Alternative names (9)
compact form • compactForm • compactObjectType • compactification • compactness • is compact • isCompact • isNonCompact • isNoncompactRandom triples
| Subject | Object |
|---|---|
| gptkb:PSL(2,_C) | true |
| gptkb:O(n,_R) | true |
| gptkb:orthogonal_group_O(3) | true |
| gptkb:Joyce_manifold | true |
| gptkb:SU(2) | true |
| gptkb:SU(1) | true |
| gptkb:special_unitary_algebra_su(n) | true |
| gptkb:E_7(C) | gptkb:E_7_(compact) |
| gptkb:moduli_space_of_curves | gptkb:Deligne–Mumford_compactification |
| gptkb:SO(32)_heterotic_string | gptkb:Kähler_manifold |
| gptkb:SU(5) | true |
| gptkb:Sp(2n) | gptkb:compact_symplectic_group |
| gptkb:E_{7(-5)} | true |
| gptkb:SO(11) | true |
| gptkb:O(4) | true |
| gptkb:F-theory | elliptically fibered Calabi-Yau manifolds |
| gptkb:special_unitary_group_SU(3) | true |
| gptkb:M2-branes_in_M-theory | can give rise to D2-branes in type IIA string theory |
| gptkb:GL_n(C) | true |
| gptkb:rotation_group_of_the_sphere | true |