Alternative names (9)
dual • dualConcept • dualSpace • dualTo • has dual • hasDualNumber • hasDuality • isDualOf • supportsDualDisplayRandom triples
| Subject | Object |
|---|---|
| gptkb:Ordinary_cohomology | ordinary homology |
| gptkb:Heyting_algebra | gptkb:co-Heyting_algebra |
| gptkb:the_Fano_plane | self-dual |
| gptkb:tesseract_(4-cube) | gptkb:16-cell |
| gptkb:A_n^*_lattice | A_n lattice |
| gptkb:canonical_bundle | anticanonical bundle |
| gptkb:Convex_Polyhedra | Convex Polyhedron |
| gptkb:Tundra_Nenets_language | yes |
| gptkb:Lebesgue_space_L2 | itself (self-dual) |
| gptkb:J3_(triangular_cupola) | none |
| gptkb:Streett_automaton | gptkb:Rabin_automaton |
| gptkb:l^2_space | itself |
| gptkb:ABJM_theory | gptkb:M-theory_on_AdS4_×_S7/Zk |
| gptkb:J1_(square_pyramid) | self-dual |
| gptkb:L^1(X,_μ) | gptkb:L^∞(X,_μ) |
| gptkb:cyclic_cohomology | gptkb:cyclic_homology |
| gptkb:noncompact_Hermitian_symmetric_space | gptkb:compact_Hermitian_symmetric_space |
| gptkb:l^p_space_for_p_≥_1 | l^q space for 1/p + 1/q = 1, p > 1 |
| gptkb:l^1_space | gptkb:l^∞_space |
| gptkb:Old_English_language | yes |