Summary Of: Limit (category theory)

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category theory | mathematics | products | inverse limits | dual notion | disjoint unions | direct sums | pushouts | direct limits | universal properties | adjoint functors | category | diagram | functor | index category | small | finite | cone | | universal cones | universal property | terminal objects | category of cones | up to | dual notion | co-cone | | universal co-cones | initial objects | category of co-cones | directed graph | Terminal objects | empty function | Products | discrete category | family | category of sets | Cartesian products | Equalizers | Kernels | zero morphism | Pullbacks | commutative square | | Inverse limits | directed | poset | isomorphism | initial object | Initial objects | Coproducts | Coequalizers | Cokernels | Pushouts | Direct limits | complete category | cocomplete category | universal constructions | functor category | diagonal functor | natural transformation | natural transformation | right adjoint | connected | diagonal morphisms | left adjoint | covariant | Hom functors | category of sets | natural isomorphism | representation | filtered category | bifunctor | natural isomorphism | functor | vacuously | complete category | adjoint functors | natural transformation | up to | covariant | contravariant functors | amnestic | Hom functor | representable functor | forgetful functor | filtered colimits | free functor | free group | free product | disjoint union | direct sum | metric spaces | continuous functions | ISBN 0-471-60922-6 | Mac Lane, Saunders | Categories for the Working Mathematician | ISBN 0-387-98403-8 | Category | Limits in categories | Articles that include images for deletion |