hasDual

134 triples

GPTKB property

dual • dualConcept • dualSpace • dualTo • has dual • hasDualNumber • hasDuality • isDualOf • supportsDualDisplay

Subject	Object
gptkb:cyclic_cohomology	gptkb:cyclic_homology
gptkb:Join_(supremum,_∨)	Meet (infimum, ∧)
gptkb:type_IIB_string_theory_on_AdS5_x_S5	gptkb:N=4_supersymmetric_Yang-Mills_theory
gptkb:Hardy_space_H^1(ℝ^n)	gptkb:BMO(ℝ^n)
gptkb:NS5-branes	gptkb:D5-brane
gptkb:cone_(category_theory)	cocone (category theory)
gptkb:Sefirot_in_Kabbalah	right and left columns
gptkb:triakis_icosahedron	gptkb:truncated_dodecahedron
gptkb:great_truncated_icosidodecahedron	great disdyakis triacontahedron
gptkb:N=4_supersymmetric_Yang–Mills_theory	gptkb:AdS/CFT_correspondence
gptkb:SiS_315_graphics_chip	yes
gptkb:Hardy_space_H^2_of_the_unit_disk	itself (self-dual)
gptkb:Product_(category_theory)	gptkb:Coproduct_(category_theory)
gptkb:Cubus	gptkb:octahedron
gptkb:antiprisms	trapezohedron
gptkb:Regular_polytope	gptkb:Regular_polytope
gptkb:Convex_polytope	gptkb:dual_polytope
gptkb:hexagonal_prism	hexagonal bipyramid
gptkb:noncompact_Hermitian_symmetric_space	gptkb:compact_Hermitian_symmetric_space
gptkb:L^1_space	gptkb:L^∞_space