Definitions from Wiktionary (Yoneda functor)
▸ noun: (category theory) A functor from a given category to the category of functors from that given category to Set (the category of sets) which maps any object of the given category to a hom functor represented by that object and any morphism to a natural isomorphism induced uniquely by that morphism according to the Yoneda lemma.
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▸ noun: (category theory) A functor from a given category to the category of functors from that given category to Set (the category of sets) which maps any object of the given category to a hom functor represented by that object and any morphism to a natural isomorphism induced uniquely by that morphism according to the Yoneda lemma.
Similar:
Yoneda embedding,
Yoneda lemma,
representable functor,
functor category,
identity functor,
full functor,
faithful functor,
functor,
endofunctor,
group functor,
more...
▸ Words similar to yoneda functor
▸ Usage examples for yoneda functor
▸ Idioms related to yoneda functor
▸ Wikipedia articles (New!)
▸ Words that often appear near yoneda functor
▸ Rhymes of yoneda functor
▸ Invented words related to yoneda functor