subobject classifier

A category $\mathcal{C}$ has a subobject classifier if it has finite limits and a monomorphism $\top : 1 \to \Omega$ from the terminal object such that for every monomorphism $m : A \to B$ there is a unique morphism $\chi_m : B \to \Omega$ such that $B \leftarrow A \rightarrow 1$ is the pullback of $B \rightarrow \Omega \leftarrow 1$ . Equivalently, the functor $\mathrm{Sub} : \mathcal{C}^{\mathrm{op}} \to \mathbf{Set}^+$ is representable.

Related properties: elementary topos
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Relevant implications

additive and pullbacks and subobject classifier implies trivial
elementary topos is equivalent to cartesian closed and finitely complete and subobject classifier
locally essentially small and subobject classifier implies well-powered
subobject classifier implies finitely complete and mono-regular

Examples

There are 7 categories with this property.

Counterexamples

There are 40 categories without this property.

Unknown

There are 4 categories for which the database has no information on whether they satisfy this property.