Karoubi envelope

The Karoubi envelope is a classification of the idempotents of a category. Precisely, given a category C, an idempotent of C is an endomorphism ${\displaystyle e:A\rightarrow A}$ with e² = e. The Karoubi envelope of C, sometimes written Split(C), is a category with objects pairs of the form (A, e) where ${\displaystyle e:A\rightarrow A}$ is an idempotent of C, and morphisms triples of the form

${\displaystyle (e,f,e^{\prime }):(A,e)\rightarrow (A^{\prime },e^{\prime })}$

where ${\displaystyle f:A\rightarrow A^{\prime }}$ is a C-morphism satisfying ${\displaystyle e^{\prime }\circ f=f=f\circ e}$.

An automorphism in Split(C) is of the form ${\displaystyle (e,f,e):(A,e)\rightarrow (A,e)}$, with inverse ${\displaystyle (e,g,e):(A,e)\rightarrow (A,e)}$ satisfying:

${\displaystyle g\circ f=e=f\circ g}$

${\displaystyle g\circ f\circ g=g}$

${\displaystyle f\circ g\circ f=f}$

If the first equation is relaxed to just have ${\displaystyle g\circ f=f\circ g}$, then f is a partial automorphism (with inverse g). A (partial) involution in Split(C) is a self-inverse (partial) automorphism.

• If C has products, then given an isomorphism ${\displaystyle f:A\rightarrow B}$ the mapping ${\displaystyle f\times f^{-1}:A\times B\rightarrow B\times A}$, composed with the "symmetric" map ${\displaystyle sym:B\times A\rightarrow A\times B}$, is a partial involution.