Alternative names (5)
has maximal subgroup • hasMaximalCompactSubgroup • hasMaximalSubgroups • isMaximalSubgroupOf • maximalSubgroupRandom triples
| Subject | Object |
|---|---|
| gptkb:Harada–Norton_group | 2^1+8:Alt(5) |
| gptkb:Mathieu_group_M12 | gptkb:M11 |
| gptkb:E_6(2) | 2^13:O_13(2) |
| gptkb:E_6(2) | 2^66:O_66^-(2) |
| gptkb:E_6(2) | 2^59:O_59(2) |
| gptkb:symmetric_group_S_9 | S_8 × S_1 |
| gptkb:L_2(7) | Z_7 : Z_3 |
| gptkb:E7(-133) | SU(8)/{±I} |
| gptkb:symmetric_group_S_9 | S_7 × S_2 |
| gptkb:Hall–Janko_group | 11:10 |
| gptkb:E_6(2) | 2^46:O_46^-(2) |
| gptkb:E_6(2) | 2^77:O_77(2) |
| gptkb:Hall–Janko_group | 2^4:A5 |
| gptkb:Harada–Norton_group | 5^2:4S5 |
| gptkb:SO(n+1,_C) | gptkb:SO(n+1) |
| gptkb:G2_group | SO(4) |
| gptkb:Hall–Janko_group | 2^1+4:5:4 |
| gptkb:E_6(2) | 2^58:O_58^-(2) |
| gptkb:E_6(2) | 2^10:O_10^-(2) |
| gptkb:E_6(2) | 2^37:O_37(2) |