Timeline for Is there a homotopy coherent analogue of Dieudonné modules?
Current License: CC BY-SA 4.0
7 events
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May 14, 2021 at 23:31 | comment | added | Hadrian Heine | Thanks for your comments! | |
May 12, 2021 at 14:12 | comment | added | Z. M | @NeilStrickland I would also like to mention that there is a theory of topological Cartier modules due to Antieau and Nikolaus. | |
May 11, 2021 at 18:11 | comment | added | Neil Strickland | I tried to work with this some years ago but did not get very far. I struggled with some foundational problems, but they can probably be avoided using $\infty$-categories, which were not available at that point. | |
May 11, 2021 at 18:09 | comment | added | Neil Strickland | There's a connection between $THH$ and Witt rings and a connection between Witt rings and Dieudonné modules, so that seems like a good place to start. There is also a theorem of Goerss relating the Dieudonné module of $H_*(\Omega^\infty E;\mathbb{F}_p)$ to $E_*(\Omega^2S^3)$. It would be very valuable to understand that in a more structured way, preferably without recourse to Brown-Gitler technology and apparently-unnatural changes of grading. | |
May 11, 2021 at 17:55 | history | edited | Francesco Polizzi | CC BY-SA 4.0 |
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May 11, 2021 at 16:51 | history | edited | Hadrian Heine | CC BY-SA 4.0 |
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May 11, 2021 at 16:46 | history | asked | Hadrian Heine | CC BY-SA 4.0 |