Alternative names (9)
dual • dualConcept • dualSpace • dualTo • has dual • hasDualNumber • hasDuality • isDualOf • supportsDualDisplayRandom triples
| Subject | Object |
|---|---|
| gptkb:A4_(Dynkin_type) | gptkb:A4_(Dynkin_type) |
| gptkb:Convex_Polyhedra | Convex Polyhedron |
| gptkb:7-dimensional_polytope | gptkb:7-cube |
| gptkb:modal_logic_S5 | ◇p ≡ ¬□¬p |
| gptkb:Convex_regular_polytope | convex regular polytope |
| gptkb:SiS_315_graphics_chip | yes |
| gptkb:7-orthoplex | gptkb:7-cube |
| gptkb:N=4_supersymmetric_Yang–Mills_theory | gptkb:AdS/CFT_correspondence |
| gptkb:sequence_space_l2 | itself (self-dual) |
| gptkb:L2_space | itself (self-dual) |
| gptkb:l^p_space_for_p_≥_1 | l^q space for 1/p + 1/q = 1, p > 1 |
| gptkb:trapezoidal_hexecontahedron | gptkb:snub_dodecahedron |
| gptkb:N=2_supersymmetric_Yang-Mills_theory | gptkb:electric-magnetic_duality |
| gptkb:Slovène | yes |
| gptkb:L^p(X,_μ) | L^q(X, μ) where 1/p + 1/q = 1, for 1 < p < ∞ |
| gptkb:Iñupiaq_language | yes |
| gptkb:l^1_space | gptkb:l^∞_space |
| gptkb:Cross-polytope | gptkb:Hypercube |
| gptkb:product_(category_theory) | coproduct (category theory) |
| gptkb:canonical_bundle | anticanonical bundle |