exact filtered colimits

In a category $\mathcal{C}$ , which we assume to have filtered colimits and finite limits, we say that filtered colimits are exact if for every finite category $\mathcal{I}$ the functor $\lim : [\mathcal{I}, \mathcal{C}] \to \mathcal{C}$ preserves filtered colimits. Equivalently, for every diagram $X : \mathcal{I} \times \mathcal{J} \to \mathcal{C}$ , where $\mathcal{I}$ is finite and $\mathcal{J}$ is filtered, the canonical morphism $\mathrm{colim}_{j} \lim_{i} X(i,j) \to \lim_{i} \mathrm{colim}_j X(i,j)$ is an isomorphism.

Related properties: cartesian filtered colimits, filtered colimits, finitely complete
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Relevant implications

cartesian filtered colimits andthin implies exact filtered colimits
exact filtered colimits implies cartesian filtered colimits
exact filtered colimits implies filtered colimits andfinitely complete
Grothendieck abelian is equivalent to abelian andcoproducts andexact filtered colimits andgenerator
locally finitely presentable implies exact filtered colimits

Examples

There are 30 categories with this property.

Counterexamples

There are 36 categories without this property.

Unknown

There are 4 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.