Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Cartesian_monoidal_category> ?p ?o }
Showing triples 1 to 55 of
55
with 100 triples per page.
- Cartesian_monoidal_category abstract "In mathematics, specifically in the field known as category theory, a monoidal category where the monoidal ("tensor") product is the categorical product is called a cartesian monoidal category. Any category with finite products (a "finite product category") can be thought of as a cartesian monoidal category. In any cartesian monoidal category, the terminal object is the tensor unit. Dually, a monoidal finite coproduct category with the monoidal structure given by the coproduct and unit the initial object is called a cocartesian monoidal category, and any finite coproduct category can be thought of as a cocartesian monoidal category.Cartesian categories with a Hom functor that is an adjoint functor to the product are called Cartesian closed categories.".
- Cartesian_monoidal_category wikiPageID "43676277".
- Cartesian_monoidal_category wikiPageLength "4521".
- Cartesian_monoidal_category wikiPageOutDegree "29".
- Cartesian_monoidal_category wikiPageRevisionID "679501658".
- Cartesian_monoidal_category wikiPageWikiLink Abelian_group.
- Cartesian_monoidal_category wikiPageWikiLink Adjoint_functor.
- Cartesian_monoidal_category wikiPageWikiLink Adjoint_functors.
- Cartesian_monoidal_category wikiPageWikiLink Bicategory.
- Cartesian_monoidal_category wikiPageWikiLink Biproduct.
- Cartesian_monoidal_category wikiPageWikiLink Cartesian_closed_category.
- Cartesian_monoidal_category wikiPageWikiLink Category:Category_theory.
- Cartesian_monoidal_category wikiPageWikiLink Category:Monoidal_categories.
- Cartesian_monoidal_category wikiPageWikiLink Category_theory.
- Cartesian_monoidal_category wikiPageWikiLink Comonoid.
- Cartesian_monoidal_category wikiPageWikiLink Coproduct.
- Cartesian_monoidal_category wikiPageWikiLink Direct_sum.
- Cartesian_monoidal_category wikiPageWikiLink Direct_sum_of_abelian_groups.
- Cartesian_monoidal_category wikiPageWikiLink Direct_sum_of_modules.
- Cartesian_monoidal_category wikiPageWikiLink Direct_sum_of_vector_spaces.
- Cartesian_monoidal_category wikiPageWikiLink Dual_(category_theory).
- Cartesian_monoidal_category wikiPageWikiLink Duality_(category_theory).
- Cartesian_monoidal_category wikiPageWikiLink Field_(mathematics).
- Cartesian_monoidal_category wikiPageWikiLink Hom_functor.
- Cartesian_monoidal_category wikiPageWikiLink Initial_and_terminal_objects.
- Cartesian_monoidal_category wikiPageWikiLink Isomorphism.
- Cartesian_monoidal_category wikiPageWikiLink Kronecker_delta.
- Cartesian_monoidal_category wikiPageWikiLink Monoid_(category_theory).
- Cartesian_monoidal_category wikiPageWikiLink Monoidal_category.
- Cartesian_monoidal_category wikiPageWikiLink Pre-additive_category.
- Cartesian_monoidal_category wikiPageWikiLink Preadditive_category.
- Cartesian_monoidal_category wikiPageWikiLink Product_(category_theory).
- Cartesian_monoidal_category wikiPageWikiLink Product_category.
- Cartesian_monoidal_category wikiPageWikiLink Trivial_group.
- Cartesian_monoidal_category wikiPageWikiLink Trivial_vector_space.
- Cartesian_monoidal_category wikiPageWikiLink Vector_space.
- Cartesian_monoidal_category wikiPageWikiLink Zero_object.
- Cartesian_monoidal_category wikiPageWikiLink Zero_object_(algebra).
- Cartesian_monoidal_category wikiPageWikiLinkText "Cartesian cateogry".
- Cartesian_monoidal_category wikiPageWikiLinkText "Cartesian monoidal category".
- Cartesian_monoidal_category wikiPageWikiLinkText "cartesian monoidal category".
- Cartesian_monoidal_category hasPhotoCollection Cartesian_monoidal_category.
- Cartesian_monoidal_category wikiPageUsesTemplate Template:Reflist.
- Cartesian_monoidal_category wikiPageUsesTemplate Template:Unref.
- Cartesian_monoidal_category subject Category:Category_theory.
- Cartesian_monoidal_category subject Category:Monoidal_categories.
- Cartesian_monoidal_category hypernym Product.
- Cartesian_monoidal_category type Software.
- Cartesian_monoidal_category comment "In mathematics, specifically in the field known as category theory, a monoidal category where the monoidal ("tensor") product is the categorical product is called a cartesian monoidal category. Any category with finite products (a "finite product category") can be thought of as a cartesian monoidal category. In any cartesian monoidal category, the terminal object is the tensor unit.".
- Cartesian_monoidal_category label "Cartesian monoidal category".
- Cartesian_monoidal_category sameAs m.011qdw6f.
- Cartesian_monoidal_category sameAs Q18205845.
- Cartesian_monoidal_category sameAs Q18205845.
- Cartesian_monoidal_category wasDerivedFrom Cartesian_monoidal_category?oldid=679501658.
- Cartesian_monoidal_category isPrimaryTopicOf Cartesian_monoidal_category.