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Statements

Subject Item: dbr:Calkin–Wilf_tree
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cantor's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cardinality_of_the_continuum
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cartesian_product
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Amorphous_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bell_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Power_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quadratic_irrational_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quadric
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Robinson–Schensted_correspondence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Schröder–Bernstein_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Element_(category_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Elias_delta_coding
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Elias_gamma_coding
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Elias_omega_coding
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:End_(topology)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Entity–relationship_model
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Myhill_isomorphism_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:New_Foundations
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Scott's_trick
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:One-dimensional_symmetry_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Parsimonious_reduction
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Representation_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Prime_geodesic
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Subcategory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bencode
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bijectiob
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Binary_relation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Binary_tree
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bipartite_double_cover
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bounded_inverse_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Antiisomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Arc_length
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Argumentation_framework
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homogeneous_relation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homography
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homotopy_groups_of_spheres
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Hypercube_graph
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bertrand's_ballot_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:List_of_mathematical_symbols_by_subject
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:List_of_set_identities_and_relations
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Permutohedron
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Relation_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Reversible_cellular_automaton
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:CubeHash
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cubic_form
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Currying
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Curve
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cycle_index
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Càdlàg
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ultrafilter_(set_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Uniform_isomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Uniform_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Unital_(geometry)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Valuation_ring
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Vector_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Vincent's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Volume_of_an_n-ball
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Von_Staudt_conic
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Decomposition_of_a_module
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Derived_set_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Development_(differential_geometry)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Deviation_risk_measure
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Double_coset
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Dyadic_rational
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Earth_mover's_distance
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Incidence_geometry
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Interval_exchange_transformation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Interval_order
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inverse_semigroup
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inversion_transformation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inversive_distance
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Involutory_matrix
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Jacquet–Langlands_correspondence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:LB-space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Lifting_scheme
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:List_of_group_theory_topics
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:List_of_permutation_topics
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Order_isomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Robinson–Schensted–Knuth_correspondence
dbo:wikiPageWikiLink: dbr:Bijection
gold:hypernym: dbr:Bijection

Subject Item: dbr:Z_curve
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Nowhere_commutative_semigroup
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Nowhere_dense_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quotient_ring
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:PSPACE-complete
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Prüfer_sequence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quasi-Hopf_algebra
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Stiefel–Whitney_class
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Perspectivity
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Witt_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:'t_Hooft_loop
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:0.999...
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:100_prisoners_problem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Complex_logarithm
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Complex_plane
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Computability_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Conic_section
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Constructible_universe
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Construction_of_the_real_numbers
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Constructivism_(philosophy_of_mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Countable_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Analogy
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Matrix_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Matrix_representation_of_conic_sections
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:General_topology
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Geometric_transformation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Nominal_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:One-time_pad
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:One-to-one_correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:One-way_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Open_book_decomposition
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Order_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Order_type
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Orientation_(graph_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quasigroup
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Transport_of_structure
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Class_(set_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Code_page_37
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Alexander's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ellipse
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Endomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Equality_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Function_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Function_composition
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Generalized_continued_fraction
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Georg_Cantor
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Glossary_of_group_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Graph_homomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Graph_labeling
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Boundary_parallel
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Morphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Multiplication_(music)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Conductor_(ring_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Conformal_map
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Continuum_hypothesis
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Controlled_vocabulary
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Convex_body
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Coordinate_system
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Coproduct
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Correspondence_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cryptomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Equinumerosity
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Equivalent_definitions_of_mathematical_structures
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Aristotle's_wheel_paradox
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bent_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Berman–Hartmanis_conjecture
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Legendre_polynomials
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Linear_algebra
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Linear_form
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Localization_(commutative_algebra)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Similarity_(geometry)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bijections
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijective
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijective_relation
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Steiner_system
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Stereographic_projection
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Straightedge_and_compass_construction
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Suffix_automaton
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Collineation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Combination
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Combinatorial_proof
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Combinatorial_species
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Comma_category
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Commutative_diagram
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Complex_coordinate_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Complex_measure
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Computable_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Computable_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Federer–Morse_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Function_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Fundamental_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Half-integer
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ideal_quotient
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Idempotent_(ring_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Identifiability
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Khinchin's_constant
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:PG(3,2)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Paradoxes_of_set_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Parity_of_a_permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Partial_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Perfect_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Permuted_congruential_generator
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Picture_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection
gold:hypernym: dbr:Bijection

Subject Item: dbr:Plane_(geometry)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Pocket_set_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Polish_notation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Space_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Spectrum_of_a_sentence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Subgroup
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Successor_cardinal
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Symmetry_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Mathematics,_Form_and_Function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Matroid_representation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Young's_lattice
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Musical_cryptogram
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Stack-sortable_permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Automorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:BKL_singularity
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Adjoint_functors
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cayley_transform
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cayley–Hamilton_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Time_evolution
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Total_order
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Tree_traversal
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Trigonometric_functions
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Truth_value
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Weierstrass_elliptic_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Wigner's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Distributive_category
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Distributive_lattice
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Divergent_series
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:GPS_signals
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Gamas's_Theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Correspondence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Gårding_domain
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Irrelevant_ideal
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Jónsson–Tarski_algebra
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Lambert_azimuthal_equal-area_projection
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Latimer–MacDuffee_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Lattice_(order)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Lattice_graph
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Linear_bottleneck_assignment_problem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Linear_extension
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Linear_map
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Link_(simplicial_complex)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Lipschitz_domain
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Logicism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Permutation_polynomial
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Tennenbaum's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Representation_theory_of_finite_groups
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Point_plotting
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:6
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Abstract_simplicial_complex
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Affine_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Affine_symmetric_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Affine_transformation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Aleph_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: n24:1
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Curvilinear_coordinates
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cyclic_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cyclic_order
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cyclic_permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Dual_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Duality_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Alternating_permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Equivalence_relation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Euler's_totient_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Exponential_family
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Exponential_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:F._Riesz's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Fallibilism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Fibonacci_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Field_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Finite_intersection_property
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Finite_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Banach_manifold
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Base-orderable_matroid
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Brauer's_three_main_theorems
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Nicolas_Bourbaki
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Numeral_system
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:P-adic_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Pairing_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cardinal_assignment
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cardinal_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cardinality
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Causal_sets
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cayley_configuration_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Diaconescu's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Diffeomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Dihedral_group_of_order_6
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Direct_sum
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Discrete_Morse_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Discrete_mathematics
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Fano_plane
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Foundations_of_geometry
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Fourth_normal_form
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Fractional_graph_isomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Glossary_of_topology
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Gompertz_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Graph_amalgamation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Graph_isomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Hanner_polytope
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Hirsch_conjecture
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:History_of_computing
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Isomorphism_theorems
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Isotopy_of_loops
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Joy_(programming_language)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Kaprekar_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Knowledge_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Unconditional_convergence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Natural_density
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Mathematical_proof
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Projection_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quadratic_assignment_problem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Quotient_space_(topology)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Rader's_FFT_algorithm
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Radical_of_an_ideal
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Relation_algebra
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Relational_model
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ring_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Zappa–Szép_product
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Group_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Group_homomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Group_structure_and_the_axiom_of_choice
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Height_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Asymmetric_norm
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inverse_element
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inverse_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Invertible_matrix
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Involution_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Isometry
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Back-and-forth_method
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Covering_graph
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Covering_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Tensor
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Hyperbola
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Hyperfinite_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Hypergraph
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Special_classes_of_semigroups
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Steiner_conic
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Small_Latin_squares_and_quasigroups
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Asymptotic_equipartition_property
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Absoluteness
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Characteristic_function_(probability_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Characterizations_of_the_exponential_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Chern_class
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Kernel_(set_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Laplace_expansion
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Lattice_path
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bidirectional_map
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bidirectional_transformation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bijection
rdf:type: yago:Function113783816 yago:Relation100031921 yago:Content105809192 yago:MathematicalRelation113783581 yago:WikicatBasicConceptsInSetTheory yago:PsychologicalFeature100023100 yago:WikicatFunctionsAndMappings yago:WikicatSpecialFunctions yago:Concept105835747 yago:Abstraction100002137 dbo:Disease yago:Cognition100023271 yago:Idea105833840
rdfs:label: Бієкція Bijektiv funktion Bijeksi 전단사 함수 Биекция Bijectie Función biyectiva Bijekzio 双射 Bijektive Funktion Bijekce Bijection Função bijectiva Corrispondenza biunivoca 全単射 Funció bijectiva Funkcja wzajemnie jednoznaczna تقابل (دالة) Dissurĵeto Bijection
rdfs:comment: Funkcja wzajemnie jednoznaczna, bijekcja – wzajemnie jednoznaczna odpowiedniość między elementami dwóch zbiorów, czyli funkcja będąca jednocześnie iniekcją i suriekcją (funkcją różnowartościową i funkcją „na”). Równoważnie: * funkcja jest bijekcją wtedy i tylko wtedy, gdy istnieje funkcja do niej odwrotna – również i ona jest bijekcją; * przy bijekcji przeciwobraz każdego singletonu również jest singletonem. Bijekcje pozwalają zdefiniować rozmaite relacje równoważności między obiektami, m.in.: Termin bijekcja powstał najpóźniej w 1954 roku, kiedy pojawił się w pracy zespołu Nicolas Bourbaki. En mathématiques, une bijection est une application bijective. Une application est bijective si tout élément de son ensemble d'arrivée a un et un seul antécédent, c'est-à-dire est image d'exactement un élément (de son domaine de définition), ou encore si elle est à la fois injective et surjective. Les bijections sont aussi parfois appelées correspondances biunivoques. On peut remarquer que dans cette définition, on n'impose pas de condition aux éléments de l'ensemble de départ, autre que celle qui définit une application : tout élément a une image et une seule. Uma função bijetiva, função bijetora, correspondência biunívoca ou bijeção, é uma função injectiva e sobrejectiva (injetora e sobrejetora, como é mais comum em português brasileiro). * Uma função bijetiva (injetiva e sobrejetiva ao mesmo tempo) * Função injetiva, mas não sobrejetiva (portanto não é bijetiva) * Função sobrejetiva, mas não injetiva (portanto não é bijetiva) * Função nem injetiva nem sobrejetiva (portanto não é bijetiva) Os termos injectiva, sobrejectiva e bijectiva se popularizaram devido ao seu uso por Nicolas Bourbaki. Bijektivität (zum Adjektiv bijektiv, welches etwa ‚umkehrbar eindeutig auf‘ bedeutet – daher auch der Begriff eineindeutig bzw. substantivisch entsprechend Eineindeutigkeit) ist ein mathematischer Begriff aus dem Bereich der Mengenlehre. Er bezeichnet eine spezielle Eigenschaft von Abbildungen und Funktionen. Bijektive Abbildungen und Funktionen nennt man auch Bijektionen. Zu einer mathematischen Struktur auftretende Bijektionen haben oft eigene Namen wie Isomorphismus, Diffeomorphismus, Homöomorphismus, Spiegelung oder Ähnliches. Hier sind dann in der Regel noch zusätzliche Forderungen in Hinblick auf die Erhaltung der jeweils betrachteten Struktur zu erfüllen. In de wiskunde is een bijectie, bijectieve afbeelding of een-op-een-correspondentie een afbeelding of functie, die zowel injectief als surjectief is, dus alle elementen van twee verzamelingen een-op-een aan elkaar koppelt. Bijectief wil dus zeggen dat ieder element uit het domein gekoppeld is aan precies één element uit het codomein en dat omgekeerd ook ieder element van gekoppeld is aan precies één element uit . Een correspondentie is een tweeplaatsige relatie, die zowel links- als rechtsvolledig is. In mathematics, a bijection, also known as a bijective function, one-to-one correspondence, or invertible function, is a function between the elements of two sets, where each element of one set is paired with exactly one element of the other set, and each element of the other set is paired with exactly one element of the first set. There are no unpaired elements. In mathematical terms, a bijective function f: X → Y is a one-to-one (injective) and onto (surjective) mapping of a set X to a set Y. The term one-to-one correspondence must not be confused with one-to-one function (an injective function; see figures). Matematika funkcio nomiĝas dissurĵeto (aŭ bijekcio, aŭ inversigebla funkcio), se ĝi estas disĵeto kaj surĵeto. 数学において、全単射（ぜんたんしゃ）あるいは双射（そうしゃ）(bijective function, bijection) とは、写像であって、その写像の終域となる集合の任意の元に対し、その元を写像の像とする元が、写像の定義域となる集合に常にただ一つだけ存在するようなもの、すなわち単射かつ全射であるような写像のことを言う。例としては、群論で扱われる置換が挙げられる。全単射であることを1対1上への写像[上への1対1写像] (one-to-one onto mapping)あるいは1対1対応 (one-to-one correspondence) ともいうが、紛らわしいのでここでは使用しない。写像 f が全単射のとき、f は可逆であるともいう。 In matematica una corrispondenza biunivoca tra due insiemi e è una relazione binaria tra e , tale che ad ogni elemento di corrisponda uno ed un solo elemento di , e viceversa ad ogni elemento di corrisponda uno ed un solo elemento di . In particolare, la corrispondenza biunivoca è una relazione di equivalenza. Lo stesso concetto può anche essere espresso usando le funzioni. Si dice che una funzione è biiettiva se per ogni elemento di vi è uno e un solo elemento di tale che . Una tale funzione è detta anche biiezione, bigezione, funzione bigettiva o funzione biunivoca. Бие́кция — отображение, которое является одновременно и сюръективным, и инъективным. При биективном отображении каждому элементу одного множества соответствует ровно один элемент другого множества, при этом определено обратное отображение, которое обладает тем же свойством. Поэтому биективное отображение называют также взаимно однозначным отображением (соответствием). Биективное отображение, являющееся гомоморфизмом, называют изоморфным соответствием. Взаимно однозначное отображение конечного множества на себя называется перестановкой (или подстановкой) элементов этого множества. Примеры: и En bijektiv funktion är en funktion, som är injektiv och surjektiv. En alternativ definition av bijektiv funktion kan uttryckas som: En bijektiv funktion är en funktion f, från mängden X till mängden Y, som är omvändbar och sådan att f:s definitionsmängd Df = X och f:s värdemängd Vf = Y. * En injektiv och surjektiv funktion och därmed en bijektiv funktion * En injektiv men ej surjektiv funktion och därmed ej en bijektiv funktion * En surjektiv men ej injektiv funktion och därmed ej en bijektiv funktion 數學中，一個由集合映射至集合的函數，若對每一在內的，存在唯一一個在內的与其对应，且對每一在內的，存在唯一一個在內的与其对应，則此函數為對射函數。換句話說，如果其為兩集合間的一一對應，则是雙射的。即，同時為單射和滿射。例如，由整數集合至的函數，其將每一個整數連結至整數，這是一個雙射函數；再看一個例子，函數，其將每一對實數連結至，這也是個雙射函數。一雙射函數亦簡稱為雙射（英語：bijection）或置換。後者一般較常使用在時。以由至的所有雙射組成的集合標記為。雙射函數在許多數學領域扮演著很基本的角色，如在同構的定義（以及如同胚和等相關概念）、置換群、投影映射及許多其他概念的基本上。 Matematikan, bijekzioa edo funtzio bijektiboa funtzio bat da, aldi berean injektiboa eta supraiektiboa dena; hau da, X multzoko elementu bakoitzari Y multzoko elementu bat dagokio, eta Y multzoko edozein y elementuri y = f(x) funtzioa beteko duen X multzoko x elementu bakarra dagokio. Formalki, Aurrekoaren ondorio zuzena hau da: funtzio bijektibo batean abiaburu-multzoko edo Definizio-eremuaren kardinalitatea, eta helburu-multzoarena edo irudi-multzoarena, berbera da. Hori adibidean ikus daiteke, non |X|=|Y|=4 den. Бієкція (бієктивна функція, бієктивне відображення, взаємно однозначна відповідність) — в математиці відображення, яке є одночасно сюр'єктивним та ін'єктивним. Інтуїтивно можна визначити бієкцію як відповідність, яка асоціює один елемент вхідної множини з одним і тільки одним елементом результуючої множини і навпаки, одному елементу результуючої множини зіставляється один і лише один елемент вхідної множини. Тобто, відображення f: X→Y є бієктивним, коли кожному елементу y з множини Y зіставлений один і лише один елемент x з множини X, і f(x) = y. Dalam matematika, bijeksi, fungsi bijektif, korespondensi satu-ke-satu, atau fungsi terbalikkan adalah fungsi yang melibatkan elemen-elemen dari dua himpunan. Setiap elemen dari satu himpunan dipasangkan dengan tepat ke satu elemen dari himpunan lainnya. Setiap elemen dari himpunan lainnya dipasangkan dengan tepat ke satu elemen dari himpunan pertama. Tidak ada elemen yang tidak berpasangan atau memiliki lebih dari satu pasangan. Dalam istilah matematika, fungsi bijektif f: X → Y adalah pemetaan satu-ke-satu (injeksi) dan onto (surjektif) dari himpunan X ke himpunan Y. Istilah korespondensi satu-ke-satu tidak boleh disalahartikan dengan fungsi satu-ke-satu (fungsi injeksi). En matemàtiques, una funció o aplicació bijectiva també anomenada simplement una bijecció és una funció f d'un conjunt X a un conjunt Y (f:X → Y) amb la propietat que per a cada y de Y hi ha exactament un x de X tal que . D'una bijecció també se'n diu una permutació. Tot i que això es fa servir més habitualment quan . El conjunt de totes les bijeccions de X en Y es denota com a . De fet, quan existeix alguna bijecció entre dos conjunts X i Y es diu que aquests són equipotents i es nota . La relació d'equipotència és d'equivalència i conserva moltes propietats, com el cardinal. En matemáticas, una función es biyectiva si es al mismo tiempo inyectiva y sobreyectiva; es decir, si todos los elementos del conjunto de salida tienen una imagen distinta en el conjunto de llegada, y a cada elemento del conjunto de llegada le corresponde un elemento del conjunto de salida. Formalmente, dada una función : La función es biyectiva si se cumple la siguiente condición: Es decir, para todo de se cumple que existe un único de , tal que la función evaluada en es igual a . في الرياضيات، الدالة التقابلية (بالإنجليزية: Bijective Function)‏ أو ببساطة، التقابل، هي دالة رياضية من مجموعة X إلى مجموعة Y حيث كل عنصر y من المجموعة المستقر Y ،هناك سابق واحد فقط x من المجموعة المنطلق X حيث يكون : f(x) = y أي أن y هي صورة x بالدالة f. 수학에서 전단사 함수(全單射函數, 영어: bijection, bijective function)는 두 집합 사이를 중복 없이 모두 일대일로 대응시키는 함수이다. 일대일 대응(一對一對應, 영어: one-to-one correspondence)이라고도 한다.
foaf:depiction: n42:Injection.svg n42:Surjection.svg n42:Not-Injection-Surjection.svg n42:Bijective_composition.svg n42:Bijection.svg
dcterms:subject: dbc:Basic_concepts_in_set_theory dbc:Functions_and_mappings dbc:Types_of_functions dbc:Mathematical_relations
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dbo:abstract: Dalam matematika, bijeksi, fungsi bijektif, korespondensi satu-ke-satu, atau fungsi terbalikkan adalah fungsi yang melibatkan elemen-elemen dari dua himpunan. Setiap elemen dari satu himpunan dipasangkan dengan tepat ke satu elemen dari himpunan lainnya. Setiap elemen dari himpunan lainnya dipasangkan dengan tepat ke satu elemen dari himpunan pertama. Tidak ada elemen yang tidak berpasangan atau memiliki lebih dari satu pasangan. Dalam istilah matematika, fungsi bijektif f: X → Y adalah pemetaan satu-ke-satu (injeksi) dan onto (surjektif) dari himpunan X ke himpunan Y. Istilah korespondensi satu-ke-satu tidak boleh disalahartikan dengan fungsi satu-ke-satu (fungsi injeksi). Sebuah bijeksi dari himpunan X ke himpunan Y memiliki fungsi invers dari Y ke X. Jika X dan Y adalah himpunan hingga, maka keberadaan suatu bijeksi berarti bahwa kedua himpunan tersebut memiliki jumlah elemen yang sama. Untuk himpunan tak berhingga, digunakan konsep bilangan kardinal—cara untuk membedakan berbagai ukuran himpunan tak berhingga. Fungsi bijektif dari suatu himpunan ke dirinya sendiri disebut permutasi dan himpunan semua permutasi dari suatu himpunan membentuk sebuah grup simetris. Fungsi bijektif sangat penting dalam berbagai bidang matematika termasuk definisi isomorfisme, homeomorfisme, difeomorfisme, kelompok permutasi, dan peta projektif. في الرياضيات، الدالة التقابلية (بالإنجليزية: Bijective Function)‏ أو ببساطة، التقابل، هي دالة رياضية من مجموعة X إلى مجموعة Y حيث كل عنصر y من المجموعة المستقر Y ،هناك سابق واحد فقط x من المجموعة المنطلق X حيث يكون : f(x) = y أي أن y هي صورة x بالدالة f. Funkcja wzajemnie jednoznaczna, bijekcja – wzajemnie jednoznaczna odpowiedniość między elementami dwóch zbiorów, czyli funkcja będąca jednocześnie iniekcją i suriekcją (funkcją różnowartościową i funkcją „na”). Równoważnie: * funkcja jest bijekcją wtedy i tylko wtedy, gdy istnieje funkcja do niej odwrotna – również i ona jest bijekcją; * przy bijekcji przeciwobraz każdego singletonu również jest singletonem. Bijekcje pozwalają zdefiniować rozmaite relacje równoważności między obiektami, m.in.: * równoliczności zbiorów w kombinatoryce i teorii mnogościi, * izomorfizmu struktur w algebrze abstrakcyjnej i teorii kategorii; * homeomorfizmu, izometrii i dyfeomorfizmu przestrzeni w topologii. Duże znaczenie odgrywają też bijekcje , tj. przekształcające zbiór w siebie (f:X→X). Bywają nazywane permutacjami – zwłaszcza dla zbiorów skończonych – i tworzą struktury znane jako grupy symetryczne; przekształcenia te pozwalają zdefiniować symetrię figur i innych obiektów. Bijekcje zbioru w siebie po nałożeniu dodatkowych warunków tworzą podgrupy grup symetrycznych, np. grupy alternujące, grupy automorfizmów, izometrii czy dyfeomorfizmów. Szczególnym rodzajem endobijekcji są też inwolucje i inne funkcje torsyjne (skończonego rzędu). Termin bijekcja powstał najpóźniej w 1954 roku, kiedy pojawił się w pracy zespołu Nicolas Bourbaki. Uma função bijetiva, função bijetora, correspondência biunívoca ou bijeção, é uma função injectiva e sobrejectiva (injetora e sobrejetora, como é mais comum em português brasileiro). * Uma função bijetiva (injetiva e sobrejetiva ao mesmo tempo) * Função injetiva, mas não sobrejetiva (portanto não é bijetiva) * Função sobrejetiva, mas não injetiva (portanto não é bijetiva) * Função nem injetiva nem sobrejetiva (portanto não é bijetiva) Os termos injectiva, sobrejectiva e bijectiva se popularizaram devido ao seu uso por Nicolas Bourbaki. In de wiskunde is een bijectie, bijectieve afbeelding of een-op-een-correspondentie een afbeelding of functie, die zowel injectief als surjectief is, dus alle elementen van twee verzamelingen een-op-een aan elkaar koppelt. Bijectief wil dus zeggen dat ieder element uit het domein gekoppeld is aan precies één element uit het codomein en dat omgekeerd ook ieder element van gekoppeld is aan precies één element uit . Een correspondentie is een tweeplaatsige relatie, die zowel links- als rechtsvolledig is. Voor elke bijectie van een verzameling op een verzameling bestaat er een inverse functie van naar , die zelf ook een bijectie is. Een bijectie van een verzameling op zichzelf wordt wel een permutatie genoemd. Bijecties zijn essentieel voor veel deelgebieden binnen de wiskunde, voor onder meer de definities van permutatiegroep, isomorfisme, homeomorfisme en diffeomorfisme. De aanduiding 'bijectieve afbeelding' werd geïntroduceerd door Bourbaki. 수학에서 전단사 함수(全單射函數, 영어: bijection, bijective function)는 두 집합 사이를 중복 없이 모두 일대일로 대응시키는 함수이다. 일대일 대응(一對一對應, 영어: one-to-one correspondence)이라고도 한다. In mathematics, a bijection, also known as a bijective function, one-to-one correspondence, or invertible function, is a function between the elements of two sets, where each element of one set is paired with exactly one element of the other set, and each element of the other set is paired with exactly one element of the first set. There are no unpaired elements. In mathematical terms, a bijective function f: X → Y is a one-to-one (injective) and onto (surjective) mapping of a set X to a set Y. The term one-to-one correspondence must not be confused with one-to-one function (an injective function; see figures). A bijection from the set X to the set Y has an inverse function from Y to X. If X and Y are finite sets, then the existence of a bijection means they have the same number of elements. For infinite sets, the picture is more complicated, leading to the concept of cardinal number—a way to distinguish the various sizes of infinite sets. A bijective function from a set to itself is also called a permutation, and the set of all permutations of a set forms the symmetric group. Bijective functions are essential to many areas of mathematics including the definitions of isomorphism, homeomorphism, diffeomorphism, permutation group, and projective map. In matematica una corrispondenza biunivoca tra due insiemi e è una relazione binaria tra e , tale che ad ogni elemento di corrisponda uno ed un solo elemento di , e viceversa ad ogni elemento di corrisponda uno ed un solo elemento di . In particolare, la corrispondenza biunivoca è una relazione di equivalenza. Lo stesso concetto può anche essere espresso usando le funzioni. Si dice che una funzione è biiettiva se per ogni elemento di vi è uno e un solo elemento di tale che . Una tale funzione è detta anche biiezione, bigezione, funzione bigettiva o funzione biunivoca. Бієкція (бієктивна функція, бієктивне відображення, взаємно однозначна відповідність) — в математиці відображення, яке є одночасно сюр'єктивним та ін'єктивним. Інтуїтивно можна визначити бієкцію як відповідність, яка асоціює один елемент вхідної множини з одним і тільки одним елементом результуючої множини і навпаки, одному елементу результуючої множини зіставляється один і лише один елемент вхідної множини. Тобто, відображення f: X→Y є бієктивним, коли кожному елементу y з множини Y зіставлений один і лише один елемент x з множини X, і f(x) = y. В теорії множин стверджується, що бієкцію між двома множинами X та Y можна встановити тоді і лише тоді, коли ці множини є рівнопотужними. En matemáticas, una función es biyectiva si es al mismo tiempo inyectiva y sobreyectiva; es decir, si todos los elementos del conjunto de salida tienen una imagen distinta en el conjunto de llegada, y a cada elemento del conjunto de llegada le corresponde un elemento del conjunto de salida. Formalmente, dada una función : La función es biyectiva si se cumple la siguiente condición: Es decir, para todo de se cumple que existe un único de , tal que la función evaluada en es igual a . Dados dos conjuntos finitos e , entonces existirá una biyección entre ambos si y solo si e tienen el mismo número de elementos. En matemàtiques, una funció o aplicació bijectiva també anomenada simplement una bijecció és una funció f d'un conjunt X a un conjunt Y (f:X → Y) amb la propietat que per a cada y de Y hi ha exactament un x de X tal que . Desglossant aquesta propietat en d'altres importants podem dir que f és bijectiva si és una correspondència tal que tots els elements del domini tenen imatge (és a dir, és una funció), tots els elements del recorregut tenen una única antiimatge, (és a dir, és una funció injectiva) i al mateix temps tots els elements del codomini són al recorregut perquè són imatge d'algun element del domini (és a dir, és una funció suprajectiva). En definitiva, una funció injectiva i exhaustiva. D'una bijecció també se'n diu una permutació. Tot i que això es fa servir més habitualment quan . El conjunt de totes les bijeccions de X en Y es denota com a . De fet, quan existeix alguna bijecció entre dos conjunts X i Y es diu que aquests són equipotents i es nota . La relació d'equipotència és d'equivalència i conserva moltes propietats, com el cardinal. Les funcions bijectives juguen un paper fonamental en moltes àrees de les matemàtiques, per exemple en la definició d'isomorfismes (i conceptes relacionats com els homeomorfismes i els difeomorfismes), grup de permutacions, , i molts altres. 数学において、全単射（ぜんたんしゃ）あるいは双射（そうしゃ）(bijective function, bijection) とは、写像であって、その写像の終域となる集合の任意の元に対し、その元を写像の像とする元が、写像の定義域となる集合に常にただ一つだけ存在するようなもの、すなわち単射かつ全射であるような写像のことを言う。例としては、群論で扱われる置換が挙げられる。全単射であることを1対1上への写像[上への1対1写像] (one-to-one onto mapping)あるいは1対1対応 (one-to-one correspondence) ともいうが、紛らわしいのでここでは使用しない。写像 f が全単射のとき、f は可逆であるともいう。 En mathématiques, une bijection est une application bijective. Une application est bijective si tout élément de son ensemble d'arrivée a un et un seul antécédent, c'est-à-dire est image d'exactement un élément (de son domaine de définition), ou encore si elle est à la fois injective et surjective. Les bijections sont aussi parfois appelées correspondances biunivoques. On peut remarquer que dans cette définition, on n'impose pas de condition aux éléments de l'ensemble de départ, autre que celle qui définit une application : tout élément a une image et une seule. S'il existe une bijection f d'un ensemble E dans un ensemble F alors il en existe une de F dans E : la bijection réciproque de f, qui à chaque élément de F associe son antécédent par f. On peut alors dire que ces ensembles sont en bijection, ou équipotents. Cantor a le premier démontré que s'il existe une injection de E vers F et une injection de F vers E (non nécessairement surjectives), alors E et F sont équipotents (c'est le théorème de Cantor-Bernstein). Si deux ensembles finis sont équipotents alors ils ont le même nombre d'éléments. L'extension de cette équivalence aux ensembles infinis a mené au concept de cardinal d'un ensemble, et à distinguer différentes tailles d'ensembles infinis, qui sont des classes d'équipotence. Ainsi, on peut par exemple montrer que l'ensemble des entiers naturels est de même taille que l'ensemble des rationnels, mais de taille strictement inférieure à l'ensemble des réels. En effet, de dans , il existe des injections mais pas de surjection. Бие́кция — отображение, которое является одновременно и сюръективным, и инъективным. При биективном отображении каждому элементу одного множества соответствует ровно один элемент другого множества, при этом определено обратное отображение, которое обладает тем же свойством. Поэтому биективное отображение называют также взаимно однозначным отображением (соответствием). Биективное отображение, являющееся гомоморфизмом, называют изоморфным соответствием. Если между двумя множествами можно установить взаимно однозначное соответствие (биекцию), то такие множества называются равномощными. С точки зрения теории множеств, равномощные множества неразличимы. Взаимно однозначное отображение конечного множества на себя называется перестановкой (или подстановкой) элементов этого множества. Формально, функция называется биекцией (и обозначается ), если она: * переводит разные элементы множества в разные элементы множества (инъективность):. * любой элемент из имеет свой прообраз (сюръективность):. Примеры: * Тождественное отображение на множестве биективно. * — биективные функции из в себя; вообще, любой моном одной переменной нечетной степени является биекцией из в себя. * — биективная функция из в . * не является биективной функцией, если считать её определённой на всём . * Строго монотонная и непрерывная функция является биекцией из отрезка на отрезок . Функция является биективной тогда и только тогда, когда существует обратная функция такая, что: и Если функции и биективны, то и композиция функций биективна, в этом случае , то есть, композиция биекций является биекцией. Обратное в общем случае неверно: если биективна, то можно лишь утверждать, что инъективна, а сюръективна. Matematika funkcio nomiĝas dissurĵeto (aŭ bijekcio, aŭ inversigebla funkcio), se ĝi estas disĵeto kaj surĵeto. En bijektiv funktion är en funktion, som är injektiv och surjektiv. En alternativ definition av bijektiv funktion kan uttryckas som: En bijektiv funktion är en funktion f, från mängden X till mängden Y, som är omvändbar och sådan att f:s definitionsmängd Df = X och f:s värdemängd Vf = Y. * En injektiv och surjektiv funktion och därmed en bijektiv funktion * En injektiv men ej surjektiv funktion och därmed ej en bijektiv funktion * En surjektiv men ej injektiv funktion och därmed ej en bijektiv funktion Matematikan, bijekzioa edo funtzio bijektiboa funtzio bat da, aldi berean injektiboa eta supraiektiboa dena; hau da, X multzoko elementu bakoitzari Y multzoko elementu bat dagokio, eta Y multzoko edozein y elementuri y = f(x) funtzioa beteko duen X multzoko x elementu bakarra dagokio. Formalki, Aurrekoaren ondorio zuzena hau da: funtzio bijektibo batean abiaburu-multzoko edo Definizio-eremuaren kardinalitatea, eta helburu-multzoarena edo irudi-multzoarena, berbera da. Hori adibidean ikus daiteke, non |X|=|Y|=4 den. 數學中，一個由集合映射至集合的函數，若對每一在內的，存在唯一一個在內的与其对应，且對每一在內的，存在唯一一個在內的与其对应，則此函數為對射函數。換句話說，如果其為兩集合間的一一對應，则是雙射的。即，同時為單射和滿射。例如，由整數集合至的函數，其將每一個整數連結至整數，這是一個雙射函數；再看一個例子，函數，其將每一對實數連結至，這也是個雙射函數。一雙射函數亦簡稱為雙射（英語：bijection）或置換。後者一般較常使用在時。以由至的所有雙射組成的集合標記為。雙射函數在許多數學領域扮演著很基本的角色，如在同構的定義（以及如同胚和等相關概念）、置換群、投影映射及許多其他概念的基本上。 Bijektivität (zum Adjektiv bijektiv, welches etwa ‚umkehrbar eindeutig auf‘ bedeutet – daher auch der Begriff eineindeutig bzw. substantivisch entsprechend Eineindeutigkeit) ist ein mathematischer Begriff aus dem Bereich der Mengenlehre. Er bezeichnet eine spezielle Eigenschaft von Abbildungen und Funktionen. Bijektive Abbildungen und Funktionen nennt man auch Bijektionen. Zu einer mathematischen Struktur auftretende Bijektionen haben oft eigene Namen wie Isomorphismus, Diffeomorphismus, Homöomorphismus, Spiegelung oder Ähnliches. Hier sind dann in der Regel noch zusätzliche Forderungen in Hinblick auf die Erhaltung der jeweils betrachteten Struktur zu erfüllen. Zur Veranschaulichung kann man sagen, dass bei einer Bijektion eine vollständige Paarbildung zwischen den Elementen von Definitionsmenge und Zielmenge stattfindet. Bijektionen behandeln ihren Definitionsbereich und ihren Wertebereich also symmetrisch; deshalb hat eine bijektive Funktion immer eine Umkehrfunktion. Bei einer Bijektion haben die Definitionsmenge und die Zielmenge dieselbe Mächtigkeit, im Falle endlicher Mengen also gleich viele Elemente. Die Bijektion einer Menge auf sich selbst heißt auch Permutation. Auch hier gibt es in mathematischen Strukturen vielfach eigene Namen. Hat die Bijektion darüber hinausgehend strukturerhaltende Eigenschaften, spricht man von einem Automorphismus. Eine Bijektion zwischen zwei Mengen wird manchmal auch eine bijektive Korrespondenz genannt.
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Subject Item: dbr:Block_cipher
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Subject Item: dbr:Summation
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Subject Item: dbr:Symmetry_in_mathematics
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Subject Item: dbr:Coercive_function
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Subject Item: dbr:Coherent_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cohomotopy_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homeomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homotopy
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homotopy_category
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Homotopy_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Toffoli_gate
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Transition_system
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Transversal_(combinatorics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Wilson_loop
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Mixtilinear_incircles_of_a_triangle
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Module_homomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Twelvefold_way
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Disjoint_union
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Domino_tiling
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Assignment_problem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Automorphism_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Axiom_of_global_choice
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Aztec_diamond
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Manifold
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Boolean_algebra_(structure)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Boolean_network
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Burnside's_lemma
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bus_encoding
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Philosophy_of_mathematics
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Phonemic_orthography
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Pixel
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Polish_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Polynomial_interpolation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Splitting_lemma
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Square-free_integer
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Field_extension
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Final_topology
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Free_Lie_algebra
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Free_abelian_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Free_module
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Green's_relations
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Group_isomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Group_representation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Group_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Groupoid
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Icosahedral_symmetry
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ideal_(set_theory)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Identity_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inclusion–exclusion_principle
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Infinite-dimensional_vector_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Inner_automorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Integer
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Integer_(computer_science)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Metric_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Natural_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Network_motif
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Octonion
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ontology_alignment
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Open_and_closed_maps
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ordinal_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cantor's_diagonal_argument
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cantor's_isomorphism_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cantor's_paradox
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Cartesian_closed_category
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Real_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Recursive_tree
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Change_of_variables_(PDE)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Second-order_logic
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Semantic_mapper
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Set_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Set_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Topological_indistinguishability
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Stable_marriage_problem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Root_system
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Space-filling_curve
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Structure_mapping_engine
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Schröder–Bernstein_theorem_for_measurable_spaces
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Schur's_lemma
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Twistor_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Netto's_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Scale_factor_(computer_science)
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Eugen_Netto
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Exponential_object
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Image_warping
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Implementation_of_mathematics_in_set_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:List_of_types_of_functions
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Symmetric_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Partial_permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Observable
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Principal_bundle
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Planar_cover
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Plücker_coordinates
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Point–line–plane_postulate
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Rubik's_Cube_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Triangle_of_partition_numbers
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Finite_field_arithmetic
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Finite_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Subgraph_isomorphism_problem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Native_resolution
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Sudoku_solving_algorithms
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Morse–Kelley_set_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Moser–de_Bruijn_sequence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Most-perfect_magic_square
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Multivalued_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Two_New_Sciences
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Puppe_sequence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Schreier_refinement_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Stirling_numbers_of_the_second_kind
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Transcendental_number_theory
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Semigroup_with_involution
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Tseytin_transformation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Nonblocking_minimal_spanning_switch
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Permutation_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Topological_space
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Residue-class-wise_affine_group
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Reversible_computing
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Tarski's_theorem_about_choice
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Outline_of_discrete_mathematics
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Outline_of_geometry
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Outline_of_logic
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:P-derivation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:P-rep
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Parameter_word
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Pseudorandom_permutation
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Transverse_knot
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Polite_number
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Risk_measure
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Topological_conjugacy
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Simplicial_map
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Transcendental_function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Uncountable_set
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Unicode_equivalence
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Stern–Brocot_tree
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Subgroup_series
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Riemann_series_theorem
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Ring_homomorphism
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Tensor_reshaping
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:T-function
dbo:wikiPageWikiLink: dbr:Bijection

Subject Item: dbr:Bijectio
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijection_(mathematics)
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijectional
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijective_Function
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijective_function
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijective_map
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijective_mapping
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Bijectivity
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: n24:1_correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:One-one_correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:One-to-one_and_onto
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:One_to_One_Correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:One_to_one_and_onto
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:One_to_one_correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Partial_bijection
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:Partial_one-one_transformation
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:1-1_Correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:1-to-1_correspondence
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:1-to-1_map
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: dbr:1-to-1_mapping
dbo:wikiPageWikiLink: dbr:Bijection
dbo:wikiPageRedirects: dbr:Bijection

Subject Item: wikipedia-en:Bijection
foaf:primaryTopic: dbr:Bijection