disjoint coproducts

A category has disjoint coproducts if it has coproducts, the coproduct inclusions $A_i \to \coprod_{i \in I} A_i$ are monomorphisms, and the pullback of the inclusions $A_i \to \coprod_{i \in I} A_i$ and $A_j \to \coprod_{i \in I} A_i$ for $i \neq j$ exists and is given by the initial object $0$ .

Related properties: coproducts, disjoint finite coproducts
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Relevant implications

disjoint coproducts is equivalent to coproducts and disjoint finite coproducts

easy

Examples

Counterexamples

category of combinatorial species
category of commutative rings
category of fields
category of finite abelian groups
category of finite orders
category of finite sets
category of finite sets and bijections
category of finite sets and injections
category of finite sets and surjections
category of finitely generated abelian groups
category of metric spaces with non-expansive maps
category of non-empty sets
category of rings
category of smooth manifolds
delooping of a non-trivial finite group
delooping of an infinite group
delooping of the additive monoid of natural numbers
delooping of the additive monoid of ordinal numbers
discrete category on two objects
empty category
partial order [0,1]
partial order of extended natural numbers
partial order of natural numbers
partial order of ordinal numbers
preorder of integers w.r.t. divisiblity
walking morphism
walking parallel pair of morphisms

Unknown

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

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