Alternative names (5)
has maximal subgroup • hasMaximalCompactSubgroup • hasMaximalSubgroups • isMaximalSubgroupOf • maximalSubgroupRandom triples
| Subject | Object |
|---|---|
| gptkb:Harada–Norton_group | 7:6S3 |
| gptkb:E_6(2) | 2^7:O_6^+(2) |
| gptkb:E_6(2) | 2^41:O_41(2) |
| gptkb:E_6(2) | 2^57:O_57(2) |
| gptkb:symmetric_group_S_n_(n_≥_3) | A_n |
| gptkb:E_6(2) | 2^51:O_51(2) |
| gptkb:E_6(2) | 2^7:O_7(2) |
| gptkb:E_6(2) | 2^44:O_44^-(2) |
| gptkb:E_6(2) | 2^17:O_17(2) |
| gptkb:E_6(2) | 2^60:O_60^-(2) |
| gptkb:E_6(2) | 2^63:O_63(2) |
| gptkb:SO(2,3) | SO(2) x SO(3) |
| gptkb:Harada–Norton_group | U3(8):3 |
| gptkb:PSL(3,_2) | M_168 |
| gptkb:E_6(2) | 2^64:O_64^-(2) |
| gptkb:E_6(2) | 2^43:O_43(2) |
| gptkb:SL(n,_ℝ) | gptkb:SO(n) |
| gptkb:E_6(2) | 2^65:O_65(2) |
| gptkb:Hall–Janko_group | 2^1+4:5:4 |
| gptkb:symmetric_group_S_4 | gptkb:S_5 |