hasDual

134 triples

GPTKB property

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

Subject	Object
gptkb:N=4_supersymmetric_Yang–Mills_theory	gptkb:S-duality
gptkb:A4_(Dynkin_type)	gptkb:A4_(Dynkin_type)
gptkb:D6-brane	gptkb:Kaluza-Klein_monopole_in_M-theory
gptkb:SiS_315_graphics_chip	yes
gptkb:A_n^*_lattice	A_n lattice
gptkb:l^p_space_for_p_≥_1	l^q space for 1/p + 1/q = 1, p > 1
gptkb:N=2_supersymmetric_Yang-Mills_theory	gptkb:electric-magnetic_duality
gptkb:J2_(pentagonal_pyramid)	none
gptkb:affine_Lie_algebras	gptkb:Langlands_dual_affine_Lie_algebra
gptkb:Voronoi_polytopes	gptkb:Delaunay_polytopes
gptkb:J3_(triangular_cupola)	none
gptkb:7-dimensional_polytope	gptkb:7-simplex
gptkb:L^p_spaces_(1_≤_p_≤_∞)	L^q where 1/p + 1/q = 1, 1 < p < ∞
gptkb:Hyperbolic_tessellations	Dual tessellation
gptkb:Iñupiaq_language	yes
gptkb:Cohomology_group	gptkb:Homology_group
gptkb:Regular_n-polytope	gptkb:Regular_n-polytope
gptkb:ATI_Rage_128_Pro	no
gptkb:Tundra_Nenets_language	yes
gptkb:ABJM_theory	gptkb:M-theory_on_AdS4_×_S7/Zk