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    • CommentRowNumber1.
    • CommentAuthorUrs
    • CommentTimeNov 21st 2022
    • (edited Nov 21st 2022)

    starting a dedicated entry for the category of vector bundles with homomorphisms allowed to cover non-trivial base maps (while previously we only had VectBund(B) for fixed base BB).

    For the moment the main point is to record the interesting cartesian- and tensor-monoidal structure (now here)

    v1, current

    • CommentRowNumber2.
    • CommentAuthorUrs
    • CommentTimeApr 5th 2023
    • (edited Apr 5th 2023)

    added (here) a section “Properties — Distributive monoidal structure” which spells out the elementary argument that (Vect Set,,)(Vect_{Set}, \sqcup, \boxtimes) is distributive monoidal (a verbatim copy of the same few paragraphs which I just added at distributive monoidal category, announed there)

    also added (here) a further subsection “Properties — Amalgamation of monoidal and parameter structures” which is meant to be experimental for the moment (I left a disclaimer “under construction”).

    The point of this last subsection I discuss in another thread: here.

    diff, v3, current

    • CommentRowNumber3.
    • CommentAuthorUrs
    • CommentTimeApr 17th 2023

    added a line (here) on the bireflective inclusion of zero-bundles

    diff, v7, current

    • CommentRowNumber4.
    • CommentAuthorperezl.alonso
    • CommentTimeDec 3rd 2024

    When does this category have equalizers preserved by the tensor product? I imagine that’s when the category of base spaces satisfies the same condition?

    • CommentRowNumber5.
    • CommentAuthorUrs
    • CommentTimeDec 3rd 2024

    That should be right. Abstractly one can appeal to the description of (co)limits in a Grothendieck construction given there: One first forms the (co)limit in the base category, then pushes/pulls the remaining diagram of fibers to a diagram all over the base (co)cone tip and forms the remaining (co)limit of fibers there.

    • CommentRowNumber6.
    • CommentAuthorperezl.alonso
    • CommentTimeDec 3rd 2024

    I see, so that means that if I have a principal GG-bundle on the category on smooth manifolds expressed as an equalizer G×PPMG\times P \rightrightarrows P\to M this will allow me to construct principal HH-bundles on VectBunVectBun as an equalizer HVVVH\otimes V \rightrightarrows V\to V' for HH a Hopf algebra object in VectBunVectBun, a vector bundle over GG, and V,VV,V' coalgebra vector bundles over P,MP,M, resp., right?

    • CommentRowNumber7.
    • CommentAuthorUrs
    • CommentTimeDec 3rd 2024

    Not sure if I am following this description.

    Incidentally, the first equalizer you mention is a coequalizer – which is good if you are still interested in it being preserved by external tensor – but I don’t see where this enters in what you write now.

    Do you really mean to have a Hopf algebra object over a base object that is a group object – this seems to lead to a clash of variances.

    So I don’t quite see what you are after here.

    • CommentRowNumber8.
    • CommentAuthorperezl.alonso
    • CommentTimeDec 3rd 2024

    Right. I’m trying to construct principal bundles in VectBunVectBun along the lines of Brzeziński 09. One regards the groups as Hopf objects given that every set is a comonoid.

    • CommentRowNumber9.
    • CommentAuthorUrs
    • CommentTimeDec 3rd 2024

    I see. But do you want HH to co-act on VV or to act? In the first case the relation to the underlying GG-action is lost, im the second case group structure is missing.

    In any, I may not have the leisure right now to sort through this.

    • CommentRowNumber10.
    • CommentAuthorperezl.alonso
    • CommentTimeDec 3rd 2024

    I’d want it to act, this would be the dual of the algebraic description of quantum group bundles expressed in terms of a Hopf coaction B coHBBHB^{co H}\to B \rightrightarrows B\otimes H.

    And no worries, this is pretty much early stage by now, but I think #5 is along the lines of what I would need, thanks!