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    • CommentRowNumber1.
    • CommentAuthorDmitri Pavlov
    • CommentTimeJul 12th 2021

    Created:

    Idea

    Partial model categories are one of the many intermediate notions between relative categories and model categories.

    They axiomatize those properties of model categories that only involve weak equivalences.

    Definition

    A partial model category is a relative category such that its class of weak equivalences satisfies the 2-out-of-6 property (if srs r and tst s are weak equivalences, then so are rr, ss, tt, tsrt s r) and admits a 3-arrow calculus, i.e., there are subcategories UU and VV (which can be thought of as analogues of acyclic cofibrations and acyclic fibrations) such that UU is closed under cobase changes (which are required to exist), VV is closed under base changes, and any morphism can be functorially factored as the composition vuv u for some uUu\in U and vVv\in V.

    Properties

    If (C,W)(C,W) is a partial model category, then any Reedy fibrant replacement of the Rezk nerve N(C,W)N(C,W) is a complete Segal space.

    Related concepts

    References

    v1, current

    • CommentRowNumber2.
    • CommentAuthorHurkyl
    • CommentTimeJul 12th 2021

    Functoral factorization into vu is for weak equivalences only.

    diff, v2, current

    • CommentRowNumber3.
    • CommentAuthorHurkyl
    • CommentTimeJul 12th 2021

    Clarified U,VU, V are subcategories of the weak equivalences, and that (co)base changes are along arbitrary morphisms, not just weak equivlaences.

    diff, v2, current