  -1   0    1/2
   0   0   1    1/2
)
(
 -i  0
  0  i
)
{2001|0,1/2,1/2}
31/2-x,1/2+y,-z
-s-,s+
(
  -1   0   0    1/2
   0   1   0    1/2
   0   0  -1      0
)
(
  0 -1
  1  0
)
{2010|1/2,1/2,0}
41/2+x,-y,1/2-z
-is-,-is+
(
   1   0   0    1/2
   0  -1   0      0
   0   0  -1    1/2
)
(
  0 -i
 -i  0
)
{2100|1/2,0,1/2}
5z,x,y
(1-i)s+/2-(1+i)s-/2,(1-i)s+/2+(1+i)s-/2
(
   0   0   1      0
   1   0   0      0
   0   1   0      0
)
(
  (1-i)/2 -(1+i)/2
  (1-i)/2  (1+i)/2
)
{3+111|0,0,0}
61/2+z,-x,1/2-y
(1+i)s+/2-(1-i)s-/2,(1+i)s+/2+(1-i)s-/2
(
   0   0   1    1/2
  -1   0   0      0
   0  -1   0    1/2
)
(
  (1+i)/2 -(1-i)/2
  (1+i)/2  (1-i)/2
)
{3+111|1/2,0,1/2}
7-z,1/2-x,1/2+y
(1+i)s+/2+(1-i)s-/2,-(1+i)s+/2+(1-i)s-/2
(
   0   0  -1      0
  -1   0   0    1/2
   0   1   0    1/2
)
(
  (1+i)/2  (1-i)/2
 -(1+i)/2  (1-i)/2
)
{3+111|0,1/2,1/2}
81/2-z,1/2+x,-y
(1-i)s+/2+(1+i)s-/2,-(1-i)s+/2+(1+i)s-/2
(
   0   0  -1    1/2
   1   0   0    1/2
   0  -1   0      0
)
(
  (1-i)/2  (1+i)/2
 -(1-i)/2  (1+i)/2
)
{3+111|1/2,1/2,0}
9y,z,x
(1+i)s+/2+(1+i)s-/2,-(1-i)s+/2+(1-i)s-/2
(
   0   1   0      0
   0   0   1      0
   1   0   0      0
)
(
  (1+i)/2  (1+i)/2
 -(1-i)/2  (1-i)/2
)
{3-111|0,0,0}
101/2-y,1/2+z,-x
(1-i)s+/2-(1-i)s-/2,(1+i)s+/2+(1+i)s-/2
(
   0  -1   0    1/2
   0   0   1    1/2
  -1   0   0      0
)
(
  (1-i)/2 -(1-i)/2
  (1+i)/2  (1+i)/2
)
{3-111|1/2,1/2,0}
111/2+y,-z,1/2-x
(1+i)s+/2-(1+i)s-/2,(1-i)s+/2+(1-i)s-/2
(
   0   1   0    1/2
   0   0  -1      0
  -1   0   0    1/2
)
(
  (1+i)/2 -(1+i)/2
  (1-i)/2  (1-i)/2
)
{3-111|1/2,0,1/2}
12-y,1/2-z,1/2+x
(1-i)s+/2+(1-i)s-/2,-(1+i)s+/2+(1+i)s-/2
(
   0  -1   0      0
   0   0  -1    1/2
   1   0   0    1/2
)
(
  (1-i)/2  (1-i)/2
 -(1+i)/2  (1+i)/2
)
{3-111|0,1/2,1/2}
133/4+y,1/4+x,3/4-z
-(1+i)2s-/2,(1-i)2s+/2
(
   0   1   0    3/4
   1   0   0    1/4
   0   0  -1    3/4
)
(
  0 -(1+i)2/2
  (1-i)2/2  0
)
{2110|3/4,1/4,3/4}
141/4-y,1/4-x,1/4-z
-(1-i)2s-/2,(1+i)2s+/2
(
   0  -1   0    1/4
  -1   0   0    1/4
   0   0  -1    1/4
)
(
  0 -(1-i)2/2
  (1+i)2/2  0
)
{2110|1/4,1/4,1/4}
151/4+y,3/4-x,3/4+z
(1+i)2s+/2,(1-i)2s-/2
(
   0   1   0    1/4
  -1   0   0    3/4
   0   0   1    3/4
)
(
 (1+i)2/2  0
  0 (1-i)2/2
)
{4-001|1/4,3/4,3/4}
163/4-y,3/4+x,1/4+z
(1-i)2s+/2,(1+i)2s-/2
(
   0  -1   0    3/4
   1   0   0    3/4
   0   0   1    1/4
)
(
 (1-i)2/2  0
  0 (1+i)2/2
)
{4+001|3/4,3/4,1/4}
173/4+x,1/4+z,3/4-y
2s+/2+i2s-/2,i2s+/2+2s-/2
(
   1   0   0    3/4
   0   0   1    1/4
   0  -1   0    3/4
)
(
  2/2 i2/2
 i2/2  2/2
)
{4-100|3/4,1/4,3/4}
183/4-x,3/4+z,1/4+y
i2s+/2+2s-/2,-2s+/2-i2s-/2
(
  -1   0   0    3/4
   0   0   1    3/4
   0   1   0    1/4
)
(
  i2/2  2/2
  -2/2 -i2/2
)
{2011|3/4,3/4,1/4}
191/4-x,1/4-z,1/4-y
-i2s+/2+2s-/2,-2s+/2+i2s-/2
(
  -1   0   0    1/4
   0   0  -1    1/4
   0  -1   0    1/4
)
(
 -i2/2  2/2
  -2/2  i2/2
)
{2011|1/4,1/4,1/4}
201/4+x,3/4-z,3/4+y
2s+/2-i2s-/2,-i2s+/2+2s-/2
(
   1   0   0    1/4
   0   0  -1    3/4
   0   1   0    3/4
)
(
  2/2 -i2/2
 -i2/2  2/2
)
{4+100|1/4,3/4,3/4}
213/4+z,1/4+y,3/4-x
2s+/2-2s-/2,2s+/2+2s-/2
(
   0   0   1    3/4
   0   1   0    1/4
  -1   0   0    3/4
)
(
  2/2 -2/2
  2/2  2/2
)
{4+010|3/4,1/4,3/4}
221/4+z,3/4-y,3/4+x
-i2s+/2-i2s-/2,-i2s+/2+i2s-/2
(
   0   0   1    1/4
   0  -1   0    3/4
   1   0   0    3/4
)
(
 -i2/2 -i2/2
 -i2/2  i2/2
)
{2101|1/4,3/4,3/4}
233/4-z,3/4+y,1/4+x
2s+/2+2s-/2,-2s+/2+2s-/2
(
   0   0  -1    3/4
   0   1   0    3/4
   1   0   0    1/4
)
(
  2/2  2/2
 -2/2  2/2
)
{4-010|3/4,3/4,1/4}
241/4-z,1/4-y,1/4-x
i2s+/2-i2s-/2,-i2s+/2-i2s-/2
(
   0   0  -1    1/4
   0  -1   0    1/4
  -1   0   0    1/4
)
(
  i2/2 -i2/2
 -i2/2 -i2/2
)
{2101|1/4,1/4,1/4}
25x,y,z
-s+,-s-
(
   1   0   0      0
   0   1   0      0
   0   0   1      0
)
(
 -1  0
  0 -1
)
{d1|0,0,0}
26-x,1/2-y,1/2+z
is+,-is-
(
  -1   0   0      0
   0  -1   0    1/2
   0   0   1    1/2
)
(
  i  0
  0 -i
)
{d2001|0,1/2,1/2}
271/2-x,1/2+y,-z
s-,-s+
(
  -1   0   0    1/2
   0   1   0    1/2
   0   0  -1      0
)
(
  0  1
 -1  0
)
{d2010|1/2,1/2,0}
281/2+x,-y,1/2-z
is-,is+
(
   1   0   0    1/2
   0  -1   0      0
   0   0  -1    1/2
)
(
 0 i
 i 0
)
{d2100|1/2,0,1/2}
29z,x,y
-(1-i)s+/2+(1+i)s-/2,-(1-i)s+/2-(1+i)s-/2
(
   0   0   1      0
   1   0   0      0
   0   1   0      0
)
(
 -(1-i)/2  (1+i)/2
 -(1-i)/2 -(1+i)/2
)
{d3+111|0,0,0}
301/2+z,-x,1/2-y
-(1+i)s+/2+(1-i)s-/2,-(1+i)s+/2-(1-i)s-/2
(
   0   0   1    1/2
  -1   0   0      0
   0  -1   0    1/2
)
(
 -(1+i)/2  (1-i)/2
 -(1+i)/2 -(1-i)/2
)
{d3+111|1/2,0,1/2}
31-z,1/2-x,1/2+y
-(1+i)s+/2-(1-i)s-/2,(1+i)s+/2-(1-i)s-/2
(
   0   0  -1      0
  -1   0   0    1/2
   0   1   0    1/2
)
(
 -(1+i)/2 -(1-i)/2
  (1+i)/2 -(1-i)/2
)
{d3+111|0,1/2,1/2}
321/2-z,1/2+x,-y
-(1-i)s+/2-(1+i)s-/2,(1-i)s+/2-(1+i)s-/2
(
   0   0  -1    1/2
   1   0   0    1/2
   0  -1   0      0
)
(
 -(1-i)/2 -(1+i)/2
  (1-i)/2 -(1+i)/2
)
{d3+111|1/2,1/2,0}
33y,z,x
-(1+i)s+/2-(1+i)s-/2,(1-i)s+/2-(1-i)s-/2
(
   0   1   0      0
   0   0   1      0
   1   0   0      0
)
(
 -(1+i)/2 -(1+i)/2
  (1-i)/2 -(1-i)/2
)
{d3-111|0,0,0}
341/2-y,1/2+z,-x
-(1-i)s+/2+(1-i)s-/2,-(1+i)s+/2-(1+i)s-/2
(
   0  -1   0    1/2
   0   0   1    1/2
  -1   0   0      0
)
(
 -(1-i)/2  (1-i)/2
 -(1+i)/2 -(1+i)/2
)
{d3-111|1/2,1/2,0}
351/2+y,-z,1/2-x
-(1+i)s+/2+(1+i)s-/2,-(1-i)s+/2-(1-i)s-/2
(
   0   1   0    1/2
   0   0  -1      0
  -1   0   0    1/2
)
(
 -(1+i)/2  (1+i)/2
 -(1-i)/2 -(1-i)/2
)
{d3-111|1/2,0,1/2}
36-y,1/2-z,1/2+x
-(1-i)s+/2-(1-i)s-/2,(1+i)s+/2-(1+i)s-/2
(
   0  -1   0      0
   0   0  -1    1/2
   1   0   0    1/2
)
(
 -(1-i)/2 -(1-i)/2
  (1+i)/2 -(1+i)/2
)
{d3-111|0,1/2,1/2}
373/4+y,1/4+x,3/4-z
(1+i)2s-/2,-(1-i)2s+/2
(
   0   1   0    3/4
   1   0   0    1/4
   0   0  -1    3/4
)
(
  0  (1+i)2/2
 -(1-i)2/2  0
)
{d2110|3/4,1/4,3/4}
381/4-y,1/4-x,1/4-z
(1-i)2s-/2,-(1+i)2s+/2
(
   0  -1   0    1/4
  -1   0   0    1/4
   0   0  -1    1/4
)
(
  0  (1-i)2/2
 -(1+i)2/2  0
)
{d2110|1/4,1/4,1/4}
391/4+y,3/4-x,3/4+z
-(1+i)2s+/2,-(1-i)2s-/2
(
   0   1   0    1/4
  -1   0   0    3/4
   0   0   1    3/4
)
(
 -(1+i)2/2  0
  0 -(1-i)2/2
)
{d4-001|1/4,3/4,3/4}
403/4-y,3/4+x,1/4+z
-(1-i)2s+/2,-(1+i)2s-/2
(
   0  -1   0    3/4
   1   0   0    3/4
   0   0   1    1/4
)
(
 -(1-i)2/2  0
  0 -(1+i)2/2
)
{d4+001|3/4,3/4,1/4}
413/4+x,1/4+z,3/4-y
-2s+/2-i2s-/2,-i2s+/2-2s-/2
(
   1   0   0    3/4
   0   0   1    1/4
   0  -1   0    3/4
)
(
  -2/2 -i2/2
 -i2/2  -2/2
)
{d4-100|3/4,1/4,3/4}
423/4-x,3/4+z,1/4+y
-i2s+/2-2s-/2,2s+/2+i2s-/2
(
  -1   0   0    3/4
   0   0   1    3/4
   0   1   0    1/4
)
(
 -i2/2  -2/2
  2/2  i2/2
)
{d2011|3/4,3/4,1/4}
431/4-x,1/4-z,1/4-y
i2s+/2-2s-/2,2s+/2-i2s-/2
(
  -1   0   0    1/4
   0   0  -1    1/4
   0  -1   0    1/4
)
(
  i2/2  -2/2
  2/2 -i2/2
)
{d2011|1/4,1/4,1/4}
441/4+x,3/4-z,3/4+y
-2s+/2+i2s-/2,i2s+/2-2s-/2
(
   1   0   0    1/4
   0   0  -1    3/4
   0   1   0    3/4
)
(
 -2/2 i2/2
 i2/2 -2/2
)
{d4+100|1/4,3/4,3/4}
453/4+z,1/4+y,3/4-x
-2s+/2+2s-/2,-2s+/2-2s-/2
(
   0   0   1    3/4
   0   1   0    1/4
  -1   0   0    3/4
)
(
 -2/2  2/2
 -2/2 -2/2
)
{d4+010|3/4,1/4,3/4}
461/4+z,3/4-y,3/4+x
i2s+/2+i2s-/2,i2s+/2-i2s-/2
(
   0   0   1    1/4
   0  -1   0    3/4
   1   0   0    3/4
)
(
  i2/2  i2/2
  i2/2 -i2/2
)
{d2101|1/4,3/4,3/4}
473/4-z,3/4+y,1/4+x
-2s+/2-2s-/2,2s+/2-2s-/2
(
   0   0  -1    3/4
   0   1   0    3/4
   1   0   0    1/4
)
(
 -2/2 -2/2
  2/2 -2/2
)
{d4-010|3/4,3/4,1/4}
481/4-z,1/4-y,1/4-x
-i2s+/2+i2s-/2,i2s+/2+i2s-/2
(
   0   0  -1    1/4
   0  -1   0    1/4
  -1   0   0    1/4
)
(
 -i2/2  i2/2
  i2/2  i2/2
)
{d2101|1/4,1/4,1/4}
(0,1/2,1/2)+set
(1/2,0,1/2)+set
(1/2,1/2,0)+set


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