Corepresentations PG

Irreducible corepresentations of the Projective Magnetic Point Group 6_π1'

Table of characters of the unitary symmetry operations

	1	6⁺	3⁺	2	3^-	6^-	^d1	^d6⁺	^d3⁺	^d2	^d3^-	^d6^-
¹E₁²E₂	2	i√3	-1	0	-1	(-i)√3	2	i√3	-1	0	-1	(-i)√3
¹E₂²E₁	2	(-i)√3	-1	0	-1	i√3	2	(-i)√3	-1	0	-1	i√3
AB	2	0	2	0	2	0	2	0	2	0	2	0

¹E₂¹E₃	2	-i	1	2i	1	i	-2	i	-1	-2i	-1	-i
²E₂²E₃	2	i	1	-2i	1	-i	-2	-i	-1	2i	-1	i
¹E₁¹E₁	2	2i	-2	2i	-2	-2i	-2	-2i	2	-2i	2	2i
²E₁²E₁	2	-2i	-2	-2i	-2	2i	-2	2i	2	2i	2	-2i

Multiplication table of the symmetry operations

6⁺

3⁺

3^-

6^-

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

6⁺'

3⁺'

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

6⁺

3⁺

3^-

6^-

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

6⁺'

3⁺'

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

6⁺

3⁺

^d2

3^-

6^-

^d6⁺

^d3⁺

^d3^-

^d6^-

^d1

6⁺'

3⁺'

^d2'

3^-'

6^-'

^d6⁺'

^d3⁺'

^d3^-'

^d6^-'

^d1'

3⁺

^d2

^d3^-

6^-

6⁺

^d3⁺

3^-

^d6^-

^d1

^d6⁺

3⁺'

^d2'

^d3^-'

6^-'

6⁺'

^d3⁺'

3^-'

^d6^-'

^d1'

^d6⁺'

3^-

6^-

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

6⁺

3⁺

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

6⁺'

3⁺'

3^-

6^-

^d6⁺

^d3⁺

^d3^-

^d6^-

^d1

6⁺

3⁺

^d2

3^-'

6^-'

^d6⁺'

^d3⁺'

^d3^-'

^d6^-'

^d1'

6⁺'

3⁺'

^d2'

6^-

6⁺

^d3⁺

3^-

^d6^-

^d1

^d6⁺

3⁺

^d2

^d3^-

6^-'

6⁺'

^d3⁺'

3^-'

^d6^-'

^d1'

^d6⁺'

3⁺'

^d2'

^d3^-'

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

6⁺

3⁺

3^-

6^-

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

6⁺'

3⁺'

3^-'

6^-'

^d6⁺

^d3⁺

^d3^-

^d6^-

^d1

6⁺

3⁺

^d2

3^-

6^-

^d6⁺'

^d3⁺'

^d3^-'

^d6^-'

^d1'

6⁺'

3⁺'

^d2'

3^-'

6^-'

^d3⁺

3^-

^d6^-

^d1

^d6⁺

3⁺

^d2

^d3^-

6^-

6⁺

^d3⁺'

3^-'

^d6^-'

^d1'

^d6⁺'

3⁺'

^d2'

^d3^-'

6^-'

6⁺'

^d2

^d3^-

^d6^-

6⁺

3⁺

3^-

6^-

^d1

^d6⁺

^d3⁺

^d2'

^d3^-'

^d6^-'

6⁺'

3⁺'

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

^d3^-

^d6^-

^d1

6⁺

3⁺

^d2

3^-

6^-

^d6⁺

^d3⁺

^d3^-'

^d6^-'

^d1'

6⁺'

3⁺'

^d2'

3^-'

6^-'

^d6⁺'

^d3⁺'

^d6^-

^d1

^d6⁺

3⁺

^d2

^d3^-

6^-

6⁺

^d3⁺

3^-

^d6^-'

^d1'

^d6⁺'

3⁺'

^d2'

^d3^-'

6^-'

6⁺'

^d3⁺'

3^-'

6⁺'

3⁺'

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

6⁺

3⁺

3^-

6^-

6⁺'

3⁺'

^d2'

3^-'

6^-'

^d6⁺'

^d3⁺'

^d3^-'

^d6^-'

^d1'

^d6⁺

^d3⁺

^d3^-

^d6^-

^d1

6⁺

3⁺

^d2

3^-

6^-

3⁺'

^d2'

^d3^-'

6^-'

6⁺'

^d3⁺'

3^-'

^d6^-'

^d1'

^d6⁺'

^d3⁺

3^-

^d6^-

^d1

^d6⁺

3⁺

^d2

^d3^-

6^-

6⁺

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

6⁺'

3⁺'

^d2

^d3^-

^d6^-

6⁺

3⁺

3^-

6^-

^d1

^d6⁺

^d3⁺

3^-'

6^-'

^d6⁺'

^d3⁺'

^d3^-'

^d6^-'

^d1'

6⁺'

3⁺'

^d2'

^d3^-

^d6^-

^d1

6⁺

3⁺

^d2

3^-

6^-

^d6⁺

^d3⁺

6^-'

6⁺'

^d3⁺'

3^-'

^d6^-'

^d1'

^d6⁺'

3⁺'

^d2'

^d3^-'

^d6^-

^d1

^d6⁺

3⁺

^d2

^d3^-

6^-

6⁺

^d3⁺

3^-

^d1'

^d6⁺'

^d3⁺'

^d2'

^d3^-'

^d6^-'

6⁺'

3⁺'

3^-'

6^-'

6⁺

3⁺

3^-

6^-

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

^d6⁺'

^d3⁺'

^d3^-'

^d6^-'

^d1'

6⁺'

3⁺'

^d2'

3^-'

6^-'

6⁺

3⁺

^d2

3^-

6^-

^d6⁺

^d3⁺

^d3^-

^d6^-

^d1

^d3⁺'

3^-'

^d6^-'

^d1'

^d6⁺'

3⁺'

^d2'

^d3^-'

6^-'

6⁺'

3⁺

^d2

^d3^-

6^-

6⁺

^d3⁺

3^-

^d6^-

^d1

^d6⁺

^d2'

^d3^-'

^d6^-'

6⁺'

3⁺'

3^-'

6^-'

^d1'

^d6⁺'

^d3⁺'

3^-

6^-

^d1

^d6⁺

^d3⁺

^d2

^d3^-

^d6^-

6⁺

3⁺

^d3^-'

^d6^-'

^d1'

6⁺'

3⁺'

^d2'

3^-'

6^-'

^d6⁺'

^d3⁺'

3^-

6^-

^d6⁺

^d3⁺

^d3^-

^d6^-

^d1

6⁺

3⁺

^d2

^d6^-'

^d1'

^d6⁺'

3⁺'

^d2'

^d3^-'

6^-'

6⁺'

^d3⁺'

3^-'

6^-

6⁺

^d3⁺

3^-

^d6^-

^d1

^d6⁺

3⁺

^d2

^d3^-

Table of projective phases in group multiplication

	1	6⁺	3⁺	2	3^-	6^-	^d1	^d6⁺	^d3⁺	^d2	^d3^-	^d6^-	1'	6⁺'	3⁺'	2'	3^-'	6^-'	^d1'	^d6⁺'	^d3⁺'	^d2'	^d3^-'	^d6^-'
1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
6⁺	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
3⁺	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
2	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
3^-	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
6^-	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
^d1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
^d6⁺	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
^d3⁺	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
^d2	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
^d3^-	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
^d6^-	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
1'	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
6⁺'	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
3⁺'	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
2'	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
3^-'	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
6^-'	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
^d1'	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
^d6⁺'	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
^d3⁺'	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
^d2'	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1
^d3^-'	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1
^d6^-'	1	1	1	1	1	1	1	1	1	1	1	1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1	-1

Matrices of the representations of the group

The antiunitary operations are written in red color

Matrix presentation

Seitz symbol

¹E₁²E₂

¹E₂²E₁

¹E₂¹E₃

²E₂²E₃

¹E₁¹E₁

²E₁²E₁

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

  1  -1
  1   0

  e^iπ/6   0
  0  e^-iπ/6

6⁺

 e^2iπ/3   0
  0   e^iπ/3

  e^-iπ/3   0
  0  e^-2iπ/3

 -1   0
  0   1

 e^-5iπ/6   0
  0   e^-iπ/6

  e^iπ/6   0
  0  e^5iπ/6

 i  0
 0  i

 -i   0
  0  -i

  0  -1
  1  -1

  e^iπ/3   0
  0  e^-iπ/3

3⁺

 e^-2iπ/3   0
  0   e^2iπ/3

 e^-2iπ/3   0
  0   e^2iπ/3

 1  0
 0  1

  e^iπ/3   0
  0  e^-iπ/3

  e^iπ/3   0
  0  e^-iπ/3

 -1   0
  0  -1

 -1   0
  0  -1

 -1   0
  0  -1

 -i   0
  0   i

  1   0
  0  -1

 -1   0
  0   1

 -1   0
  0   1

 i  0
 0  i

 -i   0
  0  -i

 i  0
 0  i

 -i   0
  0  -i

 -1   1
 -1   0

 e^-iπ/3   0
  0   e^iπ/3

3^-

  e^2iπ/3   0
  0  e^-2iπ/3

  e^2iπ/3   0
  0  e^-2iπ/3

 1  0
 0  1

 e^-iπ/3   0
  0   e^iπ/3

 e^-iπ/3   0
  0   e^iπ/3

 -1   0
  0  -1

 -1   0
  0  -1

  0   1
 -1   1

 e^-iπ/6   0
  0   e^iπ/6

6^-

 e^-2iπ/3   0
  0   e^-iπ/3

  e^iπ/3   0
  0  e^2iπ/3

 -1   0
  0   1

 e^5iπ/6   0
  0   e^iπ/6

  e^-iπ/6   0
  0  e^-5iπ/6

 -i   0
  0  -i

 i  0
 0  i

 1  0
 0  1

 -1   0
  0  -1

^d1

 1  0
 0  1

 1  0
 0  1

 1  0
 0  1

 -1   0
  0  -1

 -1   0
  0  -1

 -1   0
  0  -1

 -1   0
  0  -1

  1  -1
  1   0

 e^-5iπ/6   0
  0   e^5iπ/6

^d6⁺

 e^2iπ/3   0
  0   e^iπ/3

  e^-iπ/3   0
  0  e^-2iπ/3

 -1   0
  0   1

  e^iπ/6   0
  0  e^5iπ/6

 e^-5iπ/6   0
  0   e^-iπ/6

 -i   0
  0  -i

 i  0
 0  i

  0  -1
  1  -1

 e^-2iπ/3   0
  0   e^2iπ/3

^d3⁺

 e^-2iπ/3   0
  0   e^2iπ/3

 e^-2iπ/3   0
  0   e^2iπ/3

 1  0
 0  1

 e^-2iπ/3   0
  0   e^2iπ/3

 e^-2iπ/3   0
  0   e^2iπ/3

 1  0
 0  1

 1  0
 0  1

 -1   0
  0  -1

  i   0
  0  -i

^d2

  1   0
  0  -1

 -1   0
  0   1

 -1   0
  0   1

 -i   0
  0  -i

 i  0
 0  i

 -i   0
  0  -i

 i  0
 0  i

 -1   1
 -1   0

  e^2iπ/3   0
  0  e^-2iπ/3

^d3^-

  e^2iπ/3   0
  0  e^-2iπ/3

  e^2iπ/3   0
  0  e^-2iπ/3

 1  0
 0  1

  e^2iπ/3   0
  0  e^-2iπ/3

  e^2iπ/3   0
  0  e^-2iπ/3

 1  0
 0  1

 1  0
 0  1

  0   1
 -1   1

  e^5iπ/6   0
  0  e^-5iπ/6

^d6^-

 e^-2iπ/3   0
  0   e^-iπ/3

  e^iπ/3   0
  0  e^2iπ/3

 -1   0
  0   1

  e^-iπ/6   0
  0  e^-5iπ/6

 e^5iπ/6   0
  0   e^iπ/6

 i  0
 0  i

 -i   0
  0  -i

 1  0
 0  1

 1  0
 0  1

 0  1
 1  0

 0  1
 1  0

 0  1
 1  0

  0  -1
  1   0

  0  -1
  1   0

  0   1
 -1   0

  0   1
 -1   0

  1  -1
  1   0

  e^iπ/6   0
  0  e^-iπ/6

6⁺'

  0   e^-iπ/3
 e^-2iπ/3   0

  0  e^2iπ/3
  e^iπ/3   0

  0   1
 -1   0

  0  e^-5iπ/6
  e^5iπ/6   0

  0   e^iπ/6
 e^-iπ/6   0

  0   i
 -i   0

  0  -i
  i   0

  0  -1
  1  -1

  e^iπ/3   0
  0  e^-iπ/3

3⁺'

  0  e^-2iπ/3
  e^2iπ/3   0

  0  e^-2iπ/3
  e^2iπ/3   0

 0  1
 1  0

  0  e^-2iπ/3
  e^-iπ/3   0

  0  e^-2iπ/3
  e^-iπ/3   0

  0  -1
  1   0

  0  -1
  1   0

 -1   0
  0  -1

 -i   0
  0   i

  0  -1
  1   0

  0   1
 -1   0

  0   1
 -1   0

  0   i
 -i   0

  0  -i
  i   0

  0   i
 -i   0

  0  -i
  i   0

 -1   1
 -1   0

 e^-iπ/3   0
  0   e^iπ/3

3^-'

  0   e^2iπ/3
 e^-2iπ/3   0

  0   e^2iπ/3
 e^-2iπ/3   0

 0  1
 1  0

  0  e^2iπ/3
  e^iπ/3   0

  0  e^2iπ/3
  e^iπ/3   0

  0  -1
  1   0

  0  -1
  1   0

  0   1
 -1   1

 e^-iπ/6   0
  0   e^iπ/6

6^-'

  0   e^iπ/3
 e^2iπ/3   0

  0  e^-2iπ/3
  e^-iπ/3   0

  0   1
 -1   0

  0   e^5iπ/6
 e^-5iπ/6   0

  0  e^-iπ/6
  e^iπ/6   0

  0  -i
  i   0

  0   i
 -i   0

 1  0
 0  1

 -1   0
  0  -1

^d1'

 0  1
 1  0

 0  1
 1  0

 0  1
 1  0

  0   1
 -1   0

  0   1
 -1   0

  0  -1
  1   0

  0  -1
  1   0

  1  -1
  1   0

 e^-5iπ/6   0
  0   e^5iπ/6

^d6⁺'

  0   e^-iπ/3
 e^-2iπ/3   0

  0  e^2iπ/3
  e^iπ/3   0

  0   1
 -1   0

  0   e^iπ/6
 e^-iπ/6   0

  0  e^-5iπ/6
  e^5iπ/6   0

  0  -i
  i   0

  0   i
 -i   0

  0  -1
  1  -1

 e^-2iπ/3   0
  0   e^2iπ/3

^d3⁺'

  0  e^-2iπ/3
  e^2iπ/3   0

  0  e^-2iπ/3
  e^2iπ/3   0

 0  1
 1  0

  0   e^iπ/3
 e^2iπ/3   0

  0   e^iπ/3
 e^2iπ/3   0

  0   1
 -1   0

  0   1
 -1   0

 -1   0
  0  -1

  i   0
  0  -i

^d2'

  0  -1
  1   0

  0   1
 -1   0

  0   1
 -1   0

  0  -i
  i   0

  0   i
 -i   0

  0  -i
  i   0

  0   i
 -i   0

 -1   1
 -1   0

  e^2iπ/3   0
  0  e^-2iπ/3

^d3^-'

  0   e^2iπ/3
 e^-2iπ/3   0

  0   e^2iπ/3
 e^-2iπ/3   0

 0  1
 1  0

  0   e^-iπ/3
 e^-2iπ/3   0

  0   e^-iπ/3
 e^-2iπ/3   0

  0   1
 -1   0

  0   1
 -1   0

  0   1
 -1   1

  e^5iπ/6   0
  0  e^-5iπ/6

^d6^-'

  0   e^iπ/3
 e^2iπ/3   0

  0  e^-2iπ/3
  e^-iπ/3   0

  0   1
 -1   0

  0  e^-iπ/6
  e^iπ/6   0

  0   e^5iπ/6
 e^-5iπ/6   0

  0   i
 -i   0

  0  -i
  i   0

k-Subgroupsmag

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Irreducible corepresentations of the Projective Magnetic Point Group 6π1'

Table of characters of the unitary symmetry operations

Multiplication table of the symmetry operations

Table of projective phases in group multiplication

Matrices of the representations of the group

Irreducible corepresentations of the Projective Magnetic Point Group 6_π1'