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Essentially surjective functor

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In mathematics, specifically in category theory, a functor

F:C\to D

is essentially surjective if each object $d$ of $D$ is isomorphic to an object of the form $Fc$ for some object $c$ of $C$ .

Any functor that is part of an equivalence of categories is essentially surjective. As a partial converse, any full and faithful functor that is essentially surjective is part of an equivalence of categories.^[1]

Notes

^ Mac Lane (1998), Theorem IV.4.1

References

Mac Lane, Saunders (September 1998). Categories for the Working Mathematician (second ed.). Springer. ISBN 0-387-98403-8.
Riehl, Emily (2016). Category Theory in Context. Dover Publications, Inc Mineola, New York. ISBN 9780486809038.

External links

Essentially surjective functor at the nLab

v t e Functor types
Additive Adjoint Conservative Derived Diagonal Enriched Essentially surjective Exact Forgetful Full and faithful Logical Monoidal Representable Smooth

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