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    • CommentRowNumber1.
    • CommentAuthorUrs
    • CommentTimeJun 3rd 2023

    Starting something… prodded by discussion with user varkor, here.

    This entry gets its name from the notion in

    which is currently (just) briefly recalled in the first Definition (here).

    But, for the time being the entry has nothing more to say on Hu & Tholen’s discussion (though feel invited to change this!) but turns to a slight variant (effectively a special case) of their definition, which I am proposing and proposing to call “homotopical quasi-coproducts” (here).

    The main motivation is to have a transparent proof that for any cocomplete 𝒞\mathcal{C} its Grothendieck construction

    Loc 𝒞𝒳Grpd𝒞 𝒳 Loc_{\mathcal{C}} \;\;\;\coloneqq\;\;\; \underset{\mathcal{X}\in Grpd}{\textstyle{\int}} \mathcal{C}^{\mathcal{X}}

    is its “free homotopy quasi-coproduct completion” in direct analogy to how the category of familes

    Fam 𝒞XSet𝒞 X Fam_{\mathcal{C}} \;\;\;\coloneqq\;\;\; \underset{X\in Set}{\textstyle{\int}} \mathcal{C}^{X}

    is the free coproduct completion.

    I think I have proven this in the final theorem (here) but this is fresh from the press, so please handle with care for the moment.

    v1, current

    • CommentRowNumber2.
    • CommentAuthorUrs
    • CommentTimeJun 6th 2023

    For what it’s worth, a bit more of a writeup of this point is now in the notes here.