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1. • CommentRowNumber1.
   • CommentAuthorUrs
   • CommentTimeOct 21st 2021
   • (edited Oct 21st 2021)
   • PermaLink
   Author: Urs
   Format: MarkdownItexadded pointer to * [[Maren Justesen]], *Bikategorien af Profunktorer*, Aarhus 1968 ([pdf](https://ncatlab.org/nlab/files/Justesen_Profunktoren.pdf)) (via user varkor, [here](https://nforum.ncatlab.org/discussion/13616/maren-justesen/?Focus=96165#Comment_96165)) <a href="https://ncatlab.org/nlab/revision/diff/Prof/10">diff</a>, <a href="https://ncatlab.org/nlab/revision/Prof/10">v10</a>, <a href="https://ncatlab.org/nlab/show/Prof">current</a>

   added pointer to

   • Maren Justesen, Bikategorien af Profunktorer, Aarhus 1968 (pdf)

   (via user varkor, here)

   diff, v10, current

2. • CommentRowNumber2.
   • CommentAuthornonemenon
   • CommentTimeSep 25th 2023
   • (edited Sep 25th 2023)
   • PermaLink
   Author: nonemenon
   Format: MarkdownItexFrom what I can gather, sheaves on (some) **Vect** (with some Grothendieck topology I don't recall) constitute a standard model for generalized smooth spaces. I still recall my alarm when I first learned that this produces a synthetic differential geometry equivalent to that obtained by taking sheaves on the category of cartesian spaces and *all* smooth maps between them, which I believe is called **Cart** when equipped with (some Grothendieck topology I don't recall). Resolving my surprise concerning this identification was formative in developing my intuition for the various flavors of completion 2-functors such as Karoubi envelopes and Cauchy completion in the enriched context (and Yoneda etc). Forgive me if a flaw in my understanding has resulted in a silly question, but I am quite curious what would be obtained by extending this recipe along the analogy/abstraction [R : R-Bimod] :: [V : V-Prof]. In short: what are "spaces locally modelled on enriched categories" in the sense that tangent spaces are (enriched) categories, tensor fields are diagrams of profunctors indexed by the shape ∫ of the base, etc. Does anyone know if this has been addressed in the literature? I would love to read more! Thank you

   From what I can gather, sheaves on (some) Vect (with some Grothendieck topology I don’t recall) constitute a standard model for generalized smooth spaces. I still recall my alarm when I first learned that this produces a synthetic differential geometry equivalent to that obtained by taking sheaves on the category of cartesian spaces and all smooth maps between them, which I believe is called Cart when equipped with (some Grothendieck topology I don’t recall). Resolving my surprise concerning this identification was formative in developing my intuition for the various flavors of completion 2-functors such as Karoubi envelopes and Cauchy completion in the enriched context (and Yoneda etc).

   Forgive me if a flaw in my understanding has resulted in a silly question, but I am quite curious what would be obtained by extending this recipe along the analogy/abstraction [R : R-Bimod] :: [V : V-Prof]. In short: what are “spaces locally modelled on enriched categories” in the sense that tangent spaces are (enriched) categories, tensor fields are diagrams of profunctors indexed by the shape ∫ of the base, etc.

   Does anyone know if this has been addressed in the literature? I would love to read more! Thank you

3. • CommentRowNumber3.
   • CommentAuthorUrs
   • CommentTimeSep 25th 2023
   • PermaLink
   Author: Urs
   Format: MarkdownItex> sheaves on (some) $\mathbf{Vect}$ (with some Grothendieck topology I don’t recall) constitute a standard model for generalized smooth spaces. Do you have a pointer to what you have in mind here? > the category of cartesian spaces and all smooth maps between them, which I believe is called $\mathbf{Cart}$ Yes. I had turned attention to this category as a site for smooth spaces in Def. 1.2.197 of dcct ([p. 144](https://arxiv.org/pdf/1310.7930v1.pdf#page=144)) and the idea stuck (previous authors had insisted on using categories of open subsets of Euclidean spaces, instead).

   sheaves on (some) $\mathbf{Vect}$ (with some Grothendieck topology I don’t recall) constitute a standard model for generalized smooth spaces.

   Do you have a pointer to what you have in mind here?

   the category of cartesian spaces and all smooth maps between them, which I believe is called $\mathbf{Cart}$

   Yes. I had turned attention to this category as a site for smooth spaces in Def. 1.2.197 of dcct (p. 144) and the idea stuck (previous authors had insisted on using categories of open subsets of Euclidean spaces, instead).

4. • CommentRowNumber4.
   • CommentAuthornonemenon
   • CommentTimeSep 25th 2023
   • PermaLink
   Author: nonemenon
   Format: MarkdownItexHmm. After struggling to track down where I got the idea about Vect serving as a nice site for smooth spaces, I wonder if I got confused reading an older version of [CartSp](https://ncatlab.org/nlab/show/CartSp) or [smooth set](https://ncatlab.org/nlab/show/smooth+set). Maybe my alarm was actually good sensibility all along, haha. Thank you for the reference. I will keep chewing on the relationship between Vect and Prof; right now I'm toying with slices $Prof_{/1}$ as analogs of $Vect_{/k[1]} \simeq Aff$.

   Hmm. After struggling to track down where I got the idea about Vect serving as a nice site for smooth spaces, I wonder if I got confused reading an older version of CartSp or smooth set. Maybe my alarm was actually good sensibility all along, haha.

   Thank you for the reference. I will keep chewing on the relationship between Vect and Prof; right now I’m toying with slices $Prof_{/1}$ as analogs of $Vect_{/k[1]} \simeq Aff$.

5. • CommentRowNumber5.
   • CommentAuthoranuyts
   • CommentTimeFeb 16th 2024
   • PermaLink
   Author: anuyts
   Format: MarkdownItexProf = Kl(PSh) <a href="https://ncatlab.org/nlab/revision/diff/Prof/11">diff</a>, <a href="https://ncatlab.org/nlab/revision/Prof/11">v11</a>, <a href="https://ncatlab.org/nlab/show/Prof">current</a>

   Prof = Kl(PSh)

   diff, v11, current