category theory

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Definition

A bifibration of categories is a functor

$E \to B$

that is both a Grothendieck fibration as well as an opfibration.

Therefore every morphism $f : b_1 \to b_2$ in a bifibration has both a push-forward $f_* : E_{b_1} \to E_{b_2}$ as well as a pullback $f^* : E_{b_2} \to E_{b_1}$.

Examples

• For $C$ any category with pullbacks, the codomain fibration $cod : [I,C] \to C$ is a bifibration.

• Dually, for $C$ any category with pushouts, the domain opfibration $dom : [I,C] \to C$ is a bifibration.

• The canonical functor Mod $\to$ CRing is a bifibration.

Relation to monadic descent

Ordinary Grothendieck fibrations correspond to pseudofunctors to Cat, by the Grothendieck construction and hence to prestacks. For these one may consider descent.

If the fibration is even a bifibration, there is a particularly elegant algebraic way to encode its decent properties; this is monadic descent. The Benabou–Roubaud theorem characterizes descent properties for bifibrations.

Revised on October 3, 2012 21:08:55 by Tim Porter (95.147.236.146)