Is there a flat-modality in A1-homotopy theory? #18
Comments
|
From a discussion with David this morning: No, there cannot be a flat-modality like that, because the coalgebras of a lex comonad on a topos is a topos. A flat modality should be lex, because it is crisply right-adjoint to A1-nullfication. So this should show that externally, a flat modality would imply that the A1-local objects form a topos, which is known to be false. |
|
Written down in README |
|
I think we can maybe reopen this issue. Recently I've been looking deeper into cohesive HoTT, and while I still claim to be no expert of it, it does look to me that some form of ( Perhaps this boils down to the choice of site (the Nisnevich vs. étale stuff we'd discussed briefly at SAG 4) - so maybe we just don't have the right shape modality yet? Anyways this has been in my head for quite a few days, so just some simple thoughts for the moment. Of course, if we're going into the stable theory, that's a wholly different beast - but I guess no one's thinking that far yet... |
|
Never mind, I opened a new issue to discuss this line of thought. |
This (hopefully) boils down to the following external question:$i:M\to\mathrm{Sh}(\mathrm{Zar})$ be the inclusion of the $\mathbb A^1$ -local sheaves into all Zariski-sheaves. Then the localization is a left adjoint to $i$ and the question if there is a flat modality should be the question if $i$ also has a right adjoint or equivalently preserves homotopy colimits. I am not sure if that would be enough, but if it is false, we can definitely start to seriously question #17 .
Let
Assuming a flat-modality, it should work to use David Jaz Myers idea in the good fibrations article, theorem 5.9 taking for X the type of torsors of crisply discrete groups, to show #17.
The text was updated successfully, but these errors were encountered: