Pseudo-abelian category

In mathematics, specifically in category theory, a pseudo-abelian category is a category that is preadditive and is such that every idempotent has a kernel.^[1] Recall that an idempotent morphism ${\displaystyle p}$ is an endomorphism of an object with the property that ${\displaystyle p\circ p=p}$. Elementary considerations show that every idempotent then has a cokernel.^[2] The pseudo-abelian condition is stronger than preadditivity, but it is weaker than the requirement that every morphism have a kernel and cokernel, as is true for abelian categories.

Synonyms in the literature for pseudo-abelian include pseudoabelian and Karoubian.

Examples

Any abelian category, in particular the category Ab of abelian groups, is pseudo-abelian. Indeed, in an abelian category, every morphism has a kernel.

The category of rngs (not rings!) together with multiplicative morphisms is pseudo-abelian.

A more complicated example is the category of Chow motives. The construction of Chow motives uses the pseudo-abelian completion described below.

Pseudo-abelian completion

The Karoubi envelope construction associates to an arbitrary category ${\displaystyle C}$  a category ${\displaystyle \operatorname {Kar} C}$  together with a functor

${\displaystyle s:C\to \operatorname {Kar} C}$ 

such that the image ${\displaystyle s(p)}$  of every idempotent ${\displaystyle p}$  in ${\displaystyle C}$  splits in ${\displaystyle \operatorname {Kar} C}$ . When applied to a preadditive category ${\displaystyle C}$ , the Karoubi envelope construction yields a pseudo-abelian category ${\displaystyle \operatorname {Kar} C}$  called the pseudo-abelian completion of ${\displaystyle C}$ . Moreover, the functor

${\displaystyle C\to \operatorname {Kar} C}$ 

is in fact an additive morphism.

To be precise, given a preadditive category ${\displaystyle C}$  we construct a pseudo-abelian category ${\displaystyle \operatorname {Kar} C}$  in the following way. The objects of ${\displaystyle \operatorname {Kar} C}$  are pairs ${\displaystyle (X,p)}$  where ${\displaystyle X}$  is an object of ${\displaystyle C}$  and ${\displaystyle p}$  is an idempotent of ${\displaystyle X}$ . The morphisms

${\displaystyle f:(X,p)\to (Y,q)}$ 

in ${\displaystyle \operatorname {Kar} C}$  are those morphisms

${\displaystyle f:X\to Y}$ 

such that ${\displaystyle f=q\circ f=f\circ p}$  in ${\displaystyle C}$ . The functor

${\displaystyle C\to \operatorname {Kar} C}$ 

is given by taking ${\displaystyle X}$  to ${\displaystyle (X,\mathrm {id} _{X})}$ .

Citations

1. Artin, 1972, p. 413.
2. Lars Brünjes, Forms of Fermat equations and their zeta functions, Appendix A

References

• Artin, Michael (1972). Alexandre Grothendieck; Jean-Louis Verdier (eds.). Séminaire de Géométrie Algébrique du Bois Marie - 1963-64 - Théorie des topos et cohomologie étale des schémas - (SGA 4) - vol. 1 (Lecture notes in mathematics 269) (in French). Berlin; New York: Springer-Verlag. xix+525.