Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Generator_(category_theory)> ?p ?o. }
Showing items 1 to 12 of
12
with 100 items per page.
- Generator_(category_theory) abstract "In category theory in mathematics a family of generators (or family of separators) of a category is a collection of objects, indexed by some set I, such that for any two morphisms in , if then there is some i∈I and morphism , such that the compositions . If the family consists of a single object G, we say it is a generator. Generators are central to the definition of Grothendieck categories.".
- Generator_(category_theory) wikiPageID "9550415".
- Generator_(category_theory) wikiPageRevisionID "606487812".
- Generator_(category_theory) hasPhotoCollection Generator_(category_theory).
- Generator_(category_theory) subject Category:Category_theory.
- Generator_(category_theory) comment "In category theory in mathematics a family of generators (or family of separators) of a category is a collection of objects, indexed by some set I, such that for any two morphisms in , if then there is some i∈I and morphism , such that the compositions . If the family consists of a single object G, we say it is a generator. Generators are central to the definition of Grothendieck categories.".
- Generator_(category_theory) label "Generator (category theory)".
- Generator_(category_theory) sameAs m.02pjn7x.
- Generator_(category_theory) sameAs Q17000267.
- Generator_(category_theory) sameAs Q17000267.
- Generator_(category_theory) wasDerivedFrom Generator_(category_theory)?oldid=606487812.
- Generator_(category_theory) isPrimaryTopicOf Generator_(category_theory).