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Stephan Spahn added stuff to plus construction on presheaves
Thanks, Stephan!
you ask
To address the question of compact objects in Sh ∞(SmoothMfd) there should be an (∞,1)-plus construction, too. Is in this case where the (∞,1)-site is just a 1-site somehow clear how this works?
For -truncated objects it is in principle clear: one has to apply the plus-construction (n+2)-times in a row!
See for instance section 6.5.3 of HTT.
I have added a brief remark on this in the Idea section. But am out of time now.
I have added the reference to the famous Heller-Rowe article where the plus construction in the case of abelian sheaves is studied. In the abelian context one usually says Heller-Rowe functor. Interestingly, the theory of Q-categories of Rosenberg has been written out in 1988 to exhibit the common and nontrivial generalization of the functor in the theory of Gabriel localization and Heller/Rowe functor, as the instances of the same construction. Gabriel localization is also , just like sheafification. Here is a Gabriel filter.
I always thought that the fact that we needed to do twice had something to do with the fact that the equaliser diagram has two stages, but I never did find a good technical explanation of this point. What is clear, though, is that doing it once is a generalisation of computing . I imagine these two facts are related via -categories…
Added to plus construction on presheaves that applying the plus construction once is not left adjoint to the inclusion of separated presheaves in all presheaves.
Well, not quite. The last functor is not a discrete fibration. But it’s closely related.
The link to descent morphism didn’t match the usage of that term on that page.
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