Alternative names (9)
compact form • compactForm • compactObjectType • compactification • compactness • is compact • isCompact • isNonCompact • isNoncompactRandom triples
| Subject | Object |
|---|---|
| gptkb:PGL(2,_C) | true |
| gptkb:SO(7,_R) | yes |
| gptkb:heterotic_M-theory | gptkb:Kähler_manifold |
| gptkb:AdS5_x_S5 | Kaluza-Klein compactification |
| gptkb:special_linear_group_SL(n,_C) | true |
| gptkb:Orthogonal_group_of_signature_(1,n) | true |
| gptkb:projective_general_linear_group_over_the_complex_numbers | true |
| gptkb:Projective_Special_Linear_Group_PSL(2,_R) | true |
| gptkb:PSL_2(R) | true |
| gptkb:SO(14) | yes |
| gptkb:moduli_space_of_abelian_varieties | gptkb:Satake_compactification |
| gptkb:Type_IIA_superstring_theory | gptkb:Calabi-Yau_manifolds |
| gptkb:SO(2) | compact |
| gptkb:projective_special_linear_group_PSL(n,C) | true |
| gptkb:Type_IIA_string_theory | leads to lower-dimensional theories |
| gptkb:Cantor_space | true |
| gptkb:special_orthogonal_group_SO(10) | true |
| gptkb:Lie_group_E_8 | compact simple Lie group |
| gptkb:G_2_×_F_4 | true |
| gptkb:unitary_groups | true |