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Formal criteria for adjoint functors

In category theory, a branch of mathematics, the formal criteria for adjoint functors are criteria for the existence of a left or right adjoint of a given functor.

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In category theory, a branch of mathematics, the formal criteria for adjoint functors are criteria for the existence of a left or right adjoint of a given functor.

One criterion is the following, which first appeared in Peter J. Freyd's 1964 book Abelian Categories,1 an Introduction to the Theory of Functors:

Freyd's adjoint functor theorem2Let G : B A {\displaystyle G:{\mathcal {B}}\to {\mathcal {A}}} be a functor between categories such that B {\displaystyle {\mathcal {B}}} is complete. Then the following are equivalent (for simplicity ignoring the set-theoretic issues):

  1. G has a left adjoint.
  2. G {\displaystyle G} preserves all limits, and the following solution set condition is satisfied: for each object x in A {\displaystyle {\mathcal {A}}} , there exist a set I and an I-indexed family of morphisms f i : x G y i {\displaystyle f_{i}:x\to Gy_{i}} such that each morphism x G y {\displaystyle x\to Gy} is of the form G ( y i y ) f i {\displaystyle G(y_{i}\to y)\circ f_{i}} for some morphism y i y {\displaystyle y_{i}\to y} .

Another criterion is:

Kan criterion for the existence of a left adjointLet G : B A {\displaystyle G:{\mathcal {B}}\to {\mathcal {A}}} be a functor between categories. Then the following are equivalent.

  1. G has a left adjoint.
  2. G preserves limits and, for each object x in A {\displaystyle {\mathcal {A}}} , the limit lim ( ( x G ) B ) {\displaystyle \lim({(x\downarrow G)\to {\mathcal {B}}})} exists in B {\displaystyle {\mathcal {B}}} .3
  3. The right Kan extension G ! 1 B {\displaystyle G_{!}1_{\mathcal {B}}} of the identity functor 1 B {\displaystyle 1_{\mathcal {B}}} along G exists and is preserved by G.456

Moreover, when this is the case then a left adjoint of G can be computed using the right Kan extension.3

See also

See also

References

References

  1. Freyd 2003, Chapter 3. (pp.84–)
  2. Mac Lane 2013, Ch. V, § 6, Theorem 2.
  3. Mac Lane 2013, Ch. X, § 1, Theorem 2.
  4. Mac Lane 2013, Ch. X, § 7, Theorem 2.
  5. Kelly 1982, Theorem 4.81
  6. Medvedev 1975, p. 675
Bibliography

Bibliography

Further reading

Further reading

External links