#alg type in dimension 4
#number of irreducibles : 7
#gl class number : 14

---
class 0:
[0100 0010 0001 1111]0000
centralizer=15
[1100 0110 0011 1110]0000
(0000) x 16
---
class 1:
[0100 0010 0001 1001]0000
centralizer=15
[1100 0110 0011 1000]0000
[0100 0010 0001 1001]0000
(0000) x 16
---
class 2:
[0100 0010 0001 1100]0000
centralizer=15
[1100 0110 0011 1101]0000
(0000) x 16
---
class 3:
[0100 0010 0001 1010]0000
centralizer=12
[1100 0110 0011 1011]0000
[0100 0010 0001 1010]0000
(0000) x 16
---
class 4:
[0100 1100 0001 0011]0000
centralizer=180
[1100 1000 0011 0010]0000
[1000 0100 0011 0010]0000
[1000 0100 1111 1010]0000
[1010 0101 1001 0111]0000
(0000) x 16
---
class 5:
[0100 0010 0001 1000]0000
centralizer=8
[0100 0010 0001 1000]0000
[1110 0111 1011 1101]0000
(0000) x 8
(1000) x 8
---
class 6:
[1000 0010 0001 0111]0000
centralizer=16
[1000 0010 0001 0111]0000
[1000 1111 1100 1010]0000
[1101 1111 1100 1010]0000
(0000) x 4
(1000) x 4
(0100) x 8
---
class 7:
[0100 0010 0001 1101]0000
centralizer=6
[0100 0010 0001 1101]0000
(0000) x 8
(1000) x 8
---
class 8:
[0100 1000 0001 0010]0000
centralizer=96
[0100 1000 0001 0010]0000
[1000 0100 0110 1001]0000
[1101 1110 1001 0110]0000
[1000 0100 0101 1010]0000
(0000) x 4
(1000) x 12
---
class 9:
[1000 0100 0001 0010]0000
centralizer=192
[1000 0100 0001 0010]0000
[1011 0100 0110 0101]0000
[1000 0100 0110 0101]0000
[1111 0100 0110 0101]0000
[0100 1100 0010 0001]0000
(0000) x 2
(1000) x 6
(0010) x 8
---
class 10:
[0100 0010 0001 1110]0000
centralizer=7
[0100 0010 0001 1110]0000
(0000) x 8
(1000) x 8
---
class 11:
[0100 0010 0001 1011]0000
centralizer=7
[0100 0010 0001 1011]0000
(0000) x 8
(1000) x 8
---
class 12:
[1000 0010 0001 0100]0000
centralizer=18
[1000 0010 0001 0100]0000
[1000 1100 1010 1001]0000
[0111 1110 1011 1101]0000
(0000) x 4
(1000) x 12
---
class 13:
[1000 0100 0010 0001]0000
centralizer=20160
[0111 0100 1010 1111]0000
[0101 0100 0010 1010]0000
[1000 1001 1010 0101]0000
(0000) x 1
(1000) x 15
***
#number of gl class :14
#number of ag class :25

Bye!