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Definition
Split idempotents
Sections of bundles and sheaves

Definition

A section of a morphism $f : A \to B$ in some category is a right-inverse: a morphism $σ : B \to A$ such that

f \circ g : B \overset{σ}{\to} A \overset{f}{\to} B

equals the identity morphism on $B$ .

Split idempotents

In the case case that $f$ has a section $σ$ , $f$ may also be called a retraction or cosection of $σ$ , $B$ may be called a retract of $A$ , and the entire situation is said to split the idempotent

A \overset{f}{\to} B \overset{σ}{\to} A .

A split epimorphism is a morphism that has a section; a split monomorphism is a morphism that is a section.

A fork diagram

A ⇉_{\partial_{0}}^{\partial_{1}} B \overset{p}{\to} C

is a split fork if the morphism $p$ is a retract, in the category of arrows, of the morphism $\partial_{1}$ , via a section of the pair $(\partial_{0}, p) : \partial_{1} \to p$ . In other words, there exist a pair (section) $(t, s) : p \to \partial_{1}$ of $(\partial_{0}, p)$ such that the diagram

\begin{matrix} B & \overset{t}{\to} & A & \overset{\partial_{0}}{\to} & B \\ ↓ p & ↓ \partial_{1} & ↓ p \\ C & \overset{s}{\to} & B & \overset{p}{\to} & C \end{matrix}

commutes and its both horizontal composites are identities. It is easy to check that every split fork is a coequalizer, which is then called a split coequalizer. Clearly any functor sends a split coequalizer to a split coequalizer, hence every split coequalizer is an absolute coequalizer? (coequalizer stable under all functors).

Sections of bundles and sheaves

If one thinks of $f : A \to B$ as a bundle then its sections are sometimes called global sections. This leads to a notion of global sections of sheaves and further of objects in a general topos. See

global section

for more on this.

Revised on February 9, 2010 09:44:18 by Urs Schreiber (87.212.203.135)

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Contents

Definition

Split idempotents

Sections of bundles and sheaves

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