Definitions from Wiktionary (adjoint functor)
▸ noun: (category theory) One of a pair of functors such that the domain and codomain of one of them are identical to the codomain and domain of the other one, respectively, and such that there is a pair of natural transformations which turns the pair of functors into an adjunction.
▸ Words similar to adjoint functor
▸ Usage examples for adjoint functor
▸ Idioms related to adjoint functor
▸ Wikipedia articles (New!)
▸ Words that often appear near adjoint functor
▸ Rhymes of adjoint functor
▸ Invented words related to adjoint functor
▸ noun: (category theory) One of a pair of functors such that the domain and codomain of one of them are identical to the codomain and domain of the other one, respectively, and such that there is a pair of natural transformations which turns the pair of functors into an adjunction.
Similar:
adjunct,
equivalence of categories,
adjointness,
constant morphism,
isomorphism,
coassociativity,
coconstant morphism,
selfadjointness,
coequalizer,
coequaliser,
more...
Opposite:
▸ Words similar to adjoint functor
▸ Usage examples for adjoint functor
▸ Idioms related to adjoint functor
▸ Wikipedia articles (New!)
▸ Words that often appear near adjoint functor
▸ Rhymes of adjoint functor
▸ Invented words related to adjoint functor