Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Category_of_sets> ?p ?o }
- Category_of_sets abstract "In the mathematical field of category theory, the category of sets, denoted as Set, is the category whose objects are sets. The arrows or morphisms between sets A and B are all triples (f, A, B) where f is a function from A to B.Many other categories (such as the category of groups, with group homomorphisms as arrows) add structure to the objects of the category of sets and/or restrict the arrows to functions of a particular kind.".
- Category_of_sets wikiPageExternalLink v=onepage&q&f=false.
- Category_of_sets wikiPageExternalLink interact.pdf.
- Category_of_sets wikiPageExternalLink tr11.pdf.
- Category_of_sets wikiPageID "26829".
- Category_of_sets wikiPageLength "6540".
- Category_of_sets wikiPageOutDegree "57".
- Category_of_sets wikiPageRevisionID "636048872".
- Category_of_sets wikiPageWikiLink Abelian_category.
- Category_of_sets wikiPageWikiLink Academic_Press.
- Category_of_sets wikiPageWikiLink Additive_category.
- Category_of_sets wikiPageWikiLink Axiom_of_choice.
- Category_of_sets wikiPageWikiLink Axiom_of_foundation.
- Category_of_sets wikiPageWikiLink Axiom_of_regularity.
- Category_of_sets wikiPageWikiLink Bijection.
- Category_of_sets wikiPageWikiLink Bijective.
- Category_of_sets wikiPageWikiLink Cartesian_closed_category.
- Category_of_sets wikiPageWikiLink Cartesian_product.
- Category_of_sets wikiPageWikiLink Category:Basic_concepts_in_set_theory.
- Category_of_sets wikiPageWikiLink Category:Category-theoretic_categories.
- Category_of_sets wikiPageWikiLink Category_(mathematics).
- Category_of_sets wikiPageWikiLink Category_of_groups.
- Category_of_sets wikiPageWikiLink Category_of_topological_spaces.
- Category_of_sets wikiPageWikiLink Category_theory.
- Category_of_sets wikiPageWikiLink Class_(set_theory).
- Category_of_sets wikiPageWikiLink Complete_category.
- Category_of_sets wikiPageWikiLink Concrete_category.
- Category_of_sets wikiPageWikiLink Coproduct.
- Category_of_sets wikiPageWikiLink Coproduct_(category_theory).
- Category_of_sets wikiPageWikiLink Disjoint_union.
- Category_of_sets wikiPageWikiLink Empty_function.
- Category_of_sets wikiPageWikiLink Empty_set.
- Category_of_sets wikiPageWikiLink Epimorphism.
- Category_of_sets wikiPageWikiLink Exponential_object.
- Category_of_sets wikiPageWikiLink Function_(mathematics).
- Category_of_sets wikiPageWikiLink Graduate_Texts_in_Mathematics.
- Category_of_sets wikiPageWikiLink Grothendieck_universe.
- Category_of_sets wikiPageWikiLink Group_homomorphism.
- Category_of_sets wikiPageWikiLink Group_homomorphisms.
- Category_of_sets wikiPageWikiLink Hereditarily_finite_set.
- Category_of_sets wikiPageWikiLink Inaccessible_cardinal.
- Category_of_sets wikiPageWikiLink Initial_and_terminal_objects.
- Category_of_sets wikiPageWikiLink Initial_object.
- Category_of_sets wikiPageWikiLink Injective.
- Category_of_sets wikiPageWikiLink Injective_function.
- Category_of_sets wikiPageWikiLink Injective_object.
- Category_of_sets wikiPageWikiLink Isomorphism.
- Category_of_sets wikiPageWikiLink Mathematics.
- Category_of_sets wikiPageWikiLink Monomorphism.
- Category_of_sets wikiPageWikiLink Morphism.
- Category_of_sets wikiPageWikiLink NBG_set_theory.
- Category_of_sets wikiPageWikiLink Power_set.
- Category_of_sets wikiPageWikiLink Preadditive_category.
- Category_of_sets wikiPageWikiLink Product_(category_theory).
- Category_of_sets wikiPageWikiLink Projective_module.
- Category_of_sets wikiPageWikiLink Proper_class.
- Category_of_sets wikiPageWikiLink Set_(mathematics).
- Category_of_sets wikiPageWikiLink Set_theory.
- Category_of_sets wikiPageWikiLink Singleton_(mathematics).
- Category_of_sets wikiPageWikiLink Small_set_(category_theory).
- Category_of_sets wikiPageWikiLink Strongly_inaccessible_cardinal.
- Category_of_sets wikiPageWikiLink Subobject_classifier.
- Category_of_sets wikiPageWikiLink Surjective.
- Category_of_sets wikiPageWikiLink Surjective_function.
- Category_of_sets wikiPageWikiLink Tarski–Grothendieck_set_theory.
- Category_of_sets wikiPageWikiLink Terminal_object.
- Category_of_sets wikiPageWikiLink Topos.
- Category_of_sets wikiPageWikiLink Von_Neumann–Bernays–Gödel_set_theory.
- Category_of_sets wikiPageWikiLink Zermelo–Fraenkel_set_theory.
- Category_of_sets wikiPageWikiLink Zero_morphism.
- Category_of_sets wikiPageWikiLink Zero_object.
- Category_of_sets wikiPageWikiLinkText "Category of sets".
- Category_of_sets wikiPageWikiLinkText "Category_of_sets".
- Category_of_sets wikiPageWikiLinkText "Set".
- Category_of_sets wikiPageWikiLinkText "category '''Set'''".
- Category_of_sets wikiPageWikiLinkText "category of all sets".
- Category_of_sets wikiPageWikiLinkText "category of sets and functions".
- Category_of_sets wikiPageWikiLinkText "category of sets".
- Category_of_sets wikiPageWikiLinkText "set".
- Category_of_sets wikiPageWikiLinkText "sets".
- Category_of_sets hasPhotoCollection Category_of_sets.
- Category_of_sets wikiPageUsesTemplate Template:Citation.
- Category_of_sets wikiPageUsesTemplate Template:Cite_book.
- Category_of_sets subject Category:Basic_concepts_in_set_theory.
- Category_of_sets subject Category:Category-theoretic_categories.
- Category_of_sets hypernym Category.
- Category_of_sets type TelevisionStation.
- Category_of_sets type Concept.
- Category_of_sets comment "In the mathematical field of category theory, the category of sets, denoted as Set, is the category whose objects are sets. The arrows or morphisms between sets A and B are all triples (f, A, B) where f is a function from A to B.Many other categories (such as the category of groups, with group homomorphisms as arrows) add structure to the objects of the category of sets and/or restrict the arrows to functions of a particular kind.".
- Category_of_sets label "Category of sets".
- Category_of_sets sameAs Categoría_de_conjuntos.
- Category_of_sets sameAs Catégorie_des_ensembles.
- Category_of_sets sameAs Categorie_van_verzamelingen.
- Category_of_sets sameAs m.06np0.
- Category_of_sets sameAs Категория_множеств.
- Category_of_sets sameAs Категорія_множин.
- Category_of_sets sameAs Q2518298.
- Category_of_sets sameAs Q2518298.
- Category_of_sets sameAs 集合范畴.
- Category_of_sets wasDerivedFrom Category_of_sets?oldid=636048872.