Alternative names (5)
has maximal subgroup • hasMaximalCompactSubgroup • hasMaximalSubgroups • isMaximalSubgroupOf • maximalSubgroupRandom triples
| Subject | Object |
|---|---|
| gptkb:symmetric_group_S_n_(n_≥_3) | A_n |
| gptkb:E_6(2) | 2^67:O_67(2) |
| gptkb:E_6(2) | 2^77:O_77(2) |
| gptkb:Harada–Norton_group | 19:6 |
| gptkb:projective_special_linear_group_PSL_2(7) | Z_7 : Z_3 |
| gptkb:E_6(2) | 2^37:O_37(2) |
| gptkb:E_6(2) | 2^35:O_35(2) |
| gptkb:E_6(2) | 2^38:O_38^-(2) |
| gptkb:symmetric_group_S_n_(n_≥_3) | S_{n-1} |
| gptkb:S_6 | gptkb:S_7 |
| gptkb:E_6(2) | 2^7:O_6^+(2) |
| gptkb:E_6(2) | 2^22:O_22^-(2) |
| gptkb:E_6(2) | 2^49:O_49(2) |
| gptkb:Suzuki_sporadic_group | true |
| gptkb:SL(n,_ℝ) | gptkb:SO(n) |
| gptkb:L_2(7) | gptkb:D_14 |
| gptkb:E_{7(-5)} | gptkb:SO(12)_×_SU(2) |
| gptkb:E_6(2) | 2^74:O_74^-(2) |
| gptkb:projective_special_linear_group_PSL_2(7) | Z_2 × Z_2 × Z_2 |
| gptkb:SO(1,4) | SO(4) |