On pure monomorphisms and pure epimorphisms in accessible categories
Abstract
In all -accessible additive categories, -pure monomorphisms and -pure epimorphisms are well-behaved, as shown in our previous paper arXiv:2311.02418. This is known to be not always true in -accessible nonadditive categories. Nevertheless, mild assumptions on a -accessible category are sufficient to prove good properties of -pure monomorphisms and -pure epimorphisms. In particular, in a -accessible category with finite products, all -pure monomorphisms are -directed colimits of split monomorphisms, while in a -accessible category with finite coproducts, all -pure epimorphisms are -directed colimits of split epimorphisms. We also discuss what we call Quillen exact classes of monomorphisms and epimorphisms, generalizing the additive concept of one-sided exact category.
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