quotient object classifier

A category $\mathcal{C}$ has a quotient object classifier if its dual has a subobject classifier. This means that it has finite colimits and an epimorphism* $\top : \Psi \to 0$ such that for every epimorphism $e : A \to B$ there is a unique morphism $\psi_e : \Psi \to A$ such that

$\begin{array}{ccc} \Psi & \rightarrow & 0 \\ \downarrow && \downarrow \\ A & \rightarrow & B \end{array}$

is a pushout diagram. Equivalently, the functor

\mathrm{Quot} : \mathcal{C} \to \mathbf{Set}^+

is representable.
*Every morphism

\Psi \to 0

is a split epimorphism anyway.

Dual property: subobject classifier
Related properties: finitely cocomplete, regular quotient object classifier

Relevant implications

epi-regular andregular quotient object classifier implies quotient object classifier
locally essentially small andquotient object classifier implies well-copowered
pointed andquotient object classifier implies conormal
quotient object classifier andself-dual implies subobject classifier
quotient object classifier implies epi-regular andfinitely cocomplete
quotient object classifier implies regular quotient object classifier
self-dual andsubobject classifier implies quotient object classifier

Examples

There are 3 categories with this property.

Counterexamples

There are 67 categories without this property.

Unknown

There are 0 categories for which the database has no information on whether they satisfy this property.

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