Lie algebra

255 triples

GPTKB property

LieAlgebra • associated Lie algebra • has Lie algebra • hasLieAlgebra

Subject	Object
gptkb:SO_{n+1}(C)	so_{n+1}(C)
gptkb:Lorentz_group	so(3,1)
gptkb:SU(3)	gptkb:su(3)
gptkb:Sp(2n,C)	gptkb:sp(2n,C)
gptkb:so(7)	gptkb:so(7)
gptkb:special_unitary_group_SU(n)	gptkb:special_unitary_algebra_su(n)
gptkb:SO(11)	so(11)
gptkb:Sp(n)	gptkb:sp(n)
gptkb:orthogonal_group_O(10)	so(10)
gptkb:SL(3,C)	gptkb:sl(3,C)
gptkb:Sp(2n,_C)	gptkb:sp(2n,_C)
gptkb:Universal_covering_group_of_SL(2,_R)	gptkb:sl(2,_R)
gptkb:SO(1,n)	so(1,n)
gptkb:Special_Orthogonal_Group_in_10_dimensions_over_the_complex_numbers	so(10, C)
gptkb:Special_orthogonal_group_of_degree_n+1_over_the_complex_numbers	so(n+1, C)
gptkb:special_linear_group_SL(n,C)	gptkb:sl(n,C)
gptkb:Special_orthogonal_group_of_signature_(1,n)	so(1,n)
gptkb:complex_orthogonal_group_SO(4,C)	so(4,C)
gptkb:E_6_(mathematics)	gptkb:E_6_Lie_algebra
gptkb:SO(n+1,_C)	so(n+1, C)