regular subobject classifier

A category $\mathcal{C}$ has a regular subobject classifier if it has finite limits and a regular monomorphism* $\top : 1 \to \Omega$ such that for every regular monomorphism $m : A \to B$ there is a unique morphism $\chi_m : B \to \Omega$ such that

$\begin{array}{ccc} A & \rightarrow & B \\ \downarrow && \downarrow \\ 1 & \rightarrow & \Omega \end{array}$

is a pullback diagram. Equivalently, the functor

\mathrm{Sub}_{\mathrm{reg}} : \mathcal{C}^{\mathrm{op}} \to \mathbf{Set}^+

is representable.
*Every morphism

1 \to \Omega

is a split monomorphism and hence regular anyway.

Dual property: regular quotient object classifier
Related properties: finitely complete, subobject classifier
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Relevant implications

additive andregular subobject classifier implies trivial
finitely complete andright cancellative implies regular subobject classifier
mono-regular andregular subobject classifier implies subobject classifier
regular quotient object classifier andself-dual implies regular subobject classifier
regular subobject classifier andself-dual implies regular quotient object classifier
regular subobject classifier andstrict terminal object implies thin
regular subobject classifier implies finitely complete
subobject classifier implies regular subobject classifier

Examples

There are 20 categories with this property.

Counterexamples

There are 43 categories without this property.

Unknown

There are 7 categories for which the database has no information on whether they satisfy this property. Please help us fill in the gaps by contributing to this project.