Cofibrant generation of pure monomorphisms in presheaf categories
Abstract
We characterise when the pure monomorphisms in a presheaf category SetC are cofibrantly generated in terms of the category C. In particular, when C is a monoid S this characterises cofibrant generation of pure monomorphisms between sets with an S-action in terms of S: this happens if and only if for all a, b ∈ S there is c ∈ S such that a = cb or ca = b. We give a model-theoretic proof: we prove that our characterisation is equivalent to having a stable independence relation, which in turn is equivalent to cofibrant generation. As a corollary, we show that pure monomorphisms in acts over the multiplicative monoid of natural numbers are not cofibrantly generated.
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