strict initial object

A strict initial object is an initial object $0$ such that every morphism $A \to 0$ is an isomorphism. This property refers to the existence of a strict initial object.

Dual property: strict terminal object
Related properties: initial object
nLab Link

Relevant implications

strict initial object implies initial object

by definition
strict initial object and pointed implies trivial

If $0$ is the zero object, then for every object $A$ the unique morphism $A \to 0$ is an isomorphism by assumption.
left cancellative and initial object implies strict initial object

It suffices to prove that in general any monomorphism $f : A \to 0$ into an initial object is an isomorphism. If $g : 0 \to A$ is the unique morphism, then $f \circ g = \mathrm{id}_0$ since $0$ is initial. But then $f$ is a split epimorphism and a monomorphism, hence an isomorphism.
right cancellative and initial object implies strict initial object

Let $f : A \to 0$ be a morphism. Let $g : 0 \to A$ be the unique morphism. It is an epimorphism by assumption. Also, $f \circ g = \mathrm{id}_0$ since $0$ is initial. But then $g$ is a split monomorphism and an epimorphism, hence an isomorphism.
distributive implies strict initial object

See the nLab.
cartesian closed and initial object implies strict initial object

See the nLab.
self-dual and strict initial object implies strict terminal object

trivial by self-duality
self-dual and strict terminal object implies strict initial object

trivial by self-duality

Examples

Counterexamples

Unknown

For these categories the database has no info if they satisfy this property or not.

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