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arxiv: 1507.01624 · v1 · pith:VJPWCVU7new · submitted 2015-07-06 · 🧮 math.AT

Overcategories and undercategories of model categories

classification 🧮 math.AT
keywords categorymodelobjectsundercategoriescofibrationequivalencefibration
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If M is a model category and Z is an object of M, then there are model category structures on the category of objects of M over Z and the category of objects of M under Z under which a map is a cofibration, fibration, or weak equivalence if and only if its image in M under the forgetful functor is, respectively, a cofibration, fibration, or weak equivalence. It is asserted without proof in "Model categories and their localizations" that if M is cofibrantly generated, cellular, or proper, then so is the category of objects of M over Z. The purpose of this note is to fill in the proofs of those assertions and to state and prove the analogous results for undercategories.

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