The group is order 64, which represent 64 matrices possible from products of the 4 generators, with matrix characteristic structure (1:0/1 2:16/19 4:16/12). It has 1 identity matrix, 16 reflection matrices [], 16 2-fold rotation matrices [2]+, 2 2D central inversions [2+,2+], and one 3D central inversion [2+,2+,2+], 16 order-4 rotoreflective matrices [2+,4+], and 12 rotational 4-fold matrices: 8 [4]+ and 4 double rotations [4+,2+,4+]+.
Generators are listed as a set of matrices, index 0 to 3, or letters for extended groups.
The structure is expressed by looking at all possible matrix products of generators. They are counted by order:A/B, where order of matrix M is how many self-products produce the identity. The A count have determinant -1 (reflective), and B count have determinant +1 (pure rotations). Every group has (1:0/1} for the identity matrix.
Order
Group
Generators
Structure
Diagram
128
[[4,2,4]]
{0,1,T}
(1:0/1 2:16/27 4:48/20 8:0/16 )
64
[[4,2,4]+ ]
{0T,T1}
(1:0/1 2:0/19 4:32/12 )
64
[[4,2,4]]+
{01,1T1T}
(1:0/1 2:0/27 4:0/20 8:0/16 )
64
[4+ ,2+ [1+ ,4,2,4,1+ ]] = [4+ ,2+ [2,2,2]] = [4+ ,2+ [2[4] ]]
{0,Z}
(1:0/1 2:8/11 4:24/4 8:0/16 )
64 and reflective subgroups
edit
Order
Group
Generators
Structure
Diagram
64
[4,2,4]
{0,1,2,3}
(1:0/1 2:16/19 4:16/12 )
D8 ×D8
32
[4,2,4,1+ ] = [4,2,2]
{0,1,2,323}
(1:0/1 2:12/11 4:4/4 )
D8 ×Z2 2
32
[1+ ,4,2,4] = [2,2,4]
{010,1,2,3}
(1:0/1 2:12/11 4:4/4 )
D8 ×Z2 2
16
[1+ ,4,2,4,1+ ] = [2,2,2]
{010,1,2,323}
(1:0/1 2:8/7 )
D2 4
8
[1+ ,4,2,(4,1+ ),1+ ] = [2,2]
{010,1,2}
D2 3
8
[4,2,4* ] = [4]
{0,1}
D8
4
[1+ ,4,2,4* ] = [2]
{101,1}
D4
4
[1+ ,(1+ ,4),2,(4,1+ ),1+ ] = [2]
{1,2}
(1:0/1 2:2/1 )
D2 2
2
[1+ (1+ ,4),2,4*] = [ ]
{1}
(1:0/1 2:1/0 )
D2
32 and rotional subgroups
edit
Order
Group
Generators
Structure
Diagram
32
[4,2,4]+
{01,12,23}
(1:0/1 2:0/19 4:0/12 )
16
[1+ ,4,2,4]+ = [2,2,4]+
{0101,12,23}
(1:0/1 2:0/11 4:0/4 )
8
[1+ ,1+ ,4,2,4]+ = [2,4]+
{12,23}
8
[1+ ,4,2+ ,4,1+ ] = [2,2,2]+
{0101,12,2323}
(1:0/1 2:0/7 )
4
[4+ ,2,4*] = [4]+
{01}
(1:0/1 2:0/1 4:0/2 )
Z4
2
[1+ ,4,2,4* ]+ = [2]+
{10}
Z2
2
[1+ ,(1+ ,4),2+ ,(4,1+ ),1+ ] = [2]+
{12}
(1:0/1 2:0/1 )
Z2
Order
Group
Generators
Structure
Diagram
16
[(4,2+ ,4,2+ )] = [4,2+ ,4]+
{03,12,0101}
(1:0/1 2:0/5 4:0/2 )
16
[4+ ,2,4+ ]
{01,23}
(1:0/1 2:0/3 4:0/12 )
Z4 2
8
[1+ ,4,1+ ,2,4+ ] = [2+ ,2,4+ ]
{0101,23}
Z2 ×Z4
4
[1+ ,4,1+ ,2,4,1+ ] = [2+ ,2,2+ ]
{0101,2323}
Z2 2
Order
Group
Generators
Structure
Diagram
32
[4,(2,4)+ ]
{0,12,23}
(1:0/1 2:4/11 4:12/4 )
32
[(4,2)+ ,4]
{01,12,3}
(1:0/1 2:4/11 4:12/4 )
32
[4,2+ ,4]
{0,12,3}
(1:0/1 2:8/11 4:8/4 )
32
[4+ ,2,4]
{01,2,3}
(1:0/1 2:8/3 4:8/12 )
Z4 ×D8
32
[4,2,4+ ]
{0,1,23}
(1:0/1 2:8/3 4:8/12 )
Z4 ×D8
Order
Group
Generators
Structure
Diagram
16
[4+ ,2+ ,4]
{012,3}
(1:0/1 2:4/3 4:4/4 )
16
[4,2+ ,4+ ]
{0,123}
(1:0/1 2:4/3 4:4/4 )
16
[4+ ,2,4,1+ ] = [4+ ,2,2]
{01,232,3}
(1:0/1 2:4/3 4:4/4 )
16
[1+ ,4,2+ ,4] = [2,(2,2)+ ]
{0101,12,3}
(1:0/1 2:4/7 4:4/0 )
16
[((4,2)+ ,(4,2)+ )]
{012,123}
(1:0/1 2:0/7 4:8/0 )
16
[1+ ,4,1+ ,2,4] = [2+ ,2,4]
{0101,2,3}
(1:0/1 2:8/3 4:0/4 )
Z2 ×D8
Order
Group
Generators
Structure
Diagram
8
[4+ ,2+ ,4+ ]
{0123,0132}
8
[1+ ,4,1+ ,2+ ,4] = [2+ ,2+ ,4]
{01012,3}
8
[1+ ,4,(2,4)+ ] = [2+ ,(2,4)+ ]
{0101,12,23}
8
[1+ ,4,1+ ,2,4,1+ ] = [2+ ,2,2]
{0101,2,323}
Z2 3
8
[1+ ,4,2+ ,4,1+ ] = [1+ ,4,2+ ,2] = [(2,2)+ ,2]
{0101,12,2323}
Order
Group
Type
Generators
Structure
Diagram
4
[1+ ,4,1+ ,2,1+ ,4,1+ ] = [2+ ,2,2+ ]
Doublerot
{0101,2323}
(1:0/1 2:0/3 )
Z2 2
4
[4+ ,2,4* ] = [4]+
Rot
{01}
(1:0/1 2:4/1 4:0/2 )
Z4
4
1 ⁄2 + ,2+ ,4+ ]Doublerot
{0123}
(1:0/1 2:0/1 4:0/2 )
Z4
Order
Group
Type
Count
Generators
Structure
2
[4*,2,4,1+,1+] = []
Ref
{0}
(1:0/1 2:1/0 )
D2
2
[1+ ,4,2+ ,4*] = [2+ ,2+ ]
Rotoref
{01012}
(1:0/1 2:1/0 )
D2
2
[1+ ,4+ ,2+ ,4+ ,1+ ] = [2+ ,2+ ,2+ ]
Doublerot
1
{01012323}
(1:0/1 2:0/1 )
Z2
2
1 ⁄2 + ,2+ ,4+ ]+ = [2+ ,2+ ,2+ ]Doublerot
{01230123}
(1:0/1 2:0/1 )
Z2
Order
Group
Type
Count
Generators
Structure
2
[4*,2,4*] = []+
Identity
1
{ }
(1:0/1 )
Z1
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