Summary Of: Adjoint functors

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Adjunction (field theory) | mathematics | functors | category theory | bijections | natural | long list of examples | colimits/limits | vaguely explain | ring theory | rng | ring | universal property | functor | initial object | E | supremum | commutative triangles | terminal morphism | initial morphism | functors | natural transformations | universal algebra | string diagrams | monads | functors | natural isomorphism | bifunctors | category of sets | hom functors | morphisms | commutes | | functor | natural isomorphism | natural transformation | | terminal morphism | initial morphism | natural transformation | Daniel Kan | homological algebra | abelian groups | tensor product | abuse of notation | bilinear mappings | term of art | natural equivalence | Hilbert space | adjoint operators | abstract algebra | universal constructions | Saunders Mac Lane | citation needed | Alexander Grothendieck | functional analysis | homological algebra | algebraic geometry | Serre duality | partially ordered set | Galois connection | Galois theory | closure operators | duality | Kaplansky | monads | Kuratowski closure axioms | division | implication | propositional logic | ideal quotient | ring ideals | Grp | Set | free group | forgetful | Free groups | free abelian groups | free rings | free commutative rings | free modules | forgetful functor | free functors | Products | fibred products | equalizers | kernels | limit | diagonal functor | cartesian product | sets | product of topological spaces | kernel | Coproducts | fibred coproducts | coequalizers | cokernels | colimit | Ab | direct sum | direct sum | vector spaces | modules | free product | rng | ring homomorphism | tensor product | integral monoid ring | monoids | integral group ring | groups | group of units | field | algebras | field of fractions | polynomial ring | category of abelian groups | category of groups | abelianization | K-theory | vector bundles | topological space | direct sum | abelian group | Grothendieck group | negative numbers | existence theorem | universal algebra | model theory | representation theory of groups | induced representation | topological spaces | sets | discrete space | trivial topology | topological spaces | homotopy classes | suspension | loop space | homotopy theory | compact | Hausdorff spaces | topological spaces | Stone–Čech compactification | continuous | embedding | injective | Tychonoff space | continuous map | topological spaces | sheaves | direct image functor | inverse image functor | coherent sheaves | Stone duality | sober spaces | duality | pointless topology | cartesian closed category | naturally isomorphic | small categories | limits | colimits | product | coproduct | left exact | right exact | preadditive categories | additive functor | additive categories | biproducts | complete category | Peter J. Freyd | continuous | proper class | universal morphisms | equivalence of categories | full subcategory | monad | comonad | Eilenberg-Moore algebras | Kleisli category | ISBN 0-471-60922-6 | Mac Lane, Saunders | Categories for the Working Mathematician | ISBN 0-387-98403-8 | Category | Adjoint functors | All articles with unsourced statements | Articles with unsourced statements since November 2007 |