Alternative names (5)
Coxeter diagram • CoxeterDiagram • DynkinDiagram • has Dynkin diagram • hasDynkinDiagramRandom triples
| Subject | Object |
|---|---|
| gptkb:Weyl_group_of_E_6 | gptkb:E_6 |
| gptkb:split_E_6 | gptkb:E_6 |
| gptkb:snub_cube | nan |
| gptkb:affine_sl(2) | two nodes connected by a double arrow |
| gptkb:A_8_root_system | gptkb:A_8 |
| gptkb:E_6_Lie_group | E6 |
| gptkb:F4(q) | gptkb:F4 |
| gptkb:root_system_C_n | C_n diagram |
| gptkb:exceptional_Lie_group_G2 | two nodes connected by a triple bond |
| gptkb:root_system_A1 | single node |
| gptkb:G_2^{(1)} | affine extension of G_2 diagram |
| gptkb:E7_Lie_algebra | gptkb:E7_Dynkin_diagram |
| gptkb:E_8_Weyl_group | gptkb:E_8 |
| gptkb:Lie_algebra_of_type_F4 | gptkb:F4_Dynkin_diagram |
| gptkb:E_8_root_system | gptkb:E_8_Dynkin_diagram |
| gptkb:A4_(Dynkin_type) | o—o—o—o |
| gptkb:Weyl_group_of_F4 | 4 nodes with edges labeled 3, 4, 3 |
| gptkb:E_6_Lie_algebra | gptkb:E_6_Dynkin_diagram |
| gptkb:E_8_(compact_real_form) | gptkb:E_8_Dynkin_diagram |
| gptkb:E_8_singularity | gptkb:E_8 |