Timeline for Is there an analogue of distributions in characteristic p?
Current License: CC BY-SA 3.0
6 events
| when toggle format | what | by | license | comment | |
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| Sep 13, 2013 at 11:11 | comment | added | user64494 | In this case look at "SIMPLE LIE SUPERALGEBRAS AND NONINTEGRABLE DISTRIBUTIONS IN CHARACTERISTIC P" by SOFIANE BOUARROUDJ , DIMITRY LEITES. | |
| Sep 13, 2013 at 11:00 | comment | added | Ketil Tveiten | Check en.wikipedia.org/wiki/p-adic and en.wikipedia.org/wiki/characteristic_(algebra). When people talk about "in characteristic $p$", they typically mean e.g. algebraic geometry over a field of characteristic $p$. | |
| Sep 13, 2013 at 10:40 | comment | added | user64494 | Could you explain the difference by a simple example? | |
| Sep 13, 2013 at 7:35 | comment | added | Ketil Tveiten | I think you may have misunderstood, I was asking for a characteristic $p$ analogue, not a $p$-adic analogue. Still, it looks like the paper you linked has some ideas I can use, so thanks anyway. | |
| Sep 12, 2013 at 17:56 | comment | added | user64494 | Look at Aizenbud A., A partial analog of integrability theorem for distributions on p-adic spaces and applications arxiv.org/abs/0811.2768 | |
| Sep 12, 2013 at 10:04 | history | asked | Ketil Tveiten | CC BY-SA 3.0 |