hasMaximalSubgroup

URI: https://gptkb.org/prop/hasMaximalSubgroup

186 triples

GPTKB property

has maximal subgroup • hasMaximalCompactSubgroup • hasMaximalSubgroups • isMaximalSubgroupOf • maximalSubgroup

Subject	Object
gptkb:SO(n+1,_C)	gptkb:SO(n+1)
gptkb:E_6(2)	2^54:O_54^-(2)
gptkb:general_linear_group_GL(n,C)	gptkb:unitary_group_U(n)
gptkb:Harada–Norton_group	19:6
gptkb:E_6(2)	2^45:O_45(2)
gptkb:reductive_Lie_group	gptkb:Lie_group
gptkb:E_6(-14)	SO(10) × U(1)/Z_4
gptkb:projective_special_linear_group_PSL_2(7)	gptkb:D_14
gptkb:E_8	gptkb:D_8
gptkb:complex_Lie_group_F4	gptkb:Spin(9)
gptkb:E_6(2)	2^49:O_49(2)
gptkb:Hall–Janko_group	PSU(3,3)
gptkb:general_linear_group_GL(n,_C)	gptkb:unitary_group_U(n)
gptkb:E_6(2)	2^73:O_73(2)
gptkb:S_7	gptkb:S_8
gptkb:E_6(2)	2^74:O_74^-(2)
gptkb:Harada–Norton_group	HS:2
gptkb:projective_special_linear_group_PSL_2(7)	Z_2 × Z_2 × Z_2
gptkb:E_8	gptkb:A_4_×_A_4
gptkb:Hall–Janko_group	2^4:A5