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Full and faithful functors
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==Properties== A faithful functor need not be injective on objects or morphisms. That is, two objects ''X'' and ''X''′ may map to the same object in ''D'' (which is why the range of a full and faithful functor is not necessarily isomorphic to ''C''), and two morphisms ''f'' : ''X'' β ''Y'' and ''f''′ : ''X''′ β ''Y''′ (with different domains/codomains) may map to the same morphism in ''D''. Likewise, a full functor need not be surjective on objects or morphisms. There may be objects in ''D'' not of the form ''FX'' for some ''X'' in ''C''. Morphisms between such objects clearly cannot come from morphisms in ''C''. A full and faithful functor is necessarily injective on objects up to isomorphism. That is, if ''F'' : ''C'' β ''D'' is a full and faithful functor and <math>F(X)\cong F(Y)</math> then <math>X \cong Y</math>.
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